1 f Crossword Puzzles
portofolio mat 2021-09-30
Across
- lim x->∞ (1-(1/3x))^12x
- lim x->∞ 2x(√(9+10/x)-3)
- lim x->∞ (3-x+(x^2-2x)/(x+5))
- lim x->∞ (1+4x+4x^2)^3/x
- diketahui fungsi f ditentukan dengan rumus f(x)=(x^2-9)/(x-3), untuk x≠3; ax, untuk x=3 jika f(x) kontinu di x=3, tentukan nilai a
- lim x->∞ (√(x^2+1)-x)
- lim x->∞ sin((1/x)-(4π/3))
- lim x->∞ (3x+1-√(9x^2+4x-7))
- apakah fungsi f(x)=(x^2-4)/(x-2) kontinu di x=2?
- apakah fungsi f(x)=(x^3-1)/(x-1), untuk x≠1; 3, untuk x=1 kontinu di x=1?
Down
- lim x->3 (xtan(2x-6))/(sin(x-3))
- lim x->∞ (√(9x^2+5x+5)-√(9x^2-7x-4))
- lim x->π/2 cosx/x-(π/2)
- lim x->0 x^2tan2x/x-xcos4x
- apakah fungsi f(x)=x^3-x+1 kontinu di x=1?
- lim x->∞ ((x-1)/(x+1))^3x-2
- lim x->1 x(x)/(x^2-3x+2)
- lim x->∞ 2x^2(1-cos(6/x))
- lim x->45° cos2x/1-tanx
- lim x->∞ (2+cos(4/x))
20 Clues: lim x->∞ (√(x^2+1)-x) • lim x->∞ (2+cos(4/x)) • lim x->π/2 cosx/x-(π/2) • lim x->∞ (1-(1/3x))^12x • lim x->45° cos2x/1-tanx • lim x->∞ 2x(√(9+10/x)-3) • lim x->1 x(x)/(x^2-3x+2) • lim x->∞ (1+4x+4x^2)^3/x • lim x->∞ 2x^2(1-cos(6/x)) • lim x->0 x^2tan2x/x-xcos4x • lim x->∞ sin((1/x)-(4π/3)) • lim x->∞ ((x-1)/(x+1))^3x-2 • lim x->∞ (3x+1-√(9x^2+4x-7)) • lim x->∞ (3-x+(x^2-2x)/(x+5)) • ...
Calculus Vocabulary Crossword 2021-05-21
Across
- A rule where if a function is the quotient of two differentiable functions
- If f is continuous on the closed interval (a, b) and differentiable on the open interval (a, b), then there exists a number c in (a, b).
- The steepness of a line commonly known as the rise over run.
- A function that does have abrupt changes in value.
- A type of discontinuity when factors don’t cancel when (x – a) = 0
- A rule where if f and g are differentiable, then the composite function (f * g)(x) = f(g(x)) is differentiable and f’(g(x)) * g’(x)
- F(x) = f’(x)
- A rule where if a function is the product of two differentiable functions
- How far something or someone are from where you started.
- A type of discontinuity when factors are removed (cancel) when (x – a) = 0
- A function that does not have any abrupt changes in value
- A measurement of how much space an object has taken up.
- A quantity that expresses the extent of a two-dimensional surface or shape
- The rate of change of a function’s derivative
- A = 1/2h (b1 + b2)
- If f is continuous on the closed interval (a, b) then f takes every value between f (a) and f (b).
- f’(x) = f(x)
- A graphical general solution to a differential equation.
Down
- A method of finding the integral for a function at any point on a graph.
- If f is continuous over a closed interval (a, b) then f has both a minimum and maximum over the interval
- y – y1 = -1/m (x – x1)
- y - y1 = m (x - x1)
- A strategy for solving systems of equations that include solving for one variable and using that solution to find the other variable
- The process of finding a derivative, or rate of change, of a function
- The total amount something has traveled
- The height of the function at the maximum
- A circle with a radius of 1
- The “y-value,” that the graph is approaching from both the left side and the right side of “target value” of x = c.
- A function defined in terms of time t expressing the ratio of the value at time t and the initial investment
- The behavior of a graph of f(x) as x approaches positive or negative infinity.
30 Clues: F(x) = f’(x) • f’(x) = f(x) • A = 1/2h (b1 + b2) • y - y1 = m (x - x1) • y – y1 = -1/m (x – x1) • A circle with a radius of 1 • The total amount something has traveled • The height of the function at the maximum • The rate of change of a function’s derivative • A function that does have abrupt changes in value. • A measurement of how much space an object has taken up. • ...
ΜΑΘΗΜΑΓΙΚΑ Γ ΛΥΚΕΙΟΥ 2020-04-04
Across
- ΞΑΔΕΛΦΑΚΙ ΤΟΥ Θ.ROLLE (ΑΡΧΙΚΑ)
- ΤΟ ΟΡΙΟ ΤΗΣ F ΣΤΟ +00 ΑΝ ΕΧΕΙ ΟΡΙΖΟΝΤΙΑ ΑΣΥΜΠΤΩΤΗ ΤΟΝ XX΄
- ΠΑΡΑΤΣΟΥΚΛΙ ΤΗΣ ΑΡΧΙΚΗΣ ΣΥΝΑΡΤΗΣΗΣ
- ΛΕΓΕΤΑΙ ΚΑΙ ΡΥΘΜΟΣ ΜΕΤΑΒΟΛΗΣ
- ΑΝ Η F΄ ΘΕΤΙΚΗ ΠΑΝΤΟΥ Η F ΕΙΝΑΙ ΓΝΗΣΙΩΣ...
- Η ΕΦΑΠΤΟΜΈΝΗ ΣΕ ΑΥΤΟ ΤΟ ΣΗΜΕΙΟ ΔΙΑΠΕΡΝΑ ΤΗΝ ΚΑΜΠΥΛΗ
- ΑΝ ΜΙΑ ΣΥΝΑΡΤΗΣΗ ΕΙΝΑΙ ΠΑΡΑΓΩΓΙΣΙΜΗ ΕΙΝΑΙ ΤΟΤΕ ΣΙΓΟΥΡΑ
- ΜΙΑ ΣΥΝΕΧΗΣ ΣΥΝΑΡΤΗΣΗ ΜΕΤΑΞΥ ΔΥΟ ΔΙΑΔΟΧΙΚΩΝ ΡΙΖΩΝ ΤΗΣ ΤΟ ΔΙΑΤΗΡΕΙ ΣΤΑΘΕΡΟ
- ΑΝ Η F' EINAI ΓΝΗΣΊΩΣ ΦΘΙΝΟΥΣΑ ΤΟΤΕ Η f ΕΙΝΑΙ
- ΤΟ 1-1 ΔΕΝ ΕΙΝΑΙ ΙΣΟΠΑΛΙΑ ΑΛΛΑ ΣΗΜΑΙΝΕΙ ΟΤΙ Η ΣΥΝΑΡΤΗΣΗ ΕΙΝΑΙ
- ΕΙΝΑΙ ΟΙ f(x)=e^x ΚΑΙ g(x)=lnx
Down
- ΜΙΑ ΑΣΥΜΠΤΩΤΗ ΠΟΥ ΔΕΝ ΤΗΝ ΨΑΧΝΟΥΜΕ ΣΤΑ ΑΠΕΙΡΑ
- ΑΝ Η ΠΑΡΑΓΩΓΟΣ ΣΕ ΕΝΑ ΣΗΜΕΙΟ ΕΙΝΑΙ 0 ΤΟΤΕ ΑΥΤΗ ΕΙΝΑΙ ΟΡΙΖΟΝΤΙΑ
- ΤΟ ΘΕΩΡΗΜΑ ΤΟΥ ΘΕΛΕΙ ΑΚΡΟΤΑΤΟ
- ΕΙΧΕ ...ΕΝΑ ΤΟΥΛΑΧΙΣΤΟΝ ΞΑΔΕΛΦΟ
- ΕΙΧΕ ...ΕΝΑ ΤΟΥΛΑΧΙΣΤΟΝ ΠΑΙΔΙ
- ΤΗΝ ΑΝΑΖΗΤΟΥΜΕ ΣΤΑ ΑΠΕΙΡΑ ΚΑΙ ΔΕΝ ΕΙΝΑΙ ΟΡΙΖΟΝΤΙΑ
- ΤΟ ΘΕΩΡΗΜΑ ΣΑΝΤΟΥΙΤΣ ΣΑΝ ΚΡΙΤΗΡΙΟ
- ΜΙΑ ΠΡΑΞΗ ΜΕΤΑΞΥ ΣΥΝΑΡΤΗΣΕΩΝ
- ΑΥΤΗ ΣΤΡΕΦΕΙ ΤΑ ΚΟΙΛΑ ΑΝΩ
- ΕΝΑ ΣΗΜΕΙΟ ΜΠΟΡΕΙ ΝΑ ΕΙΝΑΙ
- ΕΙΝΑΙ ΚΑΘΕ ΠΟΛΥΩΝΥΜΙΚΗ ΣΥΝΑΡΤΗΣΗ
- ΤΩΝ ...ΤΙΜΩΝ ΕΙΝΑΙ ΘΕΩΡΗΜΑ
23 Clues: ΑΥΤΗ ΣΤΡΕΦΕΙ ΤΑ ΚΟΙΛΑ ΑΝΩ • ΕΝΑ ΣΗΜΕΙΟ ΜΠΟΡΕΙ ΝΑ ΕΙΝΑΙ • ΤΩΝ ...ΤΙΜΩΝ ΕΙΝΑΙ ΘΕΩΡΗΜΑ • ΛΕΓΕΤΑΙ ΚΑΙ ΡΥΘΜΟΣ ΜΕΤΑΒΟΛΗΣ • ΜΙΑ ΠΡΑΞΗ ΜΕΤΑΞΥ ΣΥΝΑΡΤΗΣΕΩΝ • ΤΟ ΘΕΩΡΗΜΑ ΤΟΥ ΘΕΛΕΙ ΑΚΡΟΤΑΤΟ • ΕΙΧΕ ...ΕΝΑ ΤΟΥΛΑΧΙΣΤΟΝ ΠΑΙΔΙ • ΞΑΔΕΛΦΑΚΙ ΤΟΥ Θ.ROLLE (ΑΡΧΙΚΑ) • ΕΙΧΕ ...ΕΝΑ ΤΟΥΛΑΧΙΣΤΟΝ ΞΑΔΕΛΦΟ • ΕΙΝΑΙ ΚΑΘΕ ΠΟΛΥΩΝΥΜΙΚΗ ΣΥΝΑΡΤΗΣΗ • ΕΙΝΑΙ ΟΙ f(x)=e^x ΚΑΙ g(x)=lnx • ΤΟ ΘΕΩΡΗΜΑ ΣΑΝΤΟΥΙΤΣ ΣΑΝ ΚΡΙΤΗΡΙΟ • ...
Trigonometry 2023-01-22
12 Clues: f(x)=tan(x) • Phase _____ • f(x)=sin(x) • f(x)=cos(x) • f(x)=sin(x)+1 • f(x)=cos(x+1) • The fastest wave • Used to calculate vibration • Outcome of ocean displacement • A sudden shaking of the ground • The highest or lowest point on a graph • A wave that only travels through the crust of the earth
Transformations of Functions 2023-05-20
Across
- When a>1, the function is...
- f(x) = a(x–h)²+k
- y=ax²+bx+c
- When 0<a<1, the function is...
- Represented by f(-x) or -f(x)
Down
- f(x)+|x| (type of parent function)
- (x-h)²+(y-k)²=r²
- f(x)= √x (type of parent function)
- f(x)=x (type of parent function)
- f(x)=x² (type of parent function)
- Moves a function left or right
- Moves a function up or down
12 Clues: y=ax²+bx+c • (x-h)²+(y-k)²=r² • f(x) = a(x–h)²+k • Moves a function up or down • When a>1, the function is... • Represented by f(-x) or -f(x) • Moves a function left or right • When 0<a<1, the function is... • f(x)=x (type of parent function) • f(x)=x² (type of parent function) • f(x)+|x| (type of parent function) • f(x)= √x (type of parent function)
Kylie's Crossword Puzzle 2022-03-20
Across
- 50
- Functions that undo each other
- 3
- A solution of an equation that appears more than once
- A method to divide a polynomial f(x) by a nonzero divisor d(x) to yield a quotient polynomial q(x) and a remaninder polynomial r(x)
- f(x)=3x^3+4x^2+2x-1
- 11
- A monomioal or a sum of monomials
Down
- 12
- 13
- An expression of the form au^2+bu+c=0, where u is an algebraic expression
- 5
- A shortcut method to divide a polynomial by a binomial of the form x-k
- A triangular array of numbers such that the numbers in the nth row are the coefficients of the terms in the expression of (a+b)^n for whole number values of n
- 1
- An equation with a radical that has a variable in the radicand
- 2
- 20
- For a function f, f(-x)=-f(x) for all x in its domain
- 4
20 Clues: 5 • 1 • 3 • 2 • 4 • 12 • 13 • 50 • 20 • 11 • f(x)=3x^3+4x^2+2x-1 • Functions that undo each other • A monomioal or a sum of monomials • A solution of an equation that appears more than once • For a function f, f(-x)=-f(x) for all x in its domain • An equation with a radical that has a variable in the radicand • A shortcut method to divide a polynomial by a binomial of the form x-k • ...
Grafik Fungsi Trigonometri 2023-06-05
Across
- Tentukan nilai maksimum dari f(x)=2sin3x+4.
- Tentukan nilai minimum dari f(x)=7sin2x+3
- f(x)=3sin(7x-14°)-4. Tentukan nilai minimumnya!
- Nilai maksimum dari f(x)=9sin3x+3 adalah...
- f(x)=6cos2x+1. Tentukan nilai minimumnya!
- Periode dari f(x)=5cos(6x-36°)adalah...
- Nilai tertinggi yang bisa dicapai oleh suatu fungsi trigonometri adalah nilai...
- Periode dari f(x)=2sin(3x-30°)adalah...
- Nilai terendah yang bisa dicapai oleh suatu fungsi trigonometri adalah nilai...
Down
- f(x)=3cos(4x-16°)-4. Tentukan periodenya!
- f(x)=7cos6x+3. Tentukan nilai maksimumnya!
- Rentangan pengulangan bentuk grafik adalah...
- f(x)=9sin3x+3. Tentukan amplitudonya!
- Untuk fungsi sinus dan kosinus periodenya adalah T=...°/K atau T=2π/K
- f(x)=6sin(8x-64°)-5. Tentukan periodenya!
- f(x)=2sin3x+3. Tentukan nilai minimumnya!
- Untuk fungsi Tangen periodenya adalah T=...°/K atau T=2/K
- f(x)=A cos K(x±α)+C. A dalam fungsi kosinus tersebut merupakan...
- Tentukan Hp dari Tan x=√3,dengan syarat 180°≤x<360°.
- f(x)=y=A sin K(x±α)+C merupakan bentuk fungsi...
20 Clues: f(x)=9sin3x+3. Tentukan amplitudonya! • Periode dari f(x)=5cos(6x-36°)adalah... • Periode dari f(x)=2sin(3x-30°)adalah... • f(x)=3cos(4x-16°)-4. Tentukan periodenya! • f(x)=6sin(8x-64°)-5. Tentukan periodenya! • f(x)=2sin3x+3. Tentukan nilai minimumnya! • Tentukan nilai minimum dari f(x)=7sin2x+3 • f(x)=6cos2x+1. Tentukan nilai minimumnya! • ...
Sequences 2022-03-28
11 Clues: f(2)-f(1) • 1,3,5,___... • unknown term • 3, 6, 9 __... • 16,8,0,___,-16 • f(n)=f(1)+d(n-1) • multiplying to find next term • the first number in a sequence • a set of numbers with a pattern • adding/subtracting to find next term • 5th term in arithmetic sequence: 1,11,21, ___
Calculus BC Crossword 2019-05-17
Across
- The abbreviation of the theorem stating: If f is a function that is continuous over the domain [a,b] and if m is a number between f(a) and f(b), then there is some value c between a and b such that f(c) = m.
- The sum of the terms of a sequence.
- Another name for a removable discontinuity that can be removed by filling a single point.
- The rate of change of the position of an object.
- The type of discontinuity for which the limits of the left and the right both exist but are not equal to each other.
- The line that touches a curve at a point without crossing over. It is a line which intersects a differentiable curve at the point where the slope of the curve equals the slope of the line.
- The branch of math dealing with limits, derivatives, integrals, and power series.
