1 f Crossword Puzzles
TTS MATEMATIKA 2021-02-21
Across
- Jika(fog)(x)=x+4 dan g(x)=x-2, maka invers dari fungsi f adalah...
- Diketahui fungsi f(x)=3x^2-5x+1 dan g(x)=4x+1, maka (fog)(x)=...
- Jika f(x)=√x+3 maka f^-1(x)=...
- Jika f(x)=x^2+x+1 dan g(x)=2x-3, (fog)(x)=...
- Fungsi f dan fungsi g memiliki invers dan memenuhi g(x-2)= f(x+2), maka g^-1(x) adalah...
- Jika f(x)=2x+3 dan g(x)=x^2-2x+4, (gof)(x)=...
- Jika fungsi f dan g memiliki invers dan memenuhi f(x+2)=g(x-3), maka f^-1(x)=...
- Jika f(x)=√x+1 dan (fog)(x)=2√x-1, maka g(x)=...
- Diketahui f(x)=3x-1 dan g(x)=2x^2-3, maka (gof)(x)=...
- Diketahui f(x)= 3x+2 dan g(x)= x^2-x+3. Maka (fog)(x) adalah...
- Jika f(2-x)= x/2 + 3, maka f^-1(x) adalah...
Down
- Jika f(x)=2a+8 dan g(x)=3x-6. (fog)(x)=(gof)(x), maka nilai a yang memenuhi adalah
- Jika f(x)=2x+2 dan g(x)=(x+1)/(4x-2), maka (fog)(x)=...
- Jika f(x+1)=(2x-7)/(x+1), maka (fof)^-1(-1)=...
- Diketahui f(x)=x-5 dan g(x)=x^2+x. Tentukan (fog)(x)
- Jika fungsi f dan g memiliki invers dan memenuhi f(2x)=g(x-3), maka f^-1(x)=...
- Diketahui f(x)=x+4 dan g(x)=2x, maka (fog)^-1(x)=...
- Diketahui (g^-1of^-1)(x)=-2x+4, jika f(x) = (-x-2)/2x-10,x≠5. Maka g(6)=...
- Jika f(x)= ax+3 dan f(f(x))= 4x+9 maka nilai a^2+3a+3 adalah...
- Jika f(x+1)=(2x-7)/(x+1), maka f(-1)=...
20 Clues: Jika f(x)=√x+3 maka f^-1(x)=... • Jika f(x+1)=(2x-7)/(x+1), maka f(-1)=... • Jika f(2-x)= x/2 + 3, maka f^-1(x) adalah... • Jika f(x)=x^2+x+1 dan g(x)=2x-3, (fog)(x)=... • Jika f(x)=2x+3 dan g(x)=x^2-2x+4, (gof)(x)=... • Jika f(x+1)=(2x-7)/(x+1), maka (fof)^-1(-1)=... • Jika f(x)=√x+1 dan (fog)(x)=2√x-1, maka g(x)=... • ...
TTS MAT WAJIB - Fungsi,Invers,Komposisi 2021-03-13
Across
- (l)(x), (f ◦ l)(x) = (l ◦ f)(x) = f(x) adalah salah satu sifat komposisi
- fungsi yang bisa dilambangkan dengan penggunaan huruf (f o g) adalah fungsi
- fungsi yang himpunan daerah hasilnya sama dengan himpunan daerah kodomain
- f(x)-1= x2 – 16 maka f(x) =
- jika Diketahui f(x) = x2 – 4 dan g(x) = x + 2. Tentukan (f/g).(x)
- penggabungan dari operasi pada dua jenis fungsi f (x) dan g (x) sampai bisa menghasilkan fungsi baru disebut fungsi
- f(x) = (x + 2)/(5-3x) maka nilai dari f-1 (1) adalah
- . jika diketahui f(x) = X-3 dan g(X) = 2x + 4 maka (g o f)-1 (2) adalah
- f(x) -1 = x-4 maka f(x) =
Down
- fungsi yang setiap anggota di daerah asal hanya memiliki tepat 1 pasangan dengan daerah kawan
- Fungsi satu satu
- (f.(g.h))(x) = ((f.g). h)(x) merukapan sifat fungsi
- {(0,9), (0,7), (1,8), (2,7), (2,9)} apakah ini merupakan fungsi (iya/tidak)
- Jika diketahui f (x) = 3x + 4 dan g (x) = 3x berapa nilai dari (f o g) (3)
- diketahui g(x) = 2x+4 dan ( f o g )(x) = (7x + 3)/(5x-9) nilai dari f(2)
- fungsi yang merupakan kebalikan aksi dari suatu fungsi. Adalah fungsi
- jika diketahui f(x) = X2 -2X +1 maka f-1 (4) adalah
- diketahui f(x) = 2-x dan g(x) = 2x+a+1. Jika ( f o g )(x) = (g o f)(x), berapa nilai a
- (f o g)(x)≠(g o f)(x) berarti tidak berlaku ?
- jika f(2x+4) = x dan g(5-x) = x maka nilai f(g(1)) + g(f(2)) adalah
20 Clues: Fungsi satu satu • f(x) -1 = x-4 maka f(x) = • f(x)-1= x2 – 16 maka f(x) = • (f o g)(x)≠(g o f)(x) berarti tidak berlaku ? • (f.(g.h))(x) = ((f.g). h)(x) merukapan sifat fungsi • jika diketahui f(x) = X2 -2X +1 maka f-1 (4) adalah • f(x) = (x + 2)/(5-3x) maka nilai dari f-1 (1) adalah • jika Diketahui f(x) = x2 – 4 dan g(x) = x + 2. Tentukan (f/g).(x) • ...
TTS MAT WAJIB - Fungsi,Invers,Komposisi 2021-03-13
Across
- penggabungan dari operasi pada dua jenis fungsi f (x) dan g (x) sampai bisa menghasilkan fungsi baru disebut fungsi
- fungsi yang bisa dilambangkan dengan penggunaan huruf (f o g) adalah fungsi
- (l)(x), (f ◦ l)(x) = (l ◦ f)(x) = f(x) adalah salah satu sifat komposisi
- diketahui f(x) = 2-x dan g(x) = 2x+a+1. Jika ( f o g )(x) = (g o f)(x), berapa nilai a
- fungsi yang himpunan daerah hasilnya sama dengan himpunan daerah kodomain
- f(x) -1 = x-4 maka f(x) =
- f(x)-1= x2 – 16 maka f(x) =
- jika f(2x+4) = x dan g(5-x) = x maka nilai f(g(1)) + g(f(2)) adalah
- jika diketahui f(x) = X2 -2X +1 maka f-1 (4) adalah
- {(0,9), (0,7), (1,8), (2,7), (2,9)} apakah ini merupakan fungsi (iya/tidak)
- (f.(g.h))(x) = ((f.g). h)(x) merukapan sifat fungsi
Down
- fungsi yang setiap anggota di daerah asal hanya memiliki tepat 1 pasangan dengan daerah kawan
- Jika diketahui f (x) = 3x + 4 dan g (x) = 3x berapa nilai dari (f o g) (3)
- Fungsi satu satu
- f(x) = (x + 2)/(5-3x) maka nilai dari f-1 (1) adalah
- fungsi yang merupakan kebalikan aksi dari suatu fungsi. Adalah fungsi
- . jika diketahui f(x) = X-3 dan g(X) = 2x + 4 maka (g o f)-1 (2) adalah
- (f o g)(x)≠(g o f)(x) berarti tidak berlaku ?
- jika Diketahui f(x) = x2 – 4 dan g(x) = x + 2. Tentukan (f/g).(x)
- diketahui g(x) = 2x+4 dan ( f o g )(x) = (7x + 3)/(5x-9) nilai dari f(2)
20 Clues: Fungsi satu satu • f(x) -1 = x-4 maka f(x) = • f(x)-1= x2 – 16 maka f(x) = • (f o g)(x)≠(g o f)(x) berarti tidak berlaku ? • jika diketahui f(x) = X2 -2X +1 maka f-1 (4) adalah • (f.(g.h))(x) = ((f.g). h)(x) merukapan sifat fungsi • f(x) = (x + 2)/(5-3x) maka nilai dari f-1 (1) adalah • jika Diketahui f(x) = x2 – 4 dan g(x) = x + 2. Tentukan (f/g).(x) • ...
TTS MAT WAJIB - Fungsi,Invers,Komposisi 2021-03-13
Across
- jika f(2x+4) = x dan g(5-x) = x maka nilai f(g(1)) + g(f(2)) adalah
- Fungsi satu satu
- f(x)-1= x2 – 16 maka f(x) =
- penggabungan dari operasi pada dua jenis fungsi f (x) dan g (x) sampai bisa menghasilkan fungsi baru disebut fungsi
- fungsi yang himpunan daerah hasilnya sama dengan himpunan daerah kodomain
- f(x) -1 = x-4 maka f(x) =
- . jika diketahui f(x) = X-3 dan g(X) = 2x + 4 maka (g o f)-1 (2) adalah
- fungsi yang setiap anggota di daerah asal hanya memiliki tepat 1 pasangan dengan daerah kawan
- Jika diketahui f (x) = 3x + 4 dan g (x) = 3x berapa nilai dari (f o g) (3)
Down
- (l)(x), (f ◦ l)(x) = (l ◦ f)(x) = f(x) adalah salah satu sifat komposisi
- {(0,9), (0,7), (1,8), (2,7), (2,9)} apakah ini merupakan fungsi (iya/tidak)
- f(x) = (x + 2)/(5-3x) maka nilai dari f-1 (1) adalah
- (f o g)(x)≠(g o f)(x) berarti tidak berlaku ?
- diketahui f(x) = 2-x dan g(x) = 2x+a+1. Jika ( f o g )(x) = (g o f)(x), berapa nilai a
- fungsi yang merupakan kebalikan aksi dari suatu fungsi. Adalah fungsi
- fungsi yang bisa dilambangkan dengan penggunaan huruf (f o g) adalah fungsi
- diketahui g(x) = 2x+4 dan ( f o g )(x) = (7x + 3)/(5x-9) nilai dari f(2)
- (f.(g.h))(x) = ((f.g). h)(x) merukapan sifat fungsi
- jika diketahui f(x) = X2 -2X +1 maka f-1 (4) adalah
- jika Diketahui f(x) = x2 – 4 dan g(x) = x + 2. Tentukan (f/g).(x)
20 Clues: Fungsi satu satu • f(x) -1 = x-4 maka f(x) = • f(x)-1= x2 – 16 maka f(x) = • (f o g)(x)≠(g o f)(x) berarti tidak berlaku ? • (f.(g.h))(x) = ((f.g). h)(x) merukapan sifat fungsi • jika diketahui f(x) = X2 -2X +1 maka f-1 (4) adalah • f(x) = (x + 2)/(5-3x) maka nilai dari f-1 (1) adalah • jika Diketahui f(x) = x2 – 4 dan g(x) = x + 2. Tentukan (f/g).(x) • ...
Steigerung - Komparativ und Superlativ 2024-01-29
Across
- difficilis/e: Superl. 2. Sg. m./n./1./5. Pl. m.
- antiquus/a/um: 3./6. Pl. m./f./n.
- longus/a/um: Kompar. 1. Sg. m./f.
- pulcher/ra/rum: Kompar. 1./4./5. Pl. n.
- latus/a/um: Kompar. 4. Sg. m./f.
- antiquus/a/um: Superl. 3./6. Sg. m./n.
- clarus/a/um: Superl. 2. Pl. f.
- crudelis/e: Kompar. 3. Sg. m./f./n.
- brevis/e: Superl. 4. Pl. f.
- iratus/a/um: Superl. 1. Sg. m.
- iratus/a/um: Kompar. 2. Pl. m./f./n.
- longus/a/um: Superl. 3./6. Pl. m./f./n.
- miser/era/erum: Kompar. 3. Sg. m./f./n.
- nobilis/e: Superl. 2. Pl. m./n.
Down
- similis/e: Kompar. 2. Sg. m./f./n.
- miser/era/erum: Superl. 2./3. Sg. f.//1./5. Pl. f.
- latus/a/um: Superl. 4. Pl. m.
- sacer/cra/crum: Kompar. 2. Sg. m./f./n.
- brevis/e: Kompar. 2. Pl. m./f./n.
- celer/is/e: Kompar. 1./4./5. Pl. m./f.
- atrox: Kompar. 1./4./5. Sg. n.
- difficilis/e: Kompar. 1./4./5. Pl. n.
- clarus/a/um: Kompar. 1./4./5. Sg. n.
- improbus/a/um: Kompar. 6. Sg. m./f./n.
- laetus/a/um: : Kompar. 3./6. Pl. m./f./n.
- celer/is/e: Superl. 1./5./6. Sg. f.//1./4./5. Pl. n.
- sacer/cra/crum: Superl. 4. Sg. m./1./4./5. Sg. n.
27 Clues: brevis/e: Superl. 4. Pl. f. • latus/a/um: Superl. 4. Pl. m. • atrox: Kompar. 1./4./5. Sg. n. • clarus/a/um: Superl. 2. Pl. f. • iratus/a/um: Superl. 1. Sg. m. • nobilis/e: Superl. 2. Pl. m./n. • latus/a/um: Kompar. 4. Sg. m./f. • antiquus/a/um: 3./6. Pl. m./f./n. • longus/a/um: Kompar. 1. Sg. m./f. • brevis/e: Kompar. 2. Pl. m./f./n. • similis/e: Kompar. 2. Sg. m./f./n. • ...
TTS MTK 2023-08-27
Across
- fog (x)/gof(x) merupakan
- Jika diketahui f(x)=x+1/2x-3 dan f^-1(1)adalah
- jika f^-1 adalah invers fungsi f(x)=2x-4/x-3, x≠3 maka nilai f^-1 adalah
- Hasil dari pemetaan fungsi domain dan kodomain disebut
- diketahui f(x)=2x-1 dan g(x)=x²+2 maka (f o g) adalah
- Aturan yang menggabungkan setiap elemen dalam sebuah himpunan
- Proses menggabungkan dua/lebih fungsi untuk menciptakan fungsi baru
- Fungsi dari f(x)=2x+1 dan g(x)=3x³+5 tentukan f°g(x) dan f°g(1) adalah
- Jika diketahui fungsi f(x) 2x+6/x-4 dan g(x)=2x-8/x+3 maka tentukan hasil dari f(x).g(x)
- Korespondensi satu disebut juga
Down
- Jika diketahui f(x)=3x+2 dan g(x)=2-x maka ( f o g )(x) dan ( g o f )(x) adalah
- f^-1 (x) merupakan
- Bila sebuah fungsi f(x)= x/x+1 dan g(x)=2x -1 jadi (f o g) ^-1(x) adalah
- Relasi dari himpunan A kehimpunan B,apabila anggota himpunan A berpasangan tepat dgn himpunan B
- Daerah asal disebut juga dengan
- diketahui f(x)=3x²-4x+6 dan g(x)=2x-1 maka (f o g) (2) adalah
- Hubungan antara satu himpunan dengan himpunan Lainnya
- Diketahui f(x)=6x-3 dan g(x)=5x+4 maka ( f o g )(a)=81, nilai a adalah
- Jika f(x)=3x-1 dan g(x)= 2x²+3 maka (g o f)(1) adalah
- f( x): 2x-4 merupakan bilangan
20 Clues: f^-1 (x) merupakan • fog (x)/gof(x) merupakan • f( x): 2x-4 merupakan bilangan • Daerah asal disebut juga dengan • Korespondensi satu disebut juga • Jika diketahui f(x)=x+1/2x-3 dan f^-1(1)adalah • diketahui f(x)=2x-1 dan g(x)=x²+2 maka (f o g) adalah • Hubungan antara satu himpunan dengan himpunan Lainnya • Jika f(x)=3x-1 dan g(x)= 2x²+3 maka (g o f)(1) adalah • ...
Yay Calculus 2022-05-13
Across
- ways a limit can't exist: f(x) approaches ___________ from left and right
- ____________ implies continuity; if f is at x=c, then f is continuous at x=c
- ___________ rate of change; the limit as h approaches zero of (f(x+h)-f(x))/(h)
- _____ rule; d/dx[f(g(x))]=f'(g(x))g'(x)
- s'(t) or v(t)
- derivative of an ______ function; g'(x)= 1/(f'(g(x))
- ______ point; f'(x)=0 or undefined
- ways a limit can't exist: increases or decreases without ________
- ______ rate of change; (f(b)-f(a))/(b-a)
- _______ rule; d/dx(f(x)g(x))=f'(x)g(x)+f(x)g'(x)
- our second AP Calculus AB teacher
- plus a ______ (integration)
- f'(x)=0 and sign of f'(x) goes from + to -
- ____ integration; only outer radius
- ways a limit can't exist: f(x) __________ between two fixed values
- our first AP Calculus AB teacher
- d/dx (______)=-1/√(1-x^2)
- creator of calculus
- ____________ value theorem; a function is continuous on [a,b], and y is a # between f(a) and f(b), then there exists at least one # x=c in the open interval (a,b) such that f(c)=y
Down
- ___________ theorem of calculus
- ________ differentiation; differentiate everything with respect to x, then add dy/dx if the variable is y, then solve for dy/dx
- ________ rule; d/dx(f(x)/g(x))= (f'(x)g(x)-f(x)g'(x))/g(x)^2
- d/dx(_____)=1/√(1-x^2)
- d/dx (______)=-1/(1+x^2)
- s"(t) or a(t)
- d/dx (______)=1/(|x|√(x^2-1))
- ________ value theorem; if f(x) is continuous on [a,b], its guaranteed to have an absolute maximum
- d/dx (______)=-1/(|x|√(x^2-1))
- _______ point f"(x) goes from (+ to 0 to -) or (- to 0 to +)
- a rectangular approximation for integrating
- the integral of f(x) from b to a times 1/(b-a) is equal to
- the limit as x approaches c of f(x)/g(x) = the limit as x approaches c of f'(x)/g'(x)
- f'(x)=0 and sign of f'(x) goes from - to +
- _______ theorem; squash
- s(t)
- a function f is continuous at c if the limit as x approaches c of f(x) ______
- a function f is continuous at c if f(c) is __________
- d/dx (______)=1/(1+x^2)
- ______ integration; outer and inner radius
- d/dx(__)=1/x
- ______ value theorem; instantaneous rate of change = average rate of change
41 Clues: s(t) • d/dx(__)=1/x • s"(t) or a(t) • s'(t) or v(t) • creator of calculus • d/dx(_____)=1/√(1-x^2) • _______ theorem; squash • d/dx (______)=1/(1+x^2) • d/dx (______)=-1/(1+x^2) • d/dx (______)=-1/√(1-x^2) • plus a ______ (integration) • d/dx (______)=1/(|x|√(x^2-1)) • d/dx (______)=-1/(|x|√(x^2-1)) • ___________ theorem of calculus • our first AP Calculus AB teacher • ...
Gen Mathematics Group 8 2020-12-13
Across
- f(x)=3x^2+7x,g(x)=2x-x-1 find (f-g)(x)
- x,6x and 9
- (3)^x=3^13
- x^2-1/x^2+1<=0
- 8^3x+3=8^6
- f(x)=3x^2+2x+1,g(x)=x-4 find (f*g)(x)
- x,3x and 5
- 64^4x-8<256^2x+6
- 5^2x<=125^x-5
- Solve for x 7/x+3=3/4
- x^3(x-2)/(x+3)^2<0
- x,3x and 20
Down
- (1/8)^(-2x-6)>(1/32)^(x+11)
- f(x)=3x^2+7x,g(x)=2x-x-1 find (f+g)(x)
- 7/3x+4/6x^2=5/8x-2/3x^2
- x,15x and 2
- x+3/x-4=x-5/x+4
- f(x)=x^2-2x+1,g(x)=x-1 find (f/g)(x)
- Solve for x 5/x-1/3=1/x
- x.6x and 8
20 Clues: x,6x and 9 • (3)^x=3^13 • 8^3x+3=8^6 • x,3x and 5 • x.6x and 8 • x,15x and 2 • x,3x and 20 • 5^2x<=125^x-5 • x^2-1/x^2+1<=0 • x+3/x-4=x-5/x+4 • 64^4x-8<256^2x+6 • x^3(x-2)/(x+3)^2<0 • Solve for x 7/x+3=3/4 • 7/3x+4/6x^2=5/8x-2/3x^2 • Solve for x 5/x-1/3=1/x • (1/8)^(-2x-6)>(1/32)^(x+11) • f(x)=x^2-2x+1,g(x)=x-1 find (f/g)(x) • f(x)=3x^2+2x+1,g(x)=x-4 find (f*g)(x) • ...
Crossword In Basic Calculus 2020-05-30
Across
- g(2)=t/2t+6
- g(0)=t/2t+6
- h(-1/2)=√1-z^2
- h(0)=√1-z^2
- g(z)=12x^2+36x
- h(x)=2x^3+3x^2+13x
- y=2t^4-10t^2+13t
- f(x)=500x^2+300x^3
- V(x)=54x^2+11x^3+8x^2+12x
- f(x)=6x^3-9x+4
- g(z)=4z^7-3z^-7+9z
- Determine the fourth derivative of h(t)=3t^7+6t^4+8t^3-12t+18
Down
- h(1/2)=√1-z^2
- f(0)=3-5x-2x^2
- f(x)=3x^2+x^2+16
- g(10)=t/2t+6
- determine the 4th derivative of V(x)=x^3-x^2+x-1
- f(4)=3-5x-2x^2
- determine the fourth derivative of f(x)=50x^3+24x^3+9x^3
- f(-3)=3-5x-2x^2
20 Clues: g(2)=t/2t+6 • g(0)=t/2t+6 • h(0)=√1-z^2 • g(10)=t/2t+6 • h(1/2)=√1-z^2 • f(0)=3-5x-2x^2 • h(-1/2)=√1-z^2 • f(4)=3-5x-2x^2 • g(z)=12x^2+36x • f(x)=6x^3-9x+4 • f(-3)=3-5x-2x^2 • f(x)=3x^2+x^2+16 • y=2t^4-10t^2+13t • h(x)=2x^3+3x^2+13x • f(x)=500x^2+300x^3 • g(z)=4z^7-3z^-7+9z • V(x)=54x^2+11x^3+8x^2+12x • determine the 4th derivative of V(x)=x^3-x^2+x-1 • ...
Futbol 2023-05-16
Across
- 1. m. Pelota grande, usada en juegos o con fines terapéuticos.
- 1. m. f. Jugador que se encuentra en el centro del campo. Ayuda delantera como a la defensa.
- 2. m. f. Jugador que defiende la portería.
- 3. m. f. Persona que en algunas competencias cuida de la aplicación de las reglas.
- 2. f. Golpe dado en el aire al balón.
- 10. m. Dep. Túnel
- 2. m. f. Jugador que forma parte de la linea delantera.
- 1. intr. Lanzar el balón fuertemente con el pie.
- 1. f. Dep. Saltar en el aire y patear el balón de espaldas.
- 4. f. Marco rectangular formado por dos postes y un larguero.
- 1. f. Patear el balón de forma que suba alto y después caiga.
Down
- 2. f. Dep. Golpeo del balón con las piernas cruzadas.
- 1. m. Acción y efecto de pasar.
- 1. f. Acción y efecto de amonestar.
- 8. m. Encuentro que enfrenta a dos equipos.
- 2. m. Dep. Finta que hace un jugador para sortear al rival.
- 3. f. Quebramiento de una obligación.
- 4. m. f. Entrenador de un equipo deportivo.
- 1. f. Pieza de cartulina rectangular de pequeño tamaño.
- 14. m. f. Jugador que forma parte de la linea defensiva.
20 Clues: 10. m. Dep. Túnel • 1. m. Acción y efecto de pasar. • 1. f. Acción y efecto de amonestar. • 2. f. Golpe dado en el aire al balón. • 3. f. Quebramiento de una obligación. • 2. m. f. Jugador que defiende la portería. • 8. m. Encuentro que enfrenta a dos equipos. • 4. m. f. Entrenador de un equipo deportivo. • 1. intr. Lanzar el balón fuertemente con el pie. • ...
Futbol 2023-05-16
Across
- 1. m. Pelota grande, usada en juegos o con fines terapéuticos.
- 1. m. f. Jugador que se encuentra en el centro del campo. Ayuda delantera como a la defensa.
- 2. m. f. Jugador que defiende la portería.
- 3. m. f. Persona que en algunas competencias cuida de la aplicación de las reglas.
- 2. f. Golpe dado en el aire al balón.
- 10. m. Dep. Túnel
- 2. m. f. Jugador que forma parte de la linea delantera.
- 1. intr. Lanzar el balón fuertemente con el pie.
- 1. f. Dep. Saltar en el aire y patear el balón de espaldas.
- 4. f. Marco rectangular formado por dos postes y un larguero.
- 1. f. Patear el balón de forma que suba alto y después caiga.
Down
- 2. f. Dep. Golpeo del balón con las piernas cruzadas.
- 1. m. Acción y efecto de pasar.
- 1. f. Acción y efecto de amonestar.
- 8. m. Encuentro que enfrenta a dos equipos.
- 2. m. Dep. Finta que hace un jugador para sortear al rival.
- 3. f. Quebramiento de una obligación.
- 4. m. f. Entrenador de un equipo deportivo.
- 1. f. Pieza de cartulina rectangular de pequeño tamaño.
- 14. m. f. Jugador que forma parte de la linea defensiva.
20 Clues: 10. m. Dep. Túnel • 1. m. Acción y efecto de pasar. • 1. f. Acción y efecto de amonestar. • 2. f. Golpe dado en el aire al balón. • 3. f. Quebramiento de una obligación. • 2. m. f. Jugador que defiende la portería. • 8. m. Encuentro que enfrenta a dos equipos. • 4. m. f. Entrenador de un equipo deportivo. • 1. intr. Lanzar el balón fuertemente con el pie. • ...
Futbol 2023-05-16
Across
- 1. m. Pelota grande, usada en juegos o con fines terapéuticos.
- 1. m. f. Jugador que se encuentra en el centro del campo. Ayuda delantera como a la defensa.
- 2. m. f. Jugador que defiende la portería.
