1 f Crossword Puzzles
Test your skills 2024-03-20
Across
- ax^2+bx+c=0
- f(x)=2(x)
- x^a÷x^b
- (x^a)^b
- i = -1
- 2+0=2
- square root of b^2-4ac
- f(x)=x
- f(x)=(x)
- What unit are we in
- 2+(4+3)=(2+4)+3
- f(x)=x^2
- 10/2i
Down
- x^a×x^b
- what is -9 under a square root called
- 2 solutions,1 solution, and no solution
- 2+4=4+2
- x^2+9x=0
- f(x)=x^2-4x+12
- Square root is a
- f(x)=a(x+h)^2+k
- 2(5+5)= 10+10
- f(x)=x^2
- 2+(-2)=0
- 6-3i
25 Clues: 6-3i • 2+0=2 • 10/2i • i = -1 • f(x)=x • x^a×x^b • x^a÷x^b • (x^a)^b • 2+4=4+2 • x^2+9x=0 • f(x)=x^2 • 2+(-2)=0 • f(x)=(x) • f(x)=x^2 • f(x)=2(x) • ax^2+bx+c=0 • 2(5+5)= 10+10 • f(x)=x^2-4x+12 • f(x)=a(x+h)^2+k • 2+(4+3)=(2+4)+3 • Square root is a • What unit are we in • square root of b^2-4ac • what is -9 under a square root called • 2 solutions,1 solution, and no solution
Turunan Fungsi Trigonometri 2023-02-18
Across
- nilai f' (6/2) jika f(x)= 2 sin x + cos x
- turunan pertama f(x)=sin2 4 x
- turunan pertama f(x)=2 cos 3 x
- turunan pertama y=14 sin 4x
- turunan f(x)=tg x
- turunan secx
- kecepatan bola saatt=1/2
- nilai f'(
- nilai x yang memenuhi f'(x)=1/2 jika f(x)=sin2 x
Down
- turunan dari f(x)=-4 cos x
- persamaan kecepatan saat 6 sin 2t
- turunan pertama y=-3x
- turunan kedua f(x)=sin 2x
- turunan pertama dari f(x)= sin x
- turunan ketiga y=-3x
15 Clues: nilai f'( • turunan secx • turunan f(x)=tg x • turunan ketiga y=-3x • turunan pertama y=-3x • kecepatan bola saatt=1/2 • turunan kedua f(x)=sin 2x • turunan dari f(x)=-4 cos x • turunan pertama y=14 sin 4x • turunan pertama f(x)=sin2 4 x • turunan pertama f(x)=2 cos 3 x • turunan pertama dari f(x)= sin x • persamaan kecepatan saat 6 sin 2t • nilai f' (6/2) jika f(x)= 2 sin x + cos x • ...
math 2022-04-12
Across
- if f'(x) is increasing, this is up
- 1/n^p
- rate of change of a function
- 1/cotangent
- greek symbol for angle
- change in y/change in x
- name of series for 1/n
- series for ar^n
- a1 + a2 + a3 + a4 + ... + an
- M(x-c)^n+1/(n+1)!
Down
- 1/sin
- if f'(x) exists
- 1/cos
- opposite/hypotenuse
- a1 , a2 , a3 , a4 , ... , an
- a function that has no jumps or holes
- a series centered at x = 0
- another word for integral
- adjacent/hypotenuse
- 1/tangent
20 Clues: 1/sin • 1/cos • 1/n^p • 1/tangent • 1/cotangent • if f'(x) exists • series for ar^n • M(x-c)^n+1/(n+1)! • opposite/hypotenuse • adjacent/hypotenuse • greek symbol for angle • name of series for 1/n • change in y/change in x • another word for integral • a series centered at x = 0 • rate of change of a function • a1 + a2 + a3 + a4 + ... + an • a1 , a2 , a3 , a4 , ... , an • ...
Turunan Fungsi Trigonometri 2023-02-14
Across
- nilai f' (6/2) jika f(x)= 2 sin x + cos x
- turunan pertama f(x)=sin2 4 x
- turunan pertama f(x)=2 cos 3 x
- turunan pertama y=14 sin 4x
- turunan f(x)=tg x
- turunan secx
- kecepatan bola saatt=1/2
- nilai f'(
- nilai x yang memenuhi f'(x)=1/2 jika f(x)=sin2 x
Down
- turunan dari f(x)=-4 cos x
- persamaan kecepatan saat 6 sin 2t
- turunan pertama y=-3x
- turunan kedua f(x)=sin 2x
- turunan pertama dari f(x)= sin x
- turunan ketiga y=-3x
15 Clues: nilai f'( • turunan secx • turunan f(x)=tg x • turunan ketiga y=-3x • turunan pertama y=-3x • kecepatan bola saatt=1/2 • turunan kedua f(x)=sin 2x • turunan dari f(x)=-4 cos x • turunan pertama y=14 sin 4x • turunan pertama f(x)=sin2 4 x • turunan pertama f(x)=2 cos 3 x • turunan pertama dari f(x)= sin x • persamaan kecepatan saat 6 sin 2t • nilai f' (6/2) jika f(x)= 2 sin x + cos x • ...
Turunan Fungsi Trigonometri 2023-02-18
Across
- persamaan kecepatan saat 6 sin 2t
- turunan pertama f(x)=2 cos 3 x
- turunan kedua f(x)=sin 2x
- nilai x yang memenuhi f'(x)=1/2 jika f(x)=sin2 x
- turunan ketiga y=-3x
- nilai f' (6/2) jika f(x)= 2 sin x + cos x
- turunan pertama dari f(x)= sin x
Down
- turunan pertama f(x)=sin2 4 x
- turunan secx
- turunan f(x)=tg x
- turunan dari f(x)=-4 cos x
- kecepatan bola saatt=1/2
- turunan pertama y=-3x
- nilai f'(
- turunan pertama y=14 sin 4x
15 Clues: nilai f'( • turunan secx • turunan f(x)=tg x • turunan ketiga y=-3x • turunan pertama y=-3x • kecepatan bola saatt=1/2 • turunan kedua f(x)=sin 2x • turunan dari f(x)=-4 cos x • turunan pertama y=14 sin 4x • turunan pertama f(x)=sin2 4 x • turunan pertama f(x)=2 cos 3 x • turunan pertama dari f(x)= sin x • persamaan kecepatan saat 6 sin 2t • nilai f' (6/2) jika f(x)= 2 sin x + cos x • ...
math 2022-04-12
Across
- if f'(x) is increasing, this is up
- 1/n^p
- rate of change of a function
- 1/cotangent
- greek symbol for angle
- change in y/change in x
- name of series for 1/n
- series for ar^n
- a1 + a2 + a3 + a4 + ... + an
- M(x-c)^n+1/(n+1)!
Down
- 1/sin
- if f'(x) exists
- 1/cos
- opposite/hypotenuse
- a1 , a2 , a3 , a4 , ... , an
- a function that has no jumps or holes
- a series centered at x = 0
- another word for integral
- adjacent/hypotenuse
- 1/tangent
20 Clues: 1/sin • 1/cos • 1/n^p • 1/tangent • 1/cotangent • if f'(x) exists • series for ar^n • M(x-c)^n+1/(n+1)! • opposite/hypotenuse • adjacent/hypotenuse • greek symbol for angle • name of series for 1/n • change in y/change in x • another word for integral • a series centered at x = 0 • rate of change of a function • a1 + a2 + a3 + a4 + ... + an • a1 , a2 , a3 , a4 , ... , an • ...
Nose 2024-03-15
Across
- Relación entre dos conjuntos que asocia a cada elemento del conjunto inicial un único elemento del conjunto final.
- Conjunto de valores que toma una función.
- Tipo de función que repite su gráfica en intervalos de la misma longitud.
- Tipo de dilatación o contracción de la forma $g(x)=af(x)$.
- Tipo de función de $f(x)=\frac{1}{x}$.
- Tipo de función que cumple que $f(a)=f(b)$ sí y solo sí $a=b$.
- Tipo de desplazamiento de la forma $g(x)=f(x+a)$.
- Tipo de función de la forma $f(x)=a_{n}x^{n}+a_{n-1}x^{n-1}+\cdots+a_{1}x+a_{0}$.
Down
- Tipo de función que se expresa como $(f\circ g)$.
- Conjunto de valores para los que una función está definida.
- Tipo de simetría respecto al origen de coordenadas ($f(-x)=-f(x)$).
- Función que al componerla con otra función $f(x)$ da como resultado $f(x)$.
- Tipo de función de $f(x)=e^{x}$.
- Tipo de función de la forma $f(x)=\sqrt[n]{g(x)}$.
- Función que al componerla con $f(x)$ da como resultado la función identidad.
- Las funciones a \underline{\phantom{trozos}} nos permiten trabajar ocn varias funciones elementales a la vez.
16 Clues: Tipo de función de $f(x)=e^{x}$. • Tipo de función de $f(x)=\frac{1}{x}$. • Conjunto de valores que toma una función. • Tipo de función que se expresa como $(f\circ g)$. • Tipo de desplazamiento de la forma $g(x)=f(x+a)$. • Tipo de función de la forma $f(x)=\sqrt[n]{g(x)}$. • Tipo de dilatación o contracción de la forma $g(x)=af(x)$. • ...
Crossword Puzzle 2021-04-15
19 Clues: PDE • Z_3 • |x| • 3x+2 • S(X) • (1/n) • f(x,y) • matrix • f([a,b]) • 56x+72y=40 • (0,0,.....) • span{(1,1)} • {1,-1,i,-i} • tgt at infinity • curvature of line • linear dependence • set of all humans • function from matrices to R • Injective group homomorphism
SAS MATEMATIKA KELAS XI 2023-11-26
Across
- Diketahui fungsi f(x) = x + 10, maka f(-2) adalah...
- Proses menggabungkan dua fungsi untuk membantuk fungsi baru
- Jika f(x) = 3x + 4 dan g(x) = 6 - 2x, maka nilai dari (fog)(3) adalah ….
- F(x) = 2x + 3 dan g(x) = x^2. Hitunglah (f ∘ g)(2).
- Suatu fungsi didefinisikan dengan rumus f(x) = 3 – 5x. Nilai f(– 4) adalah.…
- Diketahui 𝑓(𝑥)=𝑥^3 dan 𝑔(𝑥)=2𝑥−8. Nilai dari (𝑔∘𝑓)^-1(8) adalah.......
- Jika f(x) = x + 3 dan (g ο f)(x) = 2x^2 + 4x – 3, maka ( f ο g )(1) =……….
- Fungsi f(x) = 2x - 1 dan g(x) = 3x + 4. Temukan (f ∘ g)(-2).
- Diberikan f(x) = x^2 dan g(x) = 3x - 1. Hitung (g ∘ f)(1).
Down
- Fungsi yang menghasilkan hasil yang sama untuk setiap masukan
- Jika f(x) = 3x + 4 dan g(x) = 6 - 2x, maka nilai dari (fog)(3) adalah ….
- Fungsi f(x) = x^3 - 1 dan g(x) = 2x + 1. Temukan (f ∘ g)(0).
- Jika f(x – 2 ) = 3 – 2x dan (g ο f )(x + 2 ) = 5 – 4x , maka nilai g ( - 1 ) adalah …..
- Jika f(x) = 4x + 2 dan g(x) = x - 3, apa nilai (g ∘ f)(5)?
- Diketahui f(x) = 2x^2 – 3x + 1, tentukan nilai f( 2 ) = ……..
15 Clues: Diketahui fungsi f(x) = x + 10, maka f(-2) adalah... • F(x) = 2x + 3 dan g(x) = x^2. Hitunglah (f ∘ g)(2). • Jika f(x) = 4x + 2 dan g(x) = x - 3, apa nilai (g ∘ f)(5)? • Diberikan f(x) = x^2 dan g(x) = 3x - 1. Hitung (g ∘ f)(1). • Fungsi f(x) = x^3 - 1 dan g(x) = 2x + 1. Temukan (f ∘ g)(0). • Fungsi f(x) = 2x - 1 dan g(x) = 3x + 4. Temukan (f ∘ g)(-2). • ...
Film 328 G&E Study Crossword 2023-03-09
Across
- Force of which current is pushed
- Rate of flow of electricity
- Mercury, Medium Arc, Iodide
- 650W bulb
- Silver Lame
- W=V*A
- 2000W bulb
- unit of power
- red edged scrim -1 f stop
- Supervises Grip Dept. Chief Grip
- Gold Lame
- 4 1/2" Grip Head
- pin towards lights
- purple edged scrim of -1/3 f stop
- 5000W bulb
- 575W Headcable
- generator w/ 45a 5500W 5Gal
- Junior Receiver w/ Baby pin
- pin towards power
- 4000W Headcable
- Grip to Ground adapter
- 1200W Headcable
- 600W bulb
- 300W bulb
- AC -> DC
Down
- tallest leg of certain C-Stand
- alt name for Applebox cuz he short lol
- Gold and Silver Lame (checkerboard)
- scrim of -1 1/2 f stop
- receiver 1 1/8"
- Unit Production Manager.
- Chief light technician. Makes light plan
- Yellow or White edge Diffuser of -1 3/4 f stop
- DC -> AC
- super short applebox 1"x20"x8"
- Kind of like scaffolding for Grip. Made of steel frames.
- 10K bulb
- just the legs of a C-Stand
- holds wheeled items in place. made of wood.
- thing that extends stand vertically
- pin 5/8"
- in charge of men and equipment. 2nd in command of G or E.
- 100W bulb
- 2500W Headcable
- true power / apparent power
- 1000W EGT 7 1/4" Scrims
- green edged scrim -1/2 f stop
- attachment to extend stand horizontally
- Black Flag used to cut or shape light.
- 200W bulb
50 Clues: W=V*A • DC -> AC • 10K bulb • pin 5/8" • AC -> DC • 650W bulb • Gold Lame • 100W bulb • 600W bulb • 300W bulb • 200W bulb • 2000W bulb • 5000W bulb • Silver Lame • unit of power • 575W Headcable • receiver 1 1/8" • 2500W Headcable • 4000W Headcable • 1200W Headcable • 4 1/2" Grip Head • pin towards power • pin towards lights • scrim of -1 1/2 f stop • Grip to Ground adapter • 1000W EGT 7 1/4" Scrims • ...
Функции (основные определения) 2021-12-20
Across
- Если D(f) симметрична относительно нуля и f(-x)=f(x), то функция ...
- Что является графиком линейной функции?
- Название функции y=ax²+bx+c (a≠0)
- Множество всех точек координатной плоскости, абсциссы которых равны значениям аргумента, а ординаты – соответствующим значениям функции, называется … функции
- Один из способов задания функции
- Как называется коэффициент k в формуле линейной функции?
- Один из способов задания функции
- При а<0 ветви параболы направлены …
- Название функции y=kx – прямая …
Down
- Графики функций стоят в прямоугольной системе…
- Что является графиком функции y=x²?
- Каково взаимное расположение графиков функций у=7х-2 и у= 7х?
- График функции y=|x|+1 можно получить сдвигом графика функции y=|x| на 1 единицу ...
- Зависимость одной переменной от другой, при которой каждому значению независимой переменной соответствует единственное значение зависимой переменной называется …
- График функции y=(x-1)² можно получить сдвигом графика функции y=x² на 1 единицу ...
- Если D(f) симметрична относительно нуля и f(-x)=-f(x), то функция ...
- Как иначе называется независимая переменная?
- Название функции y=kx+b
- Как называется график функции обратной пропорциональности?
- Как называется первая координата точки М(х;у)?
- Каково взаимное расположение графиков функций у=7х-2 и у= 5х?
21 Clues: Название функции y=kx+b • Один из способов задания функции • Один из способов задания функции • Название функции y=kx – прямая … • Название функции y=ax²+bx+c (a≠0) • Что является графиком функции y=x²? • При а<0 ветви параболы направлены … • Что является графиком линейной функции? • Как иначе называется независимая переменная? • ...
ĐƠN ĐIỆU, CỰC TRỊ, MAX-MIN 2023-07-03
Across
- Nếu y'>0 với mọi x thuộc (a;b) thì hàm số ??? trên khoảng (a;b)
- Điều kiện của m để hàm số y=(mx+2m+3)/(x+m) nghịch biến trên khoảng (-3;-1)
- GTLN của hàm số y=x+4/x trên đoạn [1;5]
- Một thông điệp của trường LTV
- Câu nói bất hủ của chú Huấn Rose
- Điều kiện để hàm bậc ba có cực trị là y' của nó có ???
- Hàm đa thức y=f(x) đạt cực trị tại x=2 thì ta có ???
Down
- Một bạn được Thầy xem là ... cá biệt trong Nhóm mình
- Nếu 24a+b^3=0 thì 3 điểm cực trị của ĐTHS y=ax^4+bx^2+c tạo thành một ???
- Hàm số nào trong các hàm số sau có thể nghịch biến trên R: Hàm bậc hai, hàm bậc ba, hàm bậc bốn trùng phương, hàm nhất biến?