- The approach of a finite limit.
- A line or curve that the graph of a relation approaches more and more closely the further the graph is followed.
- The product of a given integer and all smaller positive integers.
- The highest point in a particular section of a graph.
- A polynomial that is an approximation of a function using terms from the function's taylor series.
- The abbreviation of the theorem stating: If function f is continuous on [a,b] and differentiable on (a,b), then there exists a number c in (a,b) such that f'(c)=(f(b)-f(a))/(b-a).
Down
- The total amount of space enclosed in a solid.
- The lowest point in a particular section of a graph.
- The value that a function approaches as X (or the domain variable) approaches a specific value.
- A list of numbers set apart by commas.
- The fail to approach a finite limit.
- The point at which a curve changes its concavity.
- This namesake rule is used to evaluate limits of fractions that evaluate to the indeterminate forms.
- The abbreviation of the theorem stating: If a function f is continuous over [a,b] then there are numbers c and d in [a,b] such that f(c) is an absolute minimum over [a,b] and f(d) is an absolute maximum over [a,b].
- The name given to the series 1 + 1/2 + 1/3 + 1/4 + ... + 1/n + ...
- A point on a graph of a function at which the derivative is either 0 or undefined.
- A line that passes through at least two points of a curve.
- A sharp point on a curve. At this point functions are not differentiable.
25 Clues: The approach of a finite limit. • The sum of the terms of a sequence. • The fail to approach a finite limit. • A list of numbers set apart by commas. • The total amount of space enclosed in a solid. • The rate of change of the position of an object. • The point at which a curve changes its concavity. • The lowest point in a particular section of a graph. • ...
Calculus BC Crossword 2019-05-17
Across
- The abbreviation of the theorem stating: If f is a function that is continuous over the domain [a,b] and if m is a number between f(a) and f(b), then there is some value c between a and b such that f(c) = m.
- The sum of the terms of a sequence.
- Another name for a removable discontinuity that can be removed by filling a single point.
- The rate of change of the position of an object.
- The type of discontinuity for which the limits of the left and the right both exist but are not equal to each other.
- The line that touches a curve at a point without crossing over. It is a line which intersects a differentiable curve at the point where the slope of the curve equals the slope of the line.
- The branch of math dealing with limits, derivatives, integrals, and power series.
- The approach of a finite limit.
- A line or curve that the graph of a relation approaches more and more closely the further the graph is followed.
- The product of a given integer and all smaller positive integers.
- The highest point in a particular section of a graph.
- A polynomial that is an approximation of a function using terms from the function's taylor series.
- The abbreviation of the theorem stating: If function f is continuous on [a,b] and differentiable on (a,b), then there exists a number c in (a,b) such that f'(c)=(f(b)-f(a))/(b-a).
Down
- The total amount of space enclosed in a solid.
- The lowest point in a particular section of a graph.
- The value that a function approaches as X (or the domain variable) approaches a specific value.
- A list of numbers set apart by commas.
- The fail to approach a finite limit.
- The point at which a curve changes its concavity.
- This namesake rule is used to evaluate limits of fractions that evaluate to the indeterminate forms.
- The abbreviation of the theorem stating: If a function f is continuous over [a,b] then there are numbers c and d in [a,b] such that f(c) is an absolute minimum over [a,b] and f(d) is an absolute maximum over [a,b].
- The name given to the series 1 + 1/2 + 1/3 + 1/4 + ... + 1/n + ...
- A point on a graph of a function at which the derivative is either 0 or undefined.
- A line that passes through at least two points of a curve.
- A sharp point on a curve. At this point functions are not differentiable.
25 Clues: The approach of a finite limit. • The sum of the terms of a sequence. • The fail to approach a finite limit. • A list of numbers set apart by commas. • The total amount of space enclosed in a solid. • The rate of change of the position of an object. • The point at which a curve changes its concavity. • The lowest point in a particular section of a graph. • ...
Random Calculus 2023-05-16
Across
- a ___ point is where f'(x) = 0 or is undefined
- (uv'-vu')/v²
- use if a series is positive, continuous, and decreasing
- s'(t) (s=position)
- the lowest point of a function
- if an alternating series converges and the absolute value of the general term converges, the series converges ___
- use to find the interval of convergence of a power series
- if an alternating series converges and the absolute value of the general term diverges, the series converges ___
- a p-series ___ if p > 1
- a series with a common ratio
- ∫v(t)dt (parametric)
Down
- v'(t) = s''(t)
- a point of ___ is where f''(x) changes signs
- uv'+vu'
- f' changes from positive to negative
- the highest point of a function
- a p-series ___ if p ≤ 1
- f'(g(x))g'(x)
- ∫||v(t)||dt (parametric)
- the process of finding a derivative
- uv-∫vdu
- f' changes from negative to positive
- ||v(t)|| (parametric)
23 Clues: uv'+vu' • uv-∫vdu • (uv'-vu')/v² • f'(g(x))g'(x) • v'(t) = s''(t) • s'(t) (s=position) • ∫v(t)dt (parametric) • ||v(t)|| (parametric) • a p-series ___ if p ≤ 1 • a p-series ___ if p > 1 • ∫||v(t)||dt (parametric) • a series with a common ratio • the lowest point of a function • the highest point of a function • the process of finding a derivative • f' changes from positive to negative • ...
Alg. T5 - Evaluate Piecewise Functions 2024-03-18
Across
- Find g(x), where g(x) is the translation 8 units left of f(x)=|x|.
- What are the Domain and Range of this function? y=|x+3|
- What are the Domain and Range of this function? y=|x|-2
- Find f(2): f(x)={if x=<0: -7x-1 }{ if x>0: 7x+5}
- Find g(x), where g(x) is the reflection across the x-axis of f(x)=|x|.
- what is the range of this function? y=|x+2|+1
- Find f(0): f(x)={if x=<1: x+4}{if x>1: 3x}
- Find f(7): f(x)={if x=<10: 9x+1}{if x>10: 2x-11}
Down
- Find g(x), where g(x) is the reflection across the y-axis of f(x)=|x|.
- Find g(x), where g(x) is the translation 4 units left of f(x)=|x|.
- What are the Domain and Range of this function? y=3|x|
- what is the range of this function? y=|x+2|+1
- What are the Domain and Range of this function? y=|x|-4
- Find f(8): f(x)={if x=<9: -x+12}{if x>9: 3x+15}
14 Clues: Find f(0): f(x)={if x=<1: x+4}{if x>1: 3x} • what is the range of this function? y=|x+2|+1 • what is the range of this function? y=|x+2|+1 • Find f(8): f(x)={if x=<9: -x+12}{if x>9: 3x+15} • Find f(2): f(x)={if x=<0: -7x-1 }{ if x>0: 7x+5} • Find f(7): f(x)={if x=<10: 9x+1}{if x>10: 2x-11} • What are the Domain and Range of this function? y=3|x| • ...
Matematik - 2G 2021-03-15
Across
- Den modsatte funktion til eksponentialfunktionen
- Andet ordet for limit
- Produktet af to faktorer der giver nul
- Når en ekspoentiel funktion øger sin funktionsværdi med en faktor 2
- Kan bruges til at bestemme antal rødder i en andengradsfunktion
- Navnet på ekstrema for en parabel
- f(x)=-3x^2-3x+90
- Der hvor to linjer mødes og krydser hinanden
- Pr hundredele
Down
- Hældningskoefficienten for denne funktion f(x)=12x-25
- Kvadratroden af 36
- Approximation af en linje gennem flere punkter
- Antallet af løsninger til ligningen 1/4x^2+x+1=0
- 2x-4=-4x+8
- Løsning til 3(x-5)(x+1)=0
- antal rødder i et 4. gradspolynimie
- Analyse af funktionens ekstrema og vækst
- Indeksværdi ved Basisåret
- Antal nulpunkter, når d>0
- Andengradsfunktion hvor a er positiv
- Skæring med yaksen, når f(x)=3x+17
21 Clues: 2x-4=-4x+8 • Pr hundredele • f(x)=-3x^2-3x+90 • Kvadratroden af 36 • Andet ordet for limit • Indeksværdi ved Basisåret • Antal nulpunkter, når d>0 • Løsning til 3(x-5)(x+1)=0 • Navnet på ekstrema for en parabel • Skæring med yaksen, når f(x)=3x+17 • antal rødder i et 4. gradspolynimie • Andengradsfunktion hvor a er positiv • Produktet af to faktorer der giver nul • ...
Mathematics 2017-12-07
Across
- FΔt
- A function f is ______ if f(x) = f(−x) for all x in the domain
- (a + b) + c = a + (b + c)
- Mass of the object times its velocity
- ∀a,â∈A, a≠â then f(a)≠f(â)
- a1 = 1a = a
- a⋅b=│a││b│cosθ
- A function f is _______ with period X if f(x) = f(x + X) for all x in the domain
- F= -kΔx
- λ(a + b) = λa + λb
Down
- The energy an object has due to its motion
- ∀b∈B, Ǝa∈A:f(a)=b
- │a+b│≤│a│+│b│
- Every action has an equal and opposite reaction
- A numerical property of a population is called a _______
- F=(mv^2)/r
- 'Assume result is true for an arbitrary value n = k.'
- If y0(x0) = 0 and y''(x0) < 0, then y(x) has a local _______ at x0.
- A numerical property of a sample is called a _______
- As n→∞ 1/n _______ to 0
20 Clues: FΔt • F= -kΔx • F=(mv^2)/r • a1 = 1a = a • │a+b│≤│a│+│b│ • a⋅b=│a││b│cosθ • ∀b∈B, Ǝa∈A:f(a)=b • λ(a + b) = λa + λb • As n→∞ 1/n _______ to 0 • (a + b) + c = a + (b + c) • ∀a,â∈A, a≠â then f(a)≠f(â) • Mass of the object times its velocity • The energy an object has due to its motion • Every action has an equal and opposite reaction • A numerical property of a sample is called a _______ • ...
Grafik Fungsi Trigonometri 2023-06-01
Across
- f(x)=A cos K (x±α)+C. Huruf A dalam fungsi kosinus tersebut merupakan...
- f(x)=6sin(8x-64°)-5. Tentukan periodenya!
- Untuk fungsi tangan periodenya adalah T=...°/k atau T=2/k
- f(x)=7cos 6x+3.Tentukan nilai maksimumnya!
- Nilai terendah yang bisa dicapai oleh suatu fungsi trigonometri adalah nilai...
- Nilai tertinggi yang bisa dicapai oleh suatu fungsi trigonometri adalah nilai...
- Tentukan nilai minimum dari f(x)=7sin2x+4
- f(x)=3sin (7x-14°)-4. Tentukan nilai minimumnya!
Down
- f(x)=3cos(4x-16°)-4. Tentukan periodenya!
- Nilai maksimum dari f(x)=9sin3x+3 adalah...
- Rentangan pengulangan bentuk grafik adalah...
- Tentukan Hp dari Tan x=√3, dengan syarat 180°≤x<360°
- Untuk fungsi sinus dan kosinus periodenya adalah T=...°/k atau T=2π/k
- f(x)=6 cos 2x +1. Tentukan nilai minimumnya!
- Periode dari f(x)=5cos(6x-36°)adalah...
- f(x)=2sin3x+3. Tentukan nilai minimumnya!
- f(x)=9sin 3x+3. Tentukan amplitudonya!
- Periode dari f(x)=2sin(3x-30°) adalah...
- f(x)=y=A Sin K (x±α)+ C merupakan bentuk fungsi...
- Tentukan nilai maksimum dari f(x)=2sin3x+4
20 Clues: f(x)=9sin 3x+3. Tentukan amplitudonya! • Periode dari f(x)=5cos(6x-36°)adalah... • Periode dari f(x)=2sin(3x-30°) adalah... • f(x)=3cos(4x-16°)-4. Tentukan periodenya! • f(x)=6sin(8x-64°)-5. Tentukan periodenya! • f(x)=2sin3x+3. Tentukan nilai minimumnya! • Tentukan nilai minimum dari f(x)=7sin2x+4 • f(x)=7cos 6x+3.Tentukan nilai maksimumnya! • ...
Precalculus Crossword 2021-10-18
Midterm Project 2021-01-26
Across
- Ex. (x-1) (2x^3-3x^2)
- blank a polynomial by a monomial
- with base 'e'
- X^-a = 1/X^a 0r 1/X^-a =X^a
- logb X/Y = logbX-logbY
- b^10gbx = X
- pie (3.1415)
- log bX^r = rlogbX
- An expression consisting of variables and coefficients
- X^o = 1
- logb^XY=logbX+logbY
- 0,1,2,3,4,5
- A polynomial with exactly one term
- 3/5, 1.375, 21.6
- f ( x ) = a x
- Ex. 4logb^m - logbN
Down
- an equation that has a variable in the exponent
- Ex. log5X^2/bc
- Ex. F(x)=4x^3-x^2+5
- Determines whether a function is one-to-one. has inverse
- a does not =0 and b does not =0
- (X/Y)^a = X^a/Y^a
- a function that "reverses" another function
- with base 10
- 1,2,3,4,5,5
- -1,-2,-3
- X^a/X^b = X^a-b
- Ex. F(x)=x^2 G(x)=x+3
- Show a relationship between two values
- Is a relation where each input has only one
30 Clues: X^o = 1 • -1,-2,-3 • b^10gbx = X • 1,2,3,4,5,5 • 0,1,2,3,4,5 • pie (3.1415) • with base 10 • with base 'e' • f ( x ) = a x • Ex. log5X^2/bc • X^a/X^b = X^a-b • 3/5, 1.375, 21.6 • log bX^r = rlogbX • (X/Y)^a = X^a/Y^a • Ex. F(x)=4x^3-x^2+5 • logb^XY=logbX+logbY • Ex. 4logb^m - logbN • Ex. (x-1) (2x^3-3x^2) • logb X/Y = logbX-logbY • Ex. F(x)=x^2 G(x)=x+3 • X^-a = 1/X^a 0r 1/X^-a =X^a • ...
Latin Catiline 9 2018-06-11
Across
- carēre, caruī - to be without
- necis, f. - murder
- -ōnis, f. - plundering
- valēre, valui, valitum - to be able, to succeed
- -ōnis, f. - trial, court
- odisse - to hate
Down
- ratiōnis, f. - way, manner
- -a, -um - hostile, dangerous
- (1) - to decide, judge
- malle, maluī - to prefer
- (1) - to soothe, appease
- verērī, veritus sum - to fear
12 Clues: odisse - to hate • necis, f. - murder • (1) - to decide, judge • -ōnis, f. - plundering • malle, maluī - to prefer • (1) - to soothe, appease • -ōnis, f. - trial, court • ratiōnis, f. - way, manner • -a, -um - hostile, dangerous • carēre, caruī - to be without • verērī, veritus sum - to fear • valēre, valui, valitum - to be able, to succeed
IPA 2023-12-06
Across
- Beta digunakan untuk menghitung muai
- Isi termometer bersifat mahal
- lurus beraturan
- Kepanjangan F
- kuat arus
- Kepanjangan °F
- Kepanjangan R
- Kepanjangan °C
- ilmu tentang tumbuhan
- Satuan gaya SI
- ilmu tentang zat dan sifatnya
- F....= -F reaksi
- Nama lain Hukum 1 Newton
Down
- ...= Gaya ÷ akselerasi
- Gerak semu dan gerak
- Besar perpindahan setiap satuan waktu
- titik tetap bawah 273
- Syarat benda gerak
- Sigma adalah
- ilmu tentang gerak benda
- gesek benda gerak
- satuan waktu
- Kepanjangan v
- panas dingin suatu benda
- Mr... Newton
25 Clues: kuat arus • Sigma adalah • satuan waktu • Mr... Newton • Kepanjangan F • Kepanjangan v • Kepanjangan R • Kepanjangan °F • Kepanjangan °C • Satuan gaya SI • lurus beraturan • F....= -F reaksi • gesek benda gerak • Syarat benda gerak • Gerak semu dan gerak • titik tetap bawah 273 • ilmu tentang tumbuhan • ...= Gaya ÷ akselerasi • ilmu tentang gerak benda • panas dingin suatu benda • Nama lain Hukum 1 Newton • ...
Calculus! 2013-06-01
Across
- When deriving 2 functions, use the ________ rule
- After integrating..