- 3. m. f. Persona que en algunas competencias cuida de la aplicación de las reglas.
- 2. f. Golpe dado en el aire al balón.
- 10. m. Dep. Túnel
- 2. m. f. Jugador que forma parte de la linea delantera.
- 1. intr. Lanzar el balón fuertemente con el pie.
- 1. f. Dep. Saltar en el aire y patear el balón de espaldas.
- 4. f. Marco rectangular formado por dos postes y un larguero.
- 1. f. Patear el balón de forma que suba alto y después caiga.
Down
- 2. f. Dep. Golpeo del balón con las piernas cruzadas.
- 1. m. Acción y efecto de pasar.
- 1. f. Acción y efecto de amonestar.
- 8. m. Encuentro que enfrenta a dos equipos.
- 2. m. Dep. Finta que hace un jugador para sortear al rival.
- 3. f. Quebramiento de una obligación.
- 4. m. f. Entrenador de un equipo deportivo.
- 1. f. Pieza de cartulina rectangular de pequeño tamaño.
- 14. m. f. Jugador que forma parte de la linea defensiva.
20 Clues: 10. m. Dep. Túnel • 1. m. Acción y efecto de pasar. • 1. f. Acción y efecto de amonestar. • 2. f. Golpe dado en el aire al balón. • 3. f. Quebramiento de una obligación. • 2. m. f. Jugador que defiende la portería. • 8. m. Encuentro que enfrenta a dos equipos. • 4. m. f. Entrenador de un equipo deportivo. • 1. intr. Lanzar el balón fuertemente con el pie. • ...
Calculus Terms 2023-05-15
Across
- d/dx[x^n]= nx^(n-1)
- fAVG[a,b]=1b−a⋅∫baf(x)dx
- f’’(x)=0
- sin(A + B) = sinA cosB + cosA sinB. sin(A - B)
- a linear line that passes through a curve and intersects at 2 different points
- FS’ + SF’
- f ( x ) d x = lim n → ∞ ∑ i = 1 n f ( x i ) Δ x
- h(x)=f(g(x)) h’(x)=f’(g(x))g’(x)
- d/dx
- BT’ - TB’/B^2
- a⎰b f(x)dx = F(b)-F(a)
- (c + d)v = cv + dv
- d/dx [ a⎰x f(t)dt] = f(x)
- 1/b−a⋅∫baf(x)dx
Down
- a linear line that touches a curve at only one point
- f’(x)=0
- 1⎰3 f(x)dx = 8
- dy/dx = x/2y
- a⎰b f(x)dx
- a⎰b [f(x)-g(x)] dx
- dA/dt = 2pirdr/dt
- f’(c)=f(b)-f(a)/b-a
- a⎰b 1/u^3 du/dx
- d/dx sinx
- d/dx cosx
25 Clues: d/dx • f’(x)=0 • f’’(x)=0 • FS’ + SF’ • d/dx sinx • d/dx cosx • a⎰b f(x)dx • dy/dx = x/2y • BT’ - TB’/B^2 • 1⎰3 f(x)dx = 8 • a⎰b 1/u^3 du/dx • 1/b−a⋅∫baf(x)dx • dA/dt = 2pirdr/dt • a⎰b [f(x)-g(x)] dx • (c + d)v = cv + dv • d/dx[x^n]= nx^(n-1) • f’(c)=f(b)-f(a)/b-a • a⎰b f(x)dx = F(b)-F(a) • fAVG[a,b]=1b−a⋅∫baf(x)dx • d/dx [ a⎰x f(t)dt] = f(x) • h(x)=f(g(x)) h’(x)=f’(g(x))g’(x) • ...
TTS FUNGSI, KOMPOSISI, INVERS 2021-02-20
Across
- asimtot yang tidak sejajar dengan sumbu X dan Y
- Salah satu jenis fungsi
- Nama lain daerah kawan
- suatu fungsi f yang dinyatakan dengan rumus f(x)=a
- diketahui (f o g)(x) = 9x^2-6x-3. Jika g(x) = 3x-1, nilai dari f^-1(12)=...
- Jika f(x) = 2x + 3 dan g(x) = 9 - x, nilai dari (f o g)^-1(-9) = ...
- Diketaui fungsi f dan g yang ditentukan oleh f(x) = 2x +1 dan g(x) = 4 - 2x. Nilai dari (f-g)^-1 (5) adalah...
- fungsi M yang memuat bentuk nilai mutlak adalah
- asimtot yang sejajar dengan sumbu X
- Nama lain daerah hasil
- asimtot yang sejajar dengan sumbu Y
Down
- Nama lain fungsi satu-satu
- suatu fungsi I yang dinyatakan dengan rumus I(x)=x
- Jika f(x) = 2x-1 dan (f og )(x) = -14x + 21, nilai dari g(-3) = ...
- Jika diketahui fungsi f(x) = 5x - 11 untuk R anggota x, nilai dari f^-1 (4) = ...
- Nama lain fungsi korespodensi satu-satu
- Nama lain fungsi surjektif
- Nama lain daerah asal
- Grafik fungsi kuadrat berbentuk
- Jika diketahui fungsi g(x) = 8x - 25 untuk R anggota x, nilai dari g^-1 (7) = ...
20 Clues: Nama lain daerah asal • Nama lain daerah kawan • Nama lain daerah hasil • Salah satu jenis fungsi • Nama lain fungsi satu-satu • Nama lain fungsi surjektif • Grafik fungsi kuadrat berbentuk • asimtot yang sejajar dengan sumbu X • asimtot yang sejajar dengan sumbu Y • Nama lain fungsi korespodensi satu-satu • asimtot yang tidak sejajar dengan sumbu X dan Y • ...
TTS FUNGSI, KOMPOSISI, INVERS 2021-02-20
Across
- asimtot yang tidak sejajar dengan sumbu X dan Y
- Diketaui fungsi f dan g yang ditentukan oleh f(x) = 2x +1 dan g(x) = 4 - 2x. Nilai dari (f-g)^-1 (5) adalah...
- Grafik fungsi kuadrat berbentuk
- Nama lain daerah asal
- diketahui (f o g)(x) = 9x^2-6x-3. Jika g(x) = 3x-1, nilai dari f^-1(12)=...
- Nama lain fungsi satu-satu
- asimtot yang sejajar dengan sumbu Y
- asimtot yang sejajar dengan sumbu X
- Nama lain fungsi surjektif
- fungsi M yang memuat bentuk nilai mutlak adalah
- suatu fungsi I yang dinyatakan dengan rumus I(x)=x
- Nama lain daerah hasil
Down
- Jika f(x) = 2x-1 dan (f og )(x) = -14x + 21, nilai dari g(-3) = ...
- Salah satu jenis fungsi
- Jika f(x) = 2x + 3 dan g(x) = 9 - x, nilai dari (f o g)^-1(-9) = ...
- Nama lain fungsi korespodensi satu-satu
- Jika diketahui fungsi g(x) = 8x - 25 untuk R anggota x, nilai dari g^-1 (7) = ...
- Nama lain daerah kawan
- suatu fungsi f yang dinyatakan dengan rumus f(x)=a
- Jika diketahui fungsi f(x) = 5x - 11 untuk R anggota x, nilai dari f^-1 (4) = ...
20 Clues: Nama lain daerah asal • Nama lain daerah kawan • Nama lain daerah hasil • Salah satu jenis fungsi • Nama lain fungsi satu-satu • Nama lain fungsi surjektif • Grafik fungsi kuadrat berbentuk • asimtot yang sejajar dengan sumbu Y • asimtot yang sejajar dengan sumbu X • Nama lain fungsi korespodensi satu-satu • asimtot yang tidak sejajar dengan sumbu X dan Y • ...
Basic Calculus Crossword 2020-06-02
Across
- what rule is this? D/dx nu^(n-1 ) x du
- what is the answerlim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
- evaluate lim┬(x→∞) (5x+6x^2)/(3x-8)
- what rule is this? D/dx u/v = (v x du - u x du)/v^2
- f(x)=(7x^5)/4x find f'(2)
- 〖f(x)=(2x〗^3+3)(5x) find f'(-1)
- f(x) √(x^2-4) find f’(2)
- What rule is this? d/dx f(g(x))=f^' (g(x)) g^' (x)
- It is a branch of calculus that studies the rates at which quantities change.
- f(x)=(x^2)/(x-5) find f'(1)
Down
- what rule is this? d/dx u x v = u x dv/dx + v x du/dx
- evaluate lim┬(x→3) (x^3-27)/(x-3)
- What function has a parabola?
- what function is this? If f(x) = x, then f’(x) = 1
- infinity evaluate lim┬(x→4^- ) (-3)/(4-x)^2
- f(x) √(x+5) find f’(4)
- what rule is this? D/dx f(x) + g(x) = f’(x) + g’(x)
- f(x) = 6x^2 – 9x +4 find f’(1)
- It is branch of calculus concerned with the theory and applications of integrals.
- f(x) x^3– 2x^2 + 5 find f’(2)¬¬
- f(x)=-3/x^2 find f'(2)
- evaluate lim┬(x→0) √(36-x^2 )
- what rule is this? d/dx c = 0
- what is 0/0 called?
- 〖f(x)=(5x+2)(x〗^(2)) find 〖f'(-1)〗^
- f(x) √(2&5x+2) find f’(-3)
26 Clues: what is 0/0 called? • f(x) √(x+5) find f’(4) • f(x)=-3/x^2 find f'(2) • f(x) √(x^2-4) find f’(2) • f(x)=(7x^5)/4x find f'(2) • What function has a parabola? • evaluate lim┬(x→0) √(36-x^2 ) • what rule is this? d/dx c = 0 • f(x) √(2&5x+2) find f’(-3) • f(x)=(x^2)/(x-5) find f'(1) • f(x) = 6x^2 – 9x +4 find f’(1) • evaluate lim┬(x→3) (x^3-27)/(x-3) • ...
Basic Calculus Crossword 2020-06-02
Across
- what rule is this? D/dx nu^(n-1 ) x du
- what is the answerlim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
- evaluate lim┬(x→∞) (5x+6x^2)/(3x-8)
- what rule is this? D/dx u/v = (v x du - u x du)/v^2
- f(x)=(7x^5)/4x find f'(2)
- 〖f(x)=(2x〗^3+3)(5x) find f'(-1)
- f(x) √(x^2-4) find f’(2)
- What rule is this? d/dx f(g(x))=f^' (g(x)) g^' (x)
- It is a branch of calculus that studies the rates at which quantities change.
- f(x)=(x^2)/(x-5) find f'(1)
Down
- what rule is this? d/dx u x v = u x dv/dx + v x du/dx
- evaluate lim┬(x→3) (x^3-27)/(x-3)
- What function has a parabola?
- what function is this? If f(x) = x, then f’(x) = 1
- infinity evaluate lim┬(x→4^- ) (-3)/(4-x)^2
- f(x) √(x+5) find f’(4)
- what rule is this? D/dx f(x) + g(x) = f’(x) + g’(x)
- f(x) = 6x^2 – 9x +4 find f’(1)
- It is branch of calculus concerned with the theory and applications of integrals.
- f(x) x^3– 2x^2 + 5 find f’(2)¬¬
- f(x)=-3/x^2 find f'(2)
- evaluate lim┬(x→0) √(36-x^2 )
- what rule is this? d/dx c = 0
- what is 0/0 called?
- 〖f(x)=(5x+2)(x〗^(2)) find 〖f'(-1)〗^
- f(x) √(2&5x+2) find f’(-3)
26 Clues: what is 0/0 called? • f(x) √(x+5) find f’(4) • f(x)=-3/x^2 find f'(2) • f(x) √(x^2-4) find f’(2) • f(x)=(7x^5)/4x find f'(2) • What function has a parabola? • evaluate lim┬(x→0) √(36-x^2 ) • what rule is this? d/dx c = 0 • f(x) √(2&5x+2) find f’(-3) • f(x)=(x^2)/(x-5) find f'(1) • f(x) = 6x^2 – 9x +4 find f’(1) • evaluate lim┬(x→3) (x^3-27)/(x-3) • ...
Basic Calculus Crossword 2020-06-02
Across
- evaluate lim┬(x→4^- ) (-3)/(4-x)^2
- what rule is this? D/dx nu^(n-1 ) x du
- It is branch of calculus concerned with the theory and applications of integrals.
- f(x) = 6x^2 – 9x +4 find f’(1)
- evaluate lim┬(x→3) (x^3-27)/(x-3)
- 〖f(x)=(2x〗^3+3)(5x) find f'(-1)
- what function is this? If f(x) = x, then f’(x) = 1
- What function has a parabola?
- f(x) √(x+5) find f’(4)
- What rule is this? d/dx f(g(x))=f^' (g(x)) g^' (x)
- f(x) √(2&5x+2) find f’(-3)
- what rule is this? D/dx f(x) + g(x) = f’(x) + g’(x)
Down
- f(x)=(x^2)/(x-5) find f'(1)
- It is a branch of calculus that studies the rates at which quantities change.
- evaluate lim┬(x→∞) (5x+6x^2)/(3x-8)
- what rule is this? d/dx u x v = u x dv/dx + v x du/dx
- f(x) √(x^2-4) find f’(2)
- what rule is this? d/dx c = 0
- what rule is this? D/dx u/v = (v x du - u x du)/v^2
- f(x)=-3/x^2 find f'(2)
- what is 0/0 called?
- 〖f(x)=(5x+2)(x〗^(2)) find 〖f'(-1)〗^
- what is the answerlim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
- f(x) x^3– 2x^2 + 5 find f’(2)¬¬
- f(x)=(7x^5)/4x find f'(2)
- evaluate lim┬(x→0) √(36-x^2 )
26 Clues: what is 0/0 called? • f(x) √(x+5) find f’(4) • f(x) √(x^2-4) find f’(2) • f(x)=-3/x^2 find f'(2) • f(x)=(7x^5)/4x find f'(2) • what rule is this? d/dx c = 0 • What function has a parabola? • evaluate lim┬(x→0) √(36-x^2 ) • f(x) √(2&5x+2) find f’(-3) • f(x)=(x^2)/(x-5) find f'(1) • f(x) = 6x^2 – 9x +4 find f’(1) • evaluate lim┬(x→3) (x^3-27)/(x-3) • ...
Basic Calculus Crossword 2020-06-02
Across
- evaluate lim┬(x→4^- ) (-3)/(4-x)^2
- what rule is this? D/dx nu^(n-1 ) x du
- It is branch of calculus concerned with the theory and applications of integrals.
- f(x) = 6x^2 – 9x +4 find f’(1)
- evaluate lim┬(x→3) (x^3-27)/(x-3)
- 〖f(x)=(2x〗^3+3)(5x) find f'(-1)
- what function is this? If f(x) = x, then f’(x) = 1
- What function has a parabola?
- f(x) √(x+5) find f’(4)
- What rule is this? d/dx f(g(x))=f^' (g(x)) g^' (x)
- f(x) √(2&5x+2) find f’(-3)
- what rule is this? D/dx f(x) + g(x) = f’(x) + g’(x)
Down
- f(x)=(x^2)/(x-5) find f'(1)
- It is a branch of calculus that studies the rates at which quantities change.
- evaluate lim┬(x→∞) (5x+6x^2)/(3x-8)
- what rule is this? d/dx u x v = u x dv/dx + v x du/dx
- f(x) √(x^2-4) find f’(2)
- what rule is this? d/dx c = 0
- what rule is this? D/dx u/v = (v x du - u x du)/v^2
- f(x)=-3/x^2 find f'(2)
- what is 0/0 called?
- 〖f(x)=(5x+2)(x〗^(2)) find 〖f'(-1)〗^
- what is the answerlim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
- f(x) x^3– 2x^2 + 5 find f’(2)¬¬
- f(x)=(7x^5)/4x find f'(2)
- evaluate lim┬(x→0) √(36-x^2 )
26 Clues: what is 0/0 called? • f(x) √(x+5) find f’(4) • f(x) √(x^2-4) find f’(2) • f(x)=-3/x^2 find f'(2) • f(x)=(7x^5)/4x find f'(2) • what rule is this? d/dx c = 0 • What function has a parabola? • evaluate lim┬(x→0) √(36-x^2 ) • f(x) √(2&5x+2) find f’(-3) • f(x)=(x^2)/(x-5) find f'(1) • f(x) = 6x^2 – 9x +4 find f’(1) • evaluate lim┬(x→3) (x^3-27)/(x-3) • ...
Basic Calculus Crossword 2020-06-02
Across
- evaluate lim┬(x→4^- ) (-3)/(4-x)^2
- what rule is this? D/dx nu^(n-1 ) x du
- It is branch of calculus concerned with the theory and applications of integrals.
- f(x) = 6x^2 – 9x +4 find f’(1)
- evaluate lim┬(x→3) (x^3-27)/(x-3)
- 〖f(x)=(2x〗^3+3)(5x) find f'(-1)
- what function is this? If f(x) = x, then f’(x) = 1
- What function has a parabola?
- f(x) √(x+5) find f’(4)
- What rule is this? d/dx f(g(x))=f^' (g(x)) g^' (x)
- f(x) √(2&5x+2) find f’(-3)
- what rule is this? D/dx f(x) + g(x) = f’(x) + g’(x)
Down
- f(x)=(x^2)/(x-5) find f'(1)
- It is a branch of calculus that studies the rates at which quantities change.
- evaluate lim┬(x→∞) (5x+6x^2)/(3x-8)
- what rule is this? d/dx u x v = u x dv/dx + v x du/dx
- f(x) √(x^2-4) find f’(2)
- what rule is this? d/dx c = 0
- what rule is this? D/dx u/v = (v x du - u x du)/v^2
- f(x)=-3/x^2 find f'(2)
- what is 0/0 called?
- 〖f(x)=(5x+2)(x〗^(2)) find 〖f'(-1)〗^
- what is the answer lim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
- f(x) x^3– 2x^2 + 5 find f’(2)¬¬
- f(x)=(7x^5)/4x find f'(2)
- evaluate lim┬(x→0) √(36-x^2 )
26 Clues: what is 0/0 called? • f(x) √(x+5) find f’(4) • f(x) √(x^2-4) find f’(2) • f(x)=-3/x^2 find f'(2) • f(x)=(7x^5)/4x find f'(2) • what rule is this? d/dx c = 0 • What function has a parabola? • f(x) √(2&5x+2) find f’(-3) • f(x)=(x^2)/(x-5) find f'(1) • evaluate lim┬(x→0) √(36-x^2 ) • f(x) = 6x^2 – 9x +4 find f’(1) • evaluate lim┬(x→3) (x^3-27)/(x-3) • ...
Basic Calculus Crossword 2020-06-02
Across
- evaluate lim┬(x→4^- ) (-3)/(4-x)^2
- what rule is this? D/dx nu^(n-1 ) x du
- It is branch of calculus concerned with the theory and applications of integrals.
- f(x) = 6x^2 – 9x +4 find f’(1)
- evaluate lim┬(x→3) (x^3-27)/(x-3)
- 〖f(x)=(2x〗^3+3)(5x) find f'(-1)
- what function is this? If f(x) = x, then f’(x) = 1
- What function has a parabola?
- f(x) √(x+5) find f’(4)
- What rule is this? d/dx f(g(x))=f^' (g(x)) g^' (x)
- f(x) √(2&5x+2) find f’(-3)
- what rule is this? D/dx f(x) + g(x) = f’(x) + g’(x)
Down
- f(x)=(x^2)/(x-5) find f'(1)
- It is a branch of calculus that studies the rates at which quantities change.
- evaluate lim┬(x→∞) (5x+6x^2)/(3x-8)
- what rule is this? d/dx u x v = u x dv/dx + v x du/dx
- f(x) √(x^2-4) find f’(2)
- what rule is this? d/dx c = 0
- what rule is this? D/dx u/v = (v x du - u x du)/v^2
- f(x)=-3/x^2 find f'(2)
- what is 0/0 called?
- 〖f(x)=(5x+2)(x〗^(2)) find 〖f'(-1)〗^
- what is the answerlim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
- f(x) x^3– 2x^2 + 5 find f’(2)¬¬
- f(x)=(7x^5)/4x find f'(2)
- evaluate lim┬(x→0) √(36-x^2 )
26 Clues: what is 0/0 called? • f(x) √(x+5) find f’(4) • f(x) √(x^2-4) find f’(2) • f(x)=-3/x^2 find f'(2) • f(x)=(7x^5)/4x find f'(2) • what rule is this? d/dx c = 0 • What function has a parabola? • evaluate lim┬(x→0) √(36-x^2 ) • f(x) √(2&5x+2) find f’(-3) • f(x)=(x^2)/(x-5) find f'(1) • f(x) = 6x^2 – 9x +4 find f’(1) • evaluate lim┬(x→3) (x^3-27)/(x-3) • ...
Type of vocabulary based on equation. 2022-05-20
20 Clues: < • ≅ • = • > • x • xy • x^2 • (3x) • |-1| • (3,7) • 1,4,7,11 • f(x)=ab^x • A=P(1+rt) • (1),4,7,11 • 1,(4),7,11 • f(x)=a(1-r)^x • f(x)=a(1+r)^x • let p = pineapple • 3,3,4,4,(5),5,6,7,10 • Standard Graph Formula
TTS MTK Minat 2022-11-23
Across
- turunan dari sinx
- nama lain dari turunan
- nilai minimum dari y=3sin(2x+3)+ 4
- 3sin2x + 2sin²3x
- f(x)=3x × 2cos2x, f'(π/4)=
- nilai minimum dari y=3cos5x + 6sin7x
- f(x)=3sin2x - 4cosx - 3sinx, f"(π/6)=
- F(x)=2cos2x + 4sin2x, F"(π/4)=
- F(x)=6sin4x, 2f'(0°) =
- f(x)=2sin3x + 4cosx, f"(π/4)=
Down
- sin3x × 2cos²4x - 4sinx, f'(π/3)=
- f(x)=-1/2sin3x, f'(x)=
- f(x)=2x + 3sin3x, f'(π/2)=
- f(x)=2sin3x + 4cos2x +10sinx, tentukan f'(30°)=
- tentukan gradien garis singgung kurva y=sin x di x=π/2
- 2cos3x × 2sin3x, f'(2/3π)=
- nilai maksimum dari 3cos(2x+5)+1
- nilai maksimum dari y=3cosx + 4sin3x + 1
- 2x × 3sin2x, tentukan. f'(-π/2)
- f(x)=3sin²x + 3cos2x-4x², f'(-π/4)=
20 Clues: 3sin2x + 2sin²3x • turunan dari sinx • f(x)=-1/2sin3x, f'(x)= • nama lain dari turunan • F(x)=6sin4x, 2f'(0°) = • f(x)=2x + 3sin3x, f'(π/2)= • f(x)=3x × 2cos2x, f'(π/4)= • 2cos3x × 2sin3x, f'(2/3π)= • f(x)=2sin3x + 4cosx, f"(π/4)= • F(x)=2cos2x + 4sin2x, F"(π/4)= • 2x × 3sin2x, tentukan. f'(-π/2) • nilai maksimum dari 3cos(2x+5)+1 • sin3x × 2cos²4x - 4sinx, f'(π/3)= • ...
Functions Puzzle 2023-02-02
Across
- the set of inputs in a function
- f(x) = -2x; f(-4)
- f(x) = 6x - 20; f(5)
- f(x) = -x + 20; f(32)
- f(x) = x - 4; f(2)
- f(x) = 2x + 21; f(1)
- f(x)= 4x -1; f(4)
- f(x) = -10x -1; f(-2)
- the set of outputs in a function
Down
- f(x) = -7x; f(-2)
- f(x) = 5x - 10; f(10)
- f(x) = -3x + 10; f(5)
- f(x) = -5x + 2; f(-3)
- f(x) = -4x + 15; f(4)
- f(x) = -4x - 1; f(-3)
- f(x) = 5x - 10; f(6)
16 Clues: f(x) = -7x; f(-2) • f(x) = -2x; f(-4) • f(x)= 4x -1; f(4) • f(x) = x - 4; f(2) • f(x) = 6x - 20; f(5) • f(x) = 5x - 10; f(6) • f(x) = 2x + 21; f(1) • f(x) = 5x - 10; f(10) • f(x) = -3x + 10; f(5) • f(x) = -5x + 2; f(-3) • f(x) = -4x + 15; f(4) • f(x) = -4x - 1; f(-3) • f(x) = -x + 20; f(32) • f(x) = -10x -1; f(-2) • the set of inputs in a function • the set of outputs in a function
Inverse of ordered pairs 2021-04-06
22 Clues: (0,2) • (9,2) • (5,0) • (2,7) • (0,5) • (7,8) • (2,12) • (2,-3) • (5,10) • (2,-9) • (4,-8) • (-4,5) • (8,-7) • (7,-2) • (11,5) • (11,12) • (12,-5) • f-1(x)=1/3x • g-1(x)=x+6/4 • f-1(x)=7x-12 • h-1(x)=5/2(x-8) • h-1(x)=-3/10x-5
Kelompok 6 Matematika XI 8 2023-10-01
Across
- f= {(0,1),(1,2),(2,3)}, g= {(1,2),(2,4),(3,6)}, h= {(-1,1),(1,2),(2,4)}. Hasil dari (fogoh)(-1) + (gofoh)(1) adalah
- Diket g(x)= 3x - 5, dan (fog)(x)= 6x - 9. Maka f(2)=
- Diketahui fungsi f dan g f(x) - 3x² - 4x + 6, g(x)= 2x - 1. Berapa nilai (fog)(2) adalah
- Jika f^-1(x)= g^-1(x) maka x yang memenuhi jika f(x)= 3x + 5 dan g(x)= 2x + 7 adalah
- Diket Fungsi f= {(2,3),(-1,2),(0,1),(1,4),(3,0)}. g={(0,2),(1,1),(2,0),(3,1),(4,3)}. Tentukan (fog)(1)+(gof)(2)+(fof)(0)=
- (fog)(x)= 9x - 10 dan g(x)= x - 3. Tentukan f(-2)
- Diketahui g(x)= x + 2, h(x)= 2x + 1/4x-3, maka (goh)(0) adalah
- f(x)= x² + 3x - 12, g(x)= x + 4, h(x)= 4x - 1 + 5. Tentukan (gof)(3)
- f(x)= x² - 2x - 3, g(x)= x - 3, h(x)= 4x + 6. Tentukan (f + g)(2)
- Jihan mengikuti les matamatika dengan biaya wajib per bulan sebesar Rp 100.000,00 ditambah biaya per pertemuan sebesar Rp. 50.000,00. Jika Jihan mengikuti 4 pertemuan selama sebulan, maka biaya les yang harus dibayarkan Jihan adalah
Down
- f(x)= x + 16 - 27. Maka f^-1(4) adalah
- Diketahui f(x)= 4x + 2 dengan DF= {x | x ∈ R }. Jika h(x)= f^-1 (x), maka nilai a yang memenuhi h^-1(a)= 4 adalah
- Suatu pabrik textil memiliki 2 mesin yakni mesin I dan mesin II. Mesin I digunakan untuk mengolah kapas menjadi benang. Mesin I bekerja sesuai rumus f(x)= 2x - 4 dengan f(x)benang dan " x " kapas dalam ton. Sedangkan mesin II mampu mengubah benang menjadi kain dengan rumus g(t)= t² + 4 dengan " t " adalah hasil benang dari mesin I dan g(t) banyak kain dalam ton. Jika suatu hari pabrik tekstil tersebut mengolah 3 ton kapas, maka kain yang diproduksi adalah
- Diketahui f(x)= x + 6, g(x)= 2x + 3 dan h(x)= x² + 5x. Tentukan (g + f - h)(2)=
- Suatu peluru ditembakan ke atas. Tinggi peluru dari atas tanah setelah t detik dinyatakan (-4t² + 16t) meter, maka tinggi peluru setelah 3 detik adalah
- Codomain yang memiliki pasangan terhadap domain adalah
- Berapakan nilai 6x+2y jika x dan y merupakan Penyelesaian dari sistem Persamaan 3x + 3y = 3 dan 2x - 4y = 14 adalah
- Diket. x= √(x - 4) . Hasil invers Untuk g(x) dan g(3)
- f(x)= 4x-2, g(x)= 2x+1 maka (fog)^-1 (4) adalah
- 7y + 11(y - 3)= 40. Nilai y adalah
20 Clues: 7y + 11(y - 3)= 40. Nilai y adalah • f(x)= x + 16 - 27. Maka f^-1(4) adalah • f(x)= 4x-2, g(x)= 2x+1 maka (fog)^-1 (4) adalah • (fog)(x)= 9x - 10 dan g(x)= x - 3. Tentukan f(-2) • Diket g(x)= 3x - 5, dan (fog)(x)= 6x - 9. Maka f(2)= • Diket. x= √(x - 4) . Hasil invers Untuk g(x) dan g(3) • Codomain yang memiliki pasangan terhadap domain adalah • ...