- Điều kiện của m để hàm số y=-5x^4+(m-2)x^2+m^2-9 có đúng 1 điểm cực trị
- GTLN của hàm số y=x^3-3x^2-9x+110 trên đoạn [-2;2]
- Tổng GTLN và GTNN của hàm số y=x^4-2x^2+3 trên đoạn [0;2]
- Nếu với mọi x1, x2 thuộc (a;b); x1<x2 ta đều có f(x1)>f(x2) thì hàm số f(x) ??? trên (a;b)
- GTNN của hàm số f(x)=(a+3)x^4-2ax^2+100 trên đoạn [0;3](với a là tham số) biết GTLN của f(x) trên đoạn [0;3] là f(2)
- Nếu f(x)<=q với mọi x thuộc tập K và có x0 thuộc K để f(x0)=q thì q là ??? của f(x) trên K
- Điều kiện của m để tổng GTLN và GTNN của hàm số f(x)=(x+m)/(x+1) trên đoạn [1;2] bằng 16/3
- Một bạn được Thầy xem là ... đáng yêu trong Nhóm mình
- Điều kiện để hàm y=ax^4+bx^2+c có ba điểm cực trị là gì?
- Gọi x0 là điểm cực đại của hàm số f(x) có f'(x)=(x^2-9)(x-9). Tính x0^3
20 Clues: Một thông điệp của trường LTV • Câu nói bất hủ của chú Huấn Rose • GTLN của hàm số y=x+4/x trên đoạn [1;5] • GTLN của hàm số y=x^3-3x^2-9x+110 trên đoạn [-2;2] • Một bạn được Thầy xem là ... cá biệt trong Nhóm mình • Hàm đa thức y=f(x) đạt cực trị tại x=2 thì ta có ??? • Một bạn được Thầy xem là ... đáng yêu trong Nhóm mình • ...
Dertivatives 2023-09-17
24 Clues: e^x • 1/x • -sinx • 1/2√x • sec^2x • -1/x^2 • -csc^2x • 1/1+x^2 • d/dxx^n • a^x*lna • udv+vdu • d/dxsinx • secxtanx • -1/1+x^2 • 1/√1-x^2 • -1/√1-x^2 • piecewise • d/dx(u/v) • -cscxcotx • d/dxlogax • 1/|x|√x^2-1 • -1/|x|√x^2-1 • f'(g(x))*g'(x) • d/dxf(x)+-d/dxg(x)
math 2022-04-12
Across
- if f'(x) is increasing, this is up
- 1/n^p
- rate of change of a function
- 1/cotangent
- greek symbol for angle
- change in y/change in x
- name of series for 1/n
- series for ar^n
- a1 + a2 + a3 + a4 + ... + an
- M(x-c)^n+1/(n+1)!
Down
- 1/sin
- if f'(c) exists for all c in -infinity<c<infinity
- 1/cos
- opposite/hypotenuse
- a1 , a2 , a3 , a4 , ... , an
- a function that has no jumps or holes
- a series centered at x = 0
- another word for integral
- adjacent/hypotenuse
- 1/tangent
20 Clues: 1/sin • 1/cos • 1/n^p • 1/tangent • 1/cotangent • series for ar^n • M(x-c)^n+1/(n+1)! • opposite/hypotenuse • adjacent/hypotenuse • greek symbol for angle • name of series for 1/n • change in y/change in x • another word for integral • a series centered at x = 0 • rate of change of a function • a1 + a2 + a3 + a4 + ... + an • a1 , a2 , a3 , a4 , ... , an • if f'(x) is increasing, this is up • ...
TTS MTKP Kel 5 XI A 3 2023-03-06
Across
- Diket f(x)=x³+2x²-3x+1, nilai dari 2f(2)-2f(1) adalah
- Jika f(x(=4x³+bx²+2 dengan 2f(2)+2=270. Nilai b adalah..
- Proses penggantian nilai variabel ke bentuk aljabar adalah..
- Bentuk polinomial yang dihasilkan dari pembagian suatu polinomial oleh polinomial lain adalah
- P(x) dibagi x²-3x-4 sisa (2x-1),maka p(x) dibagi (x-5)bersisa..
- Nilai limit x mendekati 2 dari 2x³+x²-6x-1 adalah..
- Persamaan suku banyak 4x⁴+2x³+7x²+6x+51 mempunyai konstanta..
- Garis yang lurus dengan garis singgung sehingga hubungan gradien mg×mn=-1 adalah garis..
Down
- Persamaan garis singgung lingkaran apabila m1=m2 disebut..
- Hasil bagi dari P(x)=4x³+12x²+4x-3 dibagi x²+2x-1 adalah
- Fungsi f(x)=kx³-4x²+2x-8 dengan f(2)=4, maka 3f(2)-3k=?
- Bentuk f'(x) untuk menentukan turunan ditentukan dengan konsep..
- P(x)=6x⁴-2x³-5x²+3x+2 terdiri dari 5..
- Sisa bagi dari P(x)=2x²-3x+1 dibagi (x-2) adalah..
- Pers. lingkaran x²+y²+2x+6y+2=0 jari jarinya adalah..
- Titik x didalam suatu fungsi disebut..
- Persamaan lingkaran x²+y²+10x-16y+p mempunyai jari jari 9. Nilai p adalah..
- Nilai dari limit mendekati 7 dari 3√7×√x+11/x-6 adalah..
- Jika didalam suatu fungsi f'(x)>0,fungsi tersebut disebut fungsi..
- Jika f'(x)=7x⁶,maka f(x)n-nya adalah x pangkat..
20 Clues: P(x)=6x⁴-2x³-5x²+3x+2 terdiri dari 5.. • Titik x didalam suatu fungsi disebut.. • Jika f'(x)=7x⁶,maka f(x)n-nya adalah x pangkat.. • Sisa bagi dari P(x)=2x²-3x+1 dibagi (x-2) adalah.. • Nilai limit x mendekati 2 dari 2x³+x²-6x-1 adalah.. • Diket f(x)=x³+2x²-3x+1, nilai dari 2f(2)-2f(1) adalah • Pers. lingkaran x²+y²+2x+6y+2=0 jari jarinya adalah.. • ...
math 2022-04-12
Across
- a series centered at x = 0
- change in y/change in x
- greek symbol for angle
- opposite/hypotenuse
- series for ar^n
- 1/n^p
- if f'(c) exists for all c in -infinity<c<infinity
- if f'(x) is increasing, this is up
- M(x-c)^n+1/(n+1)!
- name of series for 1/n
Down
- 1/cos
- rate of change of a function
- a function that has no jumps or holes
- 1/sin
- a1 + a2 + a3 + a4 + ... + an
- another word for integral
- 1/tangent
- a1 , a2 , a3 , a4 , ... , an
- 1/cotangent
- adjacent/hypotenuse
20 Clues: 1/cos • 1/sin • 1/n^p • 1/tangent • 1/cotangent • series for ar^n • M(x-c)^n+1/(n+1)! • opposite/hypotenuse • adjacent/hypotenuse • greek symbol for angle • name of series for 1/n • change in y/change in x • another word for integral • a series centered at x = 0 • rate of change of a function • a1 + a2 + a3 + a4 + ... + an • a1 , a2 , a3 , a4 , ... , an • if f'(x) is increasing, this is up • ...
First Semester Calculus 2013-01-10
Across
- valleys
- a function is _______ if f(c) is defined, the limit as x approaches c f(x) exists, and f(c)=the limit as x approaches c f(x)
- refers to the rate of change (derivative)
- the derivative of the outside, leave the inside alone, times the derivative of the inside
- states that there is a line tangent to the curve at some point that has the same slope as the secant line
- a line the function almost touches, but never does
- deciding what quantity to be maximized or minimized in terms of only one variable
- used as a form of solving for x if it cannot be factored
- d/dx (f(x)times g(x))= f'(x) times g(x)+f(x) times g'(x)
- when f(x) becomes arbitrarily close to a unique number as x approaches c from either side
- d/dx (f(x)+or-g(x))
- d/dx (lnx) = 1/x
- when f''(x)=0
- the derivative of any constant is 0
- marginal revenue - marginal cost
- d/dx (c times x^n) = c times nx^n-1
- hills
- graph is frowning (f''(x)<0)
Down
- the slope of a line tangent to a curve at any point
- a way of finding limits by factoring, then cancelling and plugging in x
- can describe a limit that does not exist
- states that if f satisfies the conditions of the theorem, then there must be at least 1 point between a and b at which f'(x)=0
- used mostly to determine if there is a zero of the function on an indicated interval
- along the x-axis
- holes, asymptotes, and jumps
- a way of finding limits by plugging in x
- when the derivative is either zero or undefined
- used when limits end in an indeterminate form
- graph is smiling (f''(x)>0)
- the derivative of x to n power is n times x to the n-1
30 Clues: hills • valleys • when f''(x)=0 • along the x-axis • d/dx (lnx) = 1/x • d/dx (f(x)+or-g(x)) • graph is smiling (f''(x)>0) • holes, asymptotes, and jumps • graph is frowning (f''(x)<0) • marginal revenue - marginal cost • the derivative of any constant is 0 • d/dx (c times x^n) = c times nx^n-1 • can describe a limit that does not exist • a way of finding limits by plugging in x • ...
nulwaarden van tweedegraadsfuncties 2019-11-09
12 Clues: f(x)=1/2x² • f(x)=x²-25 • f(x)=3x²-x • f(x)=3x²-9x • f(x)=4x²-16 • f(x)=3x²-x+2 • f(x)=x²-x-12 • f(x)=x²-2x+1 • f(x)=-2x²+3x+2 • f(x)=4x²-12x+9 • f(x)=3x²-14x-5 • f(x)=-2x²-20x-48
AP CALC AB 2022-05-18
Across
- _____ is the derivative of position
- _____ is the derivative of velocity
- _____ is the antiderivative of velocity
- the derivative of cscx
- ______ is a straight line that touches a function at only one point.
- the derivative of secx
- _______ is defined as, On closed interval [a,b], f(a) not = f(b), and k is a number between f(a) and f(b), then there is at least one number c in [a,b] such that f(c)=k
- the derivative of sinx
- d/dx[x^n]=nx^n-1
Down
- Solve: lim(x->5-)= x-5/x^2-25
- gf’-g’f/g^2
- The _____ of a graph can be determined by using the second derivative.
- French mathematician
- the derivative of a function can be interpreted as____
- f'(c)= f(b)-f(a)/b-a
- Differentiability implies ________but________doesn’t imply differentiability
- lim(x->0)= sinx/x
- the smallest value in the data set
- lim(x->0)= 1-cosx/x
- fg'+ gf’
20 Clues: fg'+ gf’ • gf’-g’f/g^2 • d/dx[x^n]=nx^n-1 • lim(x->0)= sinx/x • lim(x->0)= 1-cosx/x • French mathematician • f'(c)= f(b)-f(a)/b-a • the derivative of cscx • the derivative of secx • the derivative of sinx • Solve: lim(x->5-)= x-5/x^2-25 • the smallest value in the data set • _____ is the derivative of position • _____ is the derivative of velocity • _____ is the antiderivative of velocity • ...
Calculus Crossword 2022-05-12
Across
- function is continuous from (a,b) it must have a max or min from (a,b) and could be the endpoints
- f”(x) changes sign at x=0
- f’(x) goes -to+
- perpendicular - slope is opposite reciprocal
- f’(x) neg
- f’(x) = 0
- f(b)-f(a)/b-a
- derivative of position and integral of acceleration
- area under the curve
- sharp turn in a graph
- same slope
- |v(x)|
Down
- derivative and original are continuous
- integral of velocity
- integral from a to b (|v(x)|dx)
- derivative of velocity
- f'(x) goes +to-
- f”(X) neg
- f’(x)=0
- (1/b-a) integral from a to b (f(x)dx)
- f(b)=f(a)+integral from a to b (f’(x)dx)
- f’(x) is undefined
- f’(x) pos
- f(b)-f(a)/b-a = f’(x)
- f”(x) pos
25 Clues: |v(x)| • f’(x)=0 • f”(X) neg • f’(x) pos • f’(x) neg • f”(x) pos • f’(x) = 0 • same slope • f(b)-f(a)/b-a • f'(x) goes +to- • f’(x) goes -to+ • f’(x) is undefined • integral of velocity • area under the curve • f(b)-f(a)/b-a = f’(x) • sharp turn in a graph • derivative of velocity • f”(x) changes sign at x=0 • integral from a to b (|v(x)|dx) • (1/b-a) integral from a to b (f(x)dx) • ...
Übungen für die 4. Schularbeit 2023-05-11
Across
- Übersetzung von quarum
- Was heißt: interficere?
- Übersetzung von cui (männlich)
- dare in der 1. P. Sg. Plusquamperfekt
- Was heißt: Himmel
- is meridies im 2. F. Sg. (zusammengeschrieben)
- is casus im 2. F. Pl. (zusammengeschrieben)
- Was heißt: rex?
- Übersetzung von cuius (männlich)
- qui/quae/quod im 2. F. Sg.
- ea res im 2. F. Pl. (zusammengeschrieben)
- Was heißt: opus?
- scire in der 1. P. Pl. Plusquamperfekt
- quaerere in der 3. P. Sg. Plusquamperfekt
- Übersetzung von quibus
Down
- Was heißt: petere a?
- Was heißt: idem?
- tangere in der 2. P. Pl. Plusquamperfekt
- Übersetzung von quem
- Was heißt: debere?
- is dies im 3. F. Sg. (zusammengeschrieben)
- Was heißt: primo?
- ea manus im 4. F. Sg. (zusammengeschrieben)
- Was heißt: nihil?
- conspicere in der 3. P. Pl. Plusquamperfekt
- is metus im 6. F. Sg. (zusammengeschrieben)
- qui/quae/quod im 6. F. Pl.
- qui/quae/quod im 6. F. Sg. (männlich)
- qui/quae/quod im 4. F. Pl. (weiblich)
- is casus im 4. F. Pl. (zusammengeschrieben)
- Was heißt: scire?
- Was heißt: iussum?
- Was heißt: cadere?
33 Clues: Was heißt: rex? • Was heißt: idem? • Was heißt: opus? • Was heißt: primo? • Was heißt: Himmel • Was heißt: nihil? • Was heißt: scire? • Was heißt: debere? • Was heißt: iussum? • Was heißt: cadere? • Was heißt: petere a? • Übersetzung von quem • Übersetzung von quarum • Übersetzung von quibus • Was heißt: interficere? • qui/quae/quod im 6. F. Pl. • qui/quae/quod im 2. F. Sg. • ...
Derivative Crossword 2013-09-30
Across
- Derivative of f(x)=4x^8
- Derivative of f(x)=20x^3+4x^2+10x
- Equation of tangent line to f(x)=3x^3+4x^2+9 at (1,16)
- Derivative of f(x)=4cosx
- Derivative of f(x)=(2x+5)/(3x^3+2)
- Derivative of f(x)=865,621,6387
- Derivative of f(x)=5cotx
- Derivative of f(x)=6sinx
- Derivative of f(x)=2tanx
Down
- Derivative of f(x)=x^5
- Derivative of f(x)=3secx
- Equation of normal line to f(x)=3x^2-2x+1 at (2,9)
- Derivative of f(x)=(4x+9)(6x^2)
- Derivative of f(x)=10cscx
- Derivative of f(x)=20x
15 Clues: Derivative of f(x)=x^5 • Derivative of f(x)=20x • Derivative of f(x)=4x^8 • Derivative of f(x)=3secx • Derivative of f(x)=4cosx • Derivative of f(x)=5cotx • Derivative of f(x)=6sinx • Derivative of f(x)=2tanx • Derivative of f(x)=10cscx • Derivative of f(x)=(4x+9)(6x^2) • Derivative of f(x)=865,621,6387 • Derivative of f(x)=20x^3+4x^2+10x • Derivative of f(x)=(2x+5)/(3x^3+2) • ...
UNIT 1 VOCABULARY 2023-07-30
Across
- A type of parent function is f(x) = x^(1/2)
- The set of output values.
- The point ( x , 0) on a graph.
- Highest power in a polynomial.
- The set of input values.
- A type of parent function is f(x) = |x|
- Lowest point of a function.
- A type of parent function is f(x) = mx + b
- If a is less than b in the domain and f(a) less than f(b), then the functions is ___
- Highest point of a function.
- If a is less than b in the domain and f(a) equal to f(b), then the functions is ___
- A type of parent function is f(x) = x^2
- A mathematical relation that maps each input value to exactly one output value.
- The point ( 0 , y) on a graph.
Down
- A type of parent function is f(x) = 3^x
- A type of parent function is f(x) =1/x
- A function that has y axis symmetry.
- A type of parent function is f(x) = logx
- A function that has rotational symmetry.
- If a is less than b in the domain and f(a) greater than f(b), then the functions is ___
- A type of parent function is f(x) = x^3
- Rate of change.
- A place in a function that the graph will eventually approach.
- a + bi versus a - bi
24 Clues: Rate of change. • a + bi versus a - bi • The set of input values. • The set of output values. • Lowest point of a function. • Highest point of a function. • The point ( x , 0) on a graph. • Highest power in a polynomial. • The point ( 0 , y) on a graph. • A function that has y axis symmetry. • A type of parent function is f(x) =1/x • A type of parent function is f(x) = 3^x • ...
Calculus I Crossword - Arman & Daniel 2022-05-24
Across
- If h(x)<f(x)<g(x) and if limit, as x->c, of h(x)= limit, as x->c, of g(x), then limit, as x->c, of f(x) must = limit, as x->c, of h(x) (and limit, as x-c of g(x) by transitive laws).
- f(g(x))=x. 1/f'(g(x))=g'(x). g(x) is the ______ of f(x).