- Derivative of cosx
- (f(x)-f(a))/(x-a)
- The slope of a tangent line to a curve
- Integral of sinx
- Integral of (x^2+2) with upper limit 3 and lower limit 1
- A ______ to a curve is a line which is perpendicular to the tanget at the point of contact
- Derivative of sinx
- An integral expressed as the difference between values of the integral with a specific upper and lower limit is ______
- Derivative of f(x) over f(x)
- Integral of 1 over cos^2 x
Down
- When deriving 2 functions with a denominator use the ________ rule
- The integral is the _______ under the curve
- The process of finding the derivative
- The quotient rule is (lodihi-hidilo) over _______
- When deriving a function with a power ex.(9x^2-15x+6)^3 use the ________ rule
- To derive x^3+x^2+x^-6 you would use the ______ rule
- antiderivative of cosx
- Derivative of 1/x
- The derivative of the first derivative is the _______ derivative
21 Clues: Integral of sinx • (f(x)-f(a))/(x-a) • Derivative of 1/x • Derivative of cosx • Derivative of sinx • After integrating.. • antiderivative of cosx • Integral of 1 over cos^2 x • Derivative of f(x) over f(x) • The process of finding the derivative • The slope of a tangent line to a curve • The integral is the _______ under the curve • When deriving 2 functions, use the ________ rule • ...
Cool Calculus Crossword 2023-05-16
Across
- when f'(x) is negative then f(x) is
- a function that is continuous on [a,b] has both an absolute minimum and an absolute maximum
- when f'(x) goes from + to -
- f''(x) > 0 then f(x) is
- d/dx f(g(x)) = g'(x)*f'(g(x))
- if f is continuous, there is a y-value k with f(a) < k < f(b) with an x-value c such that a < c < b
- f(x)/g(x)= (f'(x)g(x) - g'(x)f(x))/ [g(x)]²
- when f'(x) is positive then f(x) is
- right Riemann sum is an ____ when function is increasing
- integral of 1/x
- who is the best math teacher?
- integral of sinx
- derivative of a constant
Down
- absolute value of velocity
- V = π∫r² dx
- what rule can you use if the limit goes to 0/0 when value is plugged in?
- if a function is differentiable then it is also _____
- instantaneous rate of change/slope of a tangent line
- d/dx secx
- f(x)g(x)= f'(x)g(x)+g'(x)f(x)
- derivative of cosx
- derivative of velocity
- integrating chain rule
- integral of velocity
- if velocity and acceleration have the same sign
- V= π∫(R²-r²) dx
26 Clues: d/dx secx • V = π∫r² dx • integral of 1/x • V= π∫(R²-r²) dx • integral of sinx • derivative of cosx • integral of velocity • derivative of velocity • integrating chain rule • f''(x) > 0 then f(x) is • derivative of a constant • absolute value of velocity • when f'(x) goes from + to - • f(x)g(x)= f'(x)g(x)+g'(x)f(x) • d/dx f(g(x)) = g'(x)*f'(g(x)) • who is the best math teacher? • ...
Functions Unit 2 Crossword 2016-10-19
Across
- The domain of an original function is the range of the _______________
- To be a ________, the x-coordinate must never repeat with a different y-coordinate
- Another word to decribe y=f(x) being horizontally or vertically shifted
- ______________s are the simplest and base functions of a family of functions
- f(x) = 1/x is an example of a __________________
- An _____ is created after a transformation
- A vertical line that a curve approaches, but never touches or crosses
- Translations, reflections, and dilations are all examples of a ______________
Down
- f(x)=x is an example of a ______________
- The graph of y=f(1/2x) is an example of a horizontal ___________
- The point where a graph and its transformed graph intersect at y=x
- A ________ is a set of ordered pairs
- f(x)=√x is an example of a __________________
- y=f(x) is an example of ________________
- A diagram representation that can be used when the relation is given a set of ordered pairs
- y=f(-x) is a horizontal __________ of y=f(x)
- A horizontal line that a curve approaches, but never touches or crosses
- With y=af(k(x-d))+c, the a value and k value determine the vertical and horizontal ________
- The graph of y=2f(x) is a vertical _______ of the graph y=f(x)
- A set of allowed values of y (dependent variables)
- A set of allowed values of x (independent variables)
21 Clues: A ________ is a set of ordered pairs • f(x)=x is an example of a ______________ • y=f(x) is an example of ________________ • An _____ is created after a transformation • y=f(-x) is a horizontal __________ of y=f(x) • f(x)=√x is an example of a __________________ • f(x) = 1/x is an example of a __________________ • A set of allowed values of y (dependent variables) • ...
Intervals, key signatures & scales 2013-12-01
Across
- The circle of fifths starting from F.
- A minor key with 1 (#) accidental - F#.
- The interval between F and A.
- A major key with 4 (#) accidentals - F# C# G# D#.
- The interval between E and Bb.
- The interval between B and A#.
- The circle of fifths starting from F backwards.
- A minor key with 1 (b) accidental - Bb.
- A minor scale with a raised 6th and 7th.
- The name of an interval smaller than an octave.
- The distance between two pitches.
- A major key with 5 (#) accidentals - F# C# G# D# A#.
Down
- A minor key with 2 (#) accidentals - F# C#.
- The interval between Bb and G.
- The name of an interval larger than an octave.
- The interval between A and E.
- The interval between C and D.
- A major key with 4 (b) accidentals - Bb Eb Ab Db.
- A scale built off of the 6th note of a major scale.
- A minor key with 3 (b) accidentals - Bb Eb Ab.
- The interval between D and G.
- A minor scale with a raised 7th.
- A major key with 5 (b) accidentals - Bb Eb Ab Db Gb.
- A minor key with 2 (b) accidentals - Bb Eb.
- A minor key with no accidentals.
- A major key with 3 (#) accidentals - F# C# G#.
26 Clues: The interval between A and E. • The interval between C and D. • The interval between F and A. • The interval between D and G. • The interval between Bb and G. • The interval between E and Bb. • The interval between B and A#. • A minor scale with a raised 7th. • A minor key with no accidentals. • The distance between two pitches. • The circle of fifths starting from F. • ...
AB Calculus Terms 2022-05-12
Across
- f'(x)< 0
- Means to take the integral
- Means to take the derivative of a function at a specific point
- Means you can take the derivative of something
- |v(t)|
- a(t), v'(t), x"(t)
- f'(x)= undefined
- v(t), x'(t)
- d^2y/dx^2
- Means area under the curve
- old slope formula using old equation
- Means opposite reciprocal slopes
Down
- f"(x)< 0
- Represents rate of change of an equation at any given point
- Set f'(x)=0
- Where function intersects x axis or set f'(x)=0
- Can draw a function without picking up your pencil
- 1/b-a * ∫f(x)dx
- ∫|v(t)|dt
- f'(x)> 0
- f'(x)= f(b)-f(a)/b-a
- Means sides do not intersect
- Represents where an object is at during a certain period of time
- All maximums/minimums
- Another word for derivative
- Value that a function approaches. Means approaching or closeness.
- f"(x)> 0
- Rule used anytime you have a limit problem in indeterminate form.
28 Clues: |v(t)| • f'(x)< 0 • f"(x)< 0 • f'(x)> 0 • f"(x)> 0 • ∫|v(t)|dt • d^2y/dx^2 • Set f'(x)=0 • v(t), x'(t) • 1/b-a * ∫f(x)dx • f'(x)= undefined • a(t), v'(t), x"(t) • f'(x)= f(b)-f(a)/b-a • All maximums/minimums • Means to take the integral • Means area under the curve • Another word for derivative • Means sides do not intersect • Means opposite reciprocal slopes • old slope formula using old equation • ...
TILANG DIGITAL VIER 2023-02-14
Across
- carilah jumlah dari polinomial { P(x)=4x^{2}-5x+1} dan { Q(x)=3x^{2}-8x-9}
- limit x mendekati 4 (x^-21)
- turunan pertama dari fungsi f(x) = x3 – 2x2 + 3x
- limit x mendekati 5 dari 3x-7
- Terdapat dua buah suku banyak f(x) = x^3 – x dan g(x) = x^2 + 2x = 1. Maka tentukan f(x) – g(x) dan derajatnya.
- turunan pertama dari fungsi f(x) = (3x + 2)(2x + 5)
- limit x mendekati 3 dari 5(x^2+2x)
Down
- fungsi polinomial 2x-4 dijumlahkan dengan 3x^2+5x-6
- Carilah hasil pengurangan dari polinomial,P(x)=5x^{3}+x^{2}+9} dan Q(x)=4x^{2}+7x-3}
- integral 4x^3
- turunan pertama dari fungsi f(x) = (x2 + 3x + 4)(2x + 3).
- turunan pertama pada fungsi f(x) = x³ – 5x² + 7x
- integral 4x
- limit x mendekati 3 dari (x^2-12)
- Integral 2x
- integral 3x^2
16 Clues: integral 4x • Integral 2x • integral 4x^3 • integral 3x^2 • limit x mendekati 4 (x^-21) • limit x mendekati 5 dari 3x-7 • limit x mendekati 3 dari (x^2-12) • limit x mendekati 3 dari 5(x^2+2x) • turunan pertama dari fungsi f(x) = x3 – 2x2 + 3x • turunan pertama pada fungsi f(x) = x³ – 5x² + 7x • fungsi polinomial 2x-4 dijumlahkan dengan 3x^2+5x-6 • ...
Chapter 1 Functions 2022-09-28
Across
- set of second coordinates
- number of times an identity function touches the xy plane
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- a graph is one-to-one if and only if it touches the graph once
- f-1
- set of ordered pairs
- represents a straight line on the coordinate plane
- a graph is a function if and only if it touches the graph once
- f(-x) = f(x)
- parabola
Down
- f(x) = 9
- (0,0)
- 𝑓(𝑥)=|𝑥|
- element of the domain corresponds to exactly one element of the range
- a function which returns the same value, which was used as its argument.
- set of first coordinates
- 2 functions are inverses of each other if they manifest this property
- no two elements in the domain of f correspond to the same element in the range of f
- f(-x) = -f(x)
- compound function
20 Clues: f-1 • (0,0) • f(x) = 9 • 𝑓(𝑥)=|𝑥| • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is one-to-one if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- set of first coordinates
- set of ordered pairs
- (0,0)
- 𝑓(𝑥)=|𝑥|
- no two elements in the domain of f correspond to the same element in the range of f
- a function which returns the same value, which was used as its argument.
- 2 functions are inverses of each other if they manifest this property
- represents a straight line on the coordinate plane
Down
- a graph is one-to-one if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- number of times an identity function touches the xy plane
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- a graph is a function if and only if it touches the graph once
- compound function
- f(-x) = -f(x)
- set of second coordinates
- parabola
- f(-x) = f(x)
- f-1
20 Clues: f-1 • (0,0) • f(x) = 9 • 𝑓(𝑥)=|𝑥| • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is one-to-one if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- (0,0)
- no two elements in the domain of f
- one element of the range
- a graph is a function if and only if it
- f(-x) = -f(x)
- compound function
- element of the domain corresponds to
- manifest this property
- set of ordered pairs
- the graph once
- of f
- represents a straight line on the
- number of times an identity function
- is in the domain of f.
Down
- a graph is one-to-one if and only if it
- was used as its argument.
- parabola
- to the same element in the
- 𝑓(𝑥)=|𝑥|
- plane
- the xy plane
- the domain this function is the set of
- a function which returns the same value,
- f(x) = 9
- set of first coordinates
- the graph once
- 2 functions are inverses of each other if
- f-1
- f(-x) = f(x)
- x such that x in the domain of g and
- set of second coordinates
31 Clues: f-1 • of f • (0,0) • plane • parabola • 𝑓(𝑥)=|𝑥| • f(x) = 9 • the xy plane • f(-x) = f(x) • f(-x) = -f(x) • the graph once • the graph once • compound function • set of ordered pairs • manifest this property • is in the domain of f. • one element of the range • set of first coordinates • was used as its argument. • set of second coordinates • to the same element in the • represents a straight line on the • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- (0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • (0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- I(0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • I(0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Teka Teki Silang 2023-02-14
Across
- ∫ x+2 dx?
- f(x)=6x^2, turunannya adalah?
- f(x) = 10x, turunannya adalah?
- f(x) = 2x^3+x^2-13x+a, habis dibagi (x-2) nihai a adalah?
- tentukan urethan pertama dari fungai f(x)=(x^2+3x+4)(2x+3)
Down
- ∫ x^2+2x+1 dx?
- f(x)x^2.ax+9, dimana x-1 adalah faktornya. tentukan nilai a
- Diketahui sebuah produk minuman diproduksi pada tanggal 15 mei 2013, lama barang kelayakan minuman tersebut adalah 1 tahin 6 bulan 10 hari paling maximal. maka tahun berapakah batas akhir minuman tersebut dapat di konsumsi?
- f(x)=x^3-2x^2-4x-3 di bagi (x-3)maka sisanya adalah
- x^2-5x?+4 daru p(x)= 2x^4+bx^2+34x-24. tentukan nilai a.b
- ∫ 2x+4 dx?
- lim (x^2 + 2x -1) x=4
- ∫ 1 dx?
- nilai lim (2/x-2 - 8/x^2-4) x-2 adalah?
14 Clues: ∫ 1 dx? • ∫ x+2 dx? • ∫ 2x+4 dx? • ∫ x^2+2x+1 dx? • lim (x^2 + 2x -1) x=4 • f(x)=6x^2, turunannya adalah? • f(x) = 10x, turunannya adalah? • nilai lim (2/x-2 - 8/x^2-4) x-2 adalah? • f(x)=x^3-2x^2-4x-3 di bagi (x-3)maka sisanya adalah • f(x) = 2x^3+x^2-13x+a, habis dibagi (x-2) nihai a adalah? • x^2-5x?+4 daru p(x)= 2x^4+bx^2+34x-24. tentukan nilai a.b • ...
Calculus Crossword 2014-10-16
Across
- What is lim(6) as x approaches zero?
- What is horizontal asymptote(only the value) of (4x^3-32)/(x^3)?
- lim(c)=c as x approaches a is an example of what limit law?
- F(x)= x^2 makes what kind of graph?
- What is a gap in a function's continuity without a significant change in the y value and another y value at the x value where the hole occurs?
- When a curve is concave down, the tangent line lies where on the curve?
- What type of discontinuity is a significant change in the y value for a small change in the x value?
- What lim(1/(x^6) as x approaches infinity?
- At what kind of point does a tangent not exist?
- The slope of a tangent line is the same as the ...
- What kind of limit is it when limf(x) as x approaches a-?
- What is limit(2z+6) as x approaches 5?
- F^1(x) is the ...
- How many points does a secant line go through on a graph?
Down
- f(x)=x^3 is what kind of function?
- What type of discontinuity occurs when there is an asymptote?
- The average of 2 slopes is the same as the...
- F(x)=(x^2-1)/(x-1) is an example of what type of discontinuity?
- Rate of change is another way of saying...
- What kind of limit is it when limf(x) as x approaches a+?
- How many points does a tangent line go through on a graph?
- What limit law could be used to simplify this equation: Lim[f(x)+g(x)] as x approaches a?
- Average velocities are the slopes of what type of lines?
- If f(c)exists, limf(x) as x approaches c exists and if limf(x) as x approaches c equals f(c) then the function is...
- Instantaneous velocity is could be found by the slope of the...
- lim(1/x) as x approaches zero equals?
- When a curve is concave up, the tangent lies where on the curve?
27 Clues: F^1(x) is the ... • f(x)=x^3 is what kind of function? • F(x)= x^2 makes what kind of graph? • What is lim(6) as x approaches zero? • lim(1/x) as x approaches zero equals? • What is limit(2z+6) as x approaches 5? • Rate of change is another way of saying... • What lim(1/(x^6) as x approaches infinity? • The average of 2 slopes is the same as the... • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- I(0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • I(0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- (0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • (0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- I(0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • I(0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- (0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • (0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Chapter 1 Long Test 2022-09-28
Across
- 2 functions are inverses of each other if they manifest this property
- f(x) = 9
- the domain this function is the set of all x such that x in the domain of g and g(x) is in the domain of f.
- parabola
- f(-x) = f(x)
- a graph is one-to-one if and only if it touches the graph once
- set of first coordinates
- compound function
Down
- 𝑓(𝑥)=|𝑥|
- set of second coordinates
- no two elements in the domain of f correspond to the same element in the range of f
- a graph is a function if and only if it touches the graph once
- element of the domain corresponds to exactly one element of the range
- set of ordered pairs
- represents a straight line on the coordinate plane
- (0,0)
- f-1
- a function which returns the same value, which was used as its argument.