Σταυρόλεξο 1 2018-03-29
Across
- Ο μηχανισμός που ελέγχει τον χρόνο έκθεσης
- Πόσα στοπ διαφορά έχουν το f/1 και το f/2
- Έτσι λέγονται οι μηχανές που έχουν καθρέπτη
- Συνήθως υπάρχει στις ρεφλέξ μηχανές
- Δεν υπάρχει στις SLR και στις μηχανές στούντιο
- Μηχανισμός που βρίσκεται πάντα μέσα στο φακό
- Το 1/60 είναι πιο ... ταχύτητα από το 1/15
- Αν από το f/4 πάω στο f/2,8 τότε έχω κάνει 1 στοπ ...
- Το f/11 είναι πιο ... διάφραγμα από το f/22
- Το ... κλείστρο βρίσκεται στον φακό
- Flash και ταχύτητα ...
- Focus = ...
- Ονομάστηκαν ρεφλέξ μηχανές, γιατί υπάρχει ...
- Το 1/30 είναι πιο ... ταχύτητα από το 1/125
- Παλιά μονάδα μέτρησης της ευαισθησίας του φιλμ
Down
- Καλύτερες μηχανές από την Canon
- Αν από το f/16 πάω στο f/22 τότε έχω κάνει 1 στοπ ...
- Θαμπόγυαλο = Οθόνη ...
- Η ταχύτητα κλείστρου μετριέται σε ...
- Πρόγραμμα έκθεσης όπου ο φωτογράφος επιλέγει το διάφραγμα, ονομάζεται προτεραιότητα ...
- 4sec –2stop = ...sec
- Μονάδα μέτρησης της ευαισθησίας
- Πρόγραμμα έκθεσης όπου η μηχανή βρίσκει μόνο το κατάλληλο διάφραγμα, ονομάζεται προτεραιότητα ...
- 2 στοπ = ... φορές περισσότερη έκθεση
- Το f/4 είναι πιο ... διάφραγμα από το f/2
- Περισσότερο φως κατά 8 φορές είναι ... στοπ
26 Clues: Focus = ... • 4sec –2stop = ...sec • Θαμπόγυαλο = Οθόνη ... • Flash και ταχύτητα ... • Καλύτερες μηχανές από την Canon • Μονάδα μέτρησης της ευαισθησίας • Συνήθως υπάρχει στις ρεφλέξ μηχανές • Το ... κλείστρο βρίσκεται στον φακό • Η ταχύτητα κλείστρου μετριέται σε ... • 2 στοπ = ... φορές περισσότερη έκθεση • Πόσα στοπ διαφορά έχουν το f/1 και το f/2 • ...
REMEDIAL MATEMATIKA 2022-11-06
Across
- Salah satu x dari x^2+7x+10=0
- 2^3 x2^6
- Diketahui fungsi f(x) = x² + 4x + 5. Hitunglah bayangangan untuk nilai x = 3
- 5^5 x 1/5^5
- 10^2
- Jika f(x) = x² – 4x, berapakah nilai dari f(2)?
- Hasil dari (9^1/3)^-6 adalah
- 4^5
- Hasil dari 2^-1 + 3^-1 adalah
- Hasil dari (27^1/2)^2/3 adalah
- f(x) = 4x² + 3x + 8. Hitunglah nilai a + 2b + 3c!
Down
- 5^4
- 4^4
- Hasil dari (-3)^3 + (-3)^2 + (-3)^1 + (-3)^o adalah…
- f(x) = 3x² - 2x + 5 memiliki bentuk sesuai dengan bentuk f(x) = ax² + bx + c. Hitunglah nilai 2a + 3b + 4c!
- Hasil dari (81)^1/4 x 4^3/2 adalah…
- 1^-1
- Nilai dari 2^-5 : 2^-3 adalah
- nilai c dari 2x^2+24x-135=0
- Hasil dari (-5)^3 + (-5)^2 + (-5)^1 + 5^o adalah…
- Hasil dari 2^3 x2^6 / 2^2 x2^3
21 Clues: 5^4 • 4^4 • 4^5 • 1^-1 • 10^2 • 2^3 x2^6 • 5^5 x 1/5^5 • nilai c dari 2x^2+24x-135=0 • Hasil dari (9^1/3)^-6 adalah • Salah satu x dari x^2+7x+10=0 • Nilai dari 2^-5 : 2^-3 adalah • Hasil dari 2^-1 + 3^-1 adalah • Hasil dari 2^3 x2^6 / 2^2 x2^3 • Hasil dari (27^1/2)^2/3 adalah • Hasil dari (81)^1/4 x 4^3/2 adalah… • Jika f(x) = x² – 4x, berapakah nilai dari f(2)? • ...
TTS Komposisi Fungsi Dan Invers Fungsi ptr 2023-03-12
Across
- Fungsi yang kodomainnya lebih dari 1
- Istilah dalam fungsi surjektif!
- Fungsi Kebalikan dari asalnya...
- Sifat komutatif penjumlahan ialah...
- Nilai ruas kiri sama dengan kanan, sehingga hasil nya tetap sama, dinamakan sifat apakah?
- h∘f dibaca...
- Sebutkan sifat komposisi fungsi!
- Range disebut juga..
- Bentuk fungsi asal dari 7^-1(x)=x+2
Down
- (f-g)(x)=f(x)-g(x) adalah rumus?
- Istilah dalam fungsi injektif?
- Simbol gabungan?
- (f^-1)^-1(x)=f(x),hasil dari fungsi tersebut akan..
- Simbol irisan?
- Ada berapa macam macam sifat fungsi?
- f^-1y dibaca..
- Bentuk dari fungsi identitas
- Nama lain daerah kawan?
- Rumus operasi penjumlahan fungsi?
- Apa itu fungsi?
20 Clues: h∘f dibaca... • Simbol irisan? • f^-1y dibaca.. • Apa itu fungsi? • Simbol gabungan? • Range disebut juga.. • Nama lain daerah kawan? • Bentuk dari fungsi identitas • Istilah dalam fungsi injektif? • Istilah dalam fungsi surjektif! • (f-g)(x)=f(x)-g(x) adalah rumus? • Fungsi Kebalikan dari asalnya... • Sebutkan sifat komposisi fungsi! • Rumus operasi penjumlahan fungsi? • ...
TTS FUNGSI, KOMPOSISI, INVERS 2021-02-20
Across
- Jika f(x) = 2x + 3 dan g(x) = 9 - x, nilai dari (f o g)^-1(-9) = ...
- Diketahui fungsi f dan g yang ditentukan oleh f(x) = 2x +1 dan g(x) = 4 - 2x. Nilai dari (f-g)^-1 (5) adalah...
- Jika f(x) = 2x-1 dan (f og )(x) = -14x + 21, nilai dari g(-3) = ...
- Suatu fungsi I yang dinyatakan dengan rumus I(x)=x
- Grafik fungsi kuadrat berbentuk
- Nama lain fungsi satu-satu
- Asimtot yang sejajar dengan sumbu X
- Jika diketahui fungsi f(x) = 5x - 11 untuk R anggota x, nilai dari f^-1 (4) = ...
- Suatu fungsi f yang dinyatakan dengan rumus f(x)=a
- Salah satu jenis fungsi
Down
- Fungsi M yang memuat bentuk nilai mutlak adalah
- Jika diketahui fungsi g(x) = 8x - 25 untuk R anggota x, nilai dari g^-1 (7) = ...
- Asimtot yang tidak sejajar dengan sumbu X dan Y
- Diketahui (f o g)(x) = 9x^2-6x-3. Jika g(x) = 3x-1, nilai dari f^-1(12)=...
- Nama lain fungsi korespodensi satu-satu
- Nama lain daerah asal
- Nama lain fungsi surjektif
- Nama lain daerah kawan
- Asimtot yang sejajar dengan sumbu Y
- Nama lain daerah hasil
20 Clues: Nama lain daerah asal • Nama lain daerah kawan • Nama lain daerah hasil • Salah satu jenis fungsi • Nama lain fungsi satu-satu • Nama lain fungsi surjektif • Grafik fungsi kuadrat berbentuk • Asimtot yang sejajar dengan sumbu X • Asimtot yang sejajar dengan sumbu Y • Nama lain fungsi korespodensi satu-satu • Fungsi M yang memuat bentuk nilai mutlak adalah • ...
TTS FUNGSI, KOMPOSISI, INVERS 2021-02-20
Across
- Jika f(x) = 2x + 3 dan g(x) = 9 - x, nilai dari (f o g)^-1(-9) = ...
- Diketahui fungsi f dan g yang ditentukan oleh f(x) = 2x +1 dan g(x) = 4 - 2x. Nilai dari (f-g)^-1 (5) adalah...
- Jika f(x) = 2x-1 dan (f og )(x) = -14x + 21, nilai dari g(-3) = ...
- Suatu fungsi I yang dinyatakan dengan rumus I(x)=x
- Grafik fungsi kuadrat berbentuk
- Nama lain fungsi satu-satu
- Asimtot yang sejajar dengan sumbu X
- Jika diketahui fungsi f(x) = 5x - 11 untuk R anggota x, nilai dari f^-1 (4) = ...
- Suatu fungsi f yang dinyatakan dengan rumus f(x)=a
- Salah satu jenis fungsi
Down
- Fungsi M yang memuat bentuk nilai mutlak adalah
- Jika diketahui fungsi g(x) = 8x - 25 untuk R anggota x, nilai dari g^-1 (7) = ...
- Asimtot yang tidak sejajar dengan sumbu X dan Y
- Diketahui (f o g)(x) = 9x^2-6x-3. Jika g(x) = 3x-1, nilai dari f^-1(12)=...
- Nama lain fungsi korespodensi satu-satu
- Nama lain daerah asal
- Nama lain fungsi surjektif
- Nama lain daerah kawan
- Asimtot yang sejajar dengan sumbu Y
- Nama lain daerah hasil
20 Clues: Nama lain daerah asal • Nama lain daerah kawan • Nama lain daerah hasil • Salah satu jenis fungsi • Nama lain fungsi satu-satu • Nama lain fungsi surjektif • Grafik fungsi kuadrat berbentuk • Asimtot yang sejajar dengan sumbu X • Asimtot yang sejajar dengan sumbu Y • Nama lain fungsi korespodensi satu-satu • Fungsi M yang memuat bentuk nilai mutlak adalah • ...
TTS FUNGSI, KOMPOSISI, INVERS 2021-02-20
Across
- Jika f(x) = 2x + 3 dan g(x) = 9 - x, nilai dari (f o g)^-1(-9) = ...
- Diketahui fungsi f dan g yang ditentukan oleh f(x) = 2x +1 dan g(x) = 4 - 2x. Nilai dari (f-g)^-1 (5) adalah...
- Jika f(x) = 2x-1 dan (f og )(x) = -14x + 21, nilai dari g(-3) = ...
- Suatu fungsi I yang dinyatakan dengan rumus I(x)=x
- Grafik fungsi kuadrat berbentuk
- Nama lain fungsi satu-satu
- Asimtot yang sejajar dengan sumbu X
- Jika diketahui fungsi f(x) = 5x - 11 untuk R anggota x, nilai dari f^-1 (4) = ...
- Suatu fungsi f yang dinyatakan dengan rumus f(x)=a
- Salah satu jenis fungsi
Down
- Fungsi M yang memuat bentuk nilai mutlak adalah
- Jika diketahui fungsi g(x) = 8x - 25 untuk R anggota x, nilai dari g^-1 (7) = ...
- Asimtot yang tidak sejajar dengan sumbu X dan Y
- Diketahui (f o g)(x) = 9x^2-6x-3. Jika g(x) = 3x-1, nilai dari f^-1(12)=...
- Nama lain fungsi korespodensi satu-satu
- Nama lain daerah asal
- Nama lain fungsi surjektif
- Nama lain daerah kawan
- Asimtot yang sejajar dengan sumbu Y
- Nama lain daerah hasil
20 Clues: Nama lain daerah asal • Nama lain daerah kawan • Nama lain daerah hasil • Salah satu jenis fungsi • Nama lain fungsi satu-satu • Nama lain fungsi surjektif • Grafik fungsi kuadrat berbentuk • Asimtot yang sejajar dengan sumbu X • Asimtot yang sejajar dengan sumbu Y • Nama lain fungsi korespodensi satu-satu • Fungsi M yang memuat bentuk nilai mutlak adalah • ...
Prva i druga deklinacija, I.-IV. konjugacija (prezent) 2018-10-16
Across
- ak.sg. - unda, ae, f. – val
- 3.l.pl. - moneo, 2. (monere) – opominjati
- abl.sg. - ruina, ae, f. – propast
- 2.l.sg. - devoveo, 2. (devovere) – proklinjati
- 2.l.sg. - adamo, 1. (adamare) – primati, prihvaćati
- dat.pl.(m.) - Phoenicius, 3 – fenički, 3
- nom.pl. - ora, ae, f. – obala
- dat.pl. - umbra, ae, f. – sjena
- 3.l.pl. - dormio, 4. (dormire) - spavati
- vok.sg. - pulcher, pulchra, pulchrum – lijep, 3
- gen.pl. - flamma, ae, f. – vatra
- ak.pl. - aurora, ae, f. – zora
- nom.pl. - Troianus, i, m. – Trojanac
- abl.sg. - filius, i, m. – sin
Down
- dat.sg. - campus, i, m. – polje
- abl.pl. - vita, ae, f. – život
- 2.l.pl. navigo, 1. (navigare) – ploviti
- 3.l.pl. - discedo, 3. (discedere) – otići, odlaziti
- nom.pl. - bellum, i, n. – rat
- 3.l.sg. - compleo, 2. (complere) – ispuniti
- gen.pl. - miseria, ae, f. – jad, bijeda
- 3.l.sg. - decedo, 3. (decedere) – otići, odlaziti
- ak.sg. - officium, i, n. – dužnost
- 1.l.pl. - immolo, 1. (immolare) – prinositi
- 1.l.sg. - ambulo, 1. (ambulare) – hodati, šetati
- gen.sg. - regina, ae, f. – kraljica
- 3.l.pl. - ago, 3. (agere) – voditi, dovoditi
- ak.pl.(n.)- divinus, 3 – božanski, 3
- vok.sg. - vir, viri, m. – junak, muž
29 Clues: ak.sg. - unda, ae, f. – val • nom.pl. - bellum, i, n. – rat • nom.pl. - ora, ae, f. – obala • abl.sg. - filius, i, m. – sin • abl.pl. - vita, ae, f. – život • ak.pl. - aurora, ae, f. – zora • dat.sg. - campus, i, m. – polje • dat.pl. - umbra, ae, f. – sjena • gen.pl. - flamma, ae, f. – vatra • abl.sg. - ruina, ae, f. – propast • ak.sg. - officium, i, n. – dužnost • ...
Calculus Crossword 2013-06-11
15 Clues: 1 + c • ln|x|+c • ∫tanxdx • -∫sinxdx • tan(2π/3) • -cosx + c • ln|sinx|+c • Name for "e"? • 1/3ln|3x+3| + c • f(x)=cosx f'(x)=? • f(x)=cotx f'(x)=? • f(x)= |x| f'(x)=? • ln|secx + tanx| + c • Synonym for Calculus • f(x)= sinx/x f'(x)=?
Σταυρόλεξο 1 2018-03-31
Across
- Flash και ταχύτητα ...
- Το f/4 είναι πιο ... διάφραγμα από το f/2
- Η ταχύτητα κλείστρου μετριέται σε ...
- 2 stop = ... φορές περισσότερη έκθεση
- Θαμπόγυαλο = Οθόνη ...
- Ονομάστηκαν ρεφλέξ μηχανές, γιατί υπάρχει ...
- Μηχανισμός που βρίσκεται πάντα μέσα στο φακό
- 4sec –2stop = ...sec
- Ο μηχανισμός που ελέγχει τον χρόνο έκθεσης
- Το 1/30 είναι πιο ... ταχύτητα από το 1/125
Down
- Αν από το f/4 πάω στο f/2,8 τότε έχω κάνει ...
- Αν από το f/16 πάω στο f/22 τότε έχω κάνει ...
- Το ... κλείστρο βρίσκεται στον φακό
- Το 1/60 είναι πιο ... ταχύτητα από το 1/15
- Μονάδα μέτρησης της ευαισθησίας
- Συνήθως υπάρχει στις ρεφλέξ μηχανές
- Περισσότερο φως κατά 8 φορές είναι ... stop
- Πόσα stop διαφορά έχουν το f/1 και το f/2
- Δεν υπάρχει στις SLR και στις μηχανές στούντιο
- Έτσι λέγονται οι μηχανές που έχουν καθρέπτη
- Focus = ...
- Το f/11 είναι πιο ... διάφραγμα από το f/22
- Καλύτερες μηχανές από την Canon
- Παλιά μονάδα μέτρησης της ευαισθησίας του φιλμ
24 Clues: Focus = ... • 4sec –2stop = ...sec • Flash και ταχύτητα ... • Θαμπόγυαλο = Οθόνη ... • Μονάδα μέτρησης της ευαισθησίας • Καλύτερες μηχανές από την Canon • Το ... κλείστρο βρίσκεται στον φακό • Συνήθως υπάρχει στις ρεφλέξ μηχανές • Η ταχύτητα κλείστρου μετριέται σε ... • 2 stop = ... φορές περισσότερη έκθεση • Το f/4 είναι πιο ... διάφραγμα από το f/2 • ...
Fungsi 2023-11-20
Across
- Diketahui f(x) = 2x + 1, g(x) = 5-3x dan h(x) = x²-1 tentukan nilai dari (fog) (-2)
- 5.Diketahui fungsi f:R→R, g:R→R dengan f(x)=x²+1 dan g(x) =x+1, tentukan bagaimana fungsi (g o f)(2)!
- Diketahui f(x) = 3x - 2 dan g(x) = 2x² + 3. Tentukan nilai fungsi komposisi(f o g)(-1)!
- Diketahui f(x) = 2x + 1, g(x) = 5-3x dan h(x) = x²-1 tentukan nilai dari (g o f) (-1)
- Di ketahui fungsi f(x) = 6x-3, g(x) = 5x+4, dan (f o g)(a)= 81. Nilai a
- Diketahui fungsi f(x) = 3x − 1 dan g(x) = 2x2 + 3. Nilai dari komposisi fungsi (g o f)(1)
- Diketahui f(x) = 2x + 1, g(x) = 5-3x dan h(x) = x²-1 tentukan nilai dari (fogoh) (0)
- y merupakan variabel keluaran
- Diketahui f(x) = 2x - 8, g(x) = x - 4 tentukan nilai dari (f + g) (5)
Down
- 4.Diketahui f(x)=x+1 dan (f ο g)(x) = 3x²+4. Tentukan g(4)!
- Kebalikan aksi dari suatu fungsi disebut fungsi
- Diketahui fungsi f(x) = 3x + 4 dan g(x) = 6 – 2x. Nilai dari (f o g)(2)
- Fungsi yang selalu menghasilkan nilai yang sama dengan yang diberikan/ dimasukkan disebut fungsi
- Lambang dari fungsi disebut juga... Fungsi
- x merupakan variabel masukan
15 Clues: x merupakan variabel masukan • y merupakan variabel keluaran • Lambang dari fungsi disebut juga... Fungsi • Kebalikan aksi dari suatu fungsi disebut fungsi • 4.Diketahui f(x)=x+1 dan (f ο g)(x) = 3x²+4. Tentukan g(4)! • Diketahui f(x) = 2x - 8, g(x) = x - 4 tentukan nilai dari (f + g) (5) • Diketahui fungsi f(x) = 3x + 4 dan g(x) = 6 – 2x. Nilai dari (f o g)(2) • ...
TTS MATEMATIKA FUNGSI KOMPOSISI FUNGSI, DAN INVERS FUNGSI 2023-03-05
Across
- Injektif
- Boleh memiliki pasangan lebih dari satu
- Surjektif
- Rumus perkalian pada fungsi
- Misal A:{2,3,4} dan B {4,9,16}. Jika f:A → B dengan f(x)= x², maka f adalah fungsi....
- Tentukanlah hasil dari penjumlahan komutatif berikut jika diketahui p(x)=3x+1 dan q(x)=x-5!
- Himpunan A berelasi dengan elemen himpunan B yang berbeda-beda
- Tentukanlah (f o g) ( x) jika diketahui f(x) = x²-3x dan g(x) = 4x + 1!
- Syarat pembagian pada fungsi
- Tiga buah fugsi f,g,h memenuhi hubungan h(x)=g(f(x)). Apabila diketahui g(x)=2x+4 dan h(x)=2x²+8x+12, maka tentukanlah nilai f(x)!
Down
- Korespondensi satu satu
- Pemetaan setiap anggota himpunan
- (f o l)(x) = (l o f)(x) = f(x)
- Tentukan hasil dari perkalian pada fungsi berikut jika diketahui f(x)= x - 5 dan g(x)= x+2!
- Sifat tidak komutatif
- Tentukanlah hasil dari perkalian asosiatif berikut jika diketahui p(x)=4x+1, q(x)=2x-4,dan r(x)=6x=4!
- Tentukanlah hasil dari penjumlahan asosiatif berikut jika diketahui p(x)=4x+1, q(x)=2x-4, dan r(x)=6x+4!
- Tentukanlah hasil dari perkalian komutatif berikut jika diketahui p(x)=5x+2 dan q(x)=x-2!
- Tentukan nilai ((f o g) o h) jika diketahui f(x)= x + 4, g(x)= 2 - x, dan h(x)= x² - x + 1!
- Tentukan f-¹ (x) berikut jika diketahui f(x)= (x+5)/(2x-6)!
20 Clues: Injektif • Surjektif • Sifat tidak komutatif • Korespondensi satu satu • Rumus perkalian pada fungsi • Syarat pembagian pada fungsi • (f o l)(x) = (l o f)(x) = f(x) • Pemetaan setiap anggota himpunan • Boleh memiliki pasangan lebih dari satu • Tentukan f-¹ (x) berikut jika diketahui f(x)= (x+5)/(2x-6)! • Himpunan A berelasi dengan elemen himpunan B yang berbeda-beda • ...
Calculus Puzzle 2023-12-06
Across
- f(x)=f'(a)(x -a) + f(a)
- A method of integration
- lim(f(x) - f(a))/(x - a) as x->a
- An antiderivative of 1/(x^2 + 1)
- (f(g(x))'=f'(g(x))g'(x)
- dx/dt
- Definite integral of sin(x) from 0 to Pi
- A rule to approximate definite integrals.
- The solution of the DE dy/dx = ky is this type of function1. If f'(x) < 0 then f is _______________
- (definite integral)/(b-a)
- dx or dy ( differential)
- (fg)' = f'g + gf' (two words)
- Graphical representation of a 1st order differential equation
Down
- If f'(x) < then f is _______________
- If f(x) -> infinity as x -> a, then x = a is a _________
- Differentiability implies ________________
- (x^n)' = n x^(n-1)
- limit of a Riemann sum
- lim (sin(x)/x) as x approaches zero
- f'(x) = 0 or undefine
- definite integral of |v(t)|
- Concavity changes here
- A function such that f(-x) = -f(x) for all x
23 Clues: dx/dt • (x^n)' = n x^(n-1) • f'(x) = 0 or undefine • limit of a Riemann sum • Concavity changes here • f(x)=f'(a)(x -a) + f(a) • A method of integration • (f(g(x))'=f'(g(x))g'(x) • dx or dy ( differential) • (definite integral)/(b-a) • definite integral of |v(t)| • (fg)' = f'g + gf' (two words) • lim(f(x) - f(a))/(x - a) as x->a • An antiderivative of 1/(x^2 + 1) • ...