- d/dx [f(x)/g(x)] = [g(x)•f'(x) - f(x)•g'(x)]/[g(x)]^2. ________ rule
- ∫f(x)dx can be approximated with lim n->∞ Σf(cᵢ + kΔx/n)(b-a)/n. i=1. ______ riemann sum
- lim, as x->c, f(x)/g(x) = lim, as x->c, f'(x)/g'(x) only if lim, as x->c, of f(x) and g(x), separately, are both 0 or infinity.
- [ax + b] -> [ax - b]. This process is called finding the…
Down
- π• ∫R^2 - r^2 dx from [a,b] **Where R= f(x) - axis of rotation and r= g(x) - axis of rotation and f(x)>g(x) on [a,b]. ______ method
- lim n->∞ Σf(xcᵢ)(b-a)/n. i=1.
- ∫f(x)dx can be approximated with lim n->∞ Σf(cᵢ + (i-1)Δx/n)(b-a)/n. i=1. _____ riemann sum
- d/dx [f(g(x))] = f'(g(x)) • g'(x) _____ rule.
- ∫f(x)dx can be approximated by lim n->∞ Δx/2 Σf(xᵢ₋₁) + f(xᵢ). i=1.
- d/dx [ f(x)•g(x)] = f'(x)•g(x) + g'(x)•f(x). ______ rule
- π• ∫[f(x)]^2 dx from [a,b], where f(x) is a radius, r.
13 Clues: lim n->∞ Σf(xcᵢ)(b-a)/n. i=1. • d/dx [f(g(x))] = f'(g(x)) • g'(x) _____ rule. • π• ∫[f(x)]^2 dx from [a,b], where f(x) is a radius, r. • f(g(x))=x. 1/f'(g(x))=g'(x). g(x) is the ______ of f(x). • d/dx [ f(x)•g(x)] = f'(x)•g(x) + g'(x)•f(x). ______ rule • [ax + b] -> [ax - b]. This process is called finding the… • ...
Être et les Adjectifs 2021-05-20
Across
- happy, content (m)
- heavy (f)
- heavy (m)
- ugly (m)
- smart (f)
- ugly (f)
- handsome
- redhead (f)
- Canadian (f)
- English (f)
- thin, skinny (1)
- beautiful
- big, tall (m)
- American (m)
- thin, skinny (2)
- very
- blond (m)
- happy, content (f)
- French (m)
- kind of
- young
- angry, mad (m)
- bad (f)
- small, short (f)
- older (m)
- tired (f)
- older (f)
Down
- silly, dumb
- pretty (m)
- sad
- mean (f)
- nice, pleasant
- big, tall (f)
- funny
- bad (m)
- blond (f)
- mean (m)
- pretty (f)
- brunette (f)
- small, short (m)
- smart (m)
- Canadian (m)
- athletic (m)
- nice (f)
- sick
- American (f)
- redhead (m)
- old (f)
- brunette (m)
- happy (f)
- athletic (f)
- French (f)
- angry, mad (f)
- nice (m)
- tired
- English (m)
- old (m)
- happy (m)
58 Clues: sad • sick • very • funny • young • tired • bad (m) • old (f) • kind of • bad (f) • old (m) • mean (f) • ugly (m) • ugly (f) • mean (m) • handsome • nice (f) • nice (m) • heavy (f) • heavy (m) • smart (f) • blond (f) • smart (m) • beautiful • blond (m) • happy (f) • older (m) • happy (m) • tired (f) • older (f) • pretty (m) • pretty (f) • French (f) • French (m) • silly, dumb • redhead (f) • English (f) • redhead (m) • English (m) • brunette (f) • Canadian (f) • ...
RED TIGHT 2024-01-08
30 Clues: B-2 • C-5 • C-17 • F-14 • AH-1 • MI-2 • A-10 • AN-2 • MI-8 • MQ-1 • F-15 • J-10 • F-7P • RQ-2 • CH-47 • A-129 • MI-28 • RQ-7B • WG-13 • C-160 • SA365 • SU-27 • MIG-29 • OH-58D • SA-330 • MIG-27 • MIG-31 • TU-160 • MD-500 • JAS-39
AB Calculus Crossword 2014-05-12
Across
- If f ‘(c)=0 and f “(x)<0, then f has a ______ at x=c
- If f’ does not change sign at c (f’ has the same sign on both sides of c) then f has no local ____ value.
- if function f(x) has a derivative, it is ______
- if f “(x)>0
- the process of finding a curve to fit data
- rule f(x)=x^n , f ‘(x)=nx^n-1
- problems involving the relationship between two or more rates
- Calculator function used to find derivative
- F=kx
- “The limit does not exist!!”
- [a,b]
- a^2+b^2=c^2
- when a function is differentiable at a point a that closely resembles its own tangent line very close to a
- The largest segment of a partition
- another name for the Fundamental Theorem of Calculus
- Deriving an equation with two variables is __________ differentiation
- If the function is concave down and you are finding LRAM, the area under the curve is a _______
- Find y’ of y=ln(secx+tanx)
- when marginal revenue equals marginal cost
- The definite integral of the force times distance over which the force is applied
- the function reflected over the line y=x
- Suppose u and v are functions of x that are differentiable at x=0, and that u(0)=5, u‘(0)= -3, v(0)= -1, v’(0)=2. Find d/dx(uv)
- The ______ dx is an independent variable and the _____ dy = f ‘(x)dx
- notation
- Absolute value of position
Down
- instantaneous rate of change
- This is an example of f(x)=cos(x^3); f ’(x)= -3x^2(sin(x^3))
- The third derivative of position
- y=y0e^kt
- If velocity is positive and speed is decreasing, then acceleration is _____
- where the function is continuous but not differentiable
- (LRAM+RRAM)/2)=
- the line about which a solid of revolution is generated
- a point near which the function values oscillate too much for the function to have a limit
- a function y=f(x) that is continuous on [a,b] takes on every value between f(a) and f(b)
- Δx=x2-x1 and Δy=y2-y1
- (a,b)
- If velocity is positive and decreasing, then speed is _____
- (ln2/k)
- if f ‘(x)=(1/(1+x^2)), then f(x)=?
- ln(x/x)=?
- Reimann sum using midpoints
- (2π/b) describes this
- ∆f=f(a+dx)-f(a)
- when maximizing or minimizing some aspect of the system being modified
- ((absolute max of f-absolute min of f)/2)
- L(x)=f(a)+f ‘(a)(x-a)
- y=mx+b
- where one-sided limits exist but have different values
- the easiest way to do separation by parts
- (∆x/∆t)
- Change in concavity
- T-Ts=(T0-Ts)e^-kt
- Application of local linearity used to graph a solution without knowing its equation
- If a function is continuous on [a,b] and differentiable on (a,b), then there exists a point c on (a,b) where f ‘(x)=((f(b)-f(a))/(b-a))
- theorem
- LRAM,MRAM,RRAM
- If f “(x)>0 and you are finding LRAM, its an _____
- a point that is extremely essential ( if f ‘(x)=0, where x=?)
- circle with radius of 1
- the length of a rectangle increases by 5 cm/sec and the width decreases by 2 cm/sec. Is the area increasing or decreasing when length=7 cm and width=4 cm
61 Clues: F=kx • (a,b) • [a,b] • y=mx+b • (ln2/k) • (∆x/∆t) • theorem • y=y0e^kt • notation • ln(x/x)=? • if f “(x)>0 • a^2+b^2=c^2 • LRAM,MRAM,RRAM • (LRAM+RRAM)/2)= • ∆f=f(a+dx)-f(a) • T-Ts=(T0-Ts)e^-kt • Change in concavity • Δx=x2-x1 and Δy=y2-y1 • (2π/b) describes this • L(x)=f(a)+f ‘(a)(x-a) • circle with radius of 1 • Find y’ of y=ln(secx+tanx) • Absolute value of position • Reimann sum using midpoints • ...
ΜΑΘΗΜΑΤΙΚΑ Γ ΄ΘΕΤΙΚΗΣ κεφαλαιο 1ο(1) 2020-03-31
Across
- ΕΙΝΑΙ ΘΕΩΡΗΜΑ ΛΕΓΕΤΑΙ ΚΡΙΤΗΡΙΟ
- ΕΙΝΑΙ ΤΟ f(xo)>=f(x), xoEDf
- ΔΕΝ ΕΙΝΑΙ Η ΕΞΙΣΩΣΗ ΤΟΥ ΚΥΚΛΟΥ
- ΜΑΛΛΟΝ ΘΑ ΤΑ ΞΕΠΕΡΑΣΟΥΜΕ ΜΕ ΤΟ "ΜΕΝΩ ΣΤΟ ΣΠΙΤΙ"
- lim(sinx/x) ,x-->0
- ΔΕΝ ΕΙΝΑΙ ΥΠΟΧΡΕΩΤΙΚΑ ΟΙ fog ΚΑΙ gof
Down
- ΗΕΞΙΣΩΣΗ f(x)=ψ EXEI..... MIA ΡΙΖΑ AN f:1-1
- ΕΙΝΑΙ ..ΜΙΑ ΜΟΥΣΙΚΗ .. ΑΛΛΑ ΓΝΗΣΙΩΣ, Η ΓΝ ΑΥΞΟΥΣΑ Η΄Η ΓΝ ΦΘΙΝΟΥΣΑ
- ΕΙΝΑΙ ΟΙ ΓΡΑΦΙΚΕΣ ΠΑΡΑΣΤΑΣΕΙΣ ΤΩΝ f, f^-1 ΩΣ ΠΡΟΣ ΤΗΝ ψ=x
- ..Η΄ΙΣΟ ΤΟ |sinx| ΤΟΥ |x|
- ΔΗΜΟΦΙΛΗΣ ΟΣΟ ΚΑΙ Ο ΧΟΡΝΕΡ ΑΛΛΑ ΕΠΑΝΑΣΤΑΤΗΣ
- lim((cosx-1)/x),x-->0
- limf(x)=f(xo),x-->ΧΟ
13 Clues: lim(sinx/x) ,x-->0 • limf(x)=f(xo),x-->ΧΟ • lim((cosx-1)/x),x-->0 • ..Η΄ΙΣΟ ΤΟ |sinx| ΤΟΥ |x| • ΕΙΝΑΙ ΤΟ f(xo)>=f(x), xoEDf • ΕΙΝΑΙ ΘΕΩΡΗΜΑ ΛΕΓΕΤΑΙ ΚΡΙΤΗΡΙΟ • ΔΕΝ ΕΙΝΑΙ Η ΕΞΙΣΩΣΗ ΤΟΥ ΚΥΚΛΟΥ • ΔΕΝ ΕΙΝΑΙ ΥΠΟΧΡΕΩΤΙΚΑ ΟΙ fog ΚΑΙ gof • ΗΕΞΙΣΩΣΗ f(x)=ψ EXEI..... MIA ΡΙΖΑ AN f:1-1 • ΔΗΜΟΦΙΛΗΣ ΟΣΟ ΚΑΙ Ο ΧΟΡΝΕΡ ΑΛΛΑ ΕΠΑΝΑΣΤΑΤΗΣ • ΜΑΛΛΟΝ ΘΑ ΤΑ ΞΕΠΕΡΑΣΟΥΜΕ ΜΕ ΤΟ "ΜΕΝΩ ΣΤΟ ΣΠΙΤΙ" • ...
TTS MATEMATIKA 2023-08-27
Across
- Himpunan yang membatasi "keluaran" suatu fungsi
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
Down
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- Gabungan objek yang memiliki definisi yang jelas
- Sebutan lain dari fungsi On-To
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
TTS MATEMATIKA 2023-08-27
Across
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- Gabungan objek yang memiliki definisi yang jelas
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
- Himpunan yang membatasi "keluaran" suatu fungsi
Down
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Sebutan lain dari fungsi On-To
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
AB Calculus Crossword 2014-05-12
Across
- the function reflected over the line y=x
- notation
- Δx=x2-x1 and Δy=y2-y1
- If a function is continuous on [a,b] and differentiable on (a,b), then there exists a point c on (a,b) where f ‘(x)=((f(b)-f(a))/(b-a))
- The third derivative of position
- LRAM,MRAM,RRAM
- [a,b]
- (∆x/∆t)
- If f “(x)>0 and you are finding LRAM, its an _____
- a point near which the function values oscillate too much for the function to have a limit
- If f’ does not change sign at c (f’ has the same sign on both sides of c) then f has no local ____ value.
- Suppose u and v are functions of x that are differentiable at x=0, and that u(0)=5, u‘(0)= -3, v(0)= -1, v’(0)=2. Find d/dx(uv)
- a point that is extremely essential ( if f ‘(x)=0, where x=?)
- the process of finding a curve to fit data
- If f ‘(c)=0 and f “(x)<0, then f has a ______ at x=c
- (2π/b) describes this
- L(x)=f(a)+f ‘(a)(x-a)
- If the function is concave down and you are finding LRAM, the area under the curve is a _______
- the line about which a solid of revolution is generated
- when marginal revenue equals marginal cost
- ∆f=f(a+dx)-f(a)
- where one-sided limits exist but have different values
- a function y=f(x) that is continuous on [a,b] takes on every value between f(a) and f(b)
- The definite integral of the force times distance over which the force is applied
- T-Ts=(T0-Ts)e^-kt
- F=kx
- circle with radius of 1
- y=y0e^kt
- problems involving the relationship between two or more rates
- Application of local linearity used to graph a solution without knowing its equation
- when a function is differentiable at a point a that closely resembles its own tangent line very close to a
- Absolute value of position
- This is an example of f(x)=cos(x^3); f ’(x)= -3x^2(sin(x^3))
- ln(x/x)=?
- the length of a rectangle increases by 5 cm/sec and the width decreases by 2 cm/sec. Is the area increasing or decreasing when length=7 cm and width=4 cm
Down
- The ______ dx is an independent variable and the _____ dy = f ‘(x)dx
- if f “(x)>0
- If velocity is positive and speed is decreasing, then acceleration is _____
- a^2+b^2=c^2
- y=mx+b
- Reimann sum using midpoints
- “The limit does not exist!!”
- instantaneous rate of change
- Change in concavity
- the easiest way to do separation by parts
- Calculator function used to find derivative
- Deriving an equation with two variables is __________ differentiation
- where the function is continuous but not differentiable
- another name for the Fundamental Theorem of Calculus
- rule f(x)=x^n , f ‘(x)=nx^n-1
- The largest segment of a partition
- (LRAM+RRAM)/2)=
- if f ‘(x)=(1/(1+x^2)), then f(x)=?
- if function f(x) has a derivative, it is ______
- (a,b)
- theorem
- Find y’ of y=ln(secx+tanx)
- ((absolute max of f-absolute min of f)/2)
- If velocity is positive and decreasing, then speed is _____
- when maximizing or minimizing some aspect of the system being modified
- (ln2/k)
61 Clues: F=kx • [a,b] • (a,b) • y=mx+b • (∆x/∆t) • theorem • (ln2/k) • notation • y=y0e^kt • ln(x/x)=? • if f “(x)>0 • a^2+b^2=c^2 • LRAM,MRAM,RRAM • (LRAM+RRAM)/2)= • ∆f=f(a+dx)-f(a) • T-Ts=(T0-Ts)e^-kt • Change in concavity • Δx=x2-x1 and Δy=y2-y1 • (2π/b) describes this • L(x)=f(a)+f ‘(a)(x-a) • circle with radius of 1 • Find y’ of y=ln(secx+tanx) • Absolute value of position • Reimann sum using midpoints • ...
AB Calculus Crossword 2014-05-12
Across
- (∆x/∆t)
- If f’ does not change sign at c (f’ has the same sign on both sides of c) then f has no local ____ value.
- (2π/b) describes this
- the length of a rectangle increases by 5 cm/sec and the width decreases by 2 cm/sec. Is the area increasing or decreasing when length=7 cm and width=4 cm
- (a,b)
- Calculator function used to find derivative
- Suppose u and v are functions of x that are differentiable at x=0, and that u(0)=5, u‘(0)= -3, v(0)= -1, v’(0)=2. Find d/dx(uv)
- theorem
- instantaneous rate of change
- y=mx+b
- if f “(x)>0
- where one-sided limits exist but have different values
- This is an example of f(x)=cos(x^3); f ’(x)= -3x^2(sin(x^3))
- ln(x/x)=?
- another name for the Fundamental Theorem of Calculus
- if f ‘(x)=(1/(1+x^2)), then f(x)=?
- when a function is differentiable at a point a that closely resembles its own tangent line very close to a
- The largest segment of a partition
- F=kx
- problems involving the relationship between two or more rates
- “The limit does not exist!!”
- a^2+b^2=c^2
- when marginal revenue equals marginal cost
- The third derivative of position
- Find y’ of y=ln(secx+tanx)
Down
- LRAM,MRAM,RRAM
- y=y0e^kt
- Δx=x2-x1 and Δy=y2-y1
- (LRAM+RRAM)/2)=
- Absolute value of position
- The ______ dx is an independent variable and the _____ dy = f ‘(x)dx
- Change in concavity
- a point near which the function values oscillate too much for the function to have a limit
- [a,b]
- the line about which a solid of revolution is generated
- Application of local linearity used to graph a solution without knowing its equation
- If velocity is positive and decreasing, then speed is _____
- ((absolute max of f-absolute min of f)/2)
- Reimann sum using midpoints
- circle with radius of 1
- if function f(x) has a derivative, it is ______
- when maximizing or minimizing some aspect of the system being modified
- Deriving an equation with two variables is __________ differentiation
- the process of finding a curve to fit data
- L(x)=f(a)+f ‘(a)(x-a)
- If the function is concave down and you are finding LRAM, the area under the curve is a _______
- a function y=f(x) that is continuous on [a,b] takes on every value between f(a) and f(b)
- T-Ts=(T0-Ts)e^-kt
- (ln2/k)
- If a function is continuous on [a,b] and differentiable on (a,b), then there exists a point c on (a,b) where f ‘(x)=((f(b)-f(a))/(b-a))
- If f ‘(c)=0 and f “(x)<0, then f has a ______ at x=c
- where the function is continuous but not differentiable
- If f “(x)>0 and you are finding LRAM, its an _____
- the easiest way to do separation by parts
- a point that is extremely essential ( if f ‘(x)=0, where x=?)