- f(-x) = -f(x)
- number of times an identity function touches the xy plane
20 Clues: f-1 • (0,0) • 𝑓(𝑥)=|𝑥| • f(x) = 9 • parabola • f(-x) = f(x) • f(-x) = -f(x) • compound function • set of ordered pairs • set of first coordinates • set of second coordinates • represents a straight line on the coordinate plane • number of times an identity function touches the xy plane • a graph is a function if and only if it touches the graph once • ...
Turunan Trigonometri 2022-10-17
Across
- Y = sin x + 5 cos x, y’ adalah
- Turunan dari sin 3x
- Tentukan turunan dari f(x) = 2x + cos x
- Turunan dari 2 csc x
- Turunan dari f(x)= -4 cos x adalah
- Jika f(x) = 2 sec 3x, maka f’(x) =
Down
- Turunan dari sin 3x2 adalah
- Turunan f(x) = 3 cos x
- y = 3 sin 3x , y’ adalah
- Turunan dari y = cos2 x
- Y = sin2x, y’=
- Turunan dari 3 sin x – 2 cos x
- Dx ( – 2 cos 5x)
- Turunan dari y= x- tan x + 3 adalah
- Jika f(x) = sin x cos x, maka f’(x) =
- f’(x) = sec2x , nilai f(x) adalah
16 Clues: Y = sin2x, y’= • Dx ( – 2 cos 5x) • Turunan dari sin 3x • Turunan dari 2 csc x • Turunan f(x) = 3 cos x • Turunan dari y = cos2 x • y = 3 sin 3x , y’ adalah • Turunan dari sin 3x2 adalah • Y = sin x + 5 cos x, y’ adalah • Turunan dari 3 sin x – 2 cos x • f’(x) = sec2x , nilai f(x) adalah • Turunan dari f(x)= -4 cos x adalah • Jika f(x) = 2 sec 3x, maka f’(x) = • ...
fungsi grafik trigonometri dan identitas trigonometri 2023-06-05
Across
- nilai maksimum dari f(x)=1/5 sin (5x-x/6) adalah
- nilai minimum yang dapat di capai oleh fungsi f(x) =-2 cos x + 1 adalah...
- nilai maksimum dari fungsi y = 2 sin (x+60°)+1 adalah...
- nilai maksimum dan nilai dari fungsi y=-3 sin (2x-6x)-5 adalah...
- sifat grafik y=Tan x tidak mempunyai nilai...
- periode fungsi y=-2 cos 2x adalah...
- grafik f(x)=2 cos x memotong sumbu x dititik berkoordinat...
- nilai maksimum dri f (x)=cos (8x-x/8)-2/3 adalah...
- dalam grafik fungsi sinus,k adalah...
Down
- menggambar fungsi grafik trigonometri menggunakan tabel digambar pada bidang...
- jarak terjadinya pengulangan/gelombang memiliki periode satu putaran...
- nilai minimum dari fungsi 4=-3 cos 2 (x+30°) adalah...
- suatu fungsi grafiknya berulang secara terus menerus dalam periode tertentu disebut fungsi...
- nilai maksimum dari fungsi y = -2 cos 3/2 x adalah...
- nilai minimum dari fungsi f(x)=2sin (x-x\3)+1 adalah...
- nilai maksimum dri fungsi y=-2 cos 3/2 adalah...
- suatu garis lurus yang akan di dekati oleh kurva namun tidak akan berpotongan antara garis dan kurva tersebut...
- diketahui f(x)= cos (2x-30°). nilai yang benar untuk x = 195°
- garis x 90° dan x 270° pada grafik fungsi y=Tan x disebut...
- rentang pengulangan grafik disebut...
20 Clues: periode fungsi y=-2 cos 2x adalah... • rentang pengulangan grafik disebut... • dalam grafik fungsi sinus,k adalah... • sifat grafik y=Tan x tidak mempunyai nilai... • nilai maksimum dari f(x)=1/5 sin (5x-x/6) adalah • nilai maksimum dri fungsi y=-2 cos 3/2 adalah... • nilai maksimum dri f (x)=cos (8x-x/8)-2/3 adalah... • ...
Cruzada das Funções 2021-05-03
Across
- - Função de 1° grau, sendo f: RR, definida como f(x)= ax+b, sendo a e b números reais.
- - Função onde o coeficiente a é diferente de zero e maior que um. Notação : f(x)= + ax + b.
- – Tem origem na função do 1° grau, sendo f: RR, definida como f(x)= a.x, onde a um número e diferente de zero.
- – Função onde f(-x)= f(x), qualquer que seja o valor de x E D(f).
- – Nessa função o contradomínio é igual a imagem. Em notação: f: A -> B.
- - É um tipo de função que combina duas ou mais variáveis. Notação : fog(x) = f(g(x)) ; gof(x) = g(f(x)).
- - Função que a variável está no expoente e cuja base é sempre maior que zero e diferente de um. Exemplo: f(x)= aX
- - É chamada também de função do 2° grau e apresenta notação: f(x)= ax^2 + bx +c.
- - Função onde f(-x)= - f(x), qualquer que seja o valor de x E D(f).
Down
- - é o conjunto lm formado pelos elementos y € B, de forma que exite x € A, tal que o par ordenado (x, y) € f
- - O coeficiente a da função do primeiro grau (f(x) = ax +b) é sempre negativo. Notação : f(x)= - ax + b.
- - função que apresenta elementos distintos do domínio se tiverem imagens distintas. Ex: f: A→B, tal que f(x) = 3x
- - Função com base a, sendo a real, positivo. Exemplo: f(x)= logax
- - Os conjuntos apresentam o mesmo número de elementos relacionados.Sendo uma função sobrejetora e injetora ao mesmo tempo.
- - Função que associa elementos de um conjunto em módulos, Exemplo: f(x) = |x|
15 Clues: - Função com base a, sendo a real, positivo. Exemplo: f(x)= logax • – Função onde f(-x)= f(x), qualquer que seja o valor de x E D(f). • - Função onde f(-x)= - f(x), qualquer que seja o valor de x E D(f). • – Nessa função o contradomínio é igual a imagem. Em notação: f: A -> B. • - Função que associa elementos de um conjunto em módulos, Exemplo: f(x) = |x| • ...
A Preponderance of Pre-Calculus 2013-05-06
Across
- Line about which a parabola is symmetric
- Set of all Y values
- f(x)=f(-x) and the graph is symmetric with respect to the y-axis
- (f(x+h)-f(x))/h
- The logarithmic function with base 10
- Set of all X values
Down
- The number a + bi, where a is the real part and bi is called the imaginary part
- An arrangement of objects where order matters
- f(x) = ln x
- Angles that have the same initial and terminal sides
- An angle formed by the terminal side of an angle and the x axis
- (a+bi) and (a-bi)
- A shortcut for long division of polynomials when dividing by divisors of the form x - k.
- A subset of a set of n elements in which the order is not important
- -f(x)=f(-x)
- A circle of radius 1 centered at the origin and given by the equation x^2 + y^2 = 1
16 Clues: f(x) = ln x • -f(x)=f(-x) • (f(x+h)-f(x))/h • (a+bi) and (a-bi) • Set of all Y values • Set of all X values • The logarithmic function with base 10 • Line about which a parabola is symmetric • An arrangement of objects where order matters • Angles that have the same initial and terminal sides • An angle formed by the terminal side of an angle and the x axis • ...
IPA 2023-12-04
Across
- Kepanjangan v
- Mr. ... Newton
- kuat arus
- Ilmu tentang obat obatan
- F...=-F reaksi
- Nama lain Hukum 1 Newton
- Satuan gaya SI
- Gerak semu dan gerak..
- Syarat benda gerak :perpindahan
- Kepanjangan R
- Kepanjangan s adalah
- Beta digunakan untuk menghitung muai
- Sigma adalah
Down
- Kepanjangan °C
- Isi termometer bersifat mahal
- gesek benda diam
- ilmu tentang gerak benda
- titik tetap bawah 273, titik tetap atas 373
- Kepanjangan °F
- Besar perpindahan setiap satuan waktu
- ... Lurus beraturan
- Nama gesek benda gerak
- Kepanjangan F
- ... =Gaya ÷ akselerasi
- panas dingin suatu benda
25 Clues: kuat arus • Sigma adalah • Kepanjangan v • Kepanjangan F • Kepanjangan R • Kepanjangan °C • Mr. ... Newton • Kepanjangan °F • F...=-F reaksi • Satuan gaya SI • gesek benda diam • ... Lurus beraturan • Kepanjangan s adalah • Nama gesek benda gerak • Gerak semu dan gerak.. • ... =Gaya ÷ akselerasi • ilmu tentang gerak benda • Ilmu tentang obat obatan • Nama lain Hukum 1 Newton • panas dingin suatu benda • ...
MTK RUWET 2023-10-03
Across
- Tinggi badan Ferdy 168cm dan dia tepat menghadap sebuah bola dengan jarak 10m. Berapakah jarak ujung kepala Ferdy dengan bola?
- f(x) = 5x kuadrat + 11x + 2, g(x) = x, tentukan nilai x dari komposisi (f o g)(x) nya!
- Tentukan nilai x dari persamaan log 100 = 2x
- Jika ²⁵log5²x = 8, maka x =
- Diketahui f(x+3/2) = x² + 5x + 5, f(2) =
- Diketahui fungsi F(x) = 3x + 1 g(x) = 4x + 1/2 h(x) = 2x + 5 Tentukan nilai dari komposisi fungsi ((f‐¹ o g‐¹) o h)(3) – ⅓!
- Nilai logaritma dari 8log32 adalah
- Jika f:R -> R dengan f(x) = x+2/4 maka nilai dari f inverst (2) ....
- Suatu pabrik mie berbahan dasar tepung memproduksi mie melalui 2 tahap. Tahap pertama dengan menggunakan mesin 1 yang berbahan dasar tepung dan menghasilkan adonan tepung. Selanjutnya tahap kedua menggunakan mesin 2 yang menghasilkan mie. Produksi mesin 1 menghasilkan bahan adonan tepung melalui fungsi f(x) = 5x + 4 dan mesin 2 mengikuti fungsi g(x) = 3x - 5 dengan banyaknya bahan dasar tepung dalam satuan ton. Jika bahan tepung yang tersedia adalah 2 ton, berapa banyak mie yang akan dihasilkan (satuan ton)?
Down
- Hasil dari 4 log 8 + 4 log 32 adalah
- Diketahui fungsi F(x)= x + 5g(x)= 3x + 4 /2 h(x)= 2x Maka hasil dari komposisi Fungsi (f‐¹ o g o h) (3) adalah
- f = {(0,3),(7,0),(1,9),(2,4)} g = {(3,7),(0,1),(4,0),(9,2)} Maka (fog)(0) adalah
- Pada pukul 08.00 pagi massa suatu zat radioaktif adalah 0,2 kg. Apabila diketahui laju peluruhan zat radioaktif tersebut 10% setiap jam, sisa zat radioaktif itu pada pukul 14.00 siang dalam gram adalah
- Diketahui suatu barisan aritmetika, suku ke-3 = 9, suku ke-6 = 18. R suku ke-n adalah
- Tentukan nilai dari suku ke 35 yang ada pada barisan deret aritmatika ini 2,4,6,8,…
- Himpunan penyelesaian 25𝑥+2 = 53𝑥−4 adalah
- Diketahui fungsi F=(x²+8x-2) g=(x+4) h=(x-2) Maka hasil dari komposisi fungsi (fogoh)(-2) adalah..
17 Clues: Jika ²⁵log5²x = 8, maka x = • Nilai logaritma dari 8log32 adalah • Hasil dari 4 log 8 + 4 log 32 adalah • Diketahui f(x+3/2) = x² + 5x + 5, f(2) = • Himpunan penyelesaian 25𝑥+2 = 53𝑥−4 adalah • Tentukan nilai x dari persamaan log 100 = 2x • Jika f:R -> R dengan f(x) = x+2/4 maka nilai dari f inverst (2) .... • ...
Latin Catiline 10 2018-06-11
Across
- -ī, n - chain
- = futurum esse
- moenium, n.pl. - walls, ramparts
- because
- -is, f/m - companion, pal
- diligentis - careful, attentive
- ēgredī, ēgressus sum - to leave
- (1) - to entrust
- sagacis - shrewd
Down
- voluntātis, f. - will, desire
- -ere, animadvertī, animadversum - to notice
- moris, m - custom
- -a, -um - true, justifiable
- (1) - to hesitate
- -āre, increpuī, increpitum - to rattle
- -ere, dēsiī, dēsitum - to cease
- -a, -um - worthy
- carceris, m. - prison
18 Clues: because • -ī, n - chain • = futurum esse • -a, -um - worthy • (1) - to entrust • sagacis - shrewd • moris, m - custom • (1) - to hesitate • carceris, m. - prison • -is, f/m - companion, pal • -a, -um - true, justifiable • voluntātis, f. - will, desire • diligentis - careful, attentive • -ere, dēsiī, dēsitum - to cease • ēgredī, ēgressus sum - to leave • moenium, n.pl. - walls, ramparts • ...
Psalm 89 2020-09-22
27 Clues: Verse 8 M • Verse 3 C • Verse 7 A • Verse 4 E • Verse 9 R • Verse 2 L • Verse 1 F • Verse 5 F • Verse 6 L • Verse 15 B • Verse 18 H • Verse 25 H • Verse 17 G • Verse 12 J • Verse 11 F • Verse 24 F • Verse 16 C • Verse 23 A • Verse 20 S • Verse 21 S • Verse 19 F • Verse 14 R • Verse 13 P • Verse 22 O • Verse 27 F • Verse 10 SA • Verse 25 G,R,S
Getaran dan gelombang (Jesska 8c) 2023-01-30
Across
- waktu untuk 1 gelombang.
- gelombang bergerak yang osilasinya tegak lurus terhadap arah gelombang atau jalur rambat.
- sebuah gelombang yang dalam perambatannya memerlukan medium.
- rumus getaran .
- getaran yang merambat melalui medium, berupa zat padat, cair, dan gas.
- jumlah getaran dalam 1 detik.
- jarak titik seimbang sampai puncak atau dasar gelombang.
- nama lain dari longitudinal.
- suatu gerak bolak-balik di sekitar kesetimbangan.
Down
- Jarak Terjauh dalam Gelombang.
- getaran yang merambat.
- Rumus frekuensi getaran amplitudo.
- bunyi benda yg bergetar dan menghasilkan bunyi.
- Rumus hubungan antara frekuensi dan periode.
- adalah interval nada dari nada satu.
- salah satu jenis gelombang berdasarkan arah getar dan rambatnya.
16 Clues: rumus getaran . • getaran yang merambat. • waktu untuk 1 gelombang. • nama lain dari longitudinal. • jumlah getaran dalam 1 detik. • Jarak Terjauh dalam Gelombang. • Rumus frekuensi getaran amplitudo. • adalah interval nada dari nada satu. • Rumus hubungan antara frekuensi dan periode. • bunyi benda yg bergetar dan menghasilkan bunyi. • ...
Кросворд СЛА 2022-06-15
Across
- відображення, яке є одночасно сюр'єктивним та ін'єктивним.
- Інша назва Гільбертового простору
- Ненульовий вектор для якого виконується співвідношення Av=\lambda*v
- множина чисел, що характеризує лінійний оператор.
- множина векторів, які не утворюють тривіальних лінійних комбінацій рівних нулю (ЯКІ?)
- називається множина всіх елементів виду x∈X, для яких f(x)={0}.
- Інʼєктивний гомоморфізм
- Матриця з компплексними елементами
- Бієктивний гомоморфізм, який є одночасно ін‘єктивним і сюр‘єктивним
- Відображення PL Гільбертового простору H на його підпростір L таке, що є ортогональним
- множина всіх елементів виду f(x)∈Y
Down
- співвідношення між елементами двох множин, в якому двом різним елементам першої множини (області визначення) ніколи не співставляється один і той самий елемент другої множини
- це правило, яке кожному елементу з першої множини — області визначення ставить у відповідність елемент з іншої множини
- Ізоморфізм на самого себе
- Інша назва лінійного відображення (Лінійний...)
- Гомоморфізм в себе
- Матриця скалярних добутків векторів (матриця...)
- множина всіх елементів виду f-1(y)∈X, де f-1(y) = {x∈X| f(x)=у}.
- відображення на
- алгебраїчна структура, для якої визначено дві пари бінарних операцій
20 Clues: відображення на • Гомоморфізм в себе • Інʼєктивний гомоморфізм • Ізоморфізм на самого себе • Інша назва Гільбертового простору • Матриця з компплексними елементами • множина всіх елементів виду f(x)∈Y • Інша назва лінійного відображення (Лінійний...) • Матриця скалярних добутків векторів (матриця...) • множина чисел, що характеризує лінійний оператор. • ...