Module 3 Review 2023-11-09
Across
- Length of stay authorized to an F-1 visa holder
- Area at the Port of Entry for visitors without the proper documentation
- I-515A form given to international student without all necessary documents at Port of Entry
- Agency responsible for producing the I-94
- Type of admission offered if a prospective international student doesn't yet have the requisite English skills
- Visa class for F, J, and M visas
- School process necessary before I-20 is issued
- Agency that processes international student employment authorization requests
- Amount, in academic years, of tuition and living expenses an F-1 applicant must show
- Cabinet department that oversees J visas
- Official name of I-20 and DS-2019 Forms - Certificate of _____
- Cabinet department that oversees F and M visas
- Number of days after a DSO-approved withdrawal before an F-1 visitor must depart the United States
Down
- Number of credit hours an F-1 student must be enrolled to be considered a full course of study (undergraduate)
- Institutional employee managing F-1, F-2, M-1, and M-2 records
- Agency that runs the Student and Exchange Visitor Program
- Name of the CFR Title related to immigration
- Embassy section that actually issues visas
- Category of visitor receiving an F-2, J-2, or M-2 visa
- Institutional employee managing J-1 and J-2 records
- SEVIS fee processing website
- Number of days before program start that an F-1 visitor can enter the United States
22 Clues: SEVIS fee processing website • Visa class for F, J, and M visas • Cabinet department that oversees J visas • Agency responsible for producing the I-94 • Embassy section that actually issues visas • Name of the CFR Title related to immigration • School process necessary before I-20 is issued • Cabinet department that oversees F and M visas • ...
MERRY CHRISTMAS 2023 2023-12-25
TTS MATEMATIKA RELASI DAN FUNGSI 2024-02-21
Across
- Suatu fungsi dikatakan...satu-satu jika setiap anggota doamain memasangkan tepat satu anggota kodomain dan sebaliknya
- Himpunan yang memuat semua anggota atau objek yang dibicarakan
- Diketahui fungsi f(x) = 2x² – 3x + 1. Nilai f(-2) adalah ….
- x merupakan...f(x)
- Fungsi dari himpunan A ke himpunan adalah relasi khusus yang memasangkan setiap anggota himpunan A dengan tepat...anggota himpuna B
- Diketahui rumus fungsi f (x) = 2x + 5.Jika f(a) = 11, nilai a adalah…
- Relasi yang setiap anggota daerah asal-nya memiliki tepat satu anggota daerah hasilnya
- Range adalah daerah
- kumpulan benda-benda atau objek yang didefinisikan dengan jelas
Down
- Hubungan yang memasangkan anggota-anggota himpuan A dengan anggota-anggota himpunan B
- Daerah lawan/kawan di sebut
- Fungsi dapat dinyatakan dengan himpunan...berurutan
- Diketahui fungsi f didefinisikan sebagai f(x)=3x + 1. Nilai f(1) adalah …
- Diketahui himpunan A = {1, 2, 3} dan himpunan B = {a, b}, banyaknya pemetaan dari B ke A adalah ….
- Korespondensi satu-satu dengan 3 anggota ada...cara
- Fungsi disebut juga
- Diketahui fungsi f(x) = ax + b. Jika f(1) = 3 dan f(4) = 19, nilai a adalah ….
- Daerah asal disebut
- Relasi dapat dinyatakan dengan diagram...
- y atau f(x) merupakan...dari domain
20 Clues: x merupakan...f(x) • Fungsi disebut juga • Daerah asal disebut • Range adalah daerah • Daerah lawan/kawan di sebut • y atau f(x) merupakan...dari domain • Relasi dapat dinyatakan dengan diagram... • Fungsi dapat dinyatakan dengan himpunan...berurutan • Korespondensi satu-satu dengan 3 anggota ada...cara • Diketahui fungsi f(x) = 2x² – 3x + 1. Nilai f(-2) adalah …. • ...
Calculus crossword 2022-05-11
Across
- f’(x) = 0 and goes + to -
- series centered around x=a
- series centered around x=0
- x, derivative of tanx
- absolute value of velocity
- area, 1/2∫(outside - inside)dx
- derivative of cosx
- f(x) + f’(x) x + (f’’(x) x^2)/2! + (f’’’(x) x^3)/3!
- area under the curve
- π∫(top - bottom)^2dx
- slope
Down
- rule, limit is 0/0
- derivative, (d2y/dx2)/dx
- f’(x)<0 position is
- integral
- x coordinate in polars
- f’(x)>0 position is
- y coordinate in polars
- Integral of e^x
- Integral of secxtanx
- f’(x) = 0 and goes - to +
- Velocity, 1/b-a integral of f’(x)
- Distance, integral of speed equation
- Integral of 1/x
- of Inflection, f’’(x) changes signs
25 Clues: slope • integral • Integral of e^x • Integral of 1/x • rule, limit is 0/0 • derivative of cosx • f’(x)<0 position is • f’(x)>0 position is • Integral of secxtanx • area under the curve • π∫(top - bottom)^2dx • x, derivative of tanx • x coordinate in polars • y coordinate in polars • derivative, (d2y/dx2)/dx • f’(x) = 0 and goes + to - • f’(x) = 0 and goes - to + • series centered around x=a • ...
Latin Catiline 1 2018-06-11
Across
- all the way
- quidque - each
- capere to form a plan
- -onis, f. - conspiracy
- -ae, f. - boldness
- to where
- -a, -um - last
- -is, f. slaughter
- -ire, sensi, sensum - to notice
- oris, n. - mouth, face
- (2) to lie open
- fieri, factus sum - to happen, become
Down
- -ūs, m. - face, expression
- -a, -um - most fortified
- (1) to throw about
- -ius - previous
- (1) to mark
- diu how long
- (1) to think, suppose
- (1) to call together
- furoris, m. - madness
- -ae, f. - watch
- (1) to avoid
- -ere, elusi, elusum - to mock
24 Clues: to where • all the way • (1) to mark • diu how long • (1) to avoid • quidque - each • -a, -um - last • -ius - previous • -ae, f. - watch • (2) to lie open • -is, f. slaughter • (1) to throw about • -ae, f. - boldness • (1) to call together • capere to form a plan • (1) to think, suppose • furoris, m. - madness • -onis, f. - conspiracy • oris, n. - mouth, face • -a, -um - most fortified • ...
TTS MTK 2023-03-14
Across
- Berapa operasi aljabar pada suatu fungsi
- Sifat pengelompokkan
- Diketahui fungsi f(x) = 3x − 1 dan g(x) = 2x² + 3. Nilai dari komposisi fungsi (g o f)(1) adalah
- Tentukan nilai yang menyebabkan (f ◦ g) (x) = 4
- Fungsi satu-satu
- Sifat pertama pada fungsi komposisi
- Fungsi yang berkebalikan dari fungsi asalnya
- Berapa sifat pada fungsi komposisi
Down
- Jika diketahui f(x) = x – 3 dan g(x) = 2x + 4 maka (g o f)-¹(2) adalah
- Jika diketahui f(x) = x² – 2x + 1 maka f-¹(4) adalah
- Nama lain fungsi surjektif
- Syarat agar suatu fungsi memiliki invers, f(x) harus
- Susunan dari beberapa fungsi yang berhubungan dan berkaitan
- Sifat operasi suatu bilangan yang hasilnya bilangan itu sendiri
- Fungsi yang grafiknya tidak membalik
- "o" pada komposisi fungsi
- Diketahui f(x) = 2x-1, g(x) = x²+2 jika g ◦ f = f ◦ g apakah berlaku sifat komutatif
- Jika dibuatkan sebuat rumus fungsi dapat disimbolkan g(x) sebagai
- Daerah dari hasil pemetaan antara domain dan kodomain
- Jika f(x) = 5^(x-17) maka f-¹(125) adalah
20 Clues: Fungsi satu-satu • Sifat pengelompokkan • "o" pada komposisi fungsi • Nama lain fungsi surjektif • Berapa sifat pada fungsi komposisi • Sifat pertama pada fungsi komposisi • Fungsi yang grafiknya tidak membalik • Berapa operasi aljabar pada suatu fungsi • Jika f(x) = 5^(x-17) maka f-¹(125) adalah • Fungsi yang berkebalikan dari fungsi asalnya • ...
Pre-Calculus Review 2013-05-15
Across
- Noted as the founder of the imaginary number.
- An expression of only one term.
- To reduce.
- Given f(x)=-4x, find f(-12).
- Find the difference quotient and simply the final answer for f(x)=x^2-x+1, (f(2+h)-f(2))/(h), h=/=0
- A line that continually approaches a given curve but does not meet it at any finite distance.
- 7^(3x)=49^(x+2)
- log7(x+1)+log7(x-5)=1
- A result obtained by dividing one quantity by another.
- Solve for x. 3x-y=0, 4x+3y=26
Down
- In logarithmic graphs, the y-intercept is always...
- An expression of the sum or difference of two terms.
- Solve. 2x-y=7, x^2+y^2=7
- f(x)=(1.088x-97)/(13), find f(f^(-1)(138))
- Any real number, or any quantity that can be measured using a single real number.
- Find the slant asymptote of f(x)=(3x^2-5x+2)/(x-3)
- Find the difference quotient and simply the final answer for f(x)=4x^2-2x, (f(x+h)-(fx))/(h), h=/= 0
- Given y=-x^2+2x+5, is the solution ordered pair a minimum or maximum?
- Given f(x)=x+9, f^(-1)=?
19 Clues: To reduce. • 7^(3x)=49^(x+2) • log7(x+1)+log7(x-5)=1 • Solve. 2x-y=7, x^2+y^2=7 • Given f(x)=x+9, f^(-1)=? • Given f(x)=-4x, find f(-12). • Solve for x. 3x-y=0, 4x+3y=26 • An expression of only one term. • f(x)=(1.088x-97)/(13), find f(f^(-1)(138)) • Noted as the founder of the imaginary number. • Find the slant asymptote of f(x)=(3x^2-5x+2)/(x-3) • ...
EXTREME CALCULUS CROSSWORD! 2022-03-21
Across
- when a series adds to a specific number it is ______
- If the limit as n approaches infinity of |an|^1/n <1, absolutely convergent
- If f(a)/g(b) = 0/0 or ∞/∞, then the limit as x approaches g of f(x)/g(x) = the limt as x approaches a of f’(x)/g’(x)
- dy/dx goes (+,0,-) or (+,DNE,-) or d^2y/dx^2 < 0
- if the function is continuous on [a,b], for all K between f(a) and f(b), there exists at least one number x=c in the open interval (a,b) such that f(c) = K
- Method for deriving division
- If given that dy/dx = f(x, y) and the solution passes through (x0, y0) the new x = old x + delta x
- Method in which for y’=x+y and y(0)=1, we can estimate y(1)
- the center of mass of an object is called the _____
- f' is smaller than 0
- A list of added numbers
- when a series doesn’t add to a specific number it is ________
- If the function is continuous on [a,b], then there exists an absolute max and min on that interval
- the greek letter ρ
- integral of velocity
- the force applied by water on a surface at a certain depth.
- f' = 0 or DNE AND concavity changes
- a system of equations with 2 or more dependent variables
- Point discovered by evaluating critical numbers and endpoints but is a maximum
- if the limit as n approaches infinity of |an+1/an| <1, absolutely convergent
- V = π
- f(x) = f(c) + f’(c)(x-c) + f”(c)/2! (x-c)^2 + …
- If the function is continuous on [a,b], and differential on the interval (a,b), then there is at least one number x = c in (a,b) such that f’(c) = f(b) - f(a) / b-a
- derivative of (position)
Down
- method for deriving multiplication
- If the signs change every other in a series (ex. 1-.5+.25-.125) its an ______ series
- xn+1 = xn –f(xn)/f’(xn)
- any list of numbers in a special order
- derivative of sinx
- dy/dx goes (-,0,+) or (+,DNE,+) or d^2y/dx^2 > 0
- integral of udv = uv – integral of vdu
- series represented by the sum from 1 to infinity of 1/n^p
- Approximation using Left, Right, and Middle Riemann Sums with area = bh
- V = π
- xlnx-x+C
- Approximation using riemann sums area = ½ (b1 + b2 )h
- f’ is greater than 0
- method for a function in a function
- derivative of secx
- f" is less than 0
- derivative of (velocity)
- f" is greater than 0
- series that cannot be expressed, sum from n=0 to infinity of CnX^n
- the integral of 1/x dx on 1 to ∞ is an example of a _______ integral
- Point discovered by evaluating critical numbers and endpoints but is a minimum
- Trig Identity where sin2x= 2sinxcosx and cos2x=cos^2x-sin^2x=1-2sinx
- A quantity having direction and magnitude
- ______ of convergence, a specific set of numbers that a series is convergent on.
- Curve where the derivative equals 0 or undefined
- S=a1/1-r if |r|<1
- If the function is continuous on [a,b], and differential on the interval (a,b), and f(a) = f(b), then there is at least one number x = c in (a,b) such that f’(c) = 0
51 Clues: V = π • V = π • xlnx-x+C • f" is less than 0 • S=a1/1-r if |r|<1 • derivative of sinx • derivative of secx • the greek letter ρ • f’ is greater than 0 • f' is smaller than 0 • f" is greater than 0 • integral of velocity • xn+1 = xn –f(xn)/f’(xn) • A list of added numbers • derivative of (velocity) • derivative of (position) • Method for deriving division • method for deriving multiplication • ...
Differentiation 2022-05-31
Across
- average rate of change of a function over some two intervals; (f (a+h) -f(a)) /h
- (d/dx)(c)=0
- involve multiple quantities that are changing in relation to each other; uses derivatives, and especially the chain rule to solve problem
- derivative of sinx
- y'=f'(g(x))*g'(x)
- d/dx[f(x)-g(x)]=f'(x)+g'(x)
- 1/xsqrt(x^2-1)
- d/dx[cf(x)]=cf'(x)
Down
- d/dx[f(x)-g(x)]=f'(x)-g'(x)
- is the process of finding the derivative dy/dx for such functions, and it is accomplished by applying the chain rule
- d/dx[f(x)g(x)]=f'(x)g(x)+f(x)g'(x)
- 1/sqrt(1-x^2)
- the derivative of the function is 1/x
- d/dx[f(x)/g(x)]=(f'(x)g(x)-f(x)g'(x))/[g(x)]^2
- derivative of secx
- (d/dx)(x^n)=nx^n-1, for any real number n
16 Clues: (d/dx)(c)=0 • 1/sqrt(1-x^2) • 1/xsqrt(x^2-1) • y'=f'(g(x))*g'(x) • derivative of secx • derivative of sinx • d/dx[cf(x)]=cf'(x) • d/dx[f(x)-g(x)]=f'(x)-g'(x) • d/dx[f(x)-g(x)]=f'(x)+g'(x) • d/dx[f(x)g(x)]=f'(x)g(x)+f(x)g'(x) • the derivative of the function is 1/x • (d/dx)(x^n)=nx^n-1, for any real number n • d/dx[f(x)/g(x)]=(f'(x)g(x)-f(x)g'(x))/[g(x)]^2 • ...
Hangközök, hármashangzatok BPK 2020-02-18
Across
- Így szolmizáljuk: m-f és t-d'
- Az 1. és 2. hang összecsengése, pl d-r
- Az 1. és 4. hang összecsengése, pl d-f
- d-m-szi hármashangzat neve
- Az 1. és 7. hang összecsengése
- Az 1. és 5. hang összecsengése, pl d-s
- Az 1. és 3. hang összecsengése
- A hármashangzatok 1. fordításának neve
- Így szolmizáljuk: f-t
Down
- A dúr és moll hangsor 7. hangja
- d-m-s hármashangzat neve
- Az 1. és 8. hang összecsengése, pl d-d'
- A hármashangzatok 2. fordításának neve
- Az 1. és 6. hang összecsengése (ksz-szel írd!)
- Két azonos hang összecsengése
- l,-d-m hármashangzat neve
- Így szolmizáljuk: t,-f
- t,-r-f hármashangzat neve
18 Clues: Így szolmizáljuk: f-t • Így szolmizáljuk: t,-f • d-m-s hármashangzat neve • l,-d-m hármashangzat neve • t,-r-f hármashangzat neve • d-m-szi hármashangzat neve • Így szolmizáljuk: m-f és t-d' • Két azonos hang összecsengése • Az 1. és 7. hang összecsengése • Az 1. és 3. hang összecsengése • A dúr és moll hangsor 7. hangja • Az 1. és 2. hang összecsengése, pl d-r • ...
TTS Matematika Peminatan 2022-11-24
Across
- Syarat fungsi naik adalah F'(x)
- Proses matematika guna memperoleh turunan pada sebuah fungsi trigonometri
- Jika fungsi F(x)=sin ax + cos bx memenuhi F'(0)=b dan F'(π/2a)= -1 maka a+b
- F(x) sin x-2 cos x F'(π/2)
- Turunan fungsi trigonometri jika F(x)=sin x
- Turunan pertama dari y=1/4 sin 4x adalah
- Jika F(x)sin x cos 3x, maka F'(1/6π) adalah
- Jika F(x)= sin²x maka nilai x yang memenuhi F'(x)=1/2 adalah
- Jika F(x)= sin (2x+π/6), maka nilai dari F'(0)=
Down
- Syarat fungsi turun adalah F'(x)
- y=24 sin x + 3 cos 3x tentukan y'(π/6)
- Tentukan dy/dx dari y=sin 2x
- Jika F(x)= 2 sin x +cos x, maka F'(π/2)
- Tentukan gradien singgung kurva y=sin x dititik x= π/2
- Tentukan y' dari y=4 sin x+2 cos x
- Gradien garis singgung kurva y=sin (x+20°) pada x=10° adalah
- Tentukan F'(x) dari F(x)= Sec x
- F(x)=3 sin 3x, tentukan F'(2/3π)
- tentukan persamaan garis singgung kurva y=2 cos x + sin x dititik x= 0° adalah
- Tentukan persamaan garis singgung kurva y=2 cos x +sin x dititik x=0° adalah
- Jika y=tan x-cot x, maka dy/dx, x=π/4
21 Clues: F(x) sin x-2 cos x F'(π/2) • Tentukan dy/dx dari y=sin 2x • Syarat fungsi naik adalah F'(x) • Tentukan F'(x) dari F(x)= Sec x • Syarat fungsi turun adalah F'(x) • F(x)=3 sin 3x, tentukan F'(2/3π) • Tentukan y' dari y=4 sin x+2 cos x • Jika y=tan x-cot x, maka dy/dx, x=π/4 • y=24 sin x + 3 cos 3x tentukan y'(π/6) • Jika F(x)= 2 sin x +cos x, maka F'(π/2) • ...
Differentiation 2022-05-31
Across
- average rate of change of a function over some two intervals; (f (a+h) -f(a)) /h
- (d/dx)(c)=0
- involve multiple quantities that are changing in relation to each other; uses derivatives, and especially the chain rule to solve problem
- derivative of sinx
- y'=f'(g(x))*g'(x)
- d/dx[f(x)-g(x)]=f'(x)+g'(x)
- 1/xsqrt(x^2-1)
- d/dx[cf(x)]=cf'(x)
Down
- d/dx[f(x)-g(x)]=f'(x)-g'(x)
- is the process of finding the derivative dy/dx for such functions, and it is accomplished by applying the chain rule
- d/dx[f(x)g(x)]=f'(x)g(x)+f(x)g'(x)
- 1/sqrt(1-x^2)
- the derivative of the function is 1/x
- d/dx[f(x)/g(x)]=(f'(x)g(x)-f(x)g'(x))/[g(x)]^2
- derivative of secx
- (d/dx)(x^n)=nx^n-1, for any real number n
16 Clues: (d/dx)(c)=0 • 1/sqrt(1-x^2) • 1/xsqrt(x^2-1) • y'=f'(g(x))*g'(x) • derivative of secx • derivative of sinx • d/dx[cf(x)]=cf'(x) • d/dx[f(x)-g(x)]=f'(x)-g'(x) • d/dx[f(x)-g(x)]=f'(x)+g'(x) • d/dx[f(x)g(x)]=f'(x)g(x)+f(x)g'(x) • the derivative of the function is 1/x • (d/dx)(x^n)=nx^n-1, for any real number n • d/dx[f(x)/g(x)]=(f'(x)g(x)-f(x)g'(x))/[g(x)]^2 • ...
AP Calc AB Crossword - Shanali Islam (P1) 2022-05-17
Across
- [g(x)f'(x)- f(x)g'(x)]/(g(x)^2) is what rule?
- used to find a possible extrema
- ∫r(x)^2 dx from a to b is what method?
- f'(x) changes from negative to positive
- f(b) - f(a)/b-a
- f(x) changes in concavity
- the instantaneous rate of change
- f(x)g'(x) + g(x)f'(x) is what rule?
- if f(x) is decreasing, then f'(x) is...
- a derivative is the slope of a ___ line
- y-y1 = m(x-x1)
- if f'(x) is positive, then f(x) is...
- 1/b-a(∫f(x)dx from a to b)
- f'(x) changes from positive to negative
- the derivative of velocity
- ∫1/x
Down
- ∫f(x) from a to b = F(b) - F(a)
- the derivative of f(g(x))is found using this
- minimums and maximums are a type of this
- sin(pi/2)
- when the limit as x approaches a = f(a), a function is ___
- the area under a curve
- nx^(n-1) is what rule?
- ∫R(x)^2 - r(x)^2 dx from a to b is what method?
- there is no slope at a ___ tangent
25 Clues: ∫1/x • sin(pi/2) • y-y1 = m(x-x1) • f(b) - f(a)/b-a • the area under a curve • nx^(n-1) is what rule? • f(x) changes in concavity • 1/b-a(∫f(x)dx from a to b) • the derivative of velocity • ∫f(x) from a to b = F(b) - F(a) • used to find a possible extrema • the instantaneous rate of change • there is no slope at a ___ tangent • f(x)g'(x) + g(x)f'(x) is what rule? • ...
TTS MTK Minat 2022-11-23
Across
- nilai maksimum dari y=3cosx+4sin3x+1
- nilai maksimum dari 3cos(2x+5)+1
- nilai minimum dari y=3cos5x+6sin7x
- sin3x . 2cos²4x-4sinx, f'(π/3)=
- turunan dari sinx
- F(x)=2cos2x+4sin2x, F"(π/4)=
- nama lain dari turunan
Down
- f(x)=3sin2x-4cosx-3sinx, f"(π/6)=
- f(x)=-1/2sin3x, f'(x)=
- F(x)=6sin4x, 2f'(0°) =
- 3sin2x+2sin²3x
- f(x)=3x . 2cos2x, f'(π/4)=
- f(x)=2x+3sin3x, f'(π/2)=
- nilai minimum dari y=3sin(2x+3)+4
- f(x)=2sin3x+4cosx, f"(π/4)=
- tentukan gradien garis singgung kurva y=sin x di x=π/2
16 Clues: 3sin2x+2sin²3x • turunan dari sinx • f(x)=-1/2sin3x, f'(x)= • F(x)=6sin4x, 2f'(0°) = • nama lain dari turunan • f(x)=2x+3sin3x, f'(π/2)= • f(x)=3x . 2cos2x, f'(π/4)= • f(x)=2sin3x+4cosx, f"(π/4)= • F(x)=2cos2x+4sin2x, F"(π/4)= • sin3x . 2cos²4x-4sinx, f'(π/3)= • nilai maksimum dari 3cos(2x+5)+1 • f(x)=3sin2x-4cosx-3sinx, f"(π/6)= • nilai minimum dari y=3sin(2x+3)+4 • ...
TTS MTK MINAT 2022-11-24
Across
- V= cos U maka V’=
- Turunan pertama dari fungsi f(x) = cos² (1 - 3x) adalah
- Turunan pertama dari fungsi f(x) = 3 sin (4x) adalah
- Turunan Pertama dari cos (3x-2)
- Tentukan y’ dari y = 4 sin x + 5 cos x
- y=-2 cos2x. Tentukan y’
- F(x)= sinX maka F’(x)=
- Jika f(x)=sin x cos 3xf(x)=sin x cos 3x, maka f′(1/6π)=
- y=sin(sin(sin(sin(...(sin(sin(x))))...))) Tentukan pada dy/dxx=0
- Turunan pertama dari 1/4 sin 4x
- Jika F(x)= a tanx +bx, F’(π/4)=3 dan F^' (π/3)=9,maka a+b=
- Turunan pertama dari sin (2x+3)
Down
- Turunan pertama dari sin 3x
- Jika f(x) = sin x + cos x + 3x, maka nilai dari f’(π) =
- Tentukan turunan pertama dari cos 4x
- Nilai maksimum dari F(x)= 2 cos2x + 4 sinx untuk 0<x<
- Gradien garis singgung kurva F(x)=5x^2+3x dititik yang berabsis x=2
- Jika F(x)=(sinx+cosx)/sinx,sin〖x≠0 dan F(x)turunan F(x),maka F'(π/2〗)
- Jika F(x)= -(〖cos〗^2 〖x-sin〗^2 x), maka F’(x)=
- Jika F(x)=2X diturunkan terhadap x, akan dihasilkan F’(x)=2, jika F(x)=2x^2 diturunkan terhadap x, akan dihasilkan F’(x)=
20 Clues: V= cos U maka V’= • F(x)= sinX maka F’(x)= • y=-2 cos2x. Tentukan y’ • Turunan pertama dari sin 3x • Turunan Pertama dari cos (3x-2) • Turunan pertama dari 1/4 sin 4x • Turunan pertama dari sin (2x+3) • Tentukan turunan pertama dari cos 4x • Tentukan y’ dari y = 4 sin x + 5 cos x • Jika F(x)= -(〖cos〗^2 〖x-sin〗^2 x), maka F’(x)= • ...