- The definite integral of the force times distance over which the force is applied
- notation
- rule f(x)=x^n , f ‘(x)=nx^n-1
- If velocity is positive and speed is decreasing, then acceleration is _____
- ∆f=f(a+dx)-f(a)
- the function reflected over the line y=x
61 Clues: F=kx • [a,b] • (a,b) • y=mx+b • (∆x/∆t) • theorem • (ln2/k) • y=y0e^kt • notation • ln(x/x)=? • if f “(x)>0 • a^2+b^2=c^2 • LRAM,MRAM,RRAM • (LRAM+RRAM)/2)= • ∆f=f(a+dx)-f(a) • T-Ts=(T0-Ts)e^-kt • Change in concavity • Δx=x2-x1 and Δy=y2-y1 • (2π/b) describes this • L(x)=f(a)+f ‘(a)(x-a) • circle with radius of 1 • Absolute value of position • Find y’ of y=ln(secx+tanx) • Reimann sum using midpoints • ...
TTS MATEMATIKA 2023-08-27
Across
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- Gabungan objek yang memiliki definisi yang jelas
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
- Himpunan yang membatasi "keluaran" suatu fungsi
Down
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Sebutan lain dari fungsi On-To
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
AP Calculus Exam 2023-05-24
Across
- f(-x) = f(x) means that f(x) is ___
- at x=c where the derivative switches from negative to positive and vice versa
- typically done with a table of points. be cure to only use the values that are given. if you are given 7 points, you can only calculate 3 midpoint rectangles
- f''(x) switches from positive to negative and vice versa
- f(x) is continuous, f(a)<k and f(b)>k, a<c<b and f(c)=k
- dy/dt=ky which translates to y=Ce^kt means that y is increasing ___ to y
- outer radius = f(x), inner radius = g(x). V= pi a to b ([f(x)]^2 - [g(x)]^2) dx
- sign chart to find sign of f'(x). positive means f(x) is ___
- radius=f(x): V= pi a to b [f(x)]^2 dx
- lim x->infinity and lim x->-infinity
- use ___ to find derivative f(g(x))
- Is Mr.Duong the best calculus teacher?
- f is continuous and differentiable on [a,b]. f(a)=f(b), then find c on [a,b] such that f'(c)= f(b)-f(a)/b-a
- f(-x) = -f(x) means that f(x) is ___
- find f(b)-f(a)/b-a
- express f'(x) as a fraction. set both numerator and denominator to 0 and solve
Down
- f is continuous and differentiable on [a,b]. if f(a)=f(b), then find c on [a,b] so f'(c)=0
- set both functions of f(x) and g(x) equal to each other to find ___
- A =(b-a/2n)[f(x0)+2f(x1)+2f(x2)+...+2f(xn-1)+f(xn)]
- Express f(x) as a fraction and set denominator as 0
- using relative extrema evaluate f at these values. smallest is absolute ___
- using relative extrema evaluate f at these values. largest is absolute ___
- f(x) exists, f(a) exists, f(x)=f(a)
- find f'(a)
- A=(b-a/n)[f(x1)+f(x2)+...+f(xn)]
- use the points given and plug them into dy/dx, draw little lines with the calculated slopes at the point.
- lim h->0 f(x+h)-f(x)/h
- A=a to b [f(x)-g(x)]dx
- A=(b-a/n)[f(x0)+f(x1)+...+f(xn-1)]
- sign chart to find sign of f'(x). negative means f(x) is ___
30 Clues: find f'(a) • find f(b)-f(a)/b-a • lim h->0 f(x+h)-f(x)/h • A=a to b [f(x)-g(x)]dx • A=(b-a/n)[f(x1)+f(x2)+...+f(xn)] • use ___ to find derivative f(g(x)) • A=(b-a/n)[f(x0)+f(x1)+...+f(xn-1)] • f(-x) = f(x) means that f(x) is ___ • f(x) exists, f(a) exists, f(x)=f(a) • lim x->infinity and lim x->-infinity • f(-x) = -f(x) means that f(x) is ___ • ...
Crossword Function 2021-10-05
10 Clues: f(x)= 5x2 - 2√-3+7 • h(x)= x−2x+9x, find h(−2) • find f(t)= 5t−13 when t = 4 • find f(x) = 4x+5x+1 if f(2) • find f(x)= 3x - 5 when x= -1 • If f(x) = 3x2+5x+1 find f(2) • find f(x)= 1/2x + 9 if f(12) • find f(x)= x2 - 1 when x = 0 • find f(a)= a2 + 3a + 1 when a=4 • find f(x)= 4x2 - 2x + 5 if x= -3
TTS MATEMATIKA 2023-08-27
Across
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- Gabungan objek yang memiliki definisi yang jelas
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
- Himpunan yang membatasi "keluaran" suatu fungsi
Down
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Sebutan lain dari fungsi On-To
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
TTS MATEMATIKA 2023-08-27
Across
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- Himpunan yang membatasi "keluaran" suatu fungsi
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Gabungan objek yang memiliki definisi yang jelas
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
Down
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- Sebutan lain dari fungsi On-To
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
TTS MATEMATIKA 2023-08-27
Across
- Himpunan yang membatasi "keluaran" suatu fungsi
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
Down
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- Gabungan objek yang memiliki definisi yang jelas
- Sebutan lain dari fungsi On-To
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
TTS MATEMATIKA 2023-08-27
Across
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- Gabungan objek yang memiliki definisi yang jelas
- Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5)
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
- Himpunan yang membatasi "keluaran" suatu fungsi
Down
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- dua bilangan yang dijumlahkan hasilnya sama meskipun bilangannya berbeda dan letak antar-bilanganya ditukar.
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2)
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- himpunan semua anggota himpunan B yang memiliki pasangan anggota himpunan A.
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Sebutan lain dari fungsi On-To
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(x)=7,maka nilai x
20 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2, maka (F o G)(5) • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (H o F) (2) • ...
Crossword Function 2021-10-05
10 Clues: f(x)= 5x2 - 2√-3+7 • h(x)= x−2x+9x, find h(−2) • find f(x) = 4x+5x+1 if f(2) • find f(t)= 5t−13 when t = 4 • find f(x)= 3x - 5 when x= -1 • find f(x)= x2 - 1 when x = 0 • If f(x) = 3x2+5x+1 find f(2) • find f(x)= 1/2x + 9 if f(12) • find f(a)= a2 + 3a + 1 when a=4 • find f(x)= 4x2 - 2x + 5 if x= -3
SCR Stations 2023-09-07
Across
- Walkable Tramlink tracks, Zone F
- 0.26 miles from EJ, Zone B
- “Matty was ‘ere”, Zone A
- Upgraded 1.9.1, Zone F
- 2 entrances, Zone A
- Revamped 1.10.4, Zone A
- All WL services, Zone F
- 0.17 miles from PB, Zone F
- Near EKIA, Zone A
- VisitBodin ship, Zone F
- East/West Underpass, Zone F
- Serve R054 for AL, Zone B
- 1 passing track, Zone B
- Serve 4 operators, Zone D
- Serve 1 route, Zone A
- Near a big depot, Zone A
Down
- Charlie’s Surname, Zone A
- Too short for 5 coaches, Zone B
- Has merch, Zone A
- Can’t fit a 717, Zone A
- Most platforms, Zone A
- Near siding and triangle, Zone A
- CN terminus, WL through, Zone F
- Revamped 1.10.4, Zone B
- Near hospital, Zone A
- 3 overhauls, Zone B
- Tramlink terminus, Zone F
- Plat.3 for Depot, Zone F
- R022 skips, Zone A
- WL terminus dominate, Zone F
- Curvy platform, Zone A
- 2 adjacent sidings, Zone B
- OSI with Whitney Green, Zone B
- Serve R007, Zone B
- Has campaign, Zone B
35 Clues: Has merch, Zone A • Near EKIA, Zone A • R022 skips, Zone A • Serve R007, Zone B • 3 overhauls, Zone B • 2 entrances, Zone A • Has campaign, Zone B • Near hospital, Zone A • Serve 1 route, Zone A • Most platforms, Zone A • Upgraded 1.9.1, Zone F • Curvy platform, Zone A • Can’t fit a 717, Zone A • Revamped 1.10.4, Zone B • Revamped 1.10.4, Zone A • All WL services, Zone F • ...
calculus crossword 2022-05-09
Across
- F(x)
- f'(x)
- possible inflection point
- F(x) of cscxcotx
- y-values
- new position=initial position+net change
- derivative of a velocity function
- x-values
- the mathematic study of change
- as x approaches c
- highest point of a graph
- the derivative of ln x
Down
- rate of change of a function's derivative (smiley or frowny)
- how to "go up the ladder"
- f'(g(x))*g'(x)
- minimum or maximum
- slope of secant line
- slope of tangent line
- the class we take before calc ab/bc
- the derivative of cosx
- d/dx(u^n)=nu^(n-1)
- point on the graph of f(x) where f'(x)=0 or DNE
- derivative of a position function
- a kind of visualization of a differential equation (the thing with the 6-12 points)
- derivate of e^x
25 Clues: F(x) • f'(x) • y-values • x-values • f'(g(x))*g'(x) • derivate of e^x • F(x) of cscxcotx • as x approaches c • minimum or maximum • d/dx(u^n)=nu^(n-1) • slope of secant line • slope of tangent line • the derivative of cosx • the derivative of ln x • highest point of a graph • how to "go up the ladder" • possible inflection point • the mathematic study of change • derivative of a velocity function • ...
AP Calculus 2022-06-01
Across
- __ sum modelled by s = a/(1-r)
- __ term test; lim as n-> infinity not = to 0 means that the function is divergent
- allows one to calculate backwards from f'(x) to f(x)
- __ method; y = y(old) + h[dy/dx @ (x, y)]
- Taylor series about x=0
- __ rule; d/dx[f(x)g(x)]= f'(x)g(x)+g'(x)f(x)
- __ method; a method to integrate when integration by parts becomes excessively complex
- logistic __; dy/dt = ky(1 - (y/L)
- 1/(n^p); if p > 1, then the function converges, but if 0 < p < 1, then the function diverges
- d/dx[sin(x)]
- __ fractions; integration technique used to break down linear functions
- method used to calculate the volume of a solid when there is a gap between the function and the axis of revolution
- function must be continuous on closed interval; attains at least one maximum and minimum
- __ asymptote; set the denominator equal to 0
- __ division; integration technique used to break down linear functions
- method used to calculate the volume of a solid when there is not a gap between the function the axis of revolution
- derivative of position; if > 0, then particle moving right, but if < 0, then particle moving left
- __ derivative that is used to determine concavity; f"(x) > 0, then concave up and f"(x) < 0 then concave down
- d/dx[-cos(x)]
Down
- dy/dx; instantaneous rate of change
- must add this when calculating an indefinite integral
- function must be continuous and differentiable; average rate of change = instantaneous rate of change
- the formal definition of derivative is written as a __ statement
- __ of convergence; used to determine convergence of power series
- ex: 5*4*3*2*1; represented by a !
- growth that follows the model y=Ce^kt
- __ test; used to find minima and maxima on an interval
- lim as x->c(-) = lim as x->c(+) =
- __'s rule; used to determine the limit by taking the derivative of the top and bottom
- __ rule; d/dx[f(x)/g(x)]={[g(x)f'(x)]-[g'(x)f(x)]}/[g(x)]^2
- used to estimate the area under a curve (can be from the right, left, or middle)
31 Clues: d/dx[sin(x)] • d/dx[-cos(x)] • Taylor series about x=0 • __ sum modelled by s = a/(1-r) • ex: 5*4*3*2*1; represented by a ! • logistic __; dy/dt = ky(1 - (y/L) • lim as x->c(-) = lim as x->c(+) = • dy/dx; instantaneous rate of change • growth that follows the model y=Ce^kt • __ method; y = y(old) + h[dy/dx @ (x, y)] • __ rule; d/dx[f(x)g(x)]= f'(x)g(x)+g'(x)f(x) • ...
Chapter 2 Crossword Puzzle 2012-12-20
Across
- / the graph of f(x)=(x+1)^4 is a left _____, by one unit, of the graph y=x^4.
- / In a graph whose vertex is (0,0), if a<0, the vertex is the _______ point.
- / The graph of a quadratic function with a special U-Shaped curve is called a ________.
- / In the equation f(x)=x^3+x+1, 1 is the leading...
- / -a-bi is the _________ inverse of a+bi
- / negative coefficients in a polynomial function _______ the x-axis.
- / If a graph rises to the left and right in an even function, then the leading coefficient is ________.
- / (x-2)(x+1) are _______ of x^2-x-2.
- / antonym of imaginary.
- / x=a is a ________ of the polynomial equation f(x)=0.
Down
- / f(x)=a(x-h)^2+k is an equation written in ________ form.
- / The equation f(x)=ax^2+bx+c is a _________ function.
- / In an odd function, if the graph rises to the left and falls right, then the leading coefficient is _________.
- / Synonym of long division.
- / line of symmetry in a parabola.
- / The point were the axis intersects the parabola.
- / The theorem that tells you that synthetic division can be used to evaluate a polynomial function.
- / A ____ of a function is a number x for which f(x)=0
- / The graph of a polymial function is...
- / The equation f(x)=mx+b is a ______ function.
20 Clues: / antonym of imaginary. • / Synonym of long division. • / line of symmetry in a parabola. • / (x-2)(x+1) are _______ of x^2-x-2. • / The graph of a polymial function is... • / -a-bi is the _________ inverse of a+bi • / The equation f(x)=mx+b is a ______ function. • / The point were the axis intersects the parabola. • / In the equation f(x)=x^3+x+1, 1 is the leading... • ...
Chapter 2 Crossword Puzzle 2012-12-20
Across
- (x-2)(x+1) are _______ of x^2-x-2.
- antonym of imaginary.
- A ____ of a function is a number x for which f(x)=0
- If a graph rises to the left and right in an even function, then the leading coefficient is ________.
- x=a is a ________ of the polynomial equation f(x)=0.
- In an odd function, if the graph rises to the left and falls right, then the leading coefficient is _________.
- In the equation f(x)=x^3+x+1, 1 is the leading...
- f(x)=a(x-h)^2+k is an equation written in ________ form.
- In a graph whose vertex is (0,0), if a<0, the vertex is the _______ point.
- The equation f(x)=ax^2+bx+c is a _________ function.
Down
- the graph of f(x)=(x+1)^4 is a left _____, by one unit, of the graph y=x^4.
- negative coefficients in a polynomial function _______ the x-axis.
- The point were the axis intersects the parabola.
- The equation f(x)=mx+b is a ______ function.
- The theorem that tells you that synthetic division can be used to evaluate a polynomial function.
- Synonym of long division.
- line of symmetry in a parabola.
- The graph of a polymial function is...
- The graph of a quadratic function with a special U-Shaped curve is called a ________.
- -a-bi is the _________ inverse of a+bi
20 Clues: antonym of imaginary. • Synonym of long division. • line of symmetry in a parabola. • (x-2)(x+1) are _______ of x^2-x-2. • The graph of a polymial function is... • -a-bi is the _________ inverse of a+bi • The equation f(x)=mx+b is a ______ function. • The point were the axis intersects the parabola. • In the equation f(x)=x^3+x+1, 1 is the leading... • ...
AP Calculus Crossword Review 2023-05-26
Across
- This extrema exists when f'(x) changes signs from + to -.
- A curve that is represented by f(x).
- Finding an equation for the slope of the line is called taking the _____.
- This exists when f''(x) = 0 or undefined and changes signs.
- 2 sets of terms that have an "=" sign equating them.
- The ____ of a 3-Dimensional shape can be calculated with the disk, washer, and shell method.
- The portion of math that involves deriving, integrating, etc.
- The derivative of speed that determines directional speed of a particle.
- This extrema exists when f'(x) changes signs from - to +.
- When a series results in a number > 1 for the nth term test, it has _____.
- A string of numbers that are all added together to prove convergence or divergence.
- If a function at a point has an existing limit, both sides approach the existing limit, and that point is equal to the limit then the function is considered _____.
- When a series contains a p-series with an exponent greater than 1, it is said to have _____.
- This function is represented on a circular graph with an angle and radius.
Down
- If the denominator of a function contains a factor of (x+1), it will approach a vertical _____ at x=-1.
- This type of power series is centered about x=0.
- This is calculated with partial sums and is represented with sigma.
- As x approaches infinity, you are calculating the ____ of a function.
- The second derivative of f(x) determines the _____ of a function.
- Taking the ____ of a curve will give you the area under the curve.
- A string of numbers that aren't added together.