AP Calculus Vocab Word Review Topics Crossword 2022-06-02
Across
- A type of differentiation with dy/dx when differentiating the y-variable
- If a function is continuous on a closed interval [a,b], then the function must have a maximum or minimum on the interval
- lim h→0 (f(x+h)-f(x))/h
- sin(x)/cos(x)
- f’(g(x))g’(x)
- A line to which a curve of a function approaches infinity or a specific point of discontinuity
- visual representation of a differential equation
- instantaneous rate of change of a function
- d/dt(position)
- ∫vdt from 0 to t
- when a sequence or function is approaching a finite number
- f’(x) goes from - to +
- the derivative of -cosine(x)
- d/dt(velocity)
- instantaneous rate of change of the function at a point
- when f’(x)=0 or undefined
- the typical shape of a quadratic function
- converages if p>1 or diverages if p≤1
- In calculus, this word can define a limit with no definite value
- arrangement of numbers in a specific order
- inverse to an exponential function
- this is also known as “summation notation”
- The region between two circles (shaped like a ring)
- This is known as a continuous part of a function where the derivative at that point does not exist.
Down
- A Taylor series about x=0
- where concavity changes
- f’’(x)<0
- ∫√1+(dy/dx)²dx
- (g(x)f’(x)-f’(x)g(x))/[g(x)]^2
- A unit of measure in calculus used for circles, and polar equations
- (dx/dt, dy/dt)
- a basic mathematic word used to indicate the path of a continuously moving point
- if at any point a function fails to be continuous
- f'(c)=f(b)-f(a)/b-a
- sum of numbers in a sequence
- the method of finding the derivative of a function
- value that a function approaches
- a function that can be drawn without picking up a pencil
- the study of rates of changes, functions, limits, differentiation, and integration
- derivative of Sin(x)
- A line passing through two points on a curve
- the antiderivative of sec(x)tan(x)
- area under the curve
- True mathematical statement
- f’’(x)>0
- f(x)g’(x)+f’(x)g(x)
- when a sequence or function does not approach a finite number
- approximation of an integral by a finite sum
- f’(x) goes from + to -
- This can be written as “n!”
50 Clues: f’’(x)<0 • f’’(x)>0 • sin(x)/cos(x) • f’(g(x))g’(x) • ∫√1+(dy/dx)²dx • (dx/dt, dy/dt) • d/dt(position) • d/dt(velocity) • ∫vdt from 0 to t • f'(c)=f(b)-f(a)/b-a • f(x)g’(x)+f’(x)g(x) • derivative of Sin(x) • area under the curve • f’(x) goes from - to + • f’(x) goes from + to - • where concavity changes • lim h→0 (f(x+h)-f(x))/h • A Taylor series about x=0 • when f’(x)=0 or undefined • ...
ΕΡΓΑΣΙΑ 1Η 2022-04-23
mathfinal project 2021-05-12
Across
- A point where the second derivative = 0
- An integral with upper and lower bounds
- series a series with the form (-1)^n * a_n
- When a discontinuity “jumps” from one value to another
- A differentiable function is always _________.
- A method that uses the tangent line at x and y to approximate y using intervals of x
- A method for finding the area of a solid rotate about an axis
- A discontinuity which limits from both sides are the same.
- The maximum error for a Taylor Polynomial approximating a function
- Values of a function f(x) where f’(x) changes sign
- An integral with either bound being an infinite number
- A test that is very helpful in determining the radius of convergence of a series
- Usually denoted by <x(t),y(t)>
Down
- A Riemann sum that uses the right endpoint of an interval to approximate the area under a function
- The highest value of a function on a given interval.
- A taylor series centered at x=0
- A series with the form (1/x)^n
- A series with the form 1/n^p
- A series denoted by a_n * (x-c)^n
- A Riemann sum that uses the average of the endpoints of an interval to approximate the area under a function
- A Riemann sum that uses the left endpoint of an interval to approximate the area under a function
- The change of x with respect to t
- Values of a function f(x) where f’(x) = 0
- A theorem that states if f(g)=f(h) and is continuous, then there will be x on the interval (g,h) for which f’(x) = 0
- A series that does not converge to a finite value
25 Clues: A series with the form 1/n^p • A series with the form (1/x)^n • Usually denoted by <x(t),y(t)> • A taylor series centered at x=0 • A series denoted by a_n * (x-c)^n • The change of x with respect to t • A point where the second derivative = 0 • An integral with upper and lower bounds • Values of a function f(x) where f’(x) = 0 • series a series with the form (-1)^n * a_n • ...
ΕΡΓΑΣΙΑ 1Η 2022-04-23
Writing Linear Equations Crossword Puzzle 2021-01-28
20 Clues: Question I • Question N • Question Q • Question H • Question J • Question L • Question D • Question R • Question E • Question F • Question B • Question K • Question G • Question O • Question M • Question S • Question A • Question T • Question C • Question P
Turunan Trigonometri 2022-10-17
Across
- Turunan f(x) = 3 cos x
- Jika f(x) = 2 sec 3x, maka f’(x) =
- Y = sin^2x, y’=
- Y = sin x + 5 cos x, y’ adalah
- Turunan dari f(x)= 4 sin x adalah
- Jika f(x) = sin x cos x, maka f’(x) =
Down
- Dx (3 sin x – 2 cos x)
- f’(x) = sec2x , nilai f(x) adalah
- Turunan dari y = cox2 x
- Tentukan turunan dari f(x) = 2x + cos x
- Turunan dari sin 3x2 adalah
- Turunan dari 2 csc x
- Turunan dari sin 3x
- Turunan dari 3 sin x – 2 cos x
- Turunan dari y= x- tan x + 3 adalah
- y = 3 sin 3x , y’ adalah
16 Clues: Y = sin^2x, y’= • Turunan dari sin 3x • Turunan dari 2 csc x • Dx (3 sin x – 2 cos x) • Turunan f(x) = 3 cos x • Turunan dari y = cox2 x • y = 3 sin 3x , y’ adalah • Turunan dari sin 3x2 adalah • Turunan dari 3 sin x – 2 cos x • Y = sin x + 5 cos x, y’ adalah • f’(x) = sec2x , nilai f(x) adalah • Turunan dari f(x)= 4 sin x adalah • Jika f(x) = 2 sec 3x, maka f’(x) = • ...
Chase Barsi - Algebra 2 Puzzle 2021-02-19
Across
- f(x)+k
- logarithm that uses base 10
- 0<b<1
- f(x-h)
- af(x)
- b>1
Down
- the number a root of a polynomial if and only if (x-a) is a factor
- symmetric about the y-axis
- simplest function in the family of functions
- a function in the form y=ab^x where x is a real number, a=0,b>0,b=1
- logarithm that uses base e
- f(1/b*x)
- the graph of a quadratic function is a U-shaped curve
- rewriting the expression as the product of its factors
- a quantity representing the power to which a fixed number must be raised to produce a given number
15 Clues: b>1 • 0<b<1 • af(x) • f(x)+k • f(x-h) • f(1/b*x) • symmetric about the y-axis • logarithm that uses base e • logarithm that uses base 10 • simplest function in the family of functions • the graph of a quadratic function is a U-shaped curve • rewriting the expression as the product of its factors • the number a root of a polynomial if and only if (x-a) is a factor • ...
Writing Linear Equations Crossword Puzzle 2021-01-28
20 Clues: Question I • Question N • Question Q • Question H • Question J • Question L • Question D • Question R • Question E • Question F • Question B • Question K • Question G • Question O • Question M • Question S • Question A • Question T • Question C • Question P
Unit 1: functions review 2022-12-13
Across
- the set of all input values (x-axis)
- highest output value in the entire domain
- the set of all output values (y-axis)
- example of this function: f(x)= (x-1)^3
- y=f(cx) c>1, the graph is horizontally *blank*
- where a line crosses the y-axis
- another name for max/min points of a graph
- lowest output value over an entire domain
- shifts/changes in the graph
Down
- example: f(x)=x^2
- where a line crosses the x-axis
- functions belonging to the same family
- y=f(x+c), the graph is shifted to the *blank*
- what the functions are doing at the extremes
- example: f(x)=3
15 Clues: example: f(x)=3 • example: f(x)=x^2 • shifts/changes in the graph • where a line crosses the x-axis • where a line crosses the y-axis • the set of all input values (x-axis) • the set of all output values (y-axis) • functions belonging to the same family • example of this function: f(x)= (x-1)^3 • highest output value in the entire domain • ...
Musik C-niveau 2023-03-22
Across
- formtypen i "She loves you"
- Når der er tre ottendedelsnoder på to ottendedels plads
- afstanden fra c og op til nærmeste f
- formtypen i "Dejlig er den himmelblå"
- lille terts + lille terts
- F#-mol og A-dur er
- den lille syver, man sætter på en treklang
Down
- Instrumentet, der ligner et klaver, men knipser i stedet for at hamre
- din bedste ven i musik
- 1 ½ 1 1 ½ 1 1
- halvtonetrin i en oktav
- D7
- stor terts + lille terts
- Guitarens seks strenge
14 Clues: D7 • 1 ½ 1 1 ½ 1 1 • F#-mol og A-dur er • din bedste ven i musik • Guitarens seks strenge • halvtonetrin i en oktav • stor terts + lille terts • lille terts + lille terts • formtypen i "She loves you" • afstanden fra c og op til nærmeste f • formtypen i "Dejlig er den himmelblå" • den lille syver, man sætter på en treklang • Når der er tre ottendedelsnoder på to ottendedels plads • ...
Sequences 2023-06-06
Across
- what's the f(1) (1st term) in this sequence 7,14,21,28
- recursive formula
- formula for finding any term in a geometric sequence
- name of sequence where the difference between #'s is the same
- the d in the formula stands for
- the process of adding things together in math
Down
- adding all the terms in a geometric series
- formula for finding any term in an arithmetic sequence
- explicit formula
- name of sequence with a common ratio between #'s
- what's the difference of these #'s? 4,7,10,13
- when you add terms from a sequence it's called a
12 Clues: explicit formula • recursive formula • the d in the formula stands for • adding all the terms in a geometric series • what's the difference of these #'s? 4,7,10,13 • the process of adding things together in math • name of sequence with a common ratio between #'s • when you add terms from a sequence it's called a • formula for finding any term in a geometric sequence • ...
Differentialregning 2023-02-22
Across
- Hvis grafen er aftagende, så er f'(x)...
- Hvordan udtales "Δy"?
- En linje, der rører grafen i to punkter.
- Hvad er tangentenshældning, når det vides, at f'(1)=3
- "en ___ ganget på lader vi stå"
- Betegnes med bogstavet h i tretrinsreglen.
- En linje, der rører grafen i netop ét punkt.
- Hvad er den afledte af en konstant?
- ... angiver væksthastigheden eller hældningen for tangenten.
- Hvad er f(x), hvis f'(x) er positiv
Down
- Betegnes med Δy i tretrinsreglen.
- I 3. trin i tretrinsreglen skal man finde...
- Hvis man differentierer sinus får man...
- De steder, hvor f'(x)=0 kalder vi for...
- y=f'(x0)(x-x0)+f(x0)
- En linje, der viser de steder, hvor f'(x)=0, samt hvornår f er voksende og aftagende.
- Hvad kalder man også en differentieret funktion?
17 Clues: y=f'(x0)(x-x0)+f(x0) • Hvordan udtales "Δy"? • "en ___ ganget på lader vi stå" • Betegnes med Δy i tretrinsreglen. • Hvad er den afledte af en konstant? • Hvad er f(x), hvis f'(x) er positiv • Hvis grafen er aftagende, så er f'(x)... • Hvis man differentierer sinus får man... • De steder, hvor f'(x)=0 kalder vi for... • En linje, der rører grafen i to punkter. • ...
TRIGONOMETRI GRAFIK FUNGSI 2023-06-04
Across
- Nilai maksimum dari fungsi trigonometri f(x) = 1/5 sin (5x - x/6) adalah....
- Jarak terjadinya pengulangan atau gelombang memiliki satu periode putaran disebut....
- Dalam grafik fungsi sinus, k = adalah....
- Nilai minimum dari fungsi y = -2 cos 3/2 x adalah....
- y = - x² + 4x + 3
- Simpangan terjauh titik fungsi trigonometri terhadap garis - garis horizontal (x) adalah....
- Nilai maksimum dari fungsi y = 2 sin (x+60°) + 1 adalah....
Down
- Nilai minimum yang dapat dicapai oleh grafik f(x) : -2 cos x+1 adalah....
- Nilai minimum dari fungsi f(x) :2 sin (x- x/3) +1 adalah....
- Grafik fungsi trigonometri dapat digambarkan dengan dua cara yaitu menggunakan tabel dan menggunakan lingkaran....
- Rentang pengulangan bentuk grafik disebut. ...
- Nilai maksimum dari fungsi trigonometri f(x) = cos (8x - x/8) - 2/3 adalah....
- Nilai Minimum dari fungsi trigonometri y= 5 sin² x + 3 cos²x adalah....
- Nilai maksimum dari f(x) = 12 cosx - 5 sin x+3 adalah....
- f(x) :√2 cos 3x+1.Jika nilai maksimum dan minimum f(x) berturut-turut p dan q,maka nilai p²+q² adalah adalah....
- Suatu fungsi yang grafiknya berulang secara terus menerus dalam periode tertentu disebutdisebut fungsi....
- garis x = 90° dan x = 270° pada grafik fungsi y = tan x adalah....
17 Clues: y = - x² + 4x + 3 • Dalam grafik fungsi sinus, k = adalah.... • Rentang pengulangan bentuk grafik disebut. ... • Nilai minimum dari fungsi y = -2 cos 3/2 x adalah.... • Nilai maksimum dari f(x) = 12 cosx - 5 sin x+3 adalah.... • Nilai maksimum dari fungsi y = 2 sin (x+60°) + 1 adalah.... • Nilai minimum dari fungsi f(x) :2 sin (x- x/3) +1 adalah.... • ...
calculus 2022-05-10
Across
- the rule used to find the derivative of f(g(x))
- used to find the integral when the other rules are too complicated
- up the ladder
- ln(1)
- sin(pi/2)
- when the y coordinate of two functions are the same
- found by using the second derivative test
- found by using the first derivative test
- the rule used to find the derivative of f(x)g(x)
- the inventor of Maagmatics
- do the integral
Down
- the value as x approaches a
- the shape that is a more accurate estimate of an integral than a rectangle
- f(x)
- the rule that says lim as x -> a of f(x)/g(x) = the lim of f'(x)/g'(x)
- method used to find the volume of a function rotated around a line with no gap
- method used to find the volume of a function rotated around a line with a gap
- the rule used to find the derivative of f(x)/g(x)
- do the derivative
- the shape created by rotating a triangle around the y axis
- the shape created by rotating a rectangle around the y-axis
- the rule that says the derivative of x^n is nx^(n-1)
- the line that f(x) approaches but never touches
- down the ladder
24 Clues: f(x) • ln(1) • sin(pi/2) • up the ladder • down the ladder • do the integral • do the derivative • the inventor of Maagmatics • the value as x approaches a • found by using the first derivative test • found by using the second derivative test • the rule used to find the derivative of f(g(x)) • the line that f(x) approaches but never touches • ...
A felvilágosodás 2020-02-21
Across
- ...remete = Kazinczy F.
- Kazinczy F. egyik leghíresebb epigrammája
- Kazinczy F. felesége
- az első folyóirat ebben a városban jelent meg
- János A franciaországi változásokra szerzője
- szatíragyűjtemény
Down
- A felvilágosodás egyik bölcsője (ország)
- A Nagy Francia Enciklopédia egyik szerkesztője
- a felvilágosodás középpontjában "áll"
- A magyar jakobinusok vezére (vezetéknév)
- A Felelet a Mondolatra egyik szerzője
- Itt raboskodott Kazinczy
- nyelvújítók más szóval
- olyan műfaj, mely felnagyítva ábrázol 1-1 emberi hibát
14 Clues: szatíragyűjtemény • Kazinczy F. felesége • nyelvújítók más szóval • ...remete = Kazinczy F. • Itt raboskodott Kazinczy • a felvilágosodás középpontjában "áll" • A Felelet a Mondolatra egyik szerzője • A felvilágosodás egyik bölcsője (ország) • A magyar jakobinusok vezére (vezetéknév) • Kazinczy F. egyik leghíresebb epigrammája • az első folyóirat ebben a városban jelent meg • ...