AP Calc Midterm 2021-12-15
Across
- function that is not continuous
- any limit on one side of a function
- function appearing as a straight line
- multiple variables with relationships to each other
- the critical point at the bottom or top of a hill, but not absolute
- d/dx f(g(x))=(f'(g(x))g'(x))
- when a limited derivative=0/0
- -1/1+x^2
- function with no breaks in the line
- denominator grows faster
- d/dx sinx
- 1/square root of 1-x^2
- f'(x)=nx^(n-1)
- gain/change in speed over time
- d/dx cotx
- removable discontinuity
- a relationship between one or more variables
- vertical lines that grow without touching the function
- d/dx cscx
- set of inputs accepted by a function
- average rate of change
- if function f is coninuous over (a,b) and differential over interval (a,b) then a point c exists
- finding the derivative of the ratio of 2 functions
- break in a function, non removable discontinuty
Down
- concave up
- d/dx cosx
- an infinitely small change in a varying quantity
- highest point on the entire graph
- a quantity representing the power needed to get a certain value
- instantaneous rate of change
- h'(x)=(f(x)g'(x))+(f'(x)g(x))
- numerator grows faster
- concave down
- f^3(x)
- speed in a given direction
- function defined by 2 or more equations
- 1/|x|square root of x^2-1
- -1/|x|square root of x^2-1
- Numerator and denominator grow equally
- horizontal lines that grow without touching the function
- increase becoming more and more rapid
- assigns numbers to functions to decribe concepts
- 1/ 1+x^2
- if function f is continuous, then f has at least 1 minimum and maximum value
- d/dx secx
- confirming the limit of a function by comparing it with 2 other easier functions
- -1/square root of 1-x^2
- continous function f with interval (a,b), the domain takes any value that is not continuous
- calculator solution for derivatives
- d/dx tanx
50 Clues: f^3(x) • -1/1+x^2 • 1/ 1+x^2 • d/dx cosx • d/dx sinx • d/dx cotx • d/dx secx • d/dx cscx • d/dx tanx • concave up • concave down • f'(x)=nx^(n-1) • numerator grows faster • 1/square root of 1-x^2 • average rate of change • removable discontinuity • -1/square root of 1-x^2 • denominator grows faster • 1/|x|square root of x^2-1 • speed in a given direction • -1/|x|square root of x^2-1 • ...
Calculus Terms 2023-05-30
Across
- Derivative of extrema; f'(x) = __
- Find if f''(x) is greater than or equal to 0
- (x,y) to (y,x)
- Graph of the slope of a function
- Lowest point of F(x)
- f(x)
- The top perhaps?
- integral of 1/(1-x^2)^.5
- y = ce^kt
- If f(x) is continuous on [a,b], then there's a minimum and maximum
- To solve, use the Nth term test, p-series, ratio test, integral test
- c equals 0 f(x) + f'(x)(x+c) + (f''(x)/(2!))(x+c)^2
- Lim as x-> ∞ = 2
- c doesn't equal 0 f(x) + f'(x)(x+c) + (f''(x)/(2!))(x+c)^2
- using (r, θ)
Down
- Where f(x) is defined
- If f(x) is continuous on [a,b], there's a tangent line equal to the average slope
- When f''(c) equals 0
- x(t) and y(t)
- With carrying compacity
- Curve by a quadratic function
- The value f(x) approaches
- ___ of convergence when solving convergence for a power series
- 2r
- f' of f(g(x))
- Derivitive of an integral; abbr.
- Sn = 2n {0, 2, 4, 8...}
- Chain rule, but integral
- f(a)-f(b)/a-b
- Used to find the area under a curve; opposite of derivative
- If f(x) is continuous and f(2) = 1 and f(4) = 6, theres a value f(c) = 3.2
31 Clues: 2r • f(x) • y = ce^kt • using (r, θ) • x(t) and y(t) • f' of f(g(x)) • f(a)-f(b)/a-b • (x,y) to (y,x) • The top perhaps? • Lim as x-> ∞ = 2 • When f''(c) equals 0 • Lowest point of F(x) • Where f(x) is defined • With carrying compacity • Sn = 2n {0, 2, 4, 8...} • integral of 1/(1-x^2)^.5 • Chain rule, but integral • The value f(x) approaches • Curve by a quadratic function • ...
TTS MATEMATIKA PEMINATAN 2022-11-23
Across
- turunan dari sec²x
- nama lain dari turunan fungsi
- tentukan nilai maximum dari f(x)=6 sinx+8 cosx
- nilai stasioner dai f(x)=x²-6x
- jika f(x)=sin²x maka nilai x yang memenuhi f'(x) 1/2 adalah
- tan 45°
- tentukan du/dx jika u=5x-π
- persamaan garis yang menyinggung kurva y=x³+2x²-5x dititik (1,-2) adalah
- tentukan nilai minimum 2 sinx
- turunan kedua f(x)=8 cosx-7 sinx pada x=π/2
Down
- jika f(x)=sin(2x + π/6) maka f'(0)
- nilai minimum 3 sin (4x+π) -8 0≤x≤360
- tentukan titik singgung kurva y=sin4x di titik x=π/2
- notasi turunan yaitu
- tentukan nilai maximum dari 2 cosx+1
- jika f(x)=sinx+cosx/sinx ≠ 0 maka f'(π/2)
- tentukan turunan dari f(x)=3x²
- diberikan y=-2 cosx tentukan y'
- tentukan gradien dari 2 sin 2x dititik (π/2,0)
- f(x)=cos 2x- 3 sin 2x maka tentukan nilai dari f'(π/2)
20 Clues: tan 45° • turunan dari sec²x • notasi turunan yaitu • tentukan du/dx jika u=5x-π • nama lain dari turunan fungsi • tentukan nilai minimum 2 sinx • nilai stasioner dai f(x)=x²-6x • tentukan turunan dari f(x)=3x² • diberikan y=-2 cosx tentukan y' • jika f(x)=sin(2x + π/6) maka f'(0) • tentukan nilai maximum dari 2 cosx+1 • nilai minimum 3 sin (4x+π) -8 0≤x≤360 • ...
Pharmacy and Derivatives 2021-05-17
Across
- Find f'(5) when f(x)=2x^2
- Find f''(x) when f(x)=10x^1/2
- Find f''(7) when f(x)=5x^2+5x
- Another name for #8
- Find f(9) when f(x)=14x-70
- What grows your hair and nails
- Find f'(1) when f(x)=3.5x^2+7x
Down
- Find f''(x) if f(x)=12,500,00x^2+37x+56
- What you take when you can't sleep
- Find f'(1) if f(x)=175x^2
- Find f(2,000) when f(x)=14,000x
- Find f''(x) if f(x)=39,500,000x^2+170x+6
- Prescription pain killer
- Find f'(4) when f(x)=2.5x^2+5x
- Find f(5) when f(x)=5x+29
15 Clues: Another name for #8 • Prescription pain killer • Find f'(5) when f(x)=2x^2 • Find f'(1) if f(x)=175x^2 • Find f(5) when f(x)=5x+29 • Find f(9) when f(x)=14x-70 • Find f''(x) when f(x)=10x^1/2 • Find f''(7) when f(x)=5x^2+5x • Find f'(4) when f(x)=2.5x^2+5x • What grows your hair and nails • Find f'(1) when f(x)=3.5x^2+7x • Find f(2,000) when f(x)=14,000x • ...
Calculus BC Crossword Puzzle 2021-06-01
Across
- Alternating series converges and general terms converge in another test
- ∫f (x)-g (x) from interval a to b. Where f (x) is the top-level function and g (x) is the bottom-level function.
- Finds all derivatives up to the Xth derivative, a polynomial with a finite number of terms and the largest exponent of X
- If lim is positive and finite as n approaches the comparison series / general term ratio ∞, the series behaves like a comparison series.
- When f'(x) changes from increase to decrease, or decrease to increase, f (x) is
- f '(g(x)) g'(x)
- Particles are moving right / up
- The slope of a horizontal line
- If f'(x) is negative, then f (x) is
- If the integral converges, the series converges
- As the term grows endlessly, the series diverges
- The area below the x-axis is
- ∫√ (1 + (dy / dx) ²) dx spanning a to b
- P = M / (1 + Ae^(-Mkt))
- absolute value of velocity
- The area above the x-axis is
- lim converges when n approaches ∞ in the ratio of (n + 1) term / nth term> 1
- Rate of change
- When f'(x) is decreasing, f (x) is
- Convergence when general term = 1 / n ^ p, p> 1
- If f (x) is continuously differentiable, the slope of the tangent is equal to the slope of the secant at least once in the interval (a, b).
- When f'(x) changes from negative to positive, f (x) is
- Used to find indeterminate limits, find the numerator and denominator derivatives separately, then evaluate the limits
- Particles are moving left / down
- General term = a 1 r ^ n, converge when -1 <r <1
Down
- In order to find absolute maximum on the closed interval [a, b], you should consider...
- substitution, integration by parts, partial fractions
- uv' + vu'
- y = ln (x) / x², rule used to find derivatives
- Evaluate the integral using the rightmost rectangle (estimated area)
- Where the function is not differentiable
- Two different types of functions are multiplied
- integrand is a rational function with a factorable denominator
- There are limits a and b, find an indefinite integral, F (b) -F (a)
- dP/dt = kP(M - P)
- Limitations when x approaches a in [f (x) -f (a)] / (x-a)
- Use the ratio test and set it to> 1 to solve the absolute equation and see the endpoint
- Evaluate the integral (estimated area) using the leftmost rectangle
- Limit when h approaches 0 of [f (a + h) -f (a)] / h
- The slope of the tangent at a point, the value of the derivative at a point
- The series converges as n approaches zero with the general term = 0 and the terms decrease.
- Approximate the value of the function using tangents
- Find C with no limit, indefinite integral + C and use initial value
- 0/0, ∞ / ∞, ∞ * 0, ∞-∞, 1 ^ ∞, 0⁰, ∞⁰
- The slope of a vertical line
- The slope of the secant line between two points. Used to estimate the instantaneous rate of change at a point.
- y = x cos (x), rule used to find derivatives
- Use the ratio test, set it to> 1 and solve the absolute value equation. Radius = Center-Endpoint
- Alternating series converge and general terms diverge in another test
- If f (a) <0 and f (b)> 0, then the x value must exist between a and b where f intersects the x-axis.
- When f'(x) changes from positive to negative, f (x) is
- ∫f (x) dx integrates over the interval a to b
- Evaluate the integral using a trapezoid (estimated area)
- The function and its derivative are in the integrand
- [(H1-h2) / 2] * Base
- When f'(x) is increasing, f (x) is
- (uv'-vu')/v²
- Polynomials with an infinite number of terms, including general terms
- If f'(x) is positive, then f (x) is
59 Clues: uv' + vu' • (uv'-vu')/v² • Rate of change • f '(g(x)) g'(x) • dP/dt = kP(M - P) • [(H1-h2) / 2] * Base • P = M / (1 + Ae^(-Mkt)) • absolute value of velocity • The slope of a vertical line • The area below the x-axis is • The area above the x-axis is • The slope of a horizontal line • Particles are moving right / up • Particles are moving left / down • When f'(x) is increasing, f (x) is • ...
Calculus BC Crossword Puzzle 2021-06-01
Across
- Alternating series converges and general terms converge in another test
- ∫f (x)-g (x) from interval a to b. Where f (x) is the top-level function and g (x) is the bottom-level function.
- Finds all derivatives up to the Xth derivative, a polynomial with a finite number of terms and the largest exponent of X
- If lim is positive and finite as n approaches the comparison series / general term ratio ∞, the series behaves like a comparison series.
- When f'(x) changes from increase to decrease, or decrease to increase, f (x) is
- f '(g(x)) g'(x)
- Particles are moving right / up
- The slope of a horizontal line
- If f'(x) is negative, then f (x) is
- If the integral converges, the series converges
- As the term grows endlessly, the series diverges
- The area below the x-axis is
- ∫√ (1 + (dy / dx) ²) dx spanning a to b
- P = M / (1 + Ae^(-Mkt))
- absolute value of velocity
- The area above the x-axis is
- lim converges when n approaches ∞ in the ratio of (n + 1) term / nth term> 1
- Rate of change
- When f'(x) is decreasing, f (x) is
- Convergence when general term = 1 / n ^ p, p> 1
- If f (x) is continuously differentiable, the slope of the tangent is equal to the slope of the secant at least once in the interval (a, b).
- When f'(x) changes from negative to positive, f (x) is
- Used to find indeterminate limits, find the numerator and denominator derivatives separately, then evaluate the limits
- Particles are moving left / down
- General term = a 1 r ^ n, converge when -1 <r <1
Down
- In order to find absolute maximum on the closed interval [a, b], you should consider...
- substitution, integration by parts, partial fractions
- uv' + vu'
- y = ln (x) / x², rule used to find derivatives
- Evaluate the integral using the rightmost rectangle (estimated area)
- Where the function is not differentiable
- Two different types of functions are multiplied
- integrand is a rational function with a factorable denominator
- There are limits a and b, find an indefinite integral, F (b) -F (a)
- dP/dt = kP(M - P)
- Limitations when x approaches a in [f (x) -f (a)] / (x-a)
- Use the ratio test and set it to> 1 to solve the absolute equation and see the endpoint
- Evaluate the integral (estimated area) using the leftmost rectangle
- Limit when h approaches 0 of [f (a + h) -f (a)] / h
- The slope of the tangent at a point, the value of the derivative at a point
- The series converges as n approaches zero with the general term = 0 and the terms decrease.
- Approximate the value of the function using tangents
- Find C with no limit, indefinite integral + C and use initial value
- 0/0, ∞ / ∞, ∞ * 0, ∞-∞, 1 ^ ∞, 0⁰, ∞⁰
- The slope of a vertical line
- The slope of the secant line between two points. Used to estimate the instantaneous rate of change at a point.
- y = x cos (x), rule used to find derivatives
- Use the ratio test, set it to> 1 and solve the absolute value equation. Radius = Center-Endpoint
- Alternating series converge and general terms diverge in another test
- If f (a) <0 and f (b)> 0, then the x value must exist between a and b where f intersects the x-axis.
- When f'(x) changes from positive to negative, f (x) is
- ∫f (x) dx integrates over the interval a to b
- Evaluate the integral using a trapezoid (estimated area)
- The function and its derivative are in the integrand
- [(H1-h2) / 2] * Base
- When f'(x) is increasing, f (x) is
- (uv'-vu')/v²
- Polynomials with an infinite number of terms, including general terms
- If f'(x) is positive, then f (x) is
59 Clues: uv' + vu' • (uv'-vu')/v² • Rate of change • f '(g(x)) g'(x) • dP/dt = kP(M - P) • [(H1-h2) / 2] * Base • P = M / (1 + Ae^(-Mkt)) • absolute value of velocity • The slope of a vertical line • The area below the x-axis is • The area above the x-axis is • The slope of a horizontal line • Particles are moving right / up • Particles are moving left / down • When f'(x) is increasing, f (x) is • ...
Steigerung: Bilde zu den angegebenen Adjektia den Komparativ! 2024-01-23
Across
- crudelis/e 4. F. Sg. m./f.
- nobilis/e 6. F. Sg. m./f./n.
- laetus/a/um 1./4. F. Pl. n.
- improbus/a/um 3. F. Sg. m./f.
- difficilis/e 1./4. F. Pl. n.
- longus/a/um 1. F. Sg.n.
Down
- pulcher/ra/rum 2. F. Sg. m./f./n.
- brevis/e 3./6. F. Pl. m./f./n.
- fortis/e 2. F. Pl. m./f./n.
- iratus/a/um 1./4. F. Pl. m./f.
- antiquus/a/um: 1. F. Sg. m./f.
- sacer/cra/crum 1./4. F. Sg. n.
12 Clues: longus/a/um 1. F. Sg.n. • crudelis/e 4. F. Sg. m./f. • laetus/a/um 1./4. F. Pl. n. • fortis/e 2. F. Pl. m./f./n. • nobilis/e 6. F. Sg. m./f./n. • difficilis/e 1./4. F. Pl. n. • improbus/a/um 3. F. Sg. m./f. • brevis/e 3./6. F. Pl. m./f./n. • iratus/a/um 1./4. F. Pl. m./f. • antiquus/a/um: 1. F. Sg. m./f. • sacer/cra/crum 1./4. F. Sg. n. • pulcher/ra/rum 2. F. Sg. m./f./n.
Calculus BC Vocabulary Crossword 2017-05-24
Across
- when f '(x) changes from positive to negative, f(x) has a
- the rate of change of position with respect to time
- The polar form of x =
- the slope of horizontal line
- What rule is this (uv'-vu')/v²
- a line that is perpendicular to the tangent line at the point of tangency.
- General term = 1/n^p. converges if p>1
- derivative of cosx
- when f '(x) is increasing, f(x) is
- an integral that has limits a & b, find anti-derivative, F(b) - F(a)
- the limit as h approaches 0 of [f(a+h)-f(a)]/h
- what series test utilizes ... general term = a₁r^n, converges if -1 < r < 1
- what rule uses trapezoids to approximate the area under the curve
- which test do you plug in a(n+1) for all n: if <1, absolutely convergent; if >1, divergent; if =1 then inconclusive
- which rule indicates If the limx→c (f(x)/g(x)) is indeterminate, then the limx→c (f(x)/g(x))=limx→c(f'(x)/g'(x))
- a sharp point on a curve. Note: Cusps are points at which functions and relations are not differentiable.
- the limit of f(x) as x approaches a from either direction is equal to f(a), as long as a is in the domain of f(x).
- Who's method is used for finding successively better approximations to the roots (or zeroes) of a real-valued function.
- absolute value of velocity
- when f '(x) is decreasing, f(x) is
- which test states if what is being compared to is large than original series converges, then series does same thing; also applies with divergence but has to be smaller than original series
- what comparison test states if the limit as n goes to infinity equals c, then the series do the same thing
- the set of all real numbers between two given numbers.
- When f'(x) is negative, f(x) is
- derivative of sinx
- Alternating series converges and general term converges with another test then it Converges ...
- derivative of secx
- which term states if lim as n goes to infinity does not equal 0, then series diverges
- Use tangent line to approximate values of the function
- An integral that has no limits, find antiderivative + C, use inital value to find C
- yⁿ=yⁿ⁻¹+∆x*f'(xⁿ⁻¹,yⁿ⁻¹)
- which series Approximates values of f(x) at x=a
- if f(x) is continuous and differentiable, slope of tangent line equals slope of secant line at least once in the interval (a, b) (Initials)
Down
- a Taylor series centered at x=0
- If a and b are any two points in an interval on which f is differentiable, f' takes on every value between f'(a) and f'(b) (Initials)
- To approach a finite limit.
- The area below the x-axis is
- to fail to approach a finite limit.
- a line that goes through a point on a curve with slope equal to the slope of the
- the derivative of a velocity function with respect to time.
- the product of a given integer and all smaller positive integers.
- When f'(x) is positive, f(x) is
- The slope of vertical line
- what rule is this uv' + vu'
- at that point.
- derivative of cscx
- 0/0, (0)(±∞), ∞-∞, 1^∞, 0⁰, ∞⁰
- what is a technique for finding the volume of a solid of revolution.
- Alternating series converges and general term converges and general term diverges with another test then it Converges ...
- The polar form of y =
- The area above x-axis is
- when f '(x) changes from negative to positive, f(x) has a
52 Clues: at that point. • derivative of cosx • derivative of cscx • derivative of sinx • derivative of secx • The polar form of x = • The polar form of y = • The area above x-axis is • yⁿ=yⁿ⁻¹+∆x*f'(xⁿ⁻¹,yⁿ⁻¹) • The slope of vertical line • absolute value of velocity • To approach a finite limit. • what rule is this uv' + vu' • The area below the x-axis is • the slope of horizontal line • ...
Mπατσαρά Δροσούλα Γθετ΄ΛΥΚΕΙΟΥdew17/12/2020 2020-12-15
Across
- ΑΝ ΜΙΑ ΣΥΝΑΡΤΗΣΗ ΕΙΝΑΙ 1-1 ΕΧΕΙ...
- ΜΙΑ ΣΥΝΕΧΗΣ ΣΥΝΑΡΤΗΣΗ f ΔΙΑΤΗΡΕΙ ... ΣΕ ΚΑΘΕΝΑ ΑΠΟ ΤΑ ΔΙΑΣΤΗΜΑΤΑ ΣΤΑ ΟΠΟΙΑ ΟΙ ΔΙΑΔΟΧΙΚΕΣ ΡΙΖΕΣ ΤΗΣ f ΧΩΡΙΖΟΥΝ ΤΟ ΠΕΔΙΟ ΟΡΙΣΜΟΥ ΤΗΣ
- ΕΣΤΩ Α ΕΝΑ ΥΠΟΣΥΝΟΛΟ ΤΟΥ R. ΟΝΟΜΑΖΟΥΜΕ ΠΡΑΓΜΑΤΙΚΗ ΣΥΝΑΡΤΗΣΗ ΜΕ ΠΕΔΙΟ ΟΡΙΣΜΟΥ ΤΟ Α ΜΙΑ ... (ΚΑΝΟΝΑ)f, ΜΕ ΤΗΝ ΟΠΟΙΑ ΚΑΘΕ ΣΤΟΙΧΕΙΟ xEΑ ΑΝΤΙΣΤΟΙΧΙΖΕΤΑΙ ΣΕ ΕΝΑ ΜΟΝΟ ΠΡΑΓΜΑΤΙΚΟ ΑΡΙΘΜΟ y.
- ΑΝ ΙΣΧΥΕΙ ΤΟ ΘΕΩΡΗΜΑ ΤΟΥ BOLZANO [α, β], Η ΓΡΑΦΙΚΗ ΠΑΡΑΣΤΑΣΗ ΤΗΣ ΣΥΝΑΡΤΗΣΗΣ ΤΕΜΝΕΙ ΤΟΝ ΑΞΟΝΑ x΄x ΣΕ ΕΝΑ ΤΟΥΛΑΧΙΣΤΟΝ...με ΤΕΤΜΗΜΕΝΗ xoE(α, β)
- ΘΑ ΛΕΜΕ ΟΤΙ ΜΙΑ ΣΥΝΑΡΤΗΣΗ f ΜΕ ΠΕΔΙΟ ΟΡΙΣΜΟΥ Α ΠΑΡΟΥΣΙΑΖΕΙ ΣΤΟ xoΕΑ (ΟΛΙΚΟ)... , ΤΟ f(xo), ΟΤΑΝ f(x)<=f(xo) ΓΙΑ ΚΑΘΕ xoΕΑ
- ΤΟ x ΛΕΓΕΤΑΙ ... ΜΕΤΑΒΛΗΤΗ ΣΤΙΣ ΣΥΝΑΡΤΗΣΕΙΣ
- ΟΙ ΓΡΑΦΙΚΕΣ ΠΑΡΑΣΤΑΣΕΙΣ C ΚΑΙ C΄ΤΩΝ ΣΥΝΑΡΤΗΣΕΩΝ f ΚΑΙ f^(-1) ΕΙΝΑΙ ΣΥΜΜΕΤΡΙΚΕΣ ΩΣ ΠΡΟΣ ΤΗΝ ΕΥΘΕΙΑ y=x ΠΟΥ ... ΤΙΣ ΓΩΝΙΕΣ xOy ΚΑΙ x΄Oy΄
- Df ΣΥΜΒΟΛΙΖΟΥΜΕ ΤΟ ... ΟΡΙΣΜΟΥ ΜΙΑΣ ΣΥΝΑΡΤΗΣΗΣ f
- Η ΓΡΑΦΙΚΗ ΠΑΡΑΣΤΑΣΗ ΣΥΝΑΡΤΗΣΗΣ ... ΜΕ Cf
- Η f(x)=lnx ΟΡΙΖΕΤΑΙ ΓΙΑ x ΜΕΓΑΛΥΤΕΡΑ ΤΟΥ ...
- ΘΕΩΡΗΜΑ ... ΤΙΜΩΝ
- ΓΡΑΦΙΚΗ ... ΛΕΓΕΤΑΙ ΤΟ ΣΥΝΟΛΟ ΤΩΝ ΣΗΜΕΙΩΝ Μ(x,y) ΓΙΑ ΤΑ ΟΠΟΙΑ ΙΣΧΥΕΙ y=f(x)
- Η ΓΡΑΦΙΚΗ ΠΑΡΑΣΤΑΣΗ ΤΗΣ -f ΕΙΝΑΙ ... ΩΣ ΠΡΟΣ ΤΟΝ ΑΞΟΝΑ x΄x, ΤΗΣ ΓΡΑΦΙΚΗΣ ΠΑΡΑΣΤΑΣΗΣ ΤΗΣ f
- ΑΝ ΙΣΧΥΕΙ ΤΟ ΘΕΩΡΗΜΑ ΤΟΥ BOLZANO ΤΟΤΕ ΥΠΑΡΧΕΙ ΜΙΑ, ..., ΡΙΖΑ ΤΗΣ ΕΞΙΣΩΣΗΣ f(x)=0 ΣΤΟ ΑΝΟΙΧΤΟ ΔΙΑΣΤΗΜΑ (α,β)
- ΜΙΑ ΣΥΝΑΡΤΗΣΗ f ΘΑ ΛΕΜΕ ΟΤΙ ΕΙΝΑΙ ... ΣΤΟ xo ΤΟΥ ΠΕΔΙΟΥ ΟΡΙΣΜΟΥ ΤΗΣ limf(x) = f(xo) ΜΕ x-->xo
- ΔΕΝ ΙΣΧΥΕΙ ΤΟ ... ΤΟΥ ΘΕΩΡΗΜΑΤΟΣ ΤΟΥ BOLZANO
- ΑΝ f,g ΕΙΝΑΙ ΔΥΟ ΣΥΝΑΡΤΗΣΕΙΣ ΚΑΙ ΟΡΙΖΟΝΤΑΙ ΟΙ gof ΚΑΙ fog, ΤΟΤΕ ΑΥΤΕΣ ΔΕΝ ΕΙΝΑΙ ... ΙΣΕΣ
- ΤΑ ΟΡΙΑ ΤΗΣ f ΜΕ x-->xo- ΚΑΙ x-->xo+ ΛΕΓΟΝΤΑΙ...ΟΡΙΑ
Down
- ...ΜΟΡΦΗ
- ΜΙΑ ΣΥΝΑΡΤΗΣΗ ΜΠΟΡΕΙ ΝΑ ΕΙΝΑΙ ΣΥΝΕΧΗΣ ΚΑΙ ΣΕ ... ΔΙΑΣΤΗΜΑ [α,β]
- ΑΝ ΜΙΑ ΣΥΝΑΡΤΗΣΗ f ΕΙΝΑΙ ΓΝΗΣΙΩΣ ΑΥΞΟΥΣΑ Η΄ΓΝΗΣΙΩΣ ΦΘΙΝΟΥΣΑ Σ' ΕΝΑ ΔΙΑΣΤΗΜΑ Δ ΤΟΥ ΠΕΔΙΟΥ ΟΡΙΣΜΟΥ ΤΗΣ, ΤΟΤΕ ΛΕΜΕ ΟΤΙ Η f ΕΙΝΑΙ ΓΝΗΣΙΩΣ ... ΣΤΟ Δ
- ΚΑΘΕ... ΣΥΝΑΡΤΗΣΗ ΕΙΝΑΙ ΣΥΝΕΧΗΣ
- ΤΟ (ΟΛΙΚΟ)ΜΕΓΙΣΤΟ ΚΑΙ ΤΟ (ΟΛΙΚΟ) ΕΛΑΧΙΣΤΟ ΜΙΑΣ ΣΥΝΑΡΤΗΣΗΣ f ΛΕΓΟΝΤΑΙ ΟΛΙΚΑ ...