- The derivative of the ____ of f(x) is 1/(f'(f^(-1)(x)))
- This type of a function relates both x and y with a third variable; "t".
- This type of growth increases most rapidly at half of the carrying capacity.
- The second derivative of speed.
- Maximums and minimums are both different kinds of _____.
- If a line only intersects a curve at one point, it is said to be ____ with the curve at this point.
- This type of series will converge if |r|<1.
- f(x) has a _____ point if f'(x)=0 (or undefined) and changes signs.
- This method is used when revolving a curve around a pole that will leave some sort of hole or "gap" in the center of the shape.
- This is the ____ of an integral determined by the upper and lower bounds.
31 Clues: The second derivative of speed. • A curve that is represented by f(x). • This type of series will converge if |r|<1. • A string of numbers that aren't added together. • This type of power series is centered about x=0. • 2 sets of terms that have an "=" sign equating them. • The derivative of the ____ of f(x) is 1/(f'(f^(-1)(x))) • ...
Chapter 6 Lesson 4 2023-05-03
Across
- f(10)=420(0.79)^10 round to the nearest ten
- f(x)=6.08(1+0.013)^x
- f(x)=1430(1+0.02)^x what is the first step
- f(10)=6.08(1.13)^10 round to the nearest billion
- f(x)=420(1-0.21)^x what is the first step
- f(x)=6500(1-0.143)^x
Down
- f(3)=6500(0.857)^3
- f(x)=560(1-0.24)^x what is "-0.24"
- f(x)=560(1-0.24)^x what is "x"
- f(x)=560(1-0.24)^x what is "560"
10 Clues: f(3)=6500(0.857)^3 • f(x)=6.08(1+0.013)^x • f(x)=6500(1-0.143)^x • f(x)=560(1-0.24)^x what is "x" • f(x)=560(1-0.24)^x what is "560" • f(x)=560(1-0.24)^x what is "-0.24" • f(x)=420(1-0.21)^x what is the first step • f(x)=1430(1+0.02)^x what is the first step • f(10)=420(0.79)^10 round to the nearest ten • f(10)=6.08(1.13)^10 round to the nearest billion
AP BC Calculus Crossword Puzzle 2016-12-01
Across
- if f''(x) < 0, then f(x) is __________ ____.
- when f'(x) changes sign from (+) to (-) @ x = a, there is a __________ ____________ @ x = a.
- the lowest point of a function or within a given interval
- value of the quantity per unit
- ____________ __________ theorem: if f(x) is continuous in [a, b], then there will be a max and min value for f(x)
- this is the first derivative of velocity
- the highest point of a function or within a given interval
- For the _________ __________ test, if f'' = 0, then there is neither a maximum nor minimum at that point
- in optimization, this is the data that is a fixed constant
- to find the ___________ ________ of a function, you need to find a point and the slope
- if f''(x) > 0, then f(x) is __________ ____.
- _________ theorem: if f(x) is continuous in [a, b] and differentiable in (a, b), and f(a) = f(b), then there will exist at least 1 value "c" such that f'(c) = 0
- this is the first derivative of position
- if a function's first derivative does not change sign, the function is _______________.
Down
- when f'(x) changes sign from (-) to (+) @ x = a, there is a __________ ____________ @ x = a.
- when a function cannot be differentiated explicitly for y, use this method
- in optimization, this is the data that you are trying to optimize
- to find critical points, set f'(x) = 0 or ____ ___ _____.
- this is the reverse process of differentiation
- ____________ __________ theorem: if f(x) is continuous in [a, b] and differentiable in (a, b), then there will exist at least 1 value "c" such that f'(c) = [f(b) - f(a)]/(b - a)
20 Clues: value of the quantity per unit • this is the first derivative of velocity • this is the first derivative of position • if f''(x) < 0, then f(x) is __________ ____. • if f''(x) > 0, then f(x) is __________ ____. • this is the reverse process of differentiation • the lowest point of a function or within a given interval • ...
Andengradsfunktioner 2024-03-04
13 Clues: c • d • a>0 • a<0 • Dm(f) • Vm(f) • -1<0<a • f(x)=0 • (T_x, T_y) • a>1 og a<-1 • Hældning i skæring med y-aksen • Toppunktet når funktionen er konkav • Toppunktet når funktionen er konveks
TEKA TEKI RELASI DAN FUNGSI 2023-10-23
Across
- f(t) = 2t^2 - 3t + 1 jika t = 5
- HASIL FUNGSI
- nilai dari f(x) = 5x - 10 saat x = 2.
- nilai dari f(x) = 5x - 7 saat x = 2
- nilai dari f(x) = 2x + 3 jika x = 4.
- DAERAH ASAL
- HIMPUNAN YANG SETIA
Down
- nilai dari f(x) = 3x + 2 jika x = 4
- HUBUNGAN
- nilai dari g(y) = 3y^4 + 2y^3 + y^2 + 1 jika y = 1.
- nilai dari h(x) = 4x - 3 saat x = -2.
- MATERI YANG DIPELAJARI SAAT INI
- DAERAH KAWAN
- PENGELOMPOKKAN ANGKA PADA RELASI DAN FUNGSI
14 Clues: HUBUNGAN • DAERAH ASAL • HASIL FUNGSI • DAERAH KAWAN • HIMPUNAN YANG SETIA • MATERI YANG DIPELAJARI SAAT INI • f(t) = 2t^2 - 3t + 1 jika t = 5 • nilai dari f(x) = 3x + 2 jika x = 4 • nilai dari f(x) = 5x - 7 saat x = 2 • nilai dari f(x) = 2x + 3 jika x = 4. • nilai dari h(x) = 4x - 3 saat x = -2. • nilai dari f(x) = 5x - 10 saat x = 2. • PENGELOMPOKKAN ANGKA PADA RELASI DAN FUNGSI • ...
Latin Catiline 8 2018-06-11
Across
- -ī, n. hatred
- -ī, n. weapon
- pertinui to pertain to
- -ī, m. relative, associate
- -ae, f. mercy
- how often!
- -ere, metuī to fear
- -e of consular rank
- 1. to avoid
- -e empty
- -ae, f. dagger
- atque as soon as
Down
- -ae, f. insult
- by Hercules!
- -um pleasant
- n. the Comitium
- -tatis, f. silence
- ēlabī, ēlapsus sum to slip away
- -ūs, m. arrival
- salutis, f. safety
- -ī, n. judgment
- -ūs, m. chance, mishap
22 Clues: -e empty • how often! • 1. to avoid • by Hercules! • -um pleasant • -ī, n. hatred • -ī, n. weapon • -ae, f. mercy • -ae, f. insult • -ae, f. dagger • n. the Comitium • -ūs, m. arrival • -ī, n. judgment • atque as soon as • -tatis, f. silence • salutis, f. safety • -ere, metuī to fear • -e of consular rank • pertinui to pertain to • -ūs, m. chance, mishap • -ī, m. relative, associate • ...
TEKA-TEKI MATEMATIKA (remedial) 2022-11-06
Across
- f(x) = x2 + 4x – 30
- f(x) = x² + 4x + 5
- Bentuk sederhana dari (√5+√3)(√5-√3)/√3+2
- (2x³y⁴) (-5xy²)
- y = x² + 6x + 2, tentukan sumbu y
- √16 × √144
- 2-1 + 5-1
- (-4)²
- Suatu bakteri membelah diri menjadi dua setiap 15 menit. Jika jumlah bakteri mula-mula adalah 40, maka berapa jumlah bakteri setelah 90 menit?
- √400 : √25 x √144
Down
- 2³×2⁶
- √144 + √1089 - √441
- f(x) = 2x² + 5, jika peta bagi -3
- (-5)³ + (-5)² + (-5)¹ + 5⁰
- Diskriminan dari 11x² + 10x + 15
- (-7)² × (-7)⁴
- x² . x⁵
- ((1/2)³)⁻²
- √80 - √5 + √125
- √121 + √289
20 Clues: 2³×2⁶ • (-4)² • x² . x⁵ • 2-1 + 5-1 • ((1/2)³)⁻² • √16 × √144 • √121 + √289 • (-7)² × (-7)⁴ • (2x³y⁴) (-5xy²) • √80 - √5 + √125 • √400 : √25 x √144 • f(x) = x² + 4x + 5 • f(x) = x2 + 4x – 30 • √144 + √1089 - √441 • (-5)³ + (-5)² + (-5)¹ + 5⁰ • Diskriminan dari 11x² + 10x + 15 • f(x) = 2x² + 5, jika peta bagi -3 • y = x² + 6x + 2, tentukan sumbu y • Bentuk sederhana dari (√5+√3)(√5-√3)/√3+2 • ...
Funkcija 2023-03-29
Across
- f(x)=(x+2)²+(x-4)², kai x=3
- Kuris taškas priklauso funkcijos grafikui f(x)=3+(x-1)(2x+3)? A(3;10) R(10;3) M(2;10) I(10;2)
- f(x)=(x²+2x):3,kai x=4
- Kokia viena raide galime parašyti f(x)?
- Kaip vadinasi vienas iš funkcijos sprendimo būdų?
- f(x)=x¹⁰+3x -x¹⁰, kai x=2
- Kuris taškas priklauso funkcijos grafikui f(x)=x⁴? A(2;16) B(3;15) C(4;14) D(4;12)
- Kokia yra funkcijos reikšmė, jeigu f(x)<0?
- Koks turi būti x, kad kirstų y ašį?
- Kas yra D(f)?
- Kiek gali skirtingų y turėti vienas x?
Down
- Kaip vadinasi taisyklė, pagal kurią kiekvienai vieno dydžio reikšmei priskiriama vienintelė kito dydžio reikšmė?
- Kaip kitaip vadinamas nepriklausomas kintamasis x?
- Kas yra E(f)?
- Koks kintamasis yra y?
- f(x)=(x+2)(1-x),kai x=3
- Kokia yra funkcija, jeigu su tam tikra argumento reikšme funkcijos reikšmės taškas yra pažymėtas virš Ox ašies?
- Koks turi būti y, kad kirstų x ašį?
18 Clues: Kas yra E(f)? • Kas yra D(f)? • Koks kintamasis yra y? • f(x)=(x²+2x):3,kai x=4 • f(x)=(x+2)(1-x),kai x=3 • f(x)=x¹⁰+3x -x¹⁰, kai x=2 • f(x)=(x+2)²+(x-4)², kai x=3 • Koks turi būti y, kad kirstų x ašį? • Koks turi būti x, kad kirstų y ašį? • Kiek gali skirtingų y turėti vienas x? • Kokia viena raide galime parašyti f(x)? • Kokia yra funkcijos reikšmė, jeigu f(x)<0? • ...
Nics puzzil 2022-06-02
Spanish Vocab 2 2014-10-30
16 Clues: I • We • you • You all • I am (yo) • He (1 male) • You (formal) • She (1 female) • We are (nosotros) • They (2 or more f) • They (2 or more f/m) • They are (f) (ELLAS) • you are (familer (Tu) • He is (El)/ She is (Ella) • Y'all (You All) Only in Spain • you all all (familer) (nosotros)
Cam's Amazing Calculus Crossword 2017-05-25
Across
- The limit of sinx\x as x approaches zero equals what?
- What is the point of inflection for x^3?
- The limit of (x^2 + 3x)\x as x approaches zero is what?
- f(c) = 1\(b - a) times the integral of f(x) from a to b is the what theorem? (Two Words)
- An equation involving 2 or more variables that are differentiated functions of time can be used to find an equation that relates to corresponding rates
- A point where the graph has a tangent line and the concavity changes
- Determined by taking coefficients of the highest degree in the numerator over the denominator (Two Words)
- The derivative of a function is positive when the function is what?
- A point within a domain where f' = 0 or f' does not exist (Two Words)
- Series A representation of a function as an infinite sum of terms that are calculated from the values of the function's derivatives at a single point is the definition of what?
- If a function f is not continuous at a point c, then c is a point of what of f?
- A method of integrating complex integrals where you replace the function with u is what?
- The derivative of lnx is what?
- Function A function for which f(-x) = f(x) for every x in the domain of f
Down
- A function defined by applying different formulas to different parts of its domain is a what function?
- Up If the second derivative is positive at a certain interval, then the graph is what at that interval?
- Integral of sinx from 0 to t equals what?
- What is the first-order numerical procedure for solving ordinary differential equations with a given initial value? (Two Words)
- Left-hand endpoint rectangular approximation method is denoted as what?
- The derivative of a function is negative when the function is what?
- The integral of a function is the what under the curve?
- Process for finding dy\dx when y is defined as a function as a function of x by an equation of the form f(x,y) = 0 is what differentiation?
- L(x) = f(a) + f'(a)(x - a)
- What rule is this: d\dx(uv) = u(dv\dx) + v(du\dx)
- x - (x^3)\3 + (x^5)\5 - (x^7)\7 + ... is a Maclaurin Series for what?
- What are Maximums and Minimums?
- What is the radius of convergence for the Maclaurin Series of e^x?
- What is the anti derivative of 1\x?
- Find length of a curve of y = (1\6) x^3 + (1\2) x^-1 from x = 1 to x = 2
- Derivative of secx equals what?
30 Clues: L(x) = f(a) + f'(a)(x - a) • The derivative of lnx is what? • What are Maximums and Minimums? • Derivative of secx equals what? • What is the anti derivative of 1\x? • What is the point of inflection for x^3? • Integral of sinx from 0 to t equals what? • What rule is this: d\dx(uv) = u(dv\dx) + v(du\dx) • The limit of sinx\x as x approaches zero equals what? • ...
Deutsch-Profi 2017-06-28
Across
- z oder tz? Her...
- n oder nn? So...e
- 1. Vergangenheit: ich wasche, ich ...
- n oder nn: re...en
- 1. Vergangenheit: er rennt, er ...
- k oder ck? Brü...e
- m oder mm? So...er
- k oder ck? Pun...t
- v oder f: ...erkleiden
- 1. Vergangenheit: er beißt, er ...
- ss oder ß: Stra...e
- 1. Vergangenheit: ich laufe, ich ...
- z oder tz? Mü...e
Down
- 1. Vergangenheit: ich rieche, ich ...
- ss oder ß: hei...
- 1. Vergangenheit: er steigt, er ...
- 1. Vergangenheit: wir schwimmen, wir ...
- t oder tt? We...er
- k oder ck? Glü...
- v oder f: ...euerwerk
- z oder tz? Bli...
- 1. Vergangenheit: ich falle, ich ...
- 1. Vergangenheit: ich pfeife, ich ...
- ss oder ß: wir e...en
- 1. Vergangenheit: ich rate, ich ...
- 1. Vergangenheit: wir sehen, wir ...
26 Clues: z oder tz? Her... • ss oder ß: hei... • n oder nn? So...e • k oder ck? Glü... • z oder tz? Bli... • z oder tz? Mü...e • t oder tt? We...er • n oder nn: re...en • k oder ck? Brü...e • m oder mm? So...er • k oder ck? Pun...t • ss oder ß: Stra...e • v oder f: ...euerwerk • ss oder ß: wir e...en • v oder f: ...erkleiden • 1. Vergangenheit: er rennt, er ... • 1. Vergangenheit: er beißt, er ... • ...
The Maagmatics Calculus Crossword 2022-05-16
Across
- when f'=0 or when f' is undefined
- LRAM,RRAM,MRAM
- (final position-initial position)/total time
- lim x->0
- How do you solve y=f(g(x))
- The simpler way to do math
- Slope of a tangent line
- d/dx
- When f" changes sign
- d/dx(a*b)
- Found by determining if f" is + or -
- dy/dx=xy
Down
- f(c) exists
- f'(c)= (f(b)-f(a))/(b-a)
- helps in finding the antiderivitave
- sec,tan,cos,sin
- F'(x)=f(x)
- VA and HA
- d/dt (velocity)
- to find a rate you...
- delta x or delta y
- What kind of math are we in
- Found by washer and disk method
- A=(1/2)h(b1+b2)
- Slope of a secant line
25 Clues: d/dx • lim x->0 • dy/dx=xy • VA and HA • d/dx(a*b) • F'(x)=f(x) • f(c) exists • LRAM,RRAM,MRAM • sec,tan,cos,sin • d/dt (velocity) • A=(1/2)h(b1+b2) • delta x or delta y • When f" changes sign • to find a rate you... • Slope of a secant line • Slope of a tangent line • f'(c)= (f(b)-f(a))/(b-a) • How do you solve y=f(g(x)) • The simpler way to do math • What kind of math are we in • ...
Algebra vocab 2021-12-13
15 Clues: x^2+1=0 • f(x)=x^3 • f(x)=1/x • ax^2+bx+c • The x-axis • f(x)=a.b^x • The Y-axis • Absolute Value • shifting positions • 3 square root of x • Quadratic functions • f(x)= square root of x • First, Outer, Inner, Last • another way to know the x intercepts • A number when multiplied with another produces a given number
funktioner 2020-11-24
20 Clues: F • r • b • K0 • T2 • Kn • f(x) • T1/2 • (x,y) • y=ax+b • x og y • 2x+1=4x+7 • 2 minus 2 • %-vis vækst • plus fortegn • minus fortegn • tal der ganges med • der hvor linjer krydser hinanden • n i kapitalfremskrivningsformlen • y tilvækst når x vokser 1 i lineær vækst
Derivatives Review 2023-10-30
Across
- , Derivative of sec(x) is...
- , Derivative of sin(x) is...
- , Derivative of cot(x) is...