Chapter 1 Vocabulary 2014-08-19
Across
- All domain values match up to exactly one range value.
- y-y1=m(x-x1)
- Graph that is symmetric to the origin.
- "y" increases as "x" increases
- f^-1
- y=mx+b
- Graph that is symmetric to the y-axis.
- Lines that have the same slope.
- Collection of ordered pairs.
- f(g(x))
- Correlation coefficient
- No two elements in the domain of f correspond to the same element in the range of f.
Down
- Set of inputs.
- f(x)
- Set of outputs.
- Lines that have negative reciprocal slopes.
- Graph resembles a set of stairsteps.
- "y" decreases as "x" increases
- Change in "y" over the change in "x".
- Transformation that mirrors a graph across an axis.
20 Clues: f(x) • f^-1 • y=mx+b • f(g(x)) • y-y1=m(x-x1) • Set of inputs. • Set of outputs. • Correlation coefficient • Collection of ordered pairs. • "y" increases as "x" increases • "y" decreases as "x" increases • Lines that have the same slope. • Graph resembles a set of stairsteps. • Change in "y" over the change in "x". • Graph that is symmetric to the origin. • ...
German Willkommen 1 Lektion 1 2019-12-19
Across
- class(f)
- to read
- one, impersonal pronoun
- from town or country
- policeman(m)
- now
- cardinal number(f)
- answer(f)
- to be called
- people(f)
- lady(f)
- driver(m)
- five, 5
- mobile number(f)
- four, 4
- e-mail address(f)
- exerice(n)
- you formal
- name(m)
- to find
- seven, 7
- evening(m)
- to spell
- to drink
- part(m)
- day(m)
- alphabet(n)
- to repeat
- to listen, to hear
- telephone number(f)
- or
- but
- three, 3
- example(n)
- morning(m)
- night(m)
- youth(m)
Down
- to say
- once
- word (n)
- you informal
- business/visiting card(f)
- eight, 8
- Federal football league(f)
- to write
- I
- to live
- two, 2
- bye
- and
- six, 6
- ten, 10
- to come
- company names
- to question
- radio(n)
- greetings
- hello
- place of residence(m)
- to excuse
- accident(m)
- zero, 0
- competition
- to be missing
- please
- Mr(m)
- TV set(m)
- place of birth(m)
- in
- page(f)
- one, 1
- woman, Mrs(f)
- nine, 9
73 Clues: I • or • in • now • bye • and • but • once • hello • Mr(m) • to say • two, 2 • six, 6 • please • day(m) • one, 1 • to read • to live • ten, 10 • to come • lady(f) • five, 5 • four, 4 • name(m) • to find • zero, 0 • part(m) • page(f) • nine, 9 • class(f) • word (n) • eight, 8 • to write • radio(n) • seven, 7 • to spell • to drink • three, 3 • night(m) • youth(m) • answer(f) • people(f) • driver(m) • greetings • to excuse • TV set(m) • to repeat • exerice(n) • you formal • evening(m) • example(n) • ...
Planes 2022-11-28
Across
- tail gunner
- torpedo
- fighting falcon
- whistle
- city in nz
- doolittle
- cat
- 111 allrounder
- a wild horse
- ground strafer
- air force one
- fastest bomber
- night fighter
Down
- latest navy fighter
- famous ww2 raf fighter
- revolutionary
- bomber attacker
- blenheim raf slow bomber
- flying coffin
- spy
- raf bomber
- flying fortress
- turbo
- just retired
- cannons
25 Clues: spy • cat • turbo • torpedo • whistle • cannons • doolittle • city in nz • raf bomber • tail gunner • just retired • a wild horse • revolutionary • flying coffin • air force one • night fighter • ground strafer • fastest bomber • bomber attacker • fighting falcon • flying fortress • 111 allrounder • latest navy fighter • famous ww2 raf fighter • blenheim raf slow bomber
topic 6 algebra crossword Lydia and Yatzira 2024-04-30
Across
- goes down or up by same number every time
- when n=365
- what the b value represents
- f(x)=a(1+r)^x
- when n=12
- the line that a function gets closer and closer but never touches
- common ratio
- when n=4
- when n=2
Down
- when n=1
- goes down or up by a percentage form
- f(x)=a(1-r)^x
- common difference
- y>0
- what the a value represents
- all real numbers
16 Clues: y>0 • when n=1 • when n=4 • when n=2 • when n=12 • when n=365 • common ratio • f(x)=a(1-r)^x • f(x)=a(1+r)^x • all real numbers • common difference • what the b value represents • what the a value represents • goes down or up by a percentage form • goes down or up by same number every time • the line that a function gets closer and closer but never touches
BC 2023-01-25
Across
- e
- if f is continuous and diferentiable and f(a)=f(b), then f’(x) = 0 for some value between a and b
- (uv'-vu')/v²
- y=cot(x), y’=
- minimum on a closed interval
- integral of 1/udu
- [f(a+h)-f(a)]/h
- dydx of num. & denom. separately, eval lim
- f’’(x) < 0
- ∫cos x dx
- graph of the solution to a differential eq.
- dy/dx of e^x
- integral of velocity equation
- kP(L-P)
- uv' + vu'
- use tan line to approx. vals of the func.
- integral of cot(u)du’
- 4 f is continuous,there is a # c in (a,b),f(c)=N
- -sin(x)
- dy/dx of a^x
- Points that intersect a graph at a single .
- point where f’’(x) changes signs
- ln(x)
- F(x)
- integral of sec(u)du
Down
- dy = f(x)dx
- y=tan(x), y’=
- circle with a radius of one
- maximum on a closed interval
- uv - ∫ v du
- point where a function is not continuous(Jump, Infinite, Removable)
- longest side of a right triangle
- mean value theorem
- f '(g(x)) g'(x)
- y = Ce^(kt)
- Average Rate of Change
- derivative of velocity equation
- replacing parts of an integral with u & du
- f’(x) = 0 & f’’(x) > 0
- 0
- dy/dx
- ∫ f(x) dx on interval a to b = F(b) - F(a)
- derivative of position equation
- sin(x)/cos(x)
- lna+lnb
- dy/dx x^2
- f’(x) = 0
- f’(x) = 0 & f’’(x) < 0
- lna-lnb
- f’’(x) > 0
50 Clues: e • 0 • F(x) • dy/dx • ln(x) • kP(L-P) • lna+lnb • -sin(x) • lna-lnb • ∫cos x dx • uv' + vu' • dy/dx x^2 • f’(x) = 0 • f’’(x) < 0 • f’’(x) > 0 • dy = f(x)dx • uv - ∫ v du • y = Ce^(kt) • (uv'-vu')/v² • dy/dx of e^x • dy/dx of a^x • y=tan(x), y’= • y=cot(x), y’= • sin(x)/cos(x) • [f(a+h)-f(a)]/h • f '(g(x)) g'(x) • integral of 1/udu • mean value theorem • integral of sec(u)du • integral of cot(u)du’ • Average Rate of Change • ...
STATISTICS AND PROBABILITY SYMBOLS 2021-09-07
15 Clues: μ • ∑ • MR • Q1 • f (x) • std(X) • U(a,b) • Bern(p) • corr(X,Y) • F (k1, k2) • gamma(c, λ) • example E(X) = 10 • f (k) = p(1-p) k • example P(A) = 0.5 • example E(X | Y=2) = 5
Maths PT 2022-09-16
Across
- 5x^2y . x^3y^2
- b+x2, where b=-2 and x=p+1
- 2(a-3)+4b-2(a-b-3)+5
- 7.x.y
- 5(4x-3)=11
- -x-1=221+2x
- 17x-12=114+3x
- 5^x=1/27
- (4x-2x^3)+(5x6^3-4x+5)
- −f+2+4f=8−3f
- x+1=9
- (3x–1)(x+5)
- 25=46-3x
- y=2(x+2)-10
- X²-4x-x+3
- (x-7)^2
- 2x-4y=9
- Ab+bc+ac
Down
- 5x2+15x3
- 4xyz-7xy+2xz-xyz
- 2x+3=x+15
- (3x^6y^2)^2
- -10x-19=19-8x
- 9x+2=4x+12
- -8x+4=-26x+1
- 5x-5y=7
- 12x²-3x²+2x²
- 5(2x-1)=16x
- 5x-5y=7
- x4+7x3+12x2
30 Clues: 7.x.y • x+1=9 • 5x-5y=7 • 5x-5y=7 • (x-7)^2 • 2x-4y=9 • 5x2+15x3 • 5^x=1/27 • 25=46-3x • Ab+bc+ac • 2x+3=x+15 • X²-4x-x+3 • 5(4x-3)=11 • 9x+2=4x+12 • (3x^6y^2)^2 • -x-1=221+2x • (3x–1)(x+5) • 5(2x-1)=16x • y=2(x+2)-10 • x4+7x3+12x2 • -8x+4=-26x+1 • −f+2+4f=8−3f • 12x²-3x²+2x² • 17x-12=114+3x • -10x-19=19-8x • 5x^2y . x^3y^2 • 4xyz-7xy+2xz-xyz • 2(a-3)+4b-2(a-b-3)+5 • (4x-2x^3)+(5x6^3-4x+5) • b+x2, where b=-2 and x=p+1
tts matematika peminatan 2022-11-24
Across
- tentukan u'(x) dari f(x) = sin3 x
- tentukan persamaan garis singgung kurva y= 2 cos x = sin x di titik x = 0 derajat adalah
- Jika f(x) = x=(sinx±cosx)/sinx sin x tidak sama dengan 0 dan f’ adalah
- sin dari 150 derajat
- tan dari 60 derajat
- nilai maksimum dari fungsi y= x3-27x + 10
- cosec dari 45 adalah
- bentuk lain dari 1-2 sin2 x
- f maka f’(π/2)
- jika f(x) = x maka f' (x) =
- turunan dari -cosx
Down
- kebalikan dari sinus
- sin dari 135 derajat
- nilai sin 180
- diketahui sebuah fungsi x2-6x hitunglah titik stasioner dan nilai stasionernya
- titik suatu fungsi yang tidak naik maupun tidak turun disebut titik
- nilai dari cos 60
- tentukan nilai maks dan min bentuk y =3 cos x + 4 sin x a= 3 b=4
- tentukan nilai stasioner dan titik stasioner dari fungsi f(x) = x2 - 4x
- minimum dari fungsi y = √3 cos x - sin x adalah
- pengukuran terhadap bagaimana fungsi berubah seiring perubahan nilai input disebut
- Jika f (x) = a tan x + bx dan f ‘ (π/4) =3, f’(π/3) = 9 maka (a+b)
22 Clues: nilai sin 180 • f maka f’(π/2) • nilai dari cos 60 • turunan dari -cosx • tan dari 60 derajat • kebalikan dari sinus • sin dari 135 derajat • sin dari 150 derajat • cosec dari 45 adalah • bentuk lain dari 1-2 sin2 x • jika f(x) = x maka f' (x) = • tentukan u'(x) dari f(x) = sin3 x • nilai maksimum dari fungsi y= x3-27x + 10 • minimum dari fungsi y = √3 cos x - sin x adalah • ...
math 2021-11-01
Across
- (f∘g)(x) = f(g(x))
- g/h
- y(x)=4
- g-h
- 4x+9y=1
- 9x^2 + 4y^2 = 36
- in (x-h)^2=4p(y-k), its (h,k+p)
- perpendicular to the axis of symmetry of a parabola.
- y = ax^2 + bx + c
- (x,y)
- x^2 + y^2 − 4x + 2y − 3 = 0
Down
- its the r in x^2 + y^2 = r^2
- 9y^2 - 4x^2 = 144
- (x - h)^2 = 4p(y - k)
- g+h
- x^2=4py
- f(x)
- (h,K)
- a function built from pieces of different functions over different intervals
- f*g
20 Clues: g+h • g/h • g-h • f*g • f(x) • (h,K) • (x,y) • y(x)=4 • x^2=4py • 4x+9y=1 • 9x^2 + 4y^2 = 36 • y = ax^2 + bx + c • 9y^2 - 4x^2 = 144 • (f∘g)(x) = f(g(x)) • (x - h)^2 = 4p(y - k) • x^2 + y^2 − 4x + 2y − 3 = 0 • its the r in x^2 + y^2 = r^2 • in (x-h)^2=4p(y-k), its (h,k+p) • perpendicular to the axis of symmetry of a parabola. • a function built from pieces of different functions over different intervals
unit 2 2021-04-09
Across
- shape of heart
- integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx
- loops on both the axes
- integral 0 to infinite e to power -x and x to the power n-1 dx
- curve ellipse
- half of sphere
- revolution of the ellipse about the major axis
Down
- shape of round
- shape of ball
- shape of kite
- half oval shape
- revolution of the ellipse about the minor axis
- in terms of r and theta
- f is unbounded integral a to b f(x) dx
- in terms of x and y
15 Clues: shape of ball • shape of kite • curve ellipse • shape of round • shape of heart • half of sphere • half oval shape • in terms of x and y • loops on both the axes • in terms of r and theta • f is unbounded integral a to b f(x) dx • revolution of the ellipse about the minor axis • revolution of the ellipse about the major axis • integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx • ...
Calculus 2022-05-19
Across
- If a series does not have a limit, or the limit is infinity, then the series is
- ∫f'(x)dx=f(b)-f(a)
- dP/dt=kP(1-P/L)
- a numerical value equal to the area under the graph of a function for some interval
- the rate of change of a function with respect to a variable
- any point at which the value of a function is largest (a maximum) or smallest (a minimum
- If a series has a limit, and the limit exists, the series
- a visual representation of a differential equation
- when f"(x)>0
- an equation that does not define a function yet can be solved for a y in terms of x
- a first-order numerical procedure for solving ordinary differential equations with a given initial value
- a quantity that has both magnitude and direction
Down
- when f"(x)=0 of f"(x)=undefined and changes sign
- π∫(outer radius)^2-(inner radius)^2 dx
- (r,θ)
- lim𝑥→𝑐𝑓(𝑥)/𝑔(𝑥)=lim𝑥→𝑐𝑓′(𝑥)/𝑔′(𝑥)
- if a function f is continuous on the closed interval [a,b] and differentiable on the open interval (a,b), then there exists a point c in the interval (a,b) such that f'(c) is equal to the function's average rate of change over [a,b]
- a + ar + ar2 + ar3 + ...
- If an≤bn and if ∑bn is convergent then so is ∑an and if ∑an is divergent then so is ∑bn
- If y=f(x)g(x), then y'=g(x)f'(x) + f(x)g'(x)
- ∫√1+[𝑓′(𝑥)]^2𝑑𝑥.
- If y=u(x)/v(x), then y'=[v(x)u'(x)-u(x)v'(x)]/[v(x)]^2
- gives an interval of how great the error of the series will be
- a type of discontinuity of functions that occurs at a point where the graph of a function has a hole in it
- If y = f(g(x)), then y' = f'(g(x))*g'(x)
25 Clues: (r,θ) • when f"(x)>0 • dP/dt=kP(1-P/L) • ∫√1+[𝑓′(𝑥)]^2𝑑𝑥. • ∫f'(x)dx=f(b)-f(a) • a + ar + ar2 + ar3 + ... • lim𝑥→𝑐𝑓(𝑥)/𝑔(𝑥)=lim𝑥→𝑐𝑓′(𝑥)/𝑔′(𝑥) • π∫(outer radius)^2-(inner radius)^2 dx • If y = f(g(x)), then y' = f'(g(x))*g'(x) • If y=f(x)g(x), then y'=g(x)f'(x) + f(x)g'(x) • when f"(x)=0 of f"(x)=undefined and changes sign • a quantity that has both magnitude and direction • ...
Eerstegraadsfuncties 2013-01-29
Across
- rechtevenredig ...
- alle originelen die een functiewaarde geven
- f(x)=-3x-2 is een ...
- zo verloopt de rechte als de richtingscoëfficiënt negatief is
- richtingscoëfficiënt
- een verband tussen de variabelen x en y waarbij voor elke x-waarde hoogstens 1 y-waarde berekend kan worden
- op de x-as
- de grafiek bij omgekeerd evenredige grootheden
Down
- lees je af op de y-as
- g(x)=3
- hoeveel is de nulwaarde van g(x)=4x-8
- y-waarde
- f(-1)=2; dan is -1 het ... van 2
- f(x)=4x is een rechte door de ...