- ΣΥΝ ... ΕΙΝΑΙ ΤΟ ΟΡΙΟ ΤΟΥ 1/x ΜΕ x-->0+
- Η ΕΙΚΟΝΑ f(Δ) ΕΝΟΣ ΔΙΑΣΤΗΜΑΤΟΣ Δ ΜΕΣΩ ΜΙΑΣ ΣΥΝΕΧΟΥΣ ΚΑΙ ΜΗ ... ΣΥΝΑΡΤΗΣΗΣ f ΕΙΝΑΙ ΔΙΑΣΤΗΜΑ
- ΜΙΑ ΣΥΝΑΡΤΗΣΗ f ΕΙΝΑΙ...ΑΝ ΓΙΑ x ΚΑΙ -xEDf ΚΑΙ f(-x) = f(x)
- ΤΟ ΣΥΝΟΛΟ ... ΕΧΕΙ ΓΙΑ ΣΤΟΙΧΕΙΑ ΤΟΥ ΤΙΣ ΤΙΜΕΣ ΤΗΣ f ΣΕ ΟΛΑ ΤΑ xEΑ
- ΤΟ ΠΕΔΙΟ ΟΡΙΣΜΟΥ ΤΩΝ f+g, f-g, f.g ΕΙΝΑΙ Η ... ΤΩΝ ΠΕΔΙΩΝ ΟΡΙΣΜΟΥ ΤΩΝ ΣΥΝΑΡΤΗΣΕΩΝ f ΚΑΙ g
- ΤΟ ΟΡΙΟ ΤΟΥ (συνx-1)/x ΜΕ x-->0 ΕΙΝΑΙ ...
- ΑΝΤΙ ΓΙΑ (ΟΛΙΚΟ) ΜΕΓΙΣΤΟ ΜΙΑ ΣΥΝΑΡΤΗΣΗ ΜΠΟΡΕΙ ΝΑ ΕΧΕΙ (ΟΛΙΚΟ) ...
- ΔΥΟ ΣΥΝΑΡΤΗΣΕΙΣ f ΚΑΙ g ΛΕΓΟΝΤΑΙ ... ΟΤΑΝ ΕΧΟΥΝ ΤΟ ΙΔΙΟ ΠΕΔΙΟ ΟΡΙΣΜΟΥ Α ΚΑΙ ΓΙΑ ΚΑΘΕ xΕΑ ΙΣΧΥΕΙ f(x)=g(x)
- ΜΙΑ ΣΥΝΑΡΤΗΣΗ f:Α-->R ΛΕΓΕΤΑΙ ΣΥΝΑΡΤΗΣΗ ...ΠΡΟΣ ...(1-1), ΟΤΑΝ ΓΙΑ ΟΠΟΙΑΔΗΠΟΤΕ x1,x2ΕΑ ΙΣΧΥΕΙ Η ΣΥΝΕΠΑΓΩΓΗ ΑΝ x1 ΟΧΙ x2, ΤΟΤΕ f(x1) ΟΧΙ f(x2)
- ΑΝ f ΕΙΝΑΙ ΣΥΝΕΧΗΣ ΣΥΝΑΡΤΗΣΗ ΣΤΟ[α,β], ΤΟΤΕ Η f ΠΑΙΡΝΕΙ ΣΤΟ [α,β] ΜΙΑ ... ΤΙΜΗ Μ ΚΑΙ ΜΙΑ ΕΛΑΧΙΣΤΗ ΤΙΜΗ m
- ΑΝ f, g ΕΙΝΑΙ ΔΥΟ ΣΥΝΑΡΤΗΣΕΙΣ ΜΕ ΠΕΔΙΟ ΟΡΙΣΜΟΥ Α, Β ΑΝΤΙΣΤΟΙΧΩΣ, ΤΟΤΕ ΟΝΟΜΑΖΟΥΜΕ ... ΤΗΣ f ΜΕ ΤΗΝ g ΚΑΙ ΤΗ ΣΥΜΒΟΛΙΖΟΥΜΕ ΜΕ gof, ΤΗ ΣΥΝΑΡΤΗΣΗ ΜΕ ΤΥΠΟ (gof)(x)=g(f(x))
- MIA ΣΥΝΑΡΤΗΣΗ f ΘΑ ΛΕΜΕ ΟΤΙ ΕΙΝΑΙ ΣΥΝΕΧΗΣ ΣΤΟ...ΔΙΑΣΤΗΜΑ (α,β),ΟΤΑΝ ΕΙΝΑΙ ΣΥΝΕΧΗΣ ΣΕ ΚΑΘΕ ΣΗΜΕΙΟ του (α,β)
- ΤΟ y ΟΝΟΜΑΖΕΤΑΙ ... ΤΗΣ f ΣΤΟ x ΚΑΙ ΣΥΜΒΟΛΙΖΕΤΑΙ ΜΕ f(x)
- Η ho(gof) ΕΙΝΑΙ ... ΜΕ ΤΗΝ (hog)of
- ΤΟ ΟΡΙΟ ΤΟΥ ημx/x ΜΕ x-->0 ΕΙΝΑΙ ...
- ΟΙ ΣΥΝΑΡΤΗΣΕΙΣ f(x)= ημx ΚΑΙ f(x)=συνx ΕΙΝΑΙ...ΣΥΝΑΡΤΗΣΕΙΣ ΜΕ ΠΕΡΙΟΔΟ Τ=2π
- ΕΞΑΡΤΗΜΕΝΗ ... ΛΕΓΕΤΑΙ ΤΟ y=f(x)
- ΜΙΑ ΣΥΝΑΡΤΗΣΗ f ΛΕΓΕΤΑΙ ... ΑΥΞΟΥΣΑ ΣΕ ΕΝΑ ΔΙΑΣΤΗΜΜΑ Δ ΤΟΥ ΠΕΔΙΟΥ ΟΡΙΣΜΟΥ ΤΗΣ ,ΟΤΑΝ ΓΙΑ ΟΠΟΙΑΔΗΠΟΤΕ x1,x2 ΕΔ ΜΕ x1<x2 ΙΣΧΥΕΙ: f(x1)<f(x2)
- ΜΠΟΡΩ ΝΑ ΒΡΙΣΚΩ ΤΟ ... ΤΙΜΩΝ ΜΙΑΣ ΣΥΝΕΧΟΥΣ ΚΑΙ ΓΝΗΣΙΩΣ ΜΟΝΟΤΟΝΗΣ ΣΥΝΑΡΤΗΣΗΣ
- ...ΠΑΡΕΜΒΟΛΗΣ
43 Clues: ...ΜΟΡΦΗ • ...ΠΑΡΕΜΒΟΛΗΣ • ΘΕΩΡΗΜΑ ... ΤΙΜΩΝ • ΚΑΘΕ... ΣΥΝΑΡΤΗΣΗ ΕΙΝΑΙ ΣΥΝΕΧΗΣ • ΕΞΑΡΤΗΜΕΝΗ ... ΛΕΓΕΤΑΙ ΤΟ y=f(x) • ΑΝ ΜΙΑ ΣΥΝΑΡΤΗΣΗ ΕΙΝΑΙ 1-1 ΕΧΕΙ... • Η ho(gof) ΕΙΝΑΙ ... ΜΕ ΤΗΝ (hog)of • ΤΟ ΟΡΙΟ ΤΟΥ ημx/x ΜΕ x-->0 ΕΙΝΑΙ ... • ΣΥΝ ... ΕΙΝΑΙ ΤΟ ΟΡΙΟ ΤΟΥ 1/x ΜΕ x-->0+ • Η ΓΡΑΦΙΚΗ ΠΑΡΑΣΤΑΣΗ ΣΥΝΑΡΤΗΣΗΣ ... ΜΕ Cf • ΤΟ ΟΡΙΟ ΤΟΥ (συνx-1)/x ΜΕ x-->0 ΕΙΝΑΙ ... • ...
Mathematics 2020-10-19
Across
- Solve the inequality: 6a-3/a+1<3
- What is the horizontal asymptote of y=x+5/x-9?
- Analyze the inequality of x+8/x-6<0
- What is the inequality of this equation: x+6/x-4<0
- Identify the rational inequality of x+9/x+3<0
- Solve this rational inequality: x+3/x-4 <0
- What is the rarional function of 2/x=4/6x+1
- What is the rational equatikn of 1/x=9/3x+3
- Find the y-intercept of y=(x-6)(x+3)/(x-3)(x-2)
- Find the zeroes of y=3x+5/x+3
- If f(x)= 2x+1 find x=3
Down
- Find the vertical asymptote of y=x-6/x+3
- Inequality of x+24/x-6<0
- Solve the rational equation of b+8/4b^2+6/2b^2=b+2/2b^2
- If f(x)=x-5 find x=4
- If h(n)=n^2-4n+9 find n(-3)
- Find the rational function of 1/x=4/2x+2
- Evaluate f(x)=5x-5 find x=4
- Rational equation of 1/n-8 -1=5/n-8
- Vertical asymptote of y=9x+5/x-3
20 Clues: If f(x)=x-5 find x=4 • If f(x)= 2x+1 find x=3 • Inequality of x+24/x-6<0 • If h(n)=n^2-4n+9 find n(-3) • Evaluate f(x)=5x-5 find x=4 • Find the zeroes of y=3x+5/x+3 • Solve the inequality: 6a-3/a+1<3 • Vertical asymptote of y=9x+5/x-3 • Analyze the inequality of x+8/x-6<0 • Rational equation of 1/n-8 -1=5/n-8 • Find the vertical asymptote of y=x-6/x+3 • ...
Calculus Crossword Puzzle 2023-05-19
Across
- A process for finding dy/dx when y is defined as a function as a function of x by an equation of the form f(x,y)=0 is _______ differentiation.
- Have to lift pencil to draw graph/Removable, infinite, jumps, etc.
- f(c)= 1/(b-a) times the integral of f(x) from a to b is the ______ ______ theorem (two words)
- If a function is continuous between a and b, then it takes on every value between f(a) and f(b).
- Determined by taking the coefficients of the highest degree in the numerator over the denominator.
- Where the function obtains its greatest possible value.
- 1.f(a) is defined 2.lim f(x)as x approaches a exists.
- the instantaneous rate of change of a function with respect to one of it's variables/finding the slope of the tangent line.
- Multiply exponent by coefficient and decrease the exponent by 1.
- A function that is defined by applying different formulas to different parts of its domain is a ______ function.
- The process of taking a derivative.
- V(t).
- Involves 2 or more variables that change at different rates.
- Where the function obtains its least possible value.
- Instantaneous rate of change.
- f'(g(x)) g'(x).
- f(b)-f(a)/b-a.
- 1.f(a) must be defined 2. (RHD)=(LHD).
Down
- lo dee hi mine hi dee lo lo lo.
- The value that a function approaches as that function's input gets closer and closer to a number.
- Average rate of change.
- Where concavity changes from down to up or vice versa.
- lo dee hi plus hi dee lo.
- f' is decreasing/f'' is negative.
- The derivative of -cosx.
- S(t).
- Maximum or minimum.
- f(a+h)-f(a)/h.
- Any value in its domain where its derivative is 0.
- A(t).
- f' is increasing/f'' is positive.
- The antiderivative of 1/x.
- Uses the derivative to locate the critical points and determine which point is a local maximum or local minimum and can also give information on what kind of concavity it is.
- Indefinite integral/ F'=f.
- f'(a-.
- f'(a+.
36 Clues: S(t). • A(t). • V(t). • f'(a-. • f'(a+. • f(a+h)-f(a)/h. • f(b)-f(a)/b-a. • f'(g(x)) g'(x). • Maximum or minimum. • Average rate of change. • The derivative of -cosx. • lo dee hi plus hi dee lo. • The antiderivative of 1/x. • Indefinite integral/ F'=f. • Instantaneous rate of change. • lo dee hi mine hi dee lo lo lo. • f' is decreasing/f'' is negative. • f' is increasing/f'' is positive. • ...
DS4 2024-04-05
Basic Calculus 2018-01-09
Across
- The three conditions of continuity are satisfied
- _________ functions are continuous everywhere
- If f(c) = the limit of f(x) as x approaches c+
- One of the three conditions of continuity is not met
- The limit of (x^2 – 2x + 4) as x approaches 1
- Discontinuity which at x=c, if the limit of f(x) as x approaches c it DNE
- This theorem says that the limit of a multiple of a function is simply that the multiple of the limit is the function
- 0/0
- If f(c) = the limit of f(x) as x approaches c-
- Discontinuity in which a point on the graph that is undefined or does not fit the rest of the graph
- The limit of log x as x approaches 1
Down
- The limit of f(x) as x approaches 0
- The limit of cos x as x approaches pi
- The limit of a sum of functions is the sum of the limits of the individual functions
- The limit of (x+1) if x < 4, as x approaches 4
- The value that a function or sequence "approaches" as the input or index approaches some value
- This theorem states that the limit of an integer power p of a function is just that power of the limit of the function
- The limit of (1/x+1) as x approaches 1
- If the limit of f(x) as x approaches c and the limit of g(x) as x approaches c both exist, then the limit of (f(x) + g(x)) as x approaches c always exists.
- The limit of (x+3) if x < 1, as x approaches 1
20 Clues: 0/0 • The limit of f(x) as x approaches 0 • The limit of log x as x approaches 1 • The limit of cos x as x approaches pi • The limit of (1/x+1) as x approaches 1 • _________ functions are continuous everywhere • The limit of (x^2 – 2x + 4) as x approaches 1 • The limit of (x+1) if x < 4, as x approaches 4 • If f(c) = the limit of f(x) as x approaches c+ • ...
Fonksiyon Kelime Bulmaca 2022-04-16
Across
- f, A'DAN B'YE, y=f(x) fonksiyonu için G {(x,y):x A,y B} AxB kümesinin elemanları ile oluşan geometrik temsile ne denir?
- Parçalı Fonksiyon , Mutlak Değer Fonksiyonu ,İşaret Fonksiyonu,Tam Değer Fonksiyonu , Trigonometrik Fonksiyonlar ,Artan - Azalan Fonksiyonlar ,Ters Trigonometrik Fonksiyonlar,Üstel ve Logaritmik Fonksiyonlar,Hiperbolik Fonksiyonlar, Ters Hiperbolik Fonksiyonlar,Parametrik Fonksiyonlar >>>>> fonksiyonlardır.
- f,ir'den IR'ye ve her x eleman IR için y=f(x) verilmiş olsun. her x eleman IR için f(-x)=f(x) ise f fonksiyonuna >>>>>> fonksiyon denir.
- f,a'dan A'ya 1-1 ve örten fonksiyonuna >>>>>>> fonksiyonu denir.
- örten fonksiyon,içine fonksiyon ,bire bir fonksiyon,birim fonksiyon,sabit fonksiyon,sıfır fonksiyonu, tek-çift foksiyon ve permütasyon fonksiyon , fonksiyon >>>>>>> dir.
- f:a'dan B'ye ve g:B'den C'ye fonksiyonları verilsin.gof {(x,z):x€ A,z €C,f(x)=y ve g(y)=z} olan gof: A'dan C 'ye fonksiyonuna f ile g fonksiyonlarının >>>> denir.
- f:a'dan B'ye fonksiyonunda a sıfırdan farklı ve her x elemanı A için f(x)=ax+b ise fonksiyona birinci dereceden >>>>> fonksiyon denir.
- f:a'dan B'ye ,1-1 ve örten fonksiyon olsun.fog=gof=I koşulunu sağlayan g fonksiyonuna f fonksiyonunun >>>>> denir.
Down
- f,a'dan B'YE bir fonksiyon olmak üzere A kümesi fonksiyonun >>>>>>>>>dir.
- f,a'dan B'ye bir fonksiyon olmak üzere A nın bütün elemanlarının f altında eşlendiği elemanların kümesi nedir?
- f,a'dan A'ya fonksiyonunda, f fonksiyonu A kümesinin her elemanını tekrar kendisi ile eşliyorsa, f fonksiyonuna >>>>>> fonksiyon denir.
- bileşke işleminin >>>>>>>>>>> özelliği yoktur.
- A VE B BOŞ OLMAYAN IKI küme OLMAK ÜZERE A NıN HER ELEMANıNı b NIN BIR VE YALNıZ BIR ELEMANıNA eşleyen F BAĞıNTıSıNA A DAN B YE BIR >>>>> DENIR.
- f,a'dan B'ye fonksiyon olsun.f(A) görüntü kümesi, B nin öz alt kümesi ise f fonksiyonuna >>>>>>>> fonksiyon denir.
- f,a'dan B'ye ve g,A'dan B'ye fonksiyonları verilsin. her x elemanı A için f(x)=g(x) ise f ve g fonksiyonları >>>>> fonksiyonlardır.
- f,a'dan B'ye fonksiyonu için tanım kümesinin bütün elemanlarının görüntüsü aynı ise f ye >>>>>>>> fonksiyon denir.
- f,a'dan B'ye fonksiyon olsun.f , A nın farklı her elemanını B nin farklı elemanlarına eşliyorsa f fonksiyonuna >>>>>>> fonksiyon denir.
- f,ir'den IR'ye ve her x eleman IR için y=f(x) verilmiş olsun. Her x eleman IR için f(-x)=f(x) ise f fonksiyonuna >>> fonksiyon denir.
- f,a'dan B'ye fonksiyonu verilsin.x A için f(x)=0 ise f fonksiyonu >>>>>>> fonksiyonudur.
19 Clues: bileşke işleminin >>>>>>>>>>> özelliği yoktur. • f,a'dan A'ya 1-1 ve örten fonksiyonuna >>>>>>> fonksiyonu denir. • f,a'dan B'YE bir fonksiyon olmak üzere A kümesi fonksiyonun >>>>>>>>>dir. • f,a'dan B'ye fonksiyonu verilsin.x A için f(x)=0 ise f fonksiyonu >>>>>>> fonksiyonudur. • ...
Basic Calculus 2018-01-09
Across
- The limit of log x as x approaches 1
- The limit of cos x as x approaches pi
- _________ functions are continuous everywhere
- 0/0
- This theorem says that the limit of a multiple of a function is simply that the multiple of the limit is the function
- The limit of (x^2 – 2x + 4) as x approaches 1
- The limit of (1/x+1) as x approaches 1
- The value that a function or sequence "approaches" as the input or index approaches some value
- The limit of (x+1) if x < 4, as x approaches 4
- One of the three conditions of continuity is not met
- If f(c) = the limit of f(x) as x approaches c-
Down
- If f(c) = the limit of f(x) as x approaches c+
- The limit of f(x) as x approaches 0
- Discontinuity in which a point on the graph that is undefined or does not fit the rest of the graph
- The limit of (x+3) if x < 1, as x approaches 1
- The limit of a sum of functions is the sum of the limits of the individual functions
- Discontinuity which at x=c, if the limit of f(x) as x approaches c it DNE
- The three conditions of continuity are satisfied
- This theorem states that the limit of an integer power p of a function is just that power of the limit of the function
- If the limit of f(x) as x approaches c and the limit of g(x) as x approaches c both exist, then the limit of (f(x) + g(x)) as x approaches c always exists.
20 Clues: 0/0 • The limit of f(x) as x approaches 0 • The limit of log x as x approaches 1 • The limit of cos x as x approaches pi • The limit of (1/x+1) as x approaches 1 • _________ functions are continuous everywhere • The limit of (x^2 – 2x + 4) as x approaches 1 • If f(c) = the limit of f(x) as x approaches c+ • The limit of (x+3) if x < 1, as x approaches 1 • ...
Basic Calculus 2018-01-09
Across
- The limit of (x+1) if x < 4, as x approaches 4
- The three conditions of continuity are satisfied
- _________ functions are continuous everywhere
- If the limit of f(x) as x approaches c and the limit of g(x) as x approaches c both exist, then the limit of (f(x) + g(x)) as x approaches c always exists.
- The limit of cos x as x approaches pi
- This theorem says that the limit of a multiple of a function is simply that the multiple of the limit is the function
- The limit of (x^2 – 2x + 4) as x approaches 1
- Discontinuity in which a point on the graph that is undefined or does not fit the rest of the graph
- The limit of f(x) as x approaches 0
Down
- One of the three conditions of continuity is not met
- The limit of a sum of functions is the sum of the limits of the individual functions
- The limit of (1/x+1) as x approaches 1
- The limit of (x+3) if x < 1, as x approaches 1
- 0/0
- Discontinuity which at x=c, if the limit of f(x) as x approaches c it DNE
- The value that a function or sequence "approaches" as the input or index approaches some value
- This theorem states that the limit of an integer power p of a function is just that power of the limit of the function
- If f(c) = the limit of f(x) as x approaches c-
- If f(c) = the limit of f(x) as x approaches c+
- The limit of log x as x approaches 1
20 Clues: 0/0 • The limit of f(x) as x approaches 0 • The limit of log x as x approaches 1 • The limit of cos x as x approaches pi • The limit of (1/x+1) as x approaches 1 • _________ functions are continuous everywhere • The limit of (x^2 – 2x + 4) as x approaches 1 • The limit of (x+1) if x < 4, as x approaches 4 • The limit of (x+3) if x < 1, as x approaches 1 • ...
TTS MTK MINAT 2022-11-24
Across
- sin 150°
- gradien garis singgung pada grafik f(x)=3sin 2× di titik (π/2,0)
- tentukan gradien dari f(x)=4sin 2x di titik π/2,0)
- nilai maksimum f(×)=25+sin(360°)
- jika f(×)=sin²x maka nilai x yang memenuhi f'x=1
- tentukan y'dari y=(4x-1)
- tentukan f'(x)=(3x-2²)
- turunan ke dua f(×)=8cos×-7sin× pada×=π/2
- gradien garis singgung pada f(x)=2sin (x+π) pada x=π/3
Down
- turunan pertama f(×)=tan x
- nilai minimum dari L(t)=29+cos(720)
- nilai maksimum f(×)=2cos×+4tanx
- nama lain dari kemiringan
- suatu perhitungan terhadap perubahan nilai fungsi karena perubahan variabelnya
- turunan ke dua f(×)=sin×-cos3x pada×=π/2
- nilai minimum f(×)=4sin×+3cos×
- nilai minimum f(×)=13+cos(360°)
- turunan pertama dari f(×)=3 sin x cos x
- turunan pertama f(×)=sin 3 x
- turunan cos
20 Clues: sin 150° • turunan cos • tentukan f'(x)=(3x-2²) • tentukan y'dari y=(4x-1) • nama lain dari kemiringan • turunan pertama f(×)=tan x • turunan pertama f(×)=sin 3 x • nilai minimum f(×)=4sin×+3cos× • nilai maksimum f(×)=2cos×+4tanx • nilai minimum f(×)=13+cos(360°) • nilai maksimum f(×)=25+sin(360°) • nilai minimum dari L(t)=29+cos(720) • turunan pertama dari f(×)=3 sin x cos x • ...
TTS MTK MINAT 2022-11-24
Across
- y' dari y= 4 cos x - 2 sin x
- Jika f(x) = sin x cos 3x, maka f'(1/6π)
- Diketahui fungsi fx=sin(ax).Tentukan turunan fungsi f(x)
- Jika f(x)=2x+ sin 2x untuk -π/4 < x < π/4, maka f'(x)
- tentukan f' dari f(x)= sec x
- turunan dari f(x)= 4 sin 2x
- turunan pertama f(x)= 3 sin x cos x
Down
- y' dari y= 3 sin x + 5 cos x
- y=9x²sin²x+4/xsinsinx dengan 0<x<π adalah
- tentukan f' dari f(x)= tan x
- tentukan f' dari f(x)= sin x
- y'(x) dari y(x)= sin 6x
- menentukan gradien dari garis singgung kurva y= sin 2x di titik yang berabsis π/2
- tentukan f' dari f(x)= cot x
- f'(x) dari f(x)= 5 sinx cosx
- tentukan f' dari f(x)= csc x
- Turunan pertama dari fungsi y=(sin x + cos x)2 adalah y'y'
- jika f(x)= sin²x maka nilai x yang memenuhi f'(x)= 1
- y' dari y= -2 cos x
- tentukan f' dari f(x)= cos x
- menentukan titik singgung dari garis singgung kurva y= sin 2x di titik yang berabsis π/2
21 Clues: y' dari y= -2 cos x • y'(x) dari y(x)= sin 6x • turunan dari f(x)= 4 sin 2x • y' dari y= 3 sin x + 5 cos x • tentukan f' dari f(x)= tan x • tentukan f' dari f(x)= sin x • y' dari y= 4 cos x - 2 sin x • tentukan f' dari f(x)= cot x • f'(x) dari f(x)= 5 sinx cosx • tentukan f' dari f(x)= csc x • tentukan f' dari f(x)= cos x • tentukan f' dari f(x)= sec x • ...