- , Find the derivative of r(x)=sin(x^3)^2.
- , Derivative of tan(x) is...
Down
- , Find the derivative of p(x)=sin^2(x^2+2)
- , Derivative of f(x)=2x^3+8x^2 is...
- , Derivative of cos(x) is...
- , Derivative of csc(x) is...
- , Find h'(1) if h(x)=f(x)g(x) and f(1)=3 f'(1)=10 g(1)=3 and g'(1)=.5
- , Find the equation g(x) of the line tangent to f(x)=x^3-9x at x=3.
- , The instantaneous rate of change of f(x)=2x^3+8x^2 at x=-6 is ...
12 Clues: , Derivative of sec(x) is... • , Derivative of sin(x) is... • , Derivative of cos(x) is... • , Derivative of cot(x) is... • , Derivative of csc(x) is... • , Derivative of tan(x) is... • , Derivative of f(x)=2x^3+8x^2 is... • , Find the derivative of r(x)=sin(x^3)^2. • , Find the derivative of p(x)=sin^2(x^2+2) • ...
Science Dept Christmas 2014 2014-12-14
Across
- . . . . . and the enormous prunus (F)
- Art's colleague (F)
- One in every Dept. (F)
- PATman (S)
- Try amoral gear (anagram FS)
- Endless Heather (F)
- Prefect Mum (S)
- Descendant of Howards End author? (S)
- Descendant of one 'ell of a Royalist Cavalier? (S)
- With Farmer is cockney for Haemorrhoids (F)
Down
- Brand new oar (anagram FS)
- ex Radio 1 DJ sounds tired (S)
- A mere title run (anagram FS)
- Soap or bird (S)
- Gaelic origin of 16 down (F)
- Lady of the shed (S)
- A rotational one invented by James Hargreaves (F)
- Not glossy (F)
18 Clues: PATman (S) • Not glossy (F) • Prefect Mum (S) • Soap or bird (S) • Art's colleague (F) • Endless Heather (F) • Lady of the shed (S) • One in every Dept. (F) • Brand new oar (anagram FS) • Try amoral gear (anagram FS) • Gaelic origin of 16 down (F) • A mere title run (anagram FS) • ex Radio 1 DJ sounds tired (S) • . . . . . and the enormous prunus (F) • Descendant of Howards End author? (S) • ...
Polynomial unit crossword puzzle by Lesley Wei 2013-10-14
Across
- in equation P=DQ+R,R represents______.
- in f(x)=x²+7x+5, 2 is the ______of the function.
- it is a quicker way to get the quotient and remainder.
- in f(x)=x²+7x+5, 5 is _____.
- x-intercept of a graph = _____of a function
- when multiplicity is _____number, the graph is tangent to x-axis
- {1,2,7,13} are all______.
- P(x) ÷(x-1), if remainder=0, then(x-1) is a _____of P(x).
- this theorem is: the remainder of P(x) ÷(x-a) equal to value of P(a).
- it represents the number of times that a factor repeats in a function
Down
- this point is a where a function cross y-axis.
- in f(x)=x²+7x+5, 1 is the _______.
- in equation P=DQ+R,Q represents _______.
- x-intercept of a graph = _____of a equation.
- in equation P=DQ+R, D represents_______.
- f(x)=(x+2) ³ is a _____ function.
- f(x)=(x+1)(x-3) is a _____ function
- a graph is ______ to the x-axis at a point where the graph touches x-axis but not cross it.
18 Clues: {1,2,7,13} are all______. • in f(x)=x²+7x+5, 5 is _____. • f(x)=(x+2) ³ is a _____ function. • in f(x)=x²+7x+5, 1 is the _______. • f(x)=(x+1)(x-3) is a _____ function • in equation P=DQ+R,R represents______. • in equation P=DQ+R,Q represents _______. • in equation P=DQ+R, D represents_______. • x-intercept of a graph = _____of a function • ...
Razas 2024-03-04
Across
- .(a|e|i|o|u)[a-l]{2}[án|én|ín|ón|ún]
- [o-z] {2} g?
- [ra|re|ri|ro|ru](r|s|t)\1.(a|e|i)i?[a-m]\1[r-z]
- .(a|b|c|d|e)[s-z]{2}[or|er|ir]\s\1[a-n]{2}án?
- [n-z]{2}(m|n|o|p)i?
- [ba|be|bi|bo|bu](r|s|t)[a-f]{2}\1\sc?[t-z*(l|m|n)\[a-m]{2}
- [bá|bé|bí|bó|bú]. [^a-d s-z]{2}
- [ba|be|bi|bo|bu](l|m|n|o|p)\1[xyz]
- s[a-j]{2}r?\s.[a-j]{2}
- [h-m].[abcd]i?
- [a-j]2.[w-z]\s[a-j]{2}.[w-z]
- [a-f]{2}(a|e|i|o|u).l?\1
Down
- [^e-r x-z]{2}(l|m|n|o)\1.[ag|eg|ig|og|ug]
- [pa|pe|pi|po|pu](r|s|t)\1o?\s[pa|pe|pi|po|pu].[^c-m p-z]{3}
- .[e-k]{2}(p|q|r|s)\1[^g-r]{2}
- .(f|g|h|i)i?\1\s[r-z]{3}
- .[^a-d p-z]{3}.(a|e|i|o|u)[na|ne|ni|no|nu]\a
- [da|de|di|do|du](e|f|g).\s[^e-q s-z]{2}\1[en|on|in].[ino|ina|ine]
- .[abc](r|s|t)\1i?[ar|er|ir|or|ur]
- [^a-g]{2}[sn|sk|ns|ks][xyz]
20 Clues: [o-z] {2} g? • [h-m].[abcd]i? • [n-z]{2}(m|n|o|p)i? • s[a-j]{2}r?\s.[a-j]{2} • .(f|g|h|i)i?\1\s[r-z]{3} • [a-f]{2}(a|e|i|o|u).l?\1 • [^a-g]{2}[sn|sk|ns|ks][xyz] • [a-j]2.[w-z]\s[a-j]{2}.[w-z] • .[e-k]{2}(p|q|r|s)\1[^g-r]{2} • [bá|bé|bí|bó|bú]. [^a-d s-z]{2} • .[abc](r|s|t)\1i?[ar|er|ir|or|ur] • [ba|be|bi|bo|bu](l|m|n|o|p)\1[xyz] • .(a|e|i|o|u)[a-l]{2}[án|én|ín|ón|ún] • ...
Transformations 2023-05-25
Across
- f(x+b) or f(x-b)
- simplest form of a functon
- af(x)where a>1
- function whose equation is f(x)=√x
- form of a circle in which the equation is (x-h)^2+(y-k)^2=r^22
- fuction whose equation is f(x)=x
- when a figure moves on a plane
Down
- function whose equation is f(x)=|x|
- f(x)+c or f(x)-c
- -f(x) or f(-x)
- function whose equation is f(x)=x^2
- af(x) where 0<a<1
- form of the quadratic y=a(x-h)^2+k
13 Clues: -f(x) or f(-x) • af(x)where a>1 • f(x)+c or f(x)-c • f(x+b) or f(x-b) • af(x) where 0<a<1 • simplest form of a functon • when a figure moves on a plane • fuction whose equation is f(x)=x • form of the quadratic y=a(x-h)^2+k • function whose equation is f(x)=√x • function whose equation is f(x)=|x| • function whose equation is f(x)=x^2 • ...
tekateki matematika 2023-10-18
Across
- f(x)= 11x, maka f'(x) adalah
- bunga bank yang niainya tetap disebut
- 1 windu = .... tahun
- jika f(x)=5x-8, maka nilai dari f(2)adalah ...
- semua angka dipangkatkan nol hasilnya
- 18+5-(-6)+(-20) = ....
- 2,3,5,7,11,... adalah bilangan
- 1km = .... m
- peubah
- 1kg = .... ons
Down
- 180 derajat=.... putaran
- (3^-3)/(3^-4) adalah....
- 2^3
- bangun ruang yang mempunyai buah sisi
- 100 derajat disebut sudut ...
- f(x)=8, maka f'(x) = ....
- 2 1/2-1,5-95%= .... %
- 2% dari 5000
- bungan bank yang nilainya selalu naik disebut
- bangun segiempat
20 Clues: 2^3 • peubah • 2% dari 5000 • 1km = .... m • 1kg = .... ons • bangun segiempat • 1 windu = .... tahun • 2 1/2-1,5-95%= .... % • 18+5-(-6)+(-20) = .... • 180 derajat=.... putaran • (3^-3)/(3^-4) adalah.... • f(x)=8, maka f'(x) = .... • f(x)= 11x, maka f'(x) adalah • 100 derajat disebut sudut ... • 2,3,5,7,11,... adalah bilangan • bunga bank yang niainya tetap disebut • ...
Calc project 2023-01-20
Across
- When f '(x) is positive, f(x) is
- the absolute maxes and mins of a graph
- area below x-axis is
- this type of discontinuity is a hole
- derivative of velocity
- determined by the second derivative test
- this acronym for splitting the area under a curve into even shapes to find area under curve
- When f '(x) is negative, f(x) is
- synonym for derivative
- uv - ∫ v du
- y' = cos(x), y =
- When f '(x) changes from increasing to decreasing or decreasing to increasing, f(x) has a ____
- Brackets- include end points Parentheses- do not include endpoints: _____ notation
- a point is this when f'(x) is 0 or undefined
- when a function has no holes or asymptotes or jumps
- derivative of position
- Y values of a function
- this type of discontinuity is a VA or a jump
- using derivatives to find maximums and minimums (word problems)
- When f '(x) changes fro positive to negative, f(x) has a
- this derivative test is used to find if f(x) is increasing or decreasing
- this derivative test is used to find if f(x) is concave up or down
- A line that touches a curve at two points: ____ line
Down
- y' = sec²(x), y =
- area of _____: [(h1 - h2)/2]*b
- to find the derivative
- f '(g(x)) g'(x)
- a rule for finding limits when there is indeterminate forms
- y' = -csc(x)cot(x), y =
- ______ Rule: uv' + vu'
- limit as h approaches 0 of [f(a+h)-f(a)]/h
- a rule to find derivatives of terms with exponents
- y' = 1/x, y =
- y' = -sin(x), y =
- this theorem says that if f(x) is continuous on an interval, there is a max and min
- ______ Rule: (uv'-vu')/v²
- area under the curve
- line that touches a curve at one point: _____ line
- this theorem is used when f(a) = f(b) on a closed interval
- area under a _____: ∫f(x) dx integrate over interval a to b
- as a function approaches a point, it approaches its
- y' = sec(x)tan(x), y =
- If f(1)=-4 and f(6)=9, then there must be a x-value between 1 and 6 where f crosses the x-axis.
- area above x-axis is
- X values of a function
- When f '(x) changes from negative to positive, f(x) has a
- if f(x) is continuous and differentiable, slope of tangent line equals slope of secant line at least once in the interval (a, b)
- The mathematical study of change.
- absolute value of velocity
- y' = -csc²(x), y =
- ∫ f(x) dx on interval a to b = F(b) - F(a)
51 Clues: uv - ∫ v du • y' = 1/x, y = • f '(g(x)) g'(x) • y' = cos(x), y = • y' = sec²(x), y = • y' = -sin(x), y = • y' = -csc²(x), y = • area below x-axis is • area under the curve • area above x-axis is • to find the derivative • derivative of velocity • ______ Rule: uv' + vu' • synonym for derivative • derivative of position • y' = sec(x)tan(x), y = • Y values of a function • X values of a function • ...
Tilang MTK integral, turunan, limit, polinomial 2023-02-02
Across
- 2x^3 - 10x^2 + 22x - 5 dibagi 2x-4=0, cari-> S(x)
- integral 3x^2+2x-1 dx
- integral 2x+4 dx
- Lim x^2 – 1/x + 1 x→0
- x^3-2x^2-x+2=0 -> jumlah X1 + X2 + X3
- integral x^2+2x+1 dx
- f'(1)= X^7
- Lim x – 3 x→4
Down
- f'(X)= 5x^2 + 8x
- integral x+2 dx
- 2x^3 - 10x^2 + 22x - 5 dibagi 2x-4=0, cari-> H(x)
- Lim x^2 – 2x/x - 2 x→ 2
- f'(x)= 3x^2 + 7x
- f'(2)=7x^2 + 3x^2 + 10x
- x^3-2x^2-x+2=0 -> jumlah perkalian 2 akar
- Lim x^2 – 25 x→5
16 Clues: f'(1)= X^7 • Lim x – 3 x→4 • integral x+2 dx • f'(X)= 5x^2 + 8x • integral 2x+4 dx • f'(x)= 3x^2 + 7x • Lim x^2 – 25 x→5 • integral x^2+2x+1 dx • integral 3x^2+2x-1 dx • Lim x^2 – 1/x + 1 x→0 • f'(2)=7x^2 + 3x^2 + 10x • Lim x^2 – 2x/x - 2 x→ 2 • x^3-2x^2-x+2=0 -> jumlah X1 + X2 + X3 • x^3-2x^2-x+2=0 -> jumlah perkalian 2 akar • 2x^3 - 10x^2 + 22x - 5 dibagi 2x-4=0, cari-> S(x) • ...
Transformations 2023-05-25
Across
- f(x+b) or f(x-b)
- simplest form of a functon
- af(x)where a>1
- function whose equation is f(x)=√x
- form of a circle in which the equation is (x-h)^2+(y-k)^2=r^22
- fuction whose equation is f(x)=x
- when a figure moves on a plane
Down
- function whose equation is f(x)=|x|
- f(x)+c or f(x)-c
- -f(x) or f(-x)
- function whose equation is f(x)=x^2
- af(x) where 0<a<1
- form of the quadratic y=a(x-h)^2+k
13 Clues: -f(x) or f(-x) • af(x)where a>1 • f(x)+c or f(x)-c • f(x+b) or f(x-b) • af(x) where 0<a<1 • simplest form of a functon • when a figure moves on a plane • fuction whose equation is f(x)=x • form of the quadratic y=a(x-h)^2+k • function whose equation is f(x)=√x • function whose equation is f(x)=|x| • function whose equation is f(x)=x^2 • ...
Algebra Vocab 2021-12-14
15 Clues: x^2+1=0 • f(x)=x^3 • f(x)=1/x • ax^2+bx+c • The x-axis • f(x)=a-b^x • The y-axis • Absolute value • Shifting positions • quadratic functions • f(x)=square root of x • First Outer Inner Last • Another way to find the x-axis • square root of x to the 3rd power • A number when multiplied with another produces a given number
TTS MATEMATIKA 2023-08-26
Across
- Dik fungsi f(x)=x²-2x+4 dan g(x)=2x+3, maka fungsi komposisi (fog)(x) adalah
- Diketahui fungsi f (x) = x²-3x+5 dan g(x)= 2x-1. Maka fungsi (g o f) (x)=
- Diketahui fungsi f(x)= x2+x-1 dan g(x)=x+1.maka fungsi (f o g) (x)=
- Diketahui fungsi f (x) = x²-3x+5 dan g(x)= 2x-1, Maka fungsi (f o g) (x)=
- Diketahui fungsi f(x) = x² - 3x dan g(x) = 2x + 1 Tentukan fungsi (f - g)(x)
Down
- Diketahui fungsi f(x)= x-4 dan g(x)= x2-3x+7. Maka fungsi dari (g o f) (x)=
- Diketahui fungsi f(x) = x2+5x-14 dan g(x) = x – 2 . Tentukanlah fungsi(f + g) (x)=
- Diketahui dari fungsi f(x) = x – 4 dan g(x) = x2 – 3x + 10.maka Fungsi komposisi (gof)(x)
- Jika diketahui f(x)= x²-2 dan g (x)= 2x+1, maka komposisi (f o g) (x) adalah
- Diketahui fungsi f(x) = x2+5x-14 dan g(x) = x – 2 . Tentukanlah fungsi (f – g) (x)=
10 Clues: Diketahui fungsi f(x)= x2+x-1 dan g(x)=x+1.maka fungsi (f o g) (x)= • Diketahui fungsi f (x) = x²-3x+5 dan g(x)= 2x-1. Maka fungsi (g o f) (x)= • Diketahui fungsi f (x) = x²-3x+5 dan g(x)= 2x-1, Maka fungsi (f o g) (x)= • Diketahui fungsi f(x)= x-4 dan g(x)= x2-3x+7. Maka fungsi dari (g o f) (x)= • ...
TEKA TEKI MATEMATIKA 2023-09-13
Across
- Suatu fungsi dirumuskan dengan f(x) = 2x - 3. Nilai dari f(4) adalah...
- Pada pemetaan f(x)→x^2+2x−2, bayangan dari 2 adalah . . . .
- Ditentukan fungsi f(x) =-x-1.Nilai f(-3) adalah
- Ditentukan fungsi f(x) =2x-2.Nilai f(5) adalah
- Ditentukan fungsi f(x) =2x^2 - 3x +1.Nilai f(-2) adalah
- f (x) = 2x^2 - x + 4. nilai f (-1) adalah
- f(x) =4x+3.Nilai f(2) adalah
Down
- f(x) =4-3x.Nilai f(3) adalah
- f(x) =x + 5.Nilai f(-1) adalah
- Suatu fungsi didefinisikan dengan rumus f(x) = 3 - 5x. Nilai f(-4) adalah ...