14 Clues: g(x)=3 • y-waarde • op de x-as • rechtevenredig ... • richtingscoëfficiënt • lees je af op de y-as • f(x)=-3x-2 is een ... • f(-1)=2; dan is -1 het ... van 2 • f(x)=4x is een rechte door de ... • hoeveel is de nulwaarde van g(x)=4x-8 • alle originelen die een functiewaarde geven • de grafiek bij omgekeerd evenredige grootheden • ...
unit 2 2021-04-09
Across
- shape of kite
- f is unbounded integral a to b f(x) dx
- revolution of the ellipse about the minor axis
- revolution of the ellipse about the major axis
- in terms of r and theta
- shape of ball
Down
- shape of heart
- integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx
- half oval shape
- in terms of x and y
- shape of round
- loops on both the axes
- half of sphere
- curve ellipse
- integral 0 to infinite e to power -x and x to the power n-1 dx
15 Clues: shape of kite • curve ellipse • shape of ball • shape of heart • shape of round • half of sphere • half oval shape • in terms of x and y • loops on both the axes • in terms of r and theta • f is unbounded integral a to b f(x) dx • revolution of the ellipse about the minor axis • revolution of the ellipse about the major axis • integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx • ...
math 2021-11-01
Across
- perpendicular to the axis of symmetry of a parabola.
- (x,y)
- (f∘g)(x) = f(g(x))
- 9x^2 + 4y^2 = 36
- y = ax^2 + bx + c
- g/h
- y(x)=4
- 9y^2 - 4x^2 = 144
- a function built from pieces of different functions over different intervals
- (x - h)^2 = 4p(y - k)
- its the r in x^2 + y^2 = r^2
- f(x)
Down
- x^2 + y^2 − 4x + 2y − 3 = 0
- 4x+9y=1
- g-h
- f*g
- (h,K)
- x^2=4py
- g+h
- in (x-h)^2=4p(y-k), its (h,k+p)
20 Clues: g-h • f*g • g/h • g+h • f(x) • (x,y) • (h,K) • y(x)=4 • 4x+9y=1 • x^2=4py • 9x^2 + 4y^2 = 36 • y = ax^2 + bx + c • (f∘g)(x) = f(g(x)) • 9y^2 - 4x^2 = 144 • (x - h)^2 = 4p(y - k) • x^2 + y^2 − 4x + 2y − 3 = 0 • its the r in x^2 + y^2 = r^2 • in (x-h)^2=4p(y-k), its (h,k+p) • perpendicular to the axis of symmetry of a parabola. • a function built from pieces of different functions over different intervals
unit 2 2021-04-09
Across
- half oval shape
- integral 0 to infinite e to power -x and x to the power n-1 dx
- half of sphere
- shape of kite
- shape of ball
- curve ellipse
Down
- revolution of the ellipse about the minor axis
- in terms of x and y
- shape of heart
- f is unbounded integral a to b f(x) dx
- in terms of r and theta
- shape of round
- integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx
- loops on both the axes
- revolution of the ellipse about the major axis
15 Clues: shape of kite • shape of ball • curve ellipse • shape of heart • shape of round • half of sphere • half oval shape • in terms of x and y • loops on both the axes • in terms of r and theta • f is unbounded integral a to b f(x) dx • revolution of the ellipse about the minor axis • revolution of the ellipse about the major axis • integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx • ...
unit 2 2021-04-09
Across
- shape of heart
- integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx
- loops on both the axes
- integral 0 to infinite e to power -x and x to the power n-1 dx
- curve ellipse
- half of sphere
- revolution of the ellipse about the major axis
Down
- shape of round
- shape of ball
- shape of kite
- half oval shape
- revolution of the ellipse about the minor axis
- in terms of r and theta
- f is unbounded integral a to b f(x) dx
- in terms of x and y
15 Clues: shape of ball • shape of kite • curve ellipse • shape of round • shape of heart • half of sphere • half oval shape • in terms of x and y • loops on both the axes • in terms of r and theta • f is unbounded integral a to b f(x) dx • revolution of the ellipse about the minor axis • revolution of the ellipse about the major axis • integral 0 to 1 x to the power m-1 and (1-x) to (n-1) dx • ...
Ovidius : Vízözön 2022-12-02
18 Clues: áll • part • hely • ezer • mutat • meder • férfi • mocsár • teli(f) • felhőzet • százazföld • nő(sing 1) • föld, talaj • ártatlan (m) • földkerekség • lát (sing 1) • nap, idősuak • túlél, fennmarad
TURUNAN FUNGSI TRIGONOMETRI 2023-09-14
Across
- turunan tan^2 (3x)
- bentuk lain cosec a
- turunan ketiga tan x
- turunan dari g(x)=(sin x + 1)(sin x - 2)
- turunan f(x)=2 sin x - 7 cos x
- turunan f(x)=sec x
Down
- turunan sin^2 (2x)
- untuk mencari percepata kita gunakan turunan ke berapa
- turunan kedua cos (2t)
- turunan kedua dari f(x)= 3 cos 2x
- fungsi kecepatan saat y= 3 cos 2t
- untuk mencari kecepatan kita gunakan turunan ke berapa
- bentuk lain cotan x
- turunan f(x)=2 sin 2x
14 Clues: turunan sin^2 (2x) • turunan tan^2 (3x) • turunan f(x)=sec x • bentuk lain cotan x • bentuk lain cosec a • turunan ketiga tan x • turunan f(x)=2 sin 2x • turunan kedua cos (2t) • turunan f(x)=2 sin x - 7 cos x • turunan kedua dari f(x)= 3 cos 2x • fungsi kecepatan saat y= 3 cos 2t • turunan dari g(x)=(sin x + 1)(sin x - 2) • untuk mencari percepata kita gunakan turunan ke berapa • ...
Tugas Mat Wajib 2021-03-09
Across
- Gradien garis normal dari kurva y=-x^2+9
- Diketahui segitiga ABC dengan cos A = 15/17. Panjang sisi BC adalah ...
- Sebuah mobil menempuh jarak berdasarkan fungsi s(t) = 0,5t^3+t^2-9t+1. Percepatan mobil pada detik pertama adalah ... (a(t)=s"(t))
- Kubus ABCD.EFGH, luas BCHE = 121√2. Panjang AD?
- lim x->1 (x^2+2x+1) = ...
- Dua buah tanaman masing-masing mampu menghasilkan gamet dengan gen A dan a. Saat pembuahan, gamet dari kedua tanaman saling berpasangan secara acak. Bila terbentuk 4 keturunan dari pembuahan tersebut, tentukan frekuensi harapan munculnya keturunan bergenotip aa
- Jika f(x)=((x+4)/(4-x)) dan f'(2)=log a, tentukan nilai a
- Sebuah hadiah pada roda keberuntungan diberi area seluas 8π cm^2. Jika diameter roda 16 cm dan roda diputar 24 kali, frekuensi harapan munculnya hadiah tersebut adalah ... kali
- lim x->0 ((8x^9+14x)/(x^4+2x))=...
Down
- Sebuah deret aritmatika suku pertamanya 20, jumlah enam suku pertamanya 90, nilai suku ke-11 adalah ...
- Sepuluh buah bilangan rata-ratanya 4,5. Bila ditambah x, rata-rata bilangan menjadi 5. Nilai x=?
- Dua buah dadu dilempar 36 kali. Frekuensi harapan munculnya angka kembar adalah ... kali
- Limas segiempat T.ABCD, TA=8√3, AB=16, tinggi limas?
- Deret geometri suku pertamanya 3 dan rasionya 2. Jumlah n suku pertamanya 192. Bila n = log c, tentukan nilai c
- Susunan bilangan, simbol, atau ekspresi yang disusun dalam baris dan kolom sehingga membentuk suatu bangun persegi
- Ordinat bayangan titik A(3,-7) yang direfleksi garis y = 1
- Diketahui f(x)=x^2+2 dan g(x)=x-5. Bila x>5 dan g(f(g(x)))=1, tentukan nilai x
- Integral f(x)=4x+a pada batas 1<=x<=2 adalah 9. Bila a = log b, tentukan nilai b
- Jika f(x)=(2x-3)(2x-3)(2x-3), tentukan nilai cos a bila f'(a)=54 dan a<2
- Sebuah koin dilempar sebanyak 4 kali. Frekuensi harapan munculnya gambar adalah ... kali
20 Clues: lim x->1 (x^2+2x+1) = ... • lim x->0 ((8x^9+14x)/(x^4+2x))=... • Gradien garis normal dari kurva y=-x^2+9 • Kubus ABCD.EFGH, luas BCHE = 121√2. Panjang AD? • Limas segiempat T.ABCD, TA=8√3, AB=16, tinggi limas? • Jika f(x)=((x+4)/(4-x)) dan f'(2)=log a, tentukan nilai a • Ordinat bayangan titik A(3,-7) yang direfleksi garis y = 1 • ...
Arithmetic Sequences 2023-03-13
Across
- recursive rule at starting position 0
- explicit rule at starting position 0
- sequence where consecutive terms have a common difference
Down
- recursive rule at starting position 1
- explicit rule at starting position 1
- defines the term in position ´n´ by relating it to 1 or more previous terms
- an ordered list of numbers
- defines the term position ´n´ as a function of ´n´
8 Clues: an ordered list of numbers • explicit rule at starting position 1 • explicit rule at starting position 0 • recursive rule at starting position 1 • recursive rule at starting position 0 • defines the term position ´n´ as a function of ´n´ • sequence where consecutive terms have a common difference • ...
Fungsi 2023-11-20
Across
- Dari fungsi f dan g diketahui g(x) = x −1 dan (fog)(x) = 4x2 - x . Jika f (a) = 5 , maka tentukan nilai a
- jika f dan g adalah dua fungsi yang terdefinisi pada himpunan R maka operasi yang digunakan adalah
- (f°g)(x)=(f°g)=((f°g)°h))(x) sifat fungsi komposisi tersebut adalah
- onto disebut juga dengan
- relasi khusus
- Jika diketahui f (x) = 3x + 4 dan g (x) = 3x berapa nilai dari ( f o g ) (2)?
- selisih f(x) dan g(x) dinyatakan
- jumlah f(x) dan g(x) dinyatakan
Down
- fungsi surjektif disebut juga
- korespondensi satu-satu disebut juga dengan
- Diketahui fungsi f(x) = 6x – 3, g(x) = 5x + 4 dan (f ο g)(a) = 81. Tentukan nilai a!
- hasil kali f(x) dan g(x) dinyatakan
- setiap anggota himpunan yang mempunyai kawan yang berbeda disebut
- hasil bagi f(x) dan g(x) dinyatakan
- g disebut invers dari f ditulis
15 Clues: relasi khusus • onto disebut juga dengan • fungsi surjektif disebut juga • g disebut invers dari f ditulis • jumlah f(x) dan g(x) dinyatakan • selisih f(x) dan g(x) dinyatakan • hasil kali f(x) dan g(x) dinyatakan • hasil bagi f(x) dan g(x) dinyatakan • korespondensi satu-satu disebut juga dengan • setiap anggota himpunan yang mempunyai kawan yang berbeda disebut • ...
Chapter 6 2023-04-26
Across
- product of an initial amount and a constant ratio raised to the power
- +h
- -h
- +k
- what will stay the same when we have a vertical shift
- always written as y=# because it is a horizontal line
Down
- what will change when we have a vertical shift
- what is b in f(x)=a x b^2
- what does the a represent in f(x)=a(1+r)2
- what does the r represent in f(x)=a(1+r)2
- -K
- what does the r represent in f(x)=a(1-r)2
12 Clues: +h • -h • +k • -K • what is b in f(x)=a x b^2 • what does the a represent in f(x)=a(1+r)2 • what does the r represent in f(x)=a(1+r)2 • what does the r represent in f(x)=a(1-r)2 • what will change when we have a vertical shift • what will stay the same when we have a vertical shift • always written as y=# because it is a horizontal line • ...
TTS matamatika fungsi komposisi 2023-01-26
Across
- f°g≠g°f maka hal tersebut adalah sifat dari,,,
- kebalikan dari (g°f)(x)=g(f(x)) adalah
- apabila f suatu fungsi dari a ke b dan g suatu fungsi dari b ke c (g:B –> c) maka suatu fungsi dari a ke c disebut dengan,,,
- suatu fungsi dari a ke c disebut fungsi komposisi dan dinyatakan dengan g°f maka di baca,,,
- sifat asosiatif f°(g°h) maka sama dengan,,,
- (f°g)–1=g–1°f–1 maka fungsi komposisi tersebut adalah
Down
- jika f,g dan H adalah fungsi nilai komposisi dari fungsi-fungsi x=c maka itu di sebut dengan pengertian,,
- jika f:A–>B,g:B–>C,dan H:C –>D maka pengertian tersebut adalah pengertian komposisi,,,
- tidak komutatif,asosiatif, mempunyai identitas I dan fungsi invers komposisi pengertian tersebut adalah
- C dinyatakan dengan (g°f)(x)=g(f(x)) maka awalan pertamanya adalah,,,
10 Clues: kebalikan dari (g°f)(x)=g(f(x)) adalah • sifat asosiatif f°(g°h) maka sama dengan,,, • f°g≠g°f maka hal tersebut adalah sifat dari,,, • (f°g)–1=g–1°f–1 maka fungsi komposisi tersebut adalah • C dinyatakan dengan (g°f)(x)=g(f(x)) maka awalan pertamanya adalah,,, • jika f:A–>B,g:B–>C,dan H:C –>D maka pengertian tersebut adalah pengertian komposisi,,, • ...
math 2015-06-16
Across
- the ___ the eccentricity of the hyperbola is, the more straight the graph of the eccentricity is
- the smallest number period of a periodic function
- a ___ function has every x value that corresponds to exactly one y value and one y value that corresponds to exactly one y value
- formula where Logbc = logac / logab
- equation of conic sectionis (x-h)2 + (y-k)2 s= r2?
- if a quantity is growing at r% per year (or month), then the doubling time is approximately (__/r) years (or months)
- type of conic section where B2 - 4AC is equal to 0
- what is log34 equal to the nearest tenth?
- domain of function f(x) = (1)/(x+3) is D={y|y∈R, y not equal to __}
- Logbb
- a type of shift where function f(x) translates into g(x) where g(x) is equal to f(x)+c
- log(1/32) to the nearest tenth
- graph of y=ax^2+bx+c with symmetry at x = -b/2a has ___ symmetry
- type of function where A(t) = A0(1 + r)t
- type of function where A(t) = A0bt/k = A0(1/2)t/years
- function where the new function has the same points as the original function, except that the x and y are reversed due to flip over x=y line from original
Down
- equation that contains a variable in the exponent
- the equation Ax2 + Bxy + Cy2 + Dx + Ey + F = 0
- when a plane tilted at various angles slices double cones ; examples: circle, ellipse, hyperbola, parabola
- if the coordinates of (x,y) flips over ______ then the resulting coordinates is (y, x)
- locus (set) of points in a plane equidistant from a fixed point
- t when 10t-3 = 4 rounded to the nearest tenth
- when larger number is under the x in an equation of an ellipse, then ellipse is a ____ ellipse
- in a period function when (max value minus min value) divided by two
- a function f(-x) that equals -f(x) has ___ symmetry
25 Clues: Logbb • log(1/32) to the nearest tenth • formula where Logbc = logac / logab • type of function where A(t) = A0(1 + r)t • what is log34 equal to the nearest tenth? • t when 10t-3 = 4 rounded to the nearest tenth • the equation Ax2 + Bxy + Cy2 + Dx + Ey + F = 0 • equation that contains a variable in the exponent • the smallest number period of a periodic function • ...
Chapter 6 2023-04-26
Across
- product of an initial amount and a constant ratio raised to the power
- +h
- -h
- +k
- what will stay the same when we have a vertical shift
- always written as y=# because it is a horizontal line
Down
- what will change when we have a vertical shift
- what is b in f(x)=a x b^2
- what does the a represent in f(x)=a(1+r)2
- what does the r represent in f(x)=a(1+r)2
- -K
- what does the r represent in f(x)=a(1-r)2
12 Clues: +h • -h • +k • -K • what is b in f(x)=a x b^2 • what does the a represent in f(x)=a(1+r)2 • what does the r represent in f(x)=a(1+r)2 • what does the r represent in f(x)=a(1-r)2 • what will change when we have a vertical shift • what will stay the same when we have a vertical shift • always written as y=# because it is a horizontal line • ...