TTS MTK MINAT 2022-11-24
Across
- tentukan y'dari y=(4x-1)
- tentukan gradien dari f(x)=4sin 2x di titik π/2,0)
- turunan pertama dari f(×)=3 sin x cos x
- nilai minimum f(×)=13+cos(360°)
- turunan cos
- nilai minimum dari L(t)=29+cos(720)
- turunan pertama f(×)=tan x
- nama lain dari kemiringan
- suatu perhitungan terhadap perubahan nilai fungsi karena perubahan variabelnya
Down
- nilai minimum f(×)=4sin×+3cos×
- nilai maksimum f(×)=2cos×+4tanx
- sin 150°
- gradien garis singgung pada grafik f(x)=3sin 2× di titik (π/2,0)
- nilai maksimum f(×)=25+sin(360°)
- gradien garis singgung pada f(x)=2sin (x+π) pada x=π/3
- tentukan f'(x)=(3x-2²)
- turunan ke dua f(×)=sin×-cos3x pada×=π/2
- jika f(×)=sin²x maka nilai x yang memenuhi f'x=1
- turunan pertama f(×)=sin 3 x
- turunan ke dua f(×)=8cos×-7sin× pada×=π/2
20 Clues: sin 150° • turunan cos • tentukan f'(x)=(3x-2²) • tentukan y'dari y=(4x-1) • nama lain dari kemiringan • turunan pertama f(×)=tan x • turunan pertama f(×)=sin 3 x • nilai minimum f(×)=4sin×+3cos× • nilai maksimum f(×)=2cos×+4tanx • nilai minimum f(×)=13+cos(360°) • nilai maksimum f(×)=25+sin(360°) • nilai minimum dari L(t)=29+cos(720) • turunan pertama dari f(×)=3 sin x cos x • ...
Sports 2024-01-31
Vokabeln Lektion 16 (2. Hälfte) 2023-11-27
Across
- 1. Pers. Präs. von liberare
- Genitiv Sg. von gloria
- statuere
- ob
- dignus
- 1. Pers. Sg. Präs. von statuere
- liberare
- antea
- Bitte
- 1. Pers. Präs. von redire
Down
- exire
- gloria
- Geschlecht von gloria
- 1. Pers. Sg. Perf. von statuere
- 1. Pers. Sg. Perf. von exire
- 1. Pers. Sg. Präs. von exire
- zurückgehen
- selbst
- nisi
- accidere
- ipsum f und n von ipse
21 Clues: ob • nisi • exire • antea • Bitte • gloria • selbst • dignus • statuere • accidere • liberare • zurückgehen • Geschlecht von gloria • Genitiv Sg. von gloria • ipsum f und n von ipse • 1. Pers. Präs. von redire • 1. Pers. Präs. von liberare • 1. Pers. Sg. Perf. von exire • 1. Pers. Sg. Präs. von exire • 1. Pers. Sg. Perf. von statuere • 1. Pers. Sg. Präs. von statuere
Latin Catiline 7 2018-06-11
Across
- recently
- of one's own accord
- -a, -um - lost, corrupt
- -tatis, f. - enormity
- (1) - to delight
- libidinis, f. - passion, desire
- dedecoris, n. - disgrace
- -ere, inussī, inustum - to burn in, brand upon
- facinoris, n. - outrage, crime
Down
- -ēre, haesi, haesum - to stick, cling
- -arum, f. - wedding, nuptials
- turpitudinis, f. - disgrace, shame
- -ī, n. - disgrace
- facis, f. - torch
- -ae, f. - enticement
- -ī, n.- crime, vice
- (1) - to heap up
17 Clues: recently • (1) - to delight • (1) - to heap up • -ī, n. - disgrace • facis, f. - torch • of one's own accord • -ī, n.- crime, vice • -ae, f. - enticement • -tatis, f. - enormity • -a, -um - lost, corrupt • dedecoris, n. - disgrace • -arum, f. - wedding, nuptials • facinoris, n. - outrage, crime • libidinis, f. - passion, desire • turpitudinis, f. - disgrace, shame • ...
TTS MTK MINAT 2022-11-24
Across
- jika f(x)= sin²x maka nilai x yang memenuhi f'(x)= 1
- tentukan f' dari f(x)= tan x
- y' dari y= 4 cos x - 2 sin x
- turunan dari f(x)= 4 sin 2x
- menentukan gradien dari garis singgung kurva y= sin 2x di titik yang berabsis π/2
- y' dari y= 3 sin x + 5 cos x
- y'(x) dari y(x)= sin 6x
- Turunan pertama dari fungsi y=(sin x + cos x)2 adalah y'y'
- Diketahui fungsi fx=sin(ax).Tentukan turunan fungsi f(x)
Down
- Jika f(x) = sin x cos 3x, maka f'(1/6π)
- turunan pertama f(x)= 3 sin x cos x
- tentukan f' dari f(x)= csc x
- Jika f(x)=2x+ sin 2x untuk -π/4 < x < π/4, maka f'(x)
- tentukan f' dari f(x)= sec x
- y' dari y= -2 cos x
- f'(x) dari f(x)= 5 sinx cosx
- tentukan f' dari f(x)= sin x
- y=9x²sin²x+4/xsinx dengan 0<x<π adalah
- tentukan f' dari f(x)= cot x
- tentukan f' dari f(x)= cos x
- menentukan titik singgung dari garis singgung kurva y= sin 2x di titik yang berabsis π/2
21 Clues: y' dari y= -2 cos x • y'(x) dari y(x)= sin 6x • turunan dari f(x)= 4 sin 2x • tentukan f' dari f(x)= tan x • y' dari y= 4 cos x - 2 sin x • tentukan f' dari f(x)= csc x • tentukan f' dari f(x)= sec x • y' dari y= 3 sin x + 5 cos x • f'(x) dari f(x)= 5 sinx cosx • tentukan f' dari f(x)= sin x • tentukan f' dari f(x)= cot x • tentukan f' dari f(x)= cos x • ...
Chapters 1 &2 2021-11-02
Across
- a method for finding both quotients and remainders for division by x-k without long division.
- - The values of X which satisfy the equation y = f (x)
- is equal to -i
- r(x)
- r(x)= f(x)/g(x)
- f(x)=a(x-h)^2+k
- A polynomial function of degree n has n complex zeros (real and nonreal). Some of these zeros may be repeated.
- q(x)
- the maximum and minimum values of a function
- If it can be drawn on a graph without lifting your pencil.
- set of output values for which a function is defined
- f(-x)=-f(x)
- equal to 1
- if f of x is equal to f of -x for all the values of x
- a polynomial function that has a degree of 1 and so has the form
Down
- are defined and continuous on all real numbers
- equals negative 1
- If f (x is a polynomial function of degree n 0, then f (x has precisely n linear
- A polynomial function written in this way, with terms in descending degree, is written in
- Describes what happens to the value of f(x) as x increases or decreases without bound.
- the degree of a zero function
- ax^2+bx+c=0
- Has a degree of 2
- The square root of -1
- i is an
- If it cannot be drawn on a graph without lifting your pencil.
- repeated zero
27 Clues: r(x) • q(x) • i is an • equal to 1 • ax^2+bx+c=0 • f(-x)=-f(x) • repeated zero • is equal to -i • r(x)= f(x)/g(x) • f(x)=a(x-h)^2+k • equals negative 1 • Has a degree of 2 • The square root of -1 • the degree of a zero function • the maximum and minimum values of a function • are defined and continuous on all real numbers • set of output values for which a function is defined • ...
RELASI DAN FUNGSI 2022-11-03
Across
- DIKETAHUI f(x)=mx+n, f(-1)=1 dan f(1)=5. BERAPA NILAI m dan n
- BANYAK ANGGOTA A=5, BANYAK ANGGOTA B=2, BANYAK PEMETAAN B KE A ADALAH
- DAERAH HASIL f(x)=x+1 DENGAN DOMAIN {2,4}
- NAMA LAIN DAERAH LAWAN
- {2,3,5,7,11,13,17}
- BANYAK KORESPONDENSI SATU-SATU X={2,3,5} DAN Y={a,b,c}
- RELASI DARI HPB {(4,2);(6,3);(4,8);(15,3)}
- APAKAH SETIAP RELASI ADALAH FUNGSI
- NAMA LAIN DAERAH HASIL
- {(0,0);(2,1);(4,2);(6,3)}
Down
- RELASI DARI {(2,4);(8,16);(9,18);(11,22)}
- {(1,3);(2,3);(1,4);(2,4)}
- {SAPI,KAMBING,KUDA,KUCING}
- NAMA LAIN DAERAH ASAL
- SALAH SATU CARA MENYAJIKAN RELASI DAN FUNGSI
- {(JAKARTA,INDONESIA);(BANGKOK,THAILAND);(MANILA,PHIILIPINA);(....,SINGAPURA)}
- {(1,10);(1,12);(1,18);(2,10);(2,12);(2,18);(3,12);(3,18)}
- NILAI FUNGSI UNTUK X=5 PADA F(X)=3X-1
- NILAI g(3)+g(2) pada g(x)=2x^2-4
- PADA g(x)=2x^2-4 JIKA g(a)=46, MAKA NILAI a ADALAH
20 Clues: {2,3,5,7,11,13,17} • NAMA LAIN DAERAH ASAL • NAMA LAIN DAERAH LAWAN • NAMA LAIN DAERAH HASIL • {(1,3);(2,3);(1,4);(2,4)} • {(0,0);(2,1);(4,2);(6,3)} • {SAPI,KAMBING,KUDA,KUCING} • NILAI g(3)+g(2) pada g(x)=2x^2-4 • APAKAH SETIAP RELASI ADALAH FUNGSI • NILAI FUNGSI UNTUK X=5 PADA F(X)=3X-1 • RELASI DARI {(2,4);(8,16);(9,18);(11,22)} • DAERAH HASIL f(x)=x+1 DENGAN DOMAIN {2,4} • ...
Krydsord matematik formelsamling SOSU 1 2020-09-01
Across
- \hat(\vec(a))=(-a_2,a_1)
- v i tan(v)=a
- 4^2
- f(x)=ax+b
- s.17
- a/sin(A)=b/sin(B)=c/sin(C)
- a=(y_1-y_0)/(x_1-x_0)
- (x-a)^2+(y-b)^2=r^2
- a/a_1=b/b_1=c/c_1
- (A_1,m,Q_3)
- parallelogram
Down
- f(x)=b*a^x
- f'(x_0)=lim... s.12
- skalarprodukt s.16
- a_1*a_2=-1
- (a+b)^2=a^2+b^2+2ab
- pyramide
- højde
- L=\int_a^b\sqrt(1+f'(x)^2)dx
- vektor s.14
- T_(1/2)
- Cirkel med centrum i (0,0) og radius på 1
- modstående katete divideret med hypotenusen
- cosinus s.12
- stolpediagram
25 Clues: 4^2 • s.17 • højde • T_(1/2) • pyramide • f(x)=ax+b • f(x)=b*a^x • a_1*a_2=-1 • vektor s.14 • (A_1,m,Q_3) • v i tan(v)=a • cosinus s.12 • stolpediagram • parallelogram • a/a_1=b/b_1=c/c_1 • skalarprodukt s.16 • f'(x_0)=lim... s.12 • (a+b)^2=a^2+b^2+2ab • (x-a)^2+(y-b)^2=r^2 • a=(y_1-y_0)/(x_1-x_0) • \hat(\vec(a))=(-a_2,a_1) • a/sin(A)=b/sin(B)=c/sin(C) • L=\int_a^b\sqrt(1+f'(x)^2)dx • ...
Transformations of Functions 2023-06-06
Across
- (x)=(x-2)²+5
- f(x) = |x|After transformation: f(x)=-|x+2|
- Thefunction f(x)=x takes the function f(x)=[x] and reflects it over and the function f(x)=√-x
- (x)=-(x+3)² −6
- f(x+b)indicates that the function f(x) is being moved to the b units
- when0 < a <1, function is vertically
- -x²
- a(x-h)² + k
- takesfunction f(x)=√x and reflects it over
- x²+y²+2x-4y-4=0
Down
- fx)-cindicates that the function f(x) is being moved c units
- Function: f(x)= |x|After transformation: f(x)=⅓|x|
- when a > 1, function is vertically
- (x-2)² + (y-5)² = 16
- +x²
- (x-h)²+(y-k)²=r²
- f(x-b)indicates that the function f(x) is being moved to the b units
- Function: y = x² After transformation: y = x² +5
- Function: y-√x After transformation: y = √x-3 +4
- f(x)+c indicates that the function f(x) is being moved c units
20 Clues: +x² • -x² • a(x-h)² + k • (x)=(x-2)²+5 • x²+y²+2x-4y-4=0 • (x-h)²+(y-k)²=r² • (x-2)² + (y-5)² = 16 • (x)=-(x+3)² −6 • when a > 1, function is vertically • when0 < a <1, function is vertically • takesfunction f(x)=√x and reflects it over • f(x) = |x|After transformation: f(x)=-|x+2| • Function: y = x² After transformation: y = x² +5 • ...
basis 2021-03-14
Across
- sklon k něčemu, dispozice (zejm. diathesis haemorrhagica - krvácivost, sklon ke
- operační spojka (klin.)
- rozestup, rozestoupení (pozor: diastasis rēctī je rozestup přímého břišního
- páteře dozadu, tj. „kulatá záda“)
- zaprášení plic uhelným prachem
- pouzdrem (anat.)
- dysostóza (obecný termín pro poruchu vývoje či tvaru kosti)
- chirurgicky provedené rozrušení srůstů
- větších cév nebo vlivem dlouhodobé fyzické aktivity); 2. operační
- se nepravidelnými kloubními plochami a tuhým a krátkým
- plochá šlacha, šlachová blána
- 1. cévní spojka (anat., primární nebo sekundárně vytvořená, např. při omezení
- střední část dlouhé kosti, diafýza
- neinfekční zánětlivé postižení cévní stěny, při kterém dochází k ukládání tuku
- ztuhnutí kloubu, ztráta pohyblivosti kloubu
- nádorový rozsev (rozsáhlý výskyt nádorů v určitém orgánu / oblasti)
- tvrdnutí / kornatění tepen (obecný termín označující ztluštění tepenných stěn
- (dg.) diagnóza
- (acc. -im) 1. čepovec (druhý krční obratel); 2. osa
- (z)modrání
- výskyt cyst
Down
- kostní výběžek se samostatným osifikačním centrem (např. trochantēr major)
- rozšíření, roztažení (jako patologický stav, zpravidla o stěnách dutých orgánů,
- vrozená či získaná neschopnost plíce správným způsobem se roztahovat a
- (dos., d.) dávka
- zvrat, krize
- vzduch
- / kӯphōsis,is,f. kyfóza (1. anat., obloukovité vyklenutí páteře dozadu; 2. klin. nadměrné
- ectasis corneae - vyklenutí a
- báze, základna, spodina
- (anam. / anamn.) předchorobí, anamnéza
- tuhý kloub (typ kloubního spojení), kloub s minimální pohyblivostí
- podél līnea alba při kýle [=diastasis mūsculī rēctī abdōminis])
- cirhóza (změna jaterní tkáně na vazivo)
- stěny cév; jedna z forem arteriosklerózy)
- [Mönckebergova mediokalcinóza] a artēriolosclērōsis)
- slepota, ztráta zraku
37 Clues: vzduch • (z)modrání • výskyt cyst • zvrat, krize • (dg.) diagnóza • (dos., d.) dávka • pouzdrem (anat.) • slepota, ztráta zraku • operační spojka (klin.) • báze, základna, spodina • ectasis corneae - vyklenutí a • plochá šlacha, šlachová blána • zaprášení plic uhelným prachem • páteře dozadu, tj. „kulatá záda“) • střední část dlouhé kosti, diafýza • chirurgicky provedené rozrušení srůstů • ...
Krydsord matematik formelsamling SOSU 1 2020-09-01
Across
- f'(x_0)=lim... s.12
- pyramide
- stolpediagram
- v i tan(v)=a
- (x-a)^2+(y-b)^2=r^2
- a/a_1=b/b_1=c/c_1
- cosinus s.12
- vektor s.14
- f(x)=b*a^x
- T_(1/2)
Down
- (a+b)^2=a^2+b^2+2ab
- (A_1,m,Q_3)
- s.17
- \hat(\vec(a))=(-a_2,a_1)
- modstående katete divideret med hypotenusen
- højde
- parallelogram
- skalarprodukt s.16
- Cirkel med centrum i (0,0) og radius på 1
- a=(y_1-y_0)/(x_1-x_0)
- a/sin(A)=b/sin(B)=c/sin(C)
- f(x)=ax+b
- L=\int_a^b\sqrt(1+f'(x)^2)dx
- 4^2
- a_1*a_2=-1
25 Clues: 4^2 • s.17 • højde • T_(1/2) • pyramide • f(x)=ax+b • f(x)=b*a^x • a_1*a_2=-1 • (A_1,m,Q_3) • vektor s.14 • v i tan(v)=a • cosinus s.12 • parallelogram • stolpediagram • a/a_1=b/b_1=c/c_1 • skalarprodukt s.16 • (a+b)^2=a^2+b^2+2ab • f'(x_0)=lim... s.12 • (x-a)^2+(y-b)^2=r^2 • a=(y_1-y_0)/(x_1-x_0) • \hat(\vec(a))=(-a_2,a_1) • a/sin(A)=b/sin(B)=c/sin(C) • L=\int_a^b\sqrt(1+f'(x)^2)dx • ...
Calculus Crossword Puzzle 2023-05-23
Across
- A rule you’d use if a limit is inconclusive?
- What’s Mr. Reeve’s favorite color?
- 0/0 or ∞/∞
- "Look up for inspiration, down for desperation, but never left or right for _____." -Mr. Brown
- ∫ 1/√(1-x^2) dx
- Theorem that proves there exists a point c on (a,b) such that f'(c) = the average rate of change over [a,b].
- If limit of x approaching a+ equals limit of x approaching a- for f(x), then f(x) is ____
- The famous math movie everyone has seen?
- Which mathematician is Mr. Reeves related to?
- The difference between the estimated value of the function by a taylor polynomial and the actual value of a function is
- What type of series is 1/n?
- To find the Lagrange remainder, the _____ value of the nth derivative of f^n(z) must be in the numerator.
- Biggest controversial concept in calculus, for its frequent use
- Coefficient used in the shell method
- European nation where calculus was first invented
- Derivative’s Danish counterpart
- What Rule is used: f(g(x)) = f’(g(x))g’(x)
Down
- What Rule is used: (d/dx)(tanx) = sec^2(x)
- Theorem that states on the interval (a,b) such that f(a)=f(b), then f'(x) = 0 for some x with a ≤ x ≤ b.
- Theorem that states that any value between f(a) and f(b) exists on the interval [a,b].
- What Rule is used: (d/dx)(cos(2x)) = -2sin(2x)
- lim(i->0)( (sin(i))/i )
- A function’s second derivative is the function’s _____
- What does ratio test tell us about a series?
- The lesser-known, “true” founder of calculus
- Theorem that says (d/dx)∫ f'(x)dx = f(x)
- What coefficient is in the denominator of each taylor polynomial term?
- (flew x grown)/ grew
- e^i(pi) + 1 =
- “Integration” aka. ________
- S = a/(1-r) assumes
- One founder of Calculus, famous for his laws of motion
- ∫ di =
- A mathematician with a constant named after them
- ln^-1(x) is equivalent to?
35 Clues: ∫ di = • 0/0 or ∞/∞ • e^i(pi) + 1 = • ∫ 1/√(1-x^2) dx • S = a/(1-r) assumes • (flew x grown)/ grew • lim(i->0)( (sin(i))/i ) • ln^-1(x) is equivalent to? • “Integration” aka. ________ • What type of series is 1/n? • Derivative’s Danish counterpart • What’s Mr. Reeve’s favorite color? • Coefficient used in the shell method • Theorem that says (d/dx)∫ f'(x)dx = f(x) • ...
Boolean Functions 2022-12-03
15 Clues: ˥X • A→B • A˅B • A↔B • A⊕B • A~B • A˄B • (p˄q)→(p˅q) • f(x,y)=(x→y); f(0,1)=? • Such a set with no element. • f(x,y,z)=(x˄y)˅z ;f(0,1,0)=? • f(A,B,C)=(˥A˅B)→C ;f(F,T,F)=? • f(A,B,C)=(˥A˅B)→C ;f(T,F,T)=? • S=(1,2,...,9);{(1,3,6)(4,5)(2,7,8,9)} • The dual of 0 is 1.The dual of 1 is 0.
Synonyms, based on 'The Pedestrian' 2023-02-18
Across
- startled (1) [s...]
- skimmed (2) [g...]
- selected (1) [c...]
- surge (2 [t...]
- ceaseless (2) [u...]
- germane [r...]
- alibi (4) [e...]
- fierce (2) [f...]
- entranced (2) [e...]
- infrequent (1) [o...]
- manifest (1) [d...]
Down
- regressive (4) [d...]
- ebbing(2) [d...]
- phantoms (1) [g...]
- squads (1) [b...]
- unequal to (1) [i... (with)]
- harsh (4) [o...]
- stumbled (2) [t...]
- thud (4) [t...]
- incense (2) [f...]
- capricious [m...]
- rare (2) [e...]
- stunned (2) [s...]
- peer down (1) [s...]]
- intermittent (1) [s...]
25 Clues: germane [r...] • surge (2 [t...] • thud (4) [t...] • rare (2) [e...] • ebbing(2) [d...] • harsh (4) [o...] • squads (1) [b...] • capricious [m...] • alibi (4) [e...] • fierce (2) [f...] • skimmed (2) [g...] • incense (2) [f...] • stunned (2) [s...] • startled (1) [s...] • phantoms (1) [g...] • selected (1) [c...] • stumbled (2) [t...] • manifest (1) [d...] • ceaseless (2) [u...] • entranced (2) [e...] • ...
American Initials 2022-01-06
68 Clues: F-4 • A-1 • B-1 • A-6 • C-7 • A-4 • B-2 • A-7 • S-3 • A-5 • P2V • T-6 • S-2 • F-8 • B-2 • B-23 • B-57 • B-26 • B-66 • B-58 • P-75 • P-51 • P-85 • T-37 • B-70 • B-24 • B-25 • B-36 • P-36 • A-37 • H-34 • B-18 • B-34 • PB2Y • B-17 • P-54 • V-22 • B-42 • F-80 • B-29 • B-45 • P-47 • B-32 • P-61 • P-38 • F-14 • H-56 • B-47 • A-12 • T-38 • A-26 • P-39 • PB4Y • F-94 • F-18 • F-15 • F-105 • F-104 • SH-60 • CH-37 • VC-25 • C-140 • F-101 • F-100 • F-106 • F-15E • AC-47 • AC-130
calc crossword 2021-05-26
Across
- a way to write functions as a series, used by calculators to compute complicated functions
- derivative of sine
- the function used by architects when designing the St. Louis Arch
- test of convergence for series written as 1/np
- Rule used to find the derivative of two multiplied functions
- When f(x) switches concavity, there is an ____________
- method to find volume rotated around an axis multiplied by pi
- antiderivative with bounds
- (1/(b-a))*∫baf(x)dx is the ____________ rate of change
- When f’’(x) is positive, f(x) is _________
- integral of 1/(1+x2)
- a group of functions used as coordinates, such as (x,y) coordinates made from functions based on t
Down
- A point where f’(x) goes from negative to positive
- taylor series centered around the origin (c=0)
- The value of f’(x) at a certain point on a graph
- method to find indeterminate limits
- the reverse derivative operation
- the integral of an acceleration-time graph gives ___________
- ratio of n+1th term to nth term as n approaches infinity, if lim < 1, series converges
- use rectangles with right-endpoints to estimate area under the curve of a function
- a value that f(x) approaches as x approaches some value
- ∫udv = uv - ∫vdu
- the ____________ value theorem says that there is at least one point f(c) for every value between f(a) and f(b)
- coordinate system using angle and distance from origin
- slope of the line tangent to a point is the _____________ rate of change
- rate of change of a function
26 Clues: ∫udv = uv - ∫vdu • derivative of sine • integral of 1/(1+x2) • antiderivative with bounds • rate of change of a function • the reverse derivative operation • method to find indeterminate limits • When f’’(x) is positive, f(x) is _________ • taylor series centered around the origin (c=0) • test of convergence for series written as 1/np • ...
Test your skills 2024-03-20
Across
- f(x)=(x)
- what is -9 under a square root called
- Square root is a
- square root of b^2-4ac
- f(x)=x^2
- f(x)=2(x)
- 2+0=2
- ax^2+bx+c=0
- (x^a)^b
- numbers 6-3i
- 2+4=4+2
- f(x)=a(x+h)^2+k
- 10/2i
Down
- x^2+9x=0
- i = -1
- 2 solutions,1 solution, and no solution
- 2(5+5)= 10+10
- x^a÷x^b
- f(x)=x
- 2+(4+3)=(2+4)+3
- f(x)=x^2-4x+12
- 2+(-2)=0
- f(x)=x^2
- x^a×x^b
24 Clues: 2+0=2 • 10/2i • i = -1 • f(x)=x • x^a÷x^b • (x^a)^b • 2+4=4+2 • x^a×x^b • x^2+9x=0 • f(x)=(x) • f(x)=x^2 • 2+(-2)=0 • f(x)=x^2 • f(x)=2(x) • ax^2+bx+c=0 • 2(5+5)= 10+10 • f(x)=x^2-4x+12 • 2+(4+3)=(2+4)+3 • f(x)=a(x+h)^2+k • Square root is a • numbers 6-3i • square root of b^2-4ac • what is -9 under a square root called • 2 solutions,1 solution, and no solution
Calculus Midterm 2021-12-15
Across
- For f(x) to be a ___ at x=q, the following conditions must be met; f(a) exists, lim f(x) exists, and lim f(x)=f(a)
- The denominator grows faster not as big/ super duper Big number
- The part of the graph where both sides are headed in a negative direction
- The line tangent of the curve of f(x) at x=a can be represented in point-slope form
- The highest point of the function
- unchanging
- f'(c)= f(b)-f(a)/b-a
- x^2+y^2=4
- A line that touches a curve at one point
- y=√(4-x^2)
- f'(x)
- h(x)=f*g h'(x)=f*g'+f'*g
- Gves points of inflection
- distance an object travels.