10 Clues: f(x) =4-3x.Nilai f(3) adalah • f(x) =4x+3.Nilai f(2) adalah • f(x) =x + 5.Nilai f(-1) adalah • f (x) = 2x^2 - x + 4. nilai f (-1) adalah • Ditentukan fungsi f(x) =2x-2.Nilai f(5) adalah • Ditentukan fungsi f(x) =-x-1.Nilai f(-3) adalah • Ditentukan fungsi f(x) =2x^2 - 3x +1.Nilai f(-2) adalah • Pada pemetaan f(x)→x^2+2x−2, bayangan dari 2 adalah . . . . • ...
Transformations 2023-05-25
Across
- f(x+b) or f(x-b)
- simplest form of a functon
- af(x)where a>1
- function whose equation is f(x)=√x
- form of a circle in which the equation is (x-h)^2+(y-k)^2=r^22
- fuction whose equation is f(x)=x
- when a figure moves on a plane
Down
- function whose equation is f(x)=|x|
- f(x)+c or f(x)-c
- -f(x) or f(-x)
- function whose equation is f(x)=x^2
- af(x) where 0<a<1
- form of the quadratic y=a(x-h)^2+k
13 Clues: -f(x) or f(-x) • af(x)where a>1 • f(x)+c or f(x)-c • f(x+b) or f(x-b) • af(x) where 0<a<1 • simplest form of a functon • when a figure moves on a plane • fuction whose equation is f(x)=x • form of the quadratic y=a(x-h)^2+k • function whose equation is f(x)=√x • function whose equation is f(x)=|x| • function whose equation is f(x)=x^2 • ...
Tristan's TrigCross 2024-03-13
Across
- Which quadrant is α?
- Trigometric graphs are ________.
- The inverse of sine
- If f(-x)=-f(x), then the function f is ________.
- β
- The vertical shift of a sine/cosine function determines the ________.
- 1/sine
- The number of cycles that occur per unit of time.
- Sine/Cosine
- If f(-x)=f(x), then the function f is ________.
- φ
- What do you use to solve this equation: cos(3x) = π/2
- Which quadrant is π+α?
- Which trigonometric function equals 1 at π/2?
- The number of cycles completed over an interval of 2π.
Down
- The distance from the baseline to the min/max of a sine/cosine function.
- 1/cosine
- 2π/ω
- Asin(ωt+φ)+B
- -φ/ω
- α
- Used to solve inequalities
- Y-coordinate on the unit circle
- sin(2θ)=2sinθcosθ is an example of ________.
- The inverse of cosine
- ω
- Which quadrant is 2π-α?
- Which quadrant is π-α?
- cosine/sine
- X-coordinate on the unit circle
30 Clues: α • β • ω • φ • 2π/ω • -φ/ω • 1/sine • 1/cosine • Sine/Cosine • cosine/sine • Asin(ωt+φ)+B • The inverse of sine • Which quadrant is α? • The inverse of cosine • Which quadrant is π-α? • Which quadrant is π+α? • Which quadrant is 2π-α? • Used to solve inequalities • Y-coordinate on the unit circle • X-coordinate on the unit circle • Trigometric graphs are ________. • ...
Calculus Final 2022-06-02
Across
- the state of being continuous
- 1/1+x²
- method used ti solve differential equations
- f'(x) or how the derivative of f is written
- a point where an object rotates
- The number that a function is approaching as x approaches a particular value from the left
- a graph is concave up when f¨(x) is ___ than 0
- In a limit, when the denominator equals 0, the limit is ___
- x values
- A line that touches a curve at a point without crossing the curve
- the number that a function is approaching as x approaces a paticular value from the right
- A technique used to evaluate limits of fractions that evaluate to the indeterminate expressions and . This is done by finding the limit of the derivatives of the numerator and denominator
- highest point in a graph
- theorem for instantaneous rate of change
- derivative of tanx
- A function that has different equations that describe the value of the function over different parts of the domain
- the point where the tangent line intersects the curve
- used to determine whether you have a relatvive max or min on an interval
- f'(x)g(x) + f(x)g'(x)
- what is the limit of the function 4x-2 as x approaches 4
- a graph is concave down when f¨(x) is ___ than 0
- the __ rule is usually used for a single variable raised to a power(derivatives)
- In a limit, as f(x) approaches a different number from the right side than it approaches from the left side makes the limt to ___
- the rate of change of a function with respect to a variable
- A line segment between 2 points on a curve.
- A process that maximizes or minimizes a quantity
- The point where the concavity of a function changes
- Antiderivative of 5
Down
- 1/f´(f⁻¹(x))
- [f´(x)g(x) - f(x)g´(x)]/[g(x)]²
- derivative of cotx
- point where a function ends
- Which way a curve is bowed or cupped
- point on graph where there is a valley or peak
- s(t)
- x value where there is a max, min, or change of graph shape
- the value of f(x) as the function approaches a certain number, x
- y values
- process of finding a derivative
- the ___ method is a method for calculating the volume of a solid of revolution of a solid-state material when integrating along an axis "parallel" to the axis of revolution
- -1/x²+1
- average rate of change
- A line or curve that the graph of a relation approaches more and more closely the further the graph is followed
- derivative of x³
- s¨(t)
- an indefinite integral
- lowest point in a graph
- if f(x) is continuous on [a,b], the f(x) has min and max values
- when [f(g(x))]; f´(g(x))g´(x)
- this theorem states that if f is a continuous function whose domain contains the interval [a, b], then it takes on any given value between f(a) and f(b) at some point within the interval
- s´(t)
- derivative of sinx
52 Clues: s(t) • s¨(t) • s´(t) • 1/1+x² • -1/x²+1 • x values • y values • 1/f´(f⁻¹(x)) • derivative of x³ • derivative of cotx • derivative of tanx • derivative of sinx • Antiderivative of 5 • f'(x)g(x) + f(x)g'(x) • average rate of change • an indefinite integral • lowest point in a graph • highest point in a graph • point where a function ends • the state of being continuous • when [f(g(x))]; f´(g(x))g´(x) • ...
Tilagn Digital 2023-02-14
Across
- lim ->7, x^2-49/x-7
- 1v∫^2 3(x+2)2dx= ?
- 1v∫^2 2(x-2)dx = ?
- Jika f'(x)= 2x+4 dan f(1) = 7, maka berapa nilai c?
- Jika f(x)= 4x^4-x^3/x^2+2, maka f(2)= ?
- y=2x^2+x+1, dy/dx(1)=?
- 1v∫^2 3x2dx = ?
- lim -> 5,x^2-25/x-5
Down
- 2x^4-x^3+2x^2-4x+8 : (x-2), sisanya berapa?
- Jika y=10x, y'=?
- y=3x^3-8x-2, y'(1)=?
- f(x)= 2x^4-x^3-2x^2+x+4
- 2x^4-3x^3-x^2-x+6 : (x-1), berapa sisanya?
- y=2x^2+2, y'(2)=?
- lim ->1, 3x+2
- lim ->2, 9
16 Clues: lim ->2, 9 • lim ->1, 3x+2 • 1v∫^2 3x2dx = ? • Jika y=10x, y'=? • y=2x^2+2, y'(2)=? • 1v∫^2 3(x+2)2dx= ? • 1v∫^2 2(x-2)dx = ? • lim ->7, x^2-49/x-7 • lim -> 5,x^2-25/x-5 • y=3x^3-8x-2, y'(1)=? • y=2x^2+x+1, dy/dx(1)=? • f(x)= 2x^4-x^3-2x^2+x+4 • Jika f(x)= 4x^4-x^3/x^2+2, maka f(2)= ? • 2x^4-3x^3-x^2-x+6 : (x-1), berapa sisanya? • 2x^4-x^3+2x^2-4x+8 : (x-2), sisanya berapa? • ...
Psychologist 2014-05-15
20 Clues: 1 space e • 1 space n • 1 space p • 1 space b • 1 space t • 1 space j • 1 space k • 1 space s • 1 space Q • 1 space f • 1 space g • 1 space I • 1 space c • 1 space l • 1 space a • 1 space m • 1 space O • 1 space h • 1 space d • 1 space r
Volume of Cylinder/Semi-Cylinder/Sphere/Hemisphere 2017-05-17
13 Clues: F-Question 4 • F-Question 3 • F-Question 2 • F-Question 5 • F-Question 1 • F-Question 6 • H-Question 6B • H-Question 6C • H-Question 1A • H-Question 1F • F-Question 11A • F-Question 11C • F-Question 11B
Psalm 89 2020-09-22
27 Clues: M 8 • C 3 • A 7 • E 4 • R 9 • L 2 • F 1 • F 5 • L 6 • B 15 • H 18 • G 17 • J 12 • F 11 • C 16 • 20 S • 21 S • 19 F • R 14 • P 13 • SA 10 • Verse 25 H • Verse 24 F • Verse 23 A • Verse 22 O • Verse 27 F • Verse 25 G,R,S
Jeu de piste équipe 1 2019-08-22
Across
- mot 2 point J
- mot 3 point B
- mot 5 point Q
- mot 2 point T
- mot 1 point B
- mot 1 point I
- mot 2 point U
- mot 2 du point N
- mot 1 point V
- mot 6 du point C
- mot 2 du point C
- mot 2 point F
- mot 1 point H
- mot 4 point K
- mot 2 point D
- mot 1 point M
- mot 1 point K
- mot 3 point J
- mot 1 du point O
- mot 4 point F
- mot 4 point M
- ordre des lettres du point A
- mot 3 du point O
- mot 4 du point C
- mot 4 point G
- mot 1 du point C
- mot 2 point K
- mot 1 point P
- mot 2 point H
- mot 2 point I
- mot 4 point V
- mot 2 point P
- mot 3 point D
- mot 3 du point N
- mot 3 point Q
- mot 3 point T
- mot 1 point D
Down
- ville 3 point S
- mot 3 point V
- mot 4 point Q
- mot 3 point H
- mot 2 du point O
- mot 2 point E
- mot 4 point H
- mot 3 point E
- mot 3 point M
- mot 3 point F
- mot 5 point F
- mot 1 point G
- mot 1 point R
- mot 3 point U
- mot 2 point M
- mot 4 point I
- mot 1 point F
- mot 1 point U
- mot 3 point K
- mot 5 point M
- mot 5 point G
- mot 1 point L
- mot 5 du point C
- ville 1 point S
- mot 2 point B
- mot 2 point G
- mot 1 du point N
- mot 4 point J
- ville 2 point S
- mot 1 point Q
- mot 2 point Q
- mot 4 point E
- mot 3 point P
- mot3 41 point R
- ville 4 point S
- mot 2 point L
- mot 4 point L
- mot 1 point J
- mot 3 point I
- mot 3 du point C
- mot 1 point E
- mot 2 point R
- mot 2 point V
- mot 1 point R
- mot 3 point L
- mot 1 point T
- mot 5 point R
- mot 4 point B
85 Clues: mot 3 point V • mot 2 point J • mot 4 point Q • mot 3 point H • mot 3 point B • mot 5 point Q • mot 2 point E • mot 4 point H • mot 2 point T • mot 3 point E • mot 3 point M • mot 3 point F • mot 5 point F • mot 1 point B • mot 1 point G • mot 1 point R • mot 3 point U • mot 2 point M • mot 4 point I • mot 1 point F • mot 1 point I • mot 1 point U • mot 3 point K • mot 2 point U • mot 5 point M • mot 1 point V • ...
1T kryssord 2021-05-28
Across
- En rett linje en rasjonal funksjon nærmer seg, men aldri krysser
- 1 , 4 , 9 , 16 , 25
- Verdier av x som kan settes inn i funksjonen
- n)
- k)
- Finne en matematisk modell som passer et datasett
- f)
- m)
- n)
- 2n – 1
- f(0)
- a)
- o)
- d)
- i)
- Stigningstallet til tangenten er lik null
- Vinkelrett
- h)
- g)
Down
- b)
- Flytte en potens over/under brøkstreken, bytt fortegn på …
- c)
- for while
- e)
- n*(n+1)/2
- Computer Algebra System
- En trinnvis beskrivelse av fremgangsmåten for å løse et problem
- |x|
- j)
- l)
- Sirkel med radius = 1 og sentrum i origo
- f'(x)
- y = ax + b
- cos
- Grafens skjæring med x-aksen
- c^2 = a^2 + b^2
- sin
- Delt på null er …
- tan
39 Clues: b) • c) • e) • n) • k) • f) • m) • n) • j) • l) • a) • o) • d) • i) • h) • g) • |x| • cos • sin • tan • f(0) • f'(x) • 2n – 1 • for while • n*(n+1)/2 • y = ax + b • Vinkelrett • c^2 = a^2 + b^2 • Delt på null er … • 1 , 4 , 9 , 16 , 25 • Computer Algebra System • Grafens skjæring med x-aksen • Sirkel med radius = 1 og sentrum i origo • Stigningstallet til tangenten er lik null • Verdier av x som kan settes inn i funksjonen • ...
Escape The Night 2023-11-01
Across
- Season 2 Villain
- also problematic
- Season 1 Gardener
- Season 3 Villain
- Season 1 Butler
- Creature that killed Alison in season 2
- The Big Game Hunter
- The Savant
- The Novelist/Aviator
- The Detective
- The Journalist
- Jet-pack girl's boss
- amazing M/M ship
- amazing M/F ETN ship
- Vampire princess/ Ally in season 2
Down
- The Thespian
- King of Vampires
- The Investigative Reporter
- scary Season 1 creature
- The Mystic
- The Jet Setter/Socialite
- Season 1 Maid
- Vampire who danced with Andrea
- Ally and friend in season 3
- Ally turned villain in season 3
- The Explorer
- most problematic guest on-set
- Girl who wears a jet-pack in season 2
- The Saloon Girl/Pin-Up Girl
- The best ETN ship (F/F)
- Season 4 Villain
- most problematic guest on her own
32 Clues: The Mystic • The Savant • The Thespian • The Explorer • Season 1 Maid • The Detective • The Journalist • Season 1 Butler • King of Vampires • Season 2 Villain • also problematic • Season 3 Villain • Season 4 Villain • amazing M/M ship • Season 1 Gardener • The Big Game Hunter • The Novelist/Aviator • Jet-pack girl's boss • amazing M/F ETN ship • scary Season 1 creature • The best ETN ship (F/F) • ...
Math Crossword Puzzle 2012-11-15
Across
- Lines lines that have one point in common or all points in common
- <,>,<_, _>
- y-coordinates
- number multiplied by a variable
- Function f(–x) = f(x)
- Property of Equality for real numbers a, b and c, if a=b, then a + c = b + c
- Inverse two numbers when added together equal 0. Ex. 4 + -4
- Equation ax+b=c
Down
- Inverse two numbers that when multiplied together equals 1. Ex. 4 and 1/4
- Rate of Change y = f(x)
- y=3x+4
- Expression a1, a2, a3, . . , an, . .
- Value the distance between a number and zero on a number line
- Model an exponential function representing real-world phenomena
- Function f(–x) = –f(x)
- steepness of a line
- x-coordinates
- Pair (x,y)
18 Clues: y=3x+4 • <,>,<_, _> • Pair (x,y) • y-coordinates • x-coordinates • Equation ax+b=c • steepness of a line • Function f(–x) = f(x) • Function f(–x) = –f(x) • Rate of Change y = f(x) • number multiplied by a variable • Expression a1, a2, a3, . . , an, . . • Inverse two numbers when added together equal 0. Ex. 4 + -4 • Value the distance between a number and zero on a number line • ...
Loeffler Lovely Limits 2014-05-21
Across
- lim x-> 1-
- law that says "The limit of a power is the power of the limit."
- (As x -> a) lim[f(x) - g(x)] = lim f(x) - lim g(x)
- (as x -> a) lim[f(x) / g(x)] = lim f(x) / lim g(x)
- (as x -> a) lim[f(x) + g(x)] = lim f(x) + lim g(x)
- (as x -> a) lim[f(x)g(x)] = lim f(x) * lim g(x)
Down
- f(1)
- lim x-> 0
- (as x -> a) lim [cf(x)] = c * lim f(x)
- lim x -> infinity
- lim x -> 1 DNE
- law that says "The limit of a root is the root of the limit"
- evaluate,as ( h -> 0) lim [(3+h)^2 - 9 divided by h / Six
13 Clues: f(1) • lim x-> 0 • lim x-> 1- • lim x -> 1 DNE • lim x -> infinity • (as x -> a) lim [cf(x)] = c * lim f(x) • (as x -> a) lim[f(x)g(x)] = lim f(x) * lim g(x) • (As x -> a) lim[f(x) - g(x)] = lim f(x) - lim g(x) • (as x -> a) lim[f(x) + g(x)] = lim f(x) + lim g(x) • (as x -> a) lim[f(x) / g(x)] = lim f(x) / lim g(x) • evaluate,as ( h -> 0) lim [(3+h)^2 - 9 divided by h / Six • ...
Vocabulary F & F 1 2013-05-24
Across
- you have ten of these? f......
- another place you can live in? .....
- you might put your books and toys in this? c......
- types of vegetable that are orange? ......s
- it keeps the rain off you and you can use it for the sun too? u.......
- an animal with black and yellow stripes?
- a yellow fruit that is nice to eat?
- you might eat one of these for lunch? s.......
- a type of food with only 3 letters?
- a type of drink, usually made from fruit? j....
- the number before twenty?
- when you are sick he will make you better? d.....
Down
- this person works on a farm?
- a very tall yellow animal?