Topic 1 2022-05-05
Across
- notation, 0 ≤ x ≤ 1
- (6,1),(7,2),(8,3) ~ {1, 2, 3}
- (6,1),(7,2),(8,3) ~ {6, 7, 8}
- composition, f(x) = 2x-3 ; g(x) = 5x+1 ~ f(g(x)) = 2(5x+1)-3
- An equation that has only one answer for y for every x.
- linear systems, 3x-y = 7 ; 2x+y =8
Down
- function, x = 1, 2, 3 ; y = 0, 4, 8 ~ (1,4) (2,0) (3,8)
- functions, f(x) = 3x-9 ; x = 5 ~f(5) = 3(5)-9 = 6
- functions, f-1(x) = (x-3)/2
9 Clues: notation, 0 ≤ x ≤ 1 • functions, f-1(x) = (x-3)/2 • (6,1),(7,2),(8,3) ~ {1, 2, 3} • (6,1),(7,2),(8,3) ~ {6, 7, 8} • linear systems, 3x-y = 7 ; 2x+y =8 • functions, f(x) = 3x-9 ; x = 5 ~f(5) = 3(5)-9 = 6 • function, x = 1, 2, 3 ; y = 0, 4, 8 ~ (1,4) (2,0) (3,8) • An equation that has only one answer for y for every x. • ...
Luke 2014-10-10
BASIC CALCULUS 2020-06-03
Across
- zero over a non zero is equals to?
- f(x) √(2&5x+2) find f’(-3)
- It is a branch of calculus that studies the rates at which quantities change.
- what is dy/dx stands for?
- in one graph theres two or more function what its called?
- what is 0/0 called?
- behavior of the graph
Down
- What function has a parabola?
- what rule is d/dx u x v = u x dv/dx + v x du/dx ?
- what expression is 10^x is called?
- what rule is d/dx c = 0?
- the derivative is zero.
- what rule is D/dx f(x) + g(x) = f’(x) + g’(x)?
- A number over a zero is equal to what?
- What rule is d/dx f(g(x))=f^' (g(x)) g^' (x)?
- a result or product of something?
- what kind of function is If f(x) = x, then f’(x) = 1?
- possible result for Y
- It is branch of calculus concerned with the theory and applications of integrals.
- evaluate lim┬(x→∞)〖(8x^2-5x)/(4x^2+7)〗
20 Clues: what is 0/0 called? • possible result for Y • behavior of the graph • the derivative is zero. • what rule is d/dx c = 0? • what is dy/dx stands for? • What function has a parabola? • f(x) √(2&5x+2) find f’(-3) • a result or product of something? • zero over a non zero is equals to? • what expression is 10^x is called? • A number over a zero is equal to what? • ...
Sequences 2021-10-12
Across
- does not contain an equal sign
- describes how a sequence increases or decreases
- _____ sequence where you add/sub to find terms
- f(1)=4 and f(n+1)=f(n)+6 is a ____ equation
Down
- two expressions equal to each other
- 0,1,2,3... are _____ numbers
- an equation that starts with f(n)
- f(n)=4+2(n-1) is an example of a _____
- _____ sequence where you mul/div to find terms
- refers to a number in a sequence
10 Clues: 0,1,2,3... are _____ numbers • does not contain an equal sign • refers to a number in a sequence • an equation that starts with f(n) • two expressions equal to each other • f(n)=4+2(n-1) is an example of a _____ • f(1)=4 and f(n+1)=f(n)+6 is a ____ equation • _____ sequence where you mul/div to find terms • _____ sequence where you add/sub to find terms • ...
Towns and Cities 2024-03-05
ap calc legacy project 2023-05-15
Across
- What is the integral of sec2(x)
- Find the sum of 𝛴(2/3)n starting at n=0
- Which dazzling mathmetician died the same year that women got the right to vote?
- Determine whether 𝛴3/(3n+5) converges or diverges
- Find the limit as x approaches infinity of (ex)/(x2) =
- Find ∫csc2 (x) du when x(π/2)=0
- What is the catchy acronym for choosing a U when doing integration by parts
- ∫12 (4x3 - x)dx
- What happens when the nth term test =0
- Find Dy/Dx, r=1+sin(𝜃) when 𝜃= π/3
- f(x)g’(x) + g(x)f’(x))
- Spiffy tool used to create trig identities
- you would use to integrate ∫(x-1)e-xdx
Down
- Approximate y when x=1.5 and dy/dx=x+1 given the point (1,2) using a step size of 0.1 (euler’s)
- Find the average value of f(x)=3x2-2x on (1,4)
- “Low D high minus high D low square the bottom and away we go”
- The graph of the piecewise linear function f is shown above. What is the value of ∫012 f’(x) dx
- If continuous and differentiable, IROC equals AROC, by _______
- Which sassy mathematician died by ovarian cyst?
- √(dx/dt)2+(dy/dt)2
- First step in solving a differential equation
- Find area in 2nd quadrant enclosed by r, r=3𝜃+sin(𝜃), round answer to nearest whole number
- ending of an indefinite integral
23 Clues: ∫12 (4x3 - x)dx • √(dx/dt)2+(dy/dt)2 • f(x)g’(x) + g(x)f’(x)) • What is the integral of sec2(x) • Find ∫csc2 (x) du when x(π/2)=0 • ending of an indefinite integral • Find Dy/Dx, r=1+sin(𝜃) when 𝜃= π/3 • What happens when the nth term test =0 • you would use to integrate ∫(x-1)e-xdx • Find the sum of 𝛴(2/3)n starting at n=0 • Spiffy tool used to create trig identities • ...
The Language of Trig/Pre-calculus 2020-12-08
Across
- "short & sweet" version of poly. division
- at x = 3 for (2x + 1)/( x^2 + 2x - 15)
- lines whose slopes are opposite reciprocals
- type of symmetry when only x's are opposites
- method for solving system of equations
- type of variation in which xy = k
- describes f(x) & g(x) when f(g(x))=g(f(x))= x
- comes from repeated factors in numerator & denom.
- for a function, shows up on graph as x-intercept
- function known for its "v" shape
- reciprocal of sine function
- indicated by f(g(x)) for two functions
Down
- Oh! That all quadratics could be solved thus
- choices are max, min, or pt. of inflection
- describes f(x)when f(b)< f(a) for a< b
- solution option for rational equations
- for a 30 degree angle, value is always .5
- describes f(x) as x approaches inifinity
- trig ratio for hyp/adjacent
- limits on x or y in a system of inequalities
- turning point for the graph of a quadratic
- shift produced by "k" in up/down parabola
- symmetry for an odd function
23 Clues: trig ratio for hyp/adjacent • reciprocal of sine function • symmetry for an odd function • function known for its "v" shape • type of variation in which xy = k • describes f(x)when f(b)< f(a) for a< b • solution option for rational equations • at x = 3 for (2x + 1)/( x^2 + 2x - 15) • method for solving system of equations • indicated by f(g(x)) for two functions • ...
Legacy Project 2023-05-23
Across
- Determine whether 𝛴3/(3n+5) converges or diverges
- What happens when the nth term test =0
- Rule “Low D high minus high D low, square the bottom and away we go”
- What is the catchy acronym for choosing a U when doing integration by parts
- ∫12 (4x3 - x)dx
- What is the integral of sec2(x)
- If continuous and differentiable, IROC equals AROC, by _______
- Find ∫csc2 (x) du when x(π/2)=0
- Which sassy mathematician died by ovarian cyst?
- The graph of the piecewise linear function f is shown above. What is the value of ∫012 f’(x) dx
Down
- Which dazzling mathematician died the same year that women got the right to vote in the US?
- Approximate y when x=1.5 and dy/dx=x+1 given the point (1,2) using a step size of 0.1 (euler’s)
- First step in solving a differential equation
- f(x)g'(x)+g(x)f’(x)
- Find the sum of 𝛴(2/3)n starting at n=0
- Find area in 2nd quadrant enclosed by r, r=3𝜃+sin(𝜃), round answer to nearest whole number
- Find the limit as x approaches infinity of (ex)/(x2) =
- Find the average value of f(x)=3x2-2x on (1,4)
- √(dx/dt)2+(dy/dt)
- method Method you would use to integrate ∫(x-1)e-xdx
- ending of an indefinite integral
- Find Dy/Dx, r=1+sin(𝜃) when 𝜃= π/3
22 Clues: ∫12 (4x3 - x)dx • √(dx/dt)2+(dy/dt) • f(x)g'(x)+g(x)f’(x) • What is the integral of sec2(x) • Find ∫csc2 (x) du when x(π/2)=0 • ending of an indefinite integral • Find Dy/Dx, r=1+sin(𝜃) when 𝜃= π/3 • What happens when the nth term test =0 • Find the sum of 𝛴(2/3)n starting at n=0 • First step in solving a differential equation • Find the average value of f(x)=3x2-2x on (1,4) • ...
music crossword 2019-02-22
Across
- 16 = 1 MEASURE
- lower pitch
- 1 = 1 measure
- two notes played as one
- f below middle c
- cancels sharp and flat
- a set of 5 lines
- tells the speed
- says to repeat
- creates divisions
Down
- group of beats
- g above middle c
- (two) lines at the end
- 2 = 1 measure
- 8 = 1 measure
- hold on specific note
- 4 = 1 measure
- higher pitch
- two different note played as one
19 Clues: lower pitch • higher pitch • 2 = 1 measure • 8 = 1 measure • 1 = 1 measure • 4 = 1 measure • group of beats • 16 = 1 MEASURE • says to repeat • tells the speed • g above middle c • f below middle c • a set of 5 lines • creates divisions • hold on specific note • cancels sharp and flat • (two) lines at the end • two notes played as one • two different note played as one
X 2022-03-13
Across
- [aeiou](gu|su|da)[a-f]
- (^a-hp-z)\1(aeiou).\2
- l?(^a-lp-t)[bs]\1
- [tuv](ib|we|ww)[e-oq-v]{4}
- [fo][or].a
- (p-z){2}[abc]{2}n
- [^a-es-v].(s|n|t)[opq]
- (si|er|sg)[^a-ek-p]{2}.?[orp]+
Down
- (ca|ma|llo|go)r[^ae]l(za|de|me|l)[^eo]
- [d-m]i(ra|re|ri|ro)f[^d-e]
- [^a-hp-z][aeiou]{2}n?
- .[luv](e|m)[^h-mr-w]{2}[unpt]+\1
- c[aeio][a-g](ro|ra|ma|ne)
- [xep][a-s][o-t]{2}.?
- (rin|mir|kin)[^q-vy-z]{3}r(po|on|ca).[aeiou]
- [a-f]a(da|ba|ca|ma)l[^mn]o
16 Clues: [fo][or].a • l?(^a-lp-t)[bs]\1 • (p-z){2}[abc]{2}n • [xep][a-s][o-t]{2}.? • (^a-hp-z)\1(aeiou).\2 • [^a-hp-z][aeiou]{2}n? • [aeiou](gu|su|da)[a-f] • [^a-es-v].(s|n|t)[opq] • c[aeio][a-g](ro|ra|ma|ne) • [d-m]i(ra|re|ri|ro)f[^d-e] • [tuv](ib|we|ww)[e-oq-v]{4} • [a-f]a(da|ba|ca|ma)l[^mn]o • (si|er|sg)[^a-ek-p]{2}.?[orp]+ • .[luv](e|m)[^h-mr-w]{2}[unpt]+\1 • ...
X 2022-03-13
Across
- [aeiou](gui|su|da)l[a-f]
- (^a-hp-z)\1(aeiou).\2
- l?(^a-lp-t)[bs]\1
- [tuv](ib|we|ww)[e-oq-v]{4}
- [fo][or].a
- (p-z){2}[abc]{2}n
- [^a-es-v].(s|n|t)[opq]
- (si|er|sg)[^a-ek-p]{2}.?[orp]+
Down
- (ca|ma|llo|go)r[^ae]l(za|de|me|l)[^eo]
- [d-m]i(ra|re|ri|ro)f[^d-e]
- [^a-hp-z][aeiou]{2}n?
- .[luv](e|m)[^h-mr-w]{2}[unpt]+\1
- c[aeio][a-g](ro|ra|ma|ne)
- [xep][a-s][o-t]{2}.?
- (rin|mir|kin)[^q-vy-z]{3}r(po|on|ca).[aeiou]
- [a-f]a(da|ba|ca|ma)l[^mn]o
16 Clues: [fo][or].a • l?(^a-lp-t)[bs]\1 • (p-z){2}[abc]{2}n • [xep][a-s][o-t]{2}.? • (^a-hp-z)\1(aeiou).\2 • [^a-hp-z][aeiou]{2}n? • [^a-es-v].(s|n|t)[opq] • [aeiou](gui|su|da)l[a-f] • c[aeio][a-g](ro|ra|ma|ne) • [d-m]i(ra|re|ri|ro)f[^d-e] • [tuv](ib|we|ww)[e-oq-v]{4} • [a-f]a(da|ba|ca|ma)l[^mn]o • (si|er|sg)[^a-ek-p]{2}.?[orp]+ • .[luv](e|m)[^h-mr-w]{2}[unpt]+\1 • ...
Calculus Crossword Puzzle 2021-06-07
Across
- Equation of line broken down into two equations in terms of x and y are which are known as __________ equations.
- The rule used when a limit=0/0 is ________ rule
- A _________ field shows the slope of a differential equation at certain vertical and horizontal intervals on the x-y plane
- the most extreme possible amount or value
- physical power or strength possessed by a living being
- The second derivative gives points of _________
- The slope of the line tangent to a function.
- A ________ is a set of ordered numbers.
- a line that touches a curve at only one point
- The number of living beings an area can support is the carrying ______
- f'(g(x))g'(x) describes the process for ______ rule
- A description of an operation using the addition of multiple terms
- You would evaluate the following integral from which side:
- The integral is used to find the:
- The first derivative gives _______ points
- T = h/2(y0+2y1+2y2+...+2yn-1+yn) is the formula for the _________ rule
- A min/max that’s not absolute is known as
- |v| The magnitude of velocity
- Highest point on a graph
- The term used when determining if a limit approaches a certain value
- A graph that looks like a smile
- 32 m/s or 16 ft/sec are the numbers for acceleration due to _________.
- i
- The value that a function approaches as the domain variable approaches a specific value.
- The distance a function is from the axis.
- The set interval for an integral
- (1/b-a) ∫f(x)dx from a to b
Down
- the complete total or aggregate
- To derive f=(X-1)(x-3) you would need to use ________ rule
- a point where the limit of a complex function inflates dramatically with polynomial growth.
- A convergence test utilizing f(n+1)/f(n)
- a set of real numbers that contains all real numbers lying between any two numbers of the set
- a curve obtained as the intersection of the surface of a cone with a plane is a _____ section
- Points on the end of a function
- Taking the antiderivative is also known as taking the ________
- When the graph of a function is continuous the graph has _______.
- if f'<0 on an interval then f is ________ on that interval
- A line or curve that the graph follows closely but never touches.
- a curve traced by a point on a circle being rolled along a straight line.
- a/(1-r) is the formula used to test for convergence in _________ series
- Σ(1/n)
- The interval between two points.
- 3x2+4y=20 to derive uses _______ differentiation
- √(i2+j2)
- ∫1/√(1-x2)
- The rate of change in the position of an object.
- The degree of possible inaccuracy
- The divergence test using lim → infinity =0 is the ___ term test
- When a region appears to have infinite area from x=0 to x=♾ is known as an __________ integral
- Series converges if p>1
50 Clues: i • Σ(1/n) • √(i2+j2) • ∫1/√(1-x2) • Series converges if p>1 • Highest point on a graph • (1/b-a) ∫f(x)dx from a to b • |v| The magnitude of velocity • the complete total or aggregate • Points on the end of a function • A graph that looks like a smile • The interval between two points. • The set interval for an integral • The integral is used to find the: • ...
music crossword 2019-02-22
Across
- f below middle c
- lower pitch
- 1 = 1 measure
- says to repeat
- hold on specific note
- (two) lines at the end
- g above middle c
- cancels sharp and flat
- group of beats
Down
- two different note played as one
- 8 = 1 measure
- 2 = 1 measure
- two notes played as one
- tells the speed
- a set of 5 lines
- 16 = 1 MEASURE
- 4 = 1 measure
- creates divisions
- higher pitch
19 Clues: lower pitch • higher pitch • 8 = 1 measure • 2 = 1 measure • 1 = 1 measure • 4 = 1 measure • says to repeat • 16 = 1 MEASURE • group of beats • tells the speed • f below middle c • a set of 5 lines • g above middle c • creates divisions • hold on specific note • cancels sharp and flat • two notes played as one • (two) lines at the end • two different note played as one