- The highest point of the function reletive to it area
- A point on the graph where the slope is either 0 or undefined
- if a function is continuous on [a, b], and if L is any number between f(a) and f(b), then there must be a value, x = c, where a < c < b, such that f(c) = L.
- defined not by a single equation, but by two or more
- Slope of a function
- A point where the graph is at an peak or valley
- The lowest point of the function reletive to its area
- This limit at a higher degree does not exist, If the denominator is at a higher degree = 0
- y'=dy/dx
Down
- When a limit equals 0 inthe top and bottom find the derivitive useing this rule
- An interval is sufficiently small for a tangent line to closely approximate the function over the interval.
- lim f(a+h)-f(a) / h
- f(a+h)-f(a) / (a+h)-a
- If g(x) ≤ f(x) ≤ h(x) and if lim g(x) =L and lim h(x) = L then lim f(x) = L
- f(x)=x⌃n f'(x)=nx⌃n-1
- h(x)=f/g h'(x)=g*f'-f*g'/g^2
- The derivative of Position
- f(x), f^-1(y)
- sin^-1(x), cos^-1(x), tan^-1(x)
- The lowest point of the function
- The requirements for _ are; the derivative exists for each point in the domain, The graph must be a smooth line or curve for the derivative to exist.
- The part of the graph where both sides are headed in a positive direction
- Taking the derivative of a derivative
- the point at which a maximum or minimum value of the function is obtained
- A point at which a graph is connected.
- As x aproaches_ f(x) aproaches _
- Rates of change are related by differentiation
- the branch of mathematics that deals with the finding and properties of derivatives and integrals of functions
- The derivative of Velocity
- If a function f is continuos over the interval [a,b], then f has at least one minimum value and at least one one maximum value an[a,b]
- lim f(x) exists, but f(x) ≄ f(c)
- A point on the graph where it is not continuous
- Steepness of a graph
- _ is the y-value a function approaches as you approach a given x-value from either the left or right side
- f'(g(x))g'(x)
49 Clues: f'(x) • y'=dy/dx • x^2+y^2=4 • unchanging • y=√(4-x^2) • f(x), f^-1(y) • f'(g(x))g'(x) • lim f(a+h)-f(a) / h • Slope of a function • f'(c)= f(b)-f(a)/b-a • Steepness of a graph • f(a+h)-f(a) / (a+h)-a • f(x)=x⌃n f'(x)=nx⌃n-1 • h(x)=f*g h'(x)=f*g'+f'*g • Gves points of inflection • The derivative of Position • The derivative of Velocity • distance an object travels. • h(x)=f/g h'(x)=g*f'-f*g'/g^2 • ...
Calculus Midterm 2021-12-15
Across
- For f(x) to be a ___ at x=q, the following conditions must be met; f(a) exists, lim f(x) exists, and lim f(x)=f(a)
- The denominator grows faster not as big/ super duper Big number
- The part of the graph where both sides are headed in a negative direction
- The line tangent of the curve of f(x) at x=a can be represented in point-slope form
- The highest point of the function
- unchanging
- f'(c)= f(b)-f(a)/b-a
- x^2+y^2=4
- A line that touches a curve at one point
- y=√(4-x^2)
- f'(x)
- h(x)=f*g h'(x)=f*g'+f'*g
- Gves points of inflection
- distance an object travels.
- The highest point of the function reletive to it area
- A point on the graph where the slope is either 0 or undefined
- if a function is continuous on [a, b], and if L is any number between f(a) and f(b), then there must be a value, x = c, where a < c < b, such that f(c) = L.
- defined not by a single equation, but by two or more
- Slope of a function
- A point where the graph is at an peak or valley
- The lowest point of the function reletive to its area
- This limit at a higher degree does not exist, If the denominator is at a higher degree = 0
- y'=dy/dx
Down
- When a limit equals 0 inthe top and bottom find the derivitive useing this rule
- An interval is sufficiently small for a tangent line to closely approximate the function over the interval.
- lim f(a+h)-f(a) / h
- f(a+h)-f(a) / (a+h)-a
- If g(x) ≤ f(x) ≤ h(x) and if lim g(x) =L and lim h(x) = L then lim f(x) = L
- f(x)=x⌃n f'(x)=nx⌃n-1
- h(x)=f/g h'(x)=g*f'-f*g'/g^2
- The derivative of Position
- f(x), f^-1(y)
- sin^-1(x), cos^-1(x), tan^-1(x)
- The lowest point of the function
- The requirements for _ are; the derivative exists for each point in the domain, The graph must be a smooth line or curve for the derivative to exist.
- The part of the graph where both sides are headed in a positive direction
- Taking the derivative of a derivative
- the point at which a maximum or minimum value of the function is obtained
- A point at which a graph is connected.
- As x aproaches_ f(x) aproaches _
- Rates of change are related by differentiation
- the branch of mathematics that deals with the finding and properties of derivatives and integrals of functions
- The derivative of Velocity
- If a function f is continuos over the interval [a,b], then f has at least one minimum value and at least one one maximum value an[a,b]
- lim f(x) exists, but f(x) ≄ f(c)
- A point on the graph where it is not continuous
- Steepness of a graph
- _ is the y-value a function approaches as you approach a given x-value from either the left or right side
- f'(g(x))g'(x)
49 Clues: f'(x) • y'=dy/dx • x^2+y^2=4 • unchanging • y=√(4-x^2) • f(x), f^-1(y) • f'(g(x))g'(x) • lim f(a+h)-f(a) / h • Slope of a function • f'(c)= f(b)-f(a)/b-a • Steepness of a graph • f(a+h)-f(a) / (a+h)-a • f(x)=x⌃n f'(x)=nx⌃n-1 • h(x)=f*g h'(x)=f*g'+f'*g • Gves points of inflection • The derivative of Position • The derivative of Velocity • distance an object travels. • h(x)=f/g h'(x)=g*f'-f*g'/g^2 • ...
ISSS Review: Employment 2021-12-05
Across
- An F-1 student working more than 20 hours a week is considered ____.
- The I-765 form is used to apply for this type of work authorization.
- A student must be in F-1 status for this long in order to apply for Severe Economic Hardship work authorization. (three words)
- USCIS is allowed up to ___ days to adjudicate an OPT application.
- If a student does full-time CPT for this amount of time, it'll affect eligibility for OPT. (two words)
- The CFR states an F-1 student can participate in a CPT program if it is an ___ part of an established curriculum.(hint: 8CFR214.2(f)(10)(i))
- Takes care of filing an H1-B application with USCIS.
- This agency authorizes OPT. (abbrev.)
- For an internship with an international organization, an F-1 student must be offered employment by a recognized international organization within the meaning of this Act.
- Something that gets extended with cap-gap extension related to the I-766 document.
- An F-1 student needs a job offer when applying for this practical training.
- F-1 student must apply for this when they first get an employment offer.
Down
- Letters from DSO/ARO and employer must be on this paper in order for an F-1 student to apply for a social security number.
- ___-completion OPT is done after the program end date.
- H1-B status takes effect on this date each year.
- CPT must be related to a student's ___.
- STEM Extension is a type of this practical training.
- Transfer students can only work at the school that holds this record.
- An F-1 student working no more than 20 hours a week is considered ____.
- RTI stands for ___.
- H1-B filing period begins on this date each year.
- An international student new to the U.S. can begin work ____ days before the program start date.
- Something that gets extended with cap-gap extension related to how long a student can stay in the U.S.
- Defined as making a formal judgement or decision on an application/petition
- No one has to authorize this type of employment for F-1 students.
- ___-completion OPT is done prior to graduation.
- This person authorizes CPT. (abbrev.)
27 Clues: RTI stands for ___. • This agency authorizes OPT. (abbrev.) • This person authorizes CPT. (abbrev.) • CPT must be related to a student's ___. • ___-completion OPT is done prior to graduation. • H1-B status takes effect on this date each year. • H1-B filing period begins on this date each year. • STEM Extension is a type of this practical training. • ...
part 2 2022-05-18
Across
- f(x) = int(x)
- Adjacent over opposite.
- lim x→c f(x)g(x) = lim x→c f'(x)g'(x).
- f(x) = x³
- d/dx [f(x)g(x)] = g(x)f'(x) - f(x)g'(x)[g(x)]2 (A differentiation rule).
- f’(x) = lim 𝚫x→0 f(x + 𝚫x) - f(x)𝚫x.
- A theorem that states that if f is continuous on the closed interval [a,b], differentiable on the open interval (a,b), and f(a) = f(b), then there is at least on enumber c in (a,b) such that f’(c) = 0.
- f(x) = |x|
- V = 𝝅ab[R(x)]2dx OR V = 𝝅ab[R(y)]2dy.
- Inverse tangent.
- Inverse cotangent.
- The value(s) of x of a function where y = 0.
- f(x) = 1/(1+e^-x)
- Inverse cosine.
- A theorem that states that a continuous function on a closed interval must have a maximum and a minimum and that these extrema can occur at the endpoints.
- The value of y of a function where x = 0.
- f(x) = x²
- y’ = k(y-y0).
- f(x) = sin(x)
- A horizontal line that a function approaches, but never reaches.
- d/dx [cf(x)] = cf’(x) (A differentiation rule).
- The property of a graph that is either odd, even, or nonexistent.
Down
- f(x) = x^½
- f(x) = 1/x
- The total interval of x where the function exists.
- d/dx [f(x)g(x)] = g(x)f’(x) + f(x)g’(x) OR f(x)g’(x) + g(x)f’(x) (A differentiation rule).
- Inverse sine.
- Opposite over hypotenuse.
- d/dx = [f(g(x))] = f’(g(x))g’(x) (A differentiation rule).
- d/dx [f(x) ∓ g(x)] = f’(x) ∓ g’(x) (A differentiation rule).
- 00 or ∞∞ This does not guarantee that a limit exists, nor does it indicate what the limit is if one does exist.
- Opposite over adjacent.
- An existence theorem that states that if f is continuous on the closed interval [a,b] and k is any number between f(a) and f(b), then there is at least one number c in [a,b] such that f(c) = k.
- f(x) = cos(x)
- d/dx [c] = 0 (A differentiation rule).
- A vertical line that a function approaches, but never reaches.
- Hypotenuse over opposite.
- f(x) = x
- f(x) = ln(x)
- Adjacent over hypotenuse.
- The total interval of y where the function exists.
- Inverse secant.
- f(x) = e^x
- A theorem that states that if f is continuous on the closed interval [a,b] and differentiabl on the open interval (a,b), then f’(c) = f(b) - f(a)b - a
- Inverse cosecant.
- d/dx [x^c] = nx^(n-1) (A differentiation rule).
- V = 𝝅ab([R(x)]2-[r(x)]2)dx OR V = 𝝅ab([R(y)]2-[r(y)]2)dy.
- Hypotenuse over adjacent.
48 Clues: f(x) = x • f(x) = x³ • f(x) = x² • f(x) = x^½ • f(x) = 1/x • f(x) = |x| • f(x) = e^x • f(x) = ln(x) • f(x) = int(x) • Inverse sine. • f(x) = cos(x) • y’ = k(y-y0). • f(x) = sin(x) • Inverse secant. • Inverse cosine. • Inverse tangent. • f(x) = 1/(1+e^-x) • Inverse cosecant. • Inverse cotangent. • Adjacent over opposite. • Opposite over adjacent. • Opposite over hypotenuse. • Hypotenuse over opposite. • ...
mampus 2023-10-02
Across
- Diketahui titik koordinat a (1, 0, -2), dan b (2, 1, -1). Berapa panjang vektor ab
- diketahui f(x) = 2x-4 tentukan f^-1 (4) = .....
- Diketahui tinggi tiang = 50 m. Sudut antara laki-laki dan Puncak tiang sama dengan 45°. Maka berapa jarak (m) laki-laki dengan tiang?
- diketahui h(x) = x+3/2, tentukan h^-1 (0) = .....
- Jika diketahui f(x)=3x+8 dan (gof)(x)=3x-1 maka tentukan g(2)
- Diketahui sistem persamaan linear Nilai dari x + y + z = ….
- Dalam suatu gedung pertunjukan disusun kursi dengan baris paling depan terdiri dari 12 kursi, baris kedua berisi 14 kursi, baris ketiga berisi 16 kursi, dan seterusnya. Banyaknya kursi pada baris ke-20 adalah
- Jika x dan y merupakan penyelesaian system persamaan 2x – y = 7 dan x + 3y = 14, maka nilai 2x + y adalah….
- Diketahui fungsi f(x) = x² + 4x + 5. Hitunglah bayangan untuk nilai x = 3
- Ibu Nala membeli beberapa sayuran di pasar tradisional. Dia membeli 1 ikat selada, 2 ikat bayam, dan 1 ikat daun bawang dengan total Rp 14.500,00. Bu Hanni membeli 2 ikat selada, 1 ikat bayam, dan 3 ikat daun bawang dengan total harga Rp 23.000,00. Lalu, ada Bu Mina yang membeli 2 ikat selada, 1 ikat bayam, dan 1 ikat daun bawang. Bu Mina harus membayar Rp 13.000,00 untuk belanjaannya. Berapakah harga 1 ikat selada, 1 ikat bayam, dan 1 ikat daun bawang?
- diketahui f(x) = 3x + 2 dan g(x) = x² - 3, maka tentukan nilai (fog) (1)=
- f(x) = 4x² + 3x + 8. Hitunglah nilai a + 2b + 3c!
- Tentukan hasil dari ⁷log 16-(⁷log 2+⁷log 8)
- Dengan menggunakan definisi a.b=|a|.|b|.cos θ, hitunglah pasangan vektor jika |a|=6,|b|=4,dan kedua vektor membentuk sudut 120°
- Jika dalam barisan geometri diketahui 1, 3, 9, 27, 81, …. Berapakah rasio dari deret tersebut?
- Berapa nilai 2x².x⁵/x⁷
Down
- Diketahui segitiga ABC siku-siku di B dengan sudut α adalah sudut antara Sisi AB dan Sisi AC. Panjang AB = 4 cm dan BC = 3 cm. Tentukan nilai Sin α!
- f(x) = 3x² - 2x + 5 memiliki bentuk sesuai dengan bentuk f(x) = ax² + bx + c. Hitunglah nilai 2a + 3b + 4c!
- Berapa hasil dari √512-√392+√8
- Deret geometri: 1, 3, 9, 27, 81, …. Berapakah nilai Sn dalam deret tersebut? (n = 3)
- Tentukan nilai x dari (x-2)(3x+4) = 0 yang merupakan nilai x<0
- perbandingan panjang sebuah segitiga antara sisi depan sudut dengan sisi samping segitiga (depan/samping)
- jika f(x) = 2x+7 dan g(x) = x² - 2x + 1, maka nilai (fog)(1) adalah
- Diketahui vektor u memiliki titik (2,4,-5). Berapakah panjang vektor u?
- Suku ke 8 suatu baris aritmatika yaitu 125. Apabila suku pertama adalah 20, maka beda nilai antar suku adalah …
- Jika sistem persamaan linear,mempunyai penyelesaian x = 2 dan y = 1, maka nilai dari a2 + b2 =…
- Berapa nilai eksak dari cos 0°
- Tentukan nilai x dari ³log 6x-³log 2 = 4
- Misalkan panjang vektor á adalah 1 dan panjang vektor vec b adalah 4 serta a. b = 3 Panjang vektor 2a - b adalah...
- Jika (fog)(x) = 3x-14 dan g(x) = x-5, maka f(-1)...
30 Clues: Berapa nilai 2x².x⁵/x⁷ • Berapa hasil dari √512-√392+√8 • Berapa nilai eksak dari cos 0° • Tentukan nilai x dari ³log 6x-³log 2 = 4 • Tentukan hasil dari ⁷log 16-(⁷log 2+⁷log 8) • diketahui f(x) = 2x-4 tentukan f^-1 (4) = ..... • diketahui h(x) = x+3/2, tentukan h^-1 (0) = ..... • f(x) = 4x² + 3x + 8. Hitunglah nilai a + 2b + 3c! • ...
Jack Rollins - Algebra 2 Puzzle 2021-03-23
16 Clues: b>1 • af(x) • 0<b<1 • f(x)+k • f(x-h) • y=logx • y=ab^x • f(1/b x) • ln u^n=n ln u • -f(x) or f(-x) • lnu/v=ln u-ln v • ln(uv)=ln u+ln v • a log that uses base e • line that a curve approaches as it heads to infinity • vertical line a curve approaches as it goes to infinity • horizontal line a curve approaches as it goes to infinity
AP Calculus Final 2022-12-05
Across
- d/dx[f(x)g(x)]=f(x)g'(x) + g(x)f'(x)
- d/dx(x+3y) = 1+3dy/dx
- d/dx(f(x)/g(x))= (g(x)f'(x) - f(x)g'(x))/(g(x))^2
- = v'(t)
- One line between two points at the same y-value have a slope of zero
- If y=f(g(x)) then y'=g'(x) x f'(g(x))
- = s'(t)
- example: y=(4x-3)^2 then y'=2(4x-3)(4)
- Rule limx->c (f(x)/g(x))
Down
- If n is a rational number, then the function F(x)=x^n is differentiable and d/dx(x^n-1)
- If F(x) = x^3 - 4x +5 then f'(x)=3x^2-4
- L(x)-f(a)=f'(a)(x-a) or L(x) + f'(a)(x-a)
- (√5 +2)x(√5 -2)=1
- The derivative of a constant function is zero
- (f(a+h)-f(a))/(a+h)
15 Clues: = v'(t) • = s'(t) • (√5 +2)x(√5 -2)=1 • (f(a+h)-f(a))/(a+h) • d/dx(x+3y) = 1+3dy/dx • Rule limx->c (f(x)/g(x)) • d/dx[f(x)g(x)]=f(x)g'(x) + g(x)f'(x) • If y=f(g(x)) then y'=g'(x) x f'(g(x)) • example: y=(4x-3)^2 then y'=2(4x-3)(4) • If F(x) = x^3 - 4x +5 then f'(x)=3x^2-4 • L(x)-f(a)=f'(a)(x-a) or L(x) + f'(a)(x-a) • The derivative of a constant function is zero • ...
TOÁN 2 EZ 2023-05-21
Across
- Giá trị của tích phân từ 36 đến 100 của f(x)=100/sqrt(100-x)
- Giá trị của TP kép trên D: x=0; y=x; y=2 của f(x,y)=2x
- Giá trị của TP kép trên D: -1<y<1; y^2<x<1 của f(x,y)=2xy+x
- Giá trị của tích phân từ 1 đến +vc của hàm f(x)=1/x^4
- Một loại tích phân được tính bằng cách đưa về tính tích phân xác định
- Giá trị của TP kép trên D: 0<x<2; 0<y<x^2 của hàm f(x,y)=x+2y
- Một loại tọa độ ta mới được học
- Cầu thủ bóng đá lùn mà giỏi
- Khi đổi biến sang tọa độ Cực thì y=???
- Người này không thích tóc mọc dài
- Hình thức thi hết học phần môn Toán 2 là gì?
- Tuyệt chiêu của môn phái Rùa trong truyện 7VNR
- Tích phân từ 0 đến +vc của hàm f(x)=1/(1+x^2)
- Chương cuối của Toán 2 chủ yếu nghiên cứu về vấn đề gì?
- Chương đầu tiên của môn Toán 2
Down
- Giá trị của TP kép trên D=[0,2]x[0,1] của f(x,y)=x^2+y
- Năm sinh của Mr.Quý
- Giá trị của TP kép trên D=[0,2]x[-1,1] của f(x,y)=x.y^2
- Khi đổi biến sang tọa độ Cực thì x=???
- Giá trị của TP kép trên D: x^2+y^2<9 của f(x,y)=x^2+y^2
- Chương thứ 4 của môn Toán 2 là gì?
- Để tính nó ta cần đưa về tính tích phân lặp
- Toán 2 có tất cả bao nhiêu Chương?
- Cầu thủ bóng đá không lùn mà giỏi
- Môn mà chúng ta đang học (right now)
- Khi đổi biến sang tọa độ Cực thì x^2+y^2 trở thành gì?
26 Clues: Năm sinh của Mr.Quý • Cầu thủ bóng đá lùn mà giỏi • Chương đầu tiên của môn Toán 2 • Một loại tọa độ ta mới được học • Người này không thích tóc mọc dài • Cầu thủ bóng đá không lùn mà giỏi • Chương thứ 4 của môn Toán 2 là gì? • Toán 2 có tất cả bao nhiêu Chương? • Môn mà chúng ta đang học (right now) • Khi đổi biến sang tọa độ Cực thì x=??? • ...
BASICCALCULUSRV CROSSWORD 2020-05-03
Across
- there is no limit to its values
- defined as the instantaneous rate of change, or slope, at a specific point of a function
- concerned with the study of rates at which quantities change
- find the y''' if y=x^4-5x^3+4x^2-7x+1
- The process of finding the derivative of a function.
- a function is said to be continuous if you can sketch its curve on a graph without lifting your pen even once
- Find the y''' if y=x^5+3x^-2+4x
- a formula to compute the derivative of a composite function.
- of a function is a fundamental concept in calculus and analysis concerning the behavior of that function near a particular input.
- If f(x)= (2x-1)^3 find f^' (3)?
- If f(x)= (x-3)/(x+4) find f^' (2)
- find the derivative of y=(5x^2-3)(4x^2+1)
- What is the derivative of y= (2x-1)/(3x+5) ?
Down
- concerned with area of a region bounded by curves, volumes of a solid of a revolution
- uniquely represented by its graph which is the set of all pairs(x, f (x))
- What is the derivative of y= x^3-5x^2-3 ?
- find the derivative of y= 7x^3-5/x^4 + 2/3 x^2
- find f'''(-1/3) if f(x)=x^3-1
- a branch of mathematics develop in the 17th century by Sir Isaac Newton
19 Clues: find f'''(-1/3) if f(x)=x^3-1 • there is no limit to its values • Find the y''' if y=x^5+3x^-2+4x • If f(x)= (2x-1)^3 find f^' (3)? • If f(x)= (x-3)/(x+4) find f^' (2) • find the y''' if y=x^4-5x^3+4x^2-7x+1 • What is the derivative of y= x^3-5x^2-3 ? • find the derivative of y=(5x^2-3)(4x^2+1) • What is the derivative of y= (2x-1)/(3x+5) ? • ...
Test your skills 2024-03-20
Across
- ax^2+bx+c=0
- f(x)=2(x)
- x^a÷x^b
- (x^a)^b
- i = -1
- 2+0=2
- square root of b^2-4ac
- f(x)=x
- f(x)=(x)
- What unit are we in
- 2+(4+3)=(2+4)+3
- f(x)=x^2
- 10/2i
Down
- x^a×x^b
- what is -9 under a square root called
- 2 solutions,1 solution, and no solution
- 2+4=4+2
- x^2+9x=0
- f(x)=x^2-4x+12
- Square root is a
- f(x)=a(x+h)^2+k
- 2(5+5)= 10+10
- f(x)=x^2
- 2+(-2)=0
- 6-3i
25 Clues: 6-3i • 2+0=2 • 10/2i • i = -1 • f(x)=x • x^a×x^b • x^a÷x^b • (x^a)^b • 2+4=4+2 • x^2+9x=0 • f(x)=x^2 • 2+(-2)=0 • f(x)=(x) • f(x)=x^2 • f(x)=2(x) • ax^2+bx+c=0 • 2(5+5)= 10+10 • f(x)=x^2-4x+12 • f(x)=a(x+h)^2+k • 2+(4+3)=(2+4)+3 • Square root is a • What unit are we in • square root of b^2-4ac • what is -9 under a square root called • 2 solutions,1 solution, and no solution
Turunan Fungsi Trigonometri 2023-02-18
Across
- nilai f' (6/2) jika f(x)= 2 sin x + cos x
- turunan pertama f(x)=sin2 4 x
- turunan pertama f(x)=2 cos 3 x
- turunan pertama y=14 sin 4x
- turunan f(x)=tg x
- turunan secx
- kecepatan bola saatt=1/2
- nilai f'(
- nilai x yang memenuhi f'(x)=1/2 jika f(x)=sin2 x
Down
- turunan dari f(x)=-4 cos x
- persamaan kecepatan saat 6 sin 2t
- turunan pertama y=-3x
- turunan kedua f(x)=sin 2x
- turunan pertama dari f(x)= sin x
- turunan ketiga y=-3x
15 Clues: nilai f'( • turunan secx • turunan f(x)=tg x • turunan ketiga y=-3x • turunan pertama y=-3x • kecepatan bola saatt=1/2 • turunan kedua f(x)=sin 2x • turunan dari f(x)=-4 cos x • turunan pertama y=14 sin 4x • turunan pertama f(x)=sin2 4 x • turunan pertama f(x)=2 cos 3 x • turunan pertama dari f(x)= sin x • persamaan kecepatan saat 6 sin 2t • nilai f' (6/2) jika f(x)= 2 sin x + cos x • ...
math 2022-04-12
Across
- if f'(x) is increasing, this is up
- 1/n^p
- rate of change of a function
- 1/cotangent
- greek symbol for angle
- change in y/change in x
- name of series for 1/n
- series for ar^n
- a1 + a2 + a3 + a4 + ... + an
- M(x-c)^n+1/(n+1)!
Down
- 1/sin
- if f'(x) exists
- 1/cos
- opposite/hypotenuse
- a1 , a2 , a3 , a4 , ... , an
- a function that has no jumps or holes
- a series centered at x = 0
- another word for integral
- adjacent/hypotenuse
- 1/tangent
20 Clues: 1/sin • 1/cos • 1/n^p • 1/tangent • 1/cotangent • if f'(x) exists • series for ar^n • M(x-c)^n+1/(n+1)! • opposite/hypotenuse • adjacent/hypotenuse • greek symbol for angle • name of series for 1/n • change in y/change in x • another word for integral • a series centered at x = 0 • rate of change of a function • a1 + a2 + a3 + a4 + ... + an • a1 , a2 , a3 , a4 , ... , an • ...
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