- you use it if you make a mistake when writing?
- he is not my sister! He's my .......
- the day before Saturday?
- something to keep you warm when you sleep?
- a place where you can live in? a........
- you use it to write with?
- you sit on this?
21 Clues: you sit on this? • the day before Saturday? • you use it to write with? • the number before twenty? • a very tall yellow animal? • this person works on a farm? • you have ten of these? f...... • a yellow fruit that is nice to eat? • a type of food with only 3 letters? • another place you can live in? ..... • he is not my sister! He's my ....... • ...
AP Calculus BC 2022-05-15
Across
- method using step size delta x
- theorem that states that if f is continuous on [a,b] then f must take on every y-value between f(a) and f(b)
- the sum of a sequence of numbers
- integral of velocity
- equation involving derivatives and their functions
- infinite series whose terms alternate between negative and positive
- cos(0) approximated using the first three terms of the maclaurin series
- volume of y=6x+2 rotated around the x-axis from x=0 to x=1 (rounded to nearest whole number)
- maclaurin series starting with x-(x^3/3!)+(x^5/5!)-(x^7/7!)
- integral of velocity function
- (e^1)cos(1) approximated using the first three terms of the maclaurin series (truncate to one decimal place)
- area between y=x^2 and y=3x
- when a series has a limit which is finite
- point where f’(x)=0 or f’(x) does not exist
- theorem that states that if f is continuous on [a,b] and differentiable on (a,b) then there exists c in (a,b) such that f’(c)=[f(b)-f(a)]/[b-a]
- a line that touches a curve at a single point (locally)
- derivative of velocity function
- d/dx[f(g(x))]=f’(g(x))g’(x)
Down
- total distance traveled from 1 to 2 of y=t^3 x=cos(t) (truncate to one decimal place)
- approximation of the definite integral using rectangles or trapezoids
- integration method involving fractions
- concavity when velocity is decreasing
- rule used when 0/0 or inf/inf
- graph representing the solutions to a differential equation
- speed when velocity and acceleration have different signs
- concavity when acceleration is positive
- e^3 approximated using the first three terms of the maclaurin series
- L is the ________ capacity
- reverse chain rule
- d/dx[csc(sec(x))]-0.774 x=π/4
- point where concavity changes
- |v(t)|
- ∫(1/(1+x^2))dx b=2π a=0 (round to nearest whole number)
- a function with a break, jump, or hole
- taylor series centered at c=0
- a line that touches a curve at two or more points (globally)
- d/dx[tan(x^2)] x=π/2 (rounded to the nearest whole number)
- when velocity is positive
- ________ error bounds
- test that can be used when f(x) is continuous, positive, and decreasing
40 Clues: |v(t)| • reverse chain rule • integral of velocity • ________ error bounds • when velocity is positive • L is the ________ capacity • area between y=x^2 and y=3x • d/dx[f(g(x))]=f’(g(x))g’(x) • rule used when 0/0 or inf/inf • d/dx[csc(sec(x))]-0.774 x=π/4 • point where concavity changes • integral of velocity function • taylor series centered at c=0 • method using step size delta x • ...
Numbers! 2018-03-01
20 Clues: 2= TW _ • 1= O _ E • 6= S _ X • 10= T _ N • 9= N _ _ E • 5= F _ V _ • 4= F _ _ R • 8= E _ _ HT • 7= S _ V _ N • 20= TW _ NT_ • 3= TH _ _ _ • 12= TW _ LV _ • 11= E _ E _ EN • 16= S _XT _ _ N • 15= F _ FT _ _ N • 13= TH _ RT _ _ N • 18= EI_ _ T _ _ N • 14= F _ _ RT _ _ N • 19= N _ _ ET _ _ N • 17= S _ V _ NT _ _ N
Les mois et les événements (Months and events) 2015-09-14
21 Clues: May(5) • July(7) • June(6) • April(4) • March(3) • August(8) • January(1) • February(2) • October(10) • November(11) • September(9) • December(12) • Birthday (m.) • Math test (m.) • tournament (m.) • Hockey game (m.) • Science quiz (f.) • French project (m.) • last match/game (m.) • First day of school(f.) • Museum (field) trip (f.)
GB1 Practical 1 - 2/3 2023-03-05
Across
- Found in animal only: #3
- When a specimen is in the center view of one objective, and is almost in center with the next.
- F: -SH | C: Thiol (The ONLY one with sulfer)
- Two monomers joined together.
- Found in animal only: #4
- Phosphate groups transfer ___ for cells to work.
- F: -CH3 | (Ex: 5-Methyl cytidine)
- The degree of which image details stand out against their background.
- F: -NH2/-NH3 | C: Amine (Ex: Glycine)
- Chemical formula of CHO (1:2:1)
- The ability to see and distinguish finer details.
- Found in animal only: #2
- All cells have: #4
- Slide #2 - Domain Eukarya; Kingdom Protista.
- Many monomers joined together.
- C6,H12,O6.
- This bond is the covalent bond between amino acids.
- ___ synthesis. (Short polymer merging with monomer)
- F: -O-P-O3 | C: Organic Phosphate (Ex: Gylcerol)
- How much of the specimen is in focus.
- Increases the apparent size of an object.
- Test for protein.
- F: -C=O | C: Aldehyde/Keytone (Ex: Acetone)
- Monomer of sugar.
Down
- Found in plants only: #2
- All cells have: #3
- Found in plants only: #1
- Found in animal only: #1
- ___ breaks down a polymer.
- Found in plants only: #3
- A Carbonyl in the middle
- To calculate total magnification, you ___ the power of the objective and the eyepiece.
- All cells have: #1
- Test for starch.
- Test for sugar. (REDUCING)
- Squiggly bacteria.
- When a specimen is in focus on one objective, and is almost in focus with the next.
- A Carbonyl at the end.
- Test for lipids. (Chemical)
- Common name for polypeptides.
- The area seen within the eyepiece.
- Molecule that can be bound to other identical molecules.
- Slide #1 - Domain Eukarya; Kingdom Protista.
- Large round cell that fixes nitrogen.
- All cells have: #2
- F: -OH | C: Alcohol (Ex: Ethanol)
- Rod shaped bacteria.
- Round bacteria.
- Test for lipids. (Paper)
- F: -COOH | C: Organic Acids (Ex: Acedic Acid)
50 Clues: C6,H12,O6. • Round bacteria. • Test for starch. • Test for protein. • Monomer of sugar. • All cells have: #3 • All cells have: #1 • Squiggly bacteria. • All cells have: #4 • All cells have: #2 • Rod shaped bacteria. • A Carbonyl at the end. • Found in plants only: #2 • Found in animal only: #3 • Found in plants only: #1 • Found in animal only: #1 • Found in plants only: #3 • ...
Learn Math Vocabulary 2021-01-16
Across
- (x-32)+(y+22)=16 is a(n) _____ ___ ____ _____.
- f(x)=(x2+5x+6)÷(x+2) ---> f(x)=x+3 ________ _______ can be used to solve the equation.
- Tells us a point in which a function changes its increasing, decreasing, or constant behavior.
- 4/3x; (x-8)/(x+3); (4x-7)/(x2+5x-9)are examples of ________ ______.
- 2x+4y=8 is an example of a(n) ________ equation.
- f(x)=sin(x) is an example of a(n) ________ _________.
- 2x^2+10x-12 ---> 2(x^2+5x-6) ---> 2(x+6)(x-1)
- The y-value doesn’t repeat in a(n) ____ _____ ____ function.
Down
- f(x)=x; f(x)= |x| ; f(x)=x^2; and f(x)=a^x are in the library of ______ _______.
- A rate that describes how one quantity changes in relation to another quantity.
- When the x-value doesn’t repeat, the equation is a(n) ________.
- 1-Rewrite the function as y=; 2-Interchange x and y; 3-Solve for y; 4-Replace y with f-1(x). These are the steps for finding the _____ ____ ____ _____.
- The graph is a U shape so it’s a(n) ________ function.
- Use the leading coefficient test to determine the _____ _____ of the graph.
- (5x2+3x-7)÷(x+9) ---> f(-9)=5(-9)2+3(-9)-7 ---> 405-27-7=371 ---> r=371 What was used to find the remainder?
- A rational expression in which the numerator and denominator have no factors in common.
- f(x)=cos(x) is an example of a(n) ________ _________.
17 Clues: 2x^2+10x-12 ---> 2(x^2+5x-6) ---> 2(x+6)(x-1) • (x-32)+(y+22)=16 is a(n) _____ ___ ____ _____. • 2x+4y=8 is an example of a(n) ________ equation. • f(x)=cos(x) is an example of a(n) ________ _________. • f(x)=sin(x) is an example of a(n) ________ _________. • The graph is a U shape so it’s a(n) ________ function. • ...
Grafik Fungsi Trigonometri 2023-06-04
Across
- Simpangan terjauh titik fungsi trigonometri terhadap garis - garis horizontal (x) adalah....
- Nilai minimum yang dapat dicapai oleh grafik f(x) : -2 cos x+1 adalah....
- Dalam grafik fungsi sinus, k = adalah....
- Nilai maksimum dari fungsi trigonometri f(x) = 1/5 sin (5x - x/6) 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....
- Nilai Minimum dari fungsi trigonometri y= 5 sin² x + 3 cos²x adalah....
- Rentang pengulangan bentuk grafik disebut. ...
- Nilai minimum dari fungsi f(x) :2 sin (x- x/3) +1 adalah....
- Pada saat menggambar grafik fungsi trigonometri menggunakan tabel, hubungkan titik-titik dengan kurva yang....
- Menggambar grafik fungsi trigonometri menggunakan tabel di gambar pada bidang....
- Suatu garis lurus yang akan didekati oleh kurva namun tidak akan berpotongan/bersinggungan antara garis dan kurva disebut....
- Suatu fungsi yang grafiknya berulang secara terus menerus dalam periode tertentu disebutdisebut fungsi....
Down
- Nilai minimum dari fungsi y = -2 cos 3/2 x adalah....
- Grafik fungsi trigonometri dapat digambarkan dengan dua cara yaitu menggunakan tabel dan menggunakan lingkaran....
- Nilai maksimum dari fungsi y = 2 sin (x+60°) + 1 adalah....
- Jarak terjadinya pengulangan atau gelombang memiliki satu periode putaran disebut....
- Nilai maksimum dari f(x) = 12 cosx - 5 sin x+3 adalah....
- y = - x² + 4x + 3
- Nilai maksimum dari fungsi trigonometri f(x) = cos (8x - x/8) - 2/3 adalah....
- garis x = 90° dan x = 270° pada grafik fungsi y = tan x adalah....
20 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.... • ...
GRAFIK FUNGSI TRIGONOMETRI 2023-06-02
Across
- Rentang pengulangan bentuk grafik disebut....
- Nilai maksimum dari fungsi trigonometri f(x) = 1/5 sin (5x - x/6) adalah....
- Simpangan terjauh titik fungsi trigonometri terhadap garis - garis horizontal (x) adalah....
- Nilai minimum dari fungsi y = -2 cos 3/2 x 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....
- Dalam grafik fungsi sinus, k = adalah....
- Grafik fungsi trigonometri dapat digambarkan dengan dua cara yaitu menggunakan tabel dan menggunakan lingkaran....
- Pada saat menggambar grafik fungsi trigonometri menggunakan tabel hubungkan titik - titik dengan kurva yang....
Down
- Nilai minimum dari fungsi f(x) :2 sin (x- x/3) +1 adalah....
- Menggunakan grafik fungsi trigonometri menggunakan tabel digambar pada bidang....
- Nilai maksimum dari fungsi y = 2 sin (x+60°) + 1 adalah....
- Nilai minimum yang dapat dicapai oleh grafik f(x) : -2 cos x+1 adalah....
- y = - x² + 4x + 3
- Jarak terjadinya pengulangan atau gelombang memiliki satu periode putaran disebut....
- Nilai maksimum dari fungsi trigonometri f(x) = cos (8x - x/8) - 2/3 adalah....
- Suatu garis lurus yang akan di dekati oleh kurva namun tidak akan berpotongan atau bersinggungan antara garis dan kurva disebut....
- Nilai Minimum dari fungsi trigonometri y= 5 sin² x + 3 cos²x 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....
- Nilai maksimum dari f(x) = 12 cosx - 5 sin x+3 adalah....
20 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.... • ...
7.r. - linearna funkcija 2016-05-14
Across
- Koliko minimalno točaka je potrebno za crtanje pravca?
- U kakvom položaju u odnosu na koordinatne osi je pravac x=-1?
- f(x)=-2x+1, g(x)=-3x, h(x)=-x-4.
- U f(x)=ax+b, x je ...
- Funkcija oblika f(x)=ax+b.
- Kakav kut s pozitivnim dijelom osi x zatvara pravac čiji a<0?
Down
- U f(x)=ax+b, f(x) je ...
- Pravci koji imaju jednake koeficijente smjerova.
- f(x)=5x-3, g(x)=0.5x, h(x)=2x-4.
- Kakav kut s pozitivnim dijelom osi x zatvara pravac čiji a>0?
- Koeficijent b u f(x)=ax+b.
- Točka u kojoj pravac siječe os x.
- Graf linearne funkcije u koordinatnoj ravnini.
- U kakvom položaju u odnosu na koordinatne osi je pravac y=4?
- Koeficijent a u f(x)=ax+b.
15 Clues: U f(x)=ax+b, x je ... • U f(x)=ax+b, f(x) je ... • Koeficijent b u f(x)=ax+b. • Koeficijent a u f(x)=ax+b. • Funkcija oblika f(x)=ax+b. • f(x)=5x-3, g(x)=0.5x, h(x)=2x-4. • f(x)=-2x+1, g(x)=-3x, h(x)=-x-4. • Točka u kojoj pravac siječe os x. • Graf linearne funkcije u koordinatnoj ravnini. • Pravci koji imaju jednake koeficijente smjerova. • ...
TTS Getaran dan Gelombang 2023-01-11
Across
- Waktu untuk bergetar 1 getaran
- Frekuensi sama dengan 5 maka T =
- Kecepatan melebihi kecepatan suara
- Gelombang longitudinal
- Penemu teknik kirim listrik nirkabel
- Keadaan benda saat diam
- Pantulan suara terdengar jelas
- Jarak ditempuh gelombang waktu tertentu
- Periode sama dengan 0.5 maka F =
- Bunyi dengan frekuensi teratur
- Suara bom meletus
- Gelombang merambat tak perlu medium
- Bunyi frekuensi tak teratur
- Satu bukit satu lembah
- Gelombang merambat perlu medium
- Arah getar gelombang sejajar rambatnya
- Dalam waktu 10 s bergetar 40x maka F=
- Arah bergetar tegak lurus rambatnya
Down
- Bunyi frekuensinya diatas 20.000Hz
- gerak periodik melewati keseimbangan
- Jarak ditempuh dalam 1 gelombang
- Bergetar 40x dalam waktu 5 s maka T=
- Pantulan suara terdengar samar
- Jika ɳ = 12 meter, v = 3 m/s, maka T=
- Jika ɳ = 2 meter, v = 12 m/s, maka F=
- Amplitudo
- Jika F = 0.5 H dan ɳ = 1 m, maka v=
- Indera manusia
- Bunyi frekuensinya kurang 20 Hz
- Bunyi frekuensinya kurang 20-20.000Hz
- Medium perambatan bunyi
- Bergetarnya benda oleh getar benda lain
- Jika T = 0.04 maka F =
- Jika v= 15 m/s dan F = 6 Hz, maka ɳ=
- Banyaknya getaran tiap detik
35 Clues: Amplitudo • Indera manusia • Suara bom meletus • Gelombang longitudinal • Jika T = 0.04 maka F = • Satu bukit satu lembah • Keadaan benda saat diam • Medium perambatan bunyi • Bunyi frekuensi tak teratur • Banyaknya getaran tiap detik • Waktu untuk bergetar 1 getaran • Pantulan suara terdengar samar • Pantulan suara terdengar jelas • Bunyi dengan frekuensi teratur • ...
parent functions 2023-05-09
GRAFIK FUNGSI TRIGONOMETRI 2023-05-22
Across
- garis x = 90° dan x = 270° pada grafik fungsi y = tan x disebut
- dalam grafik fungsi sinus, k adalah
- nilai minimum dari fungsi trigonometri y = 5 sin² x + 3 cos² x adalah
- jarak terjadinya pengulangan/gelombang memiliki periode satu putaran
- suatu garis lurus yang akan didekati oleh kurva namun tidak akan berpotongan/bersinggungan antara garis dan kurva disebut
- pada saat menggambar grafik fungsi trigonometri menggunakan tabel, hubungkan titik-titik dengan kurva yang
- nilai maksimum dari f(x) = 12 cos x - 5 sin x + 3 adalah
- simpangan terjauh titik fungsi trigonometri terhadap garis horizontal (x) adalah
- f(x) = √2 cos 3x + 1. Jika nilai maksimum dan minimum f(x) berturut-turut p dan q, maka nilai p² + q² adalah
- sifat grafik y = tan x, tidak mempunyai nilai
Down
- nilai maksimum dari fungsi y = -2 cos 3/2x adalah
- y = -x² + 4x - 3
- nilai maksimum dari fungsi y = 2 sin (x+60°) + 1 adalah
- nilai minimum dari fungsi f(x) = 2 sin (x - x/3) + 1
- nilai minimum yang dapat dicapai oleh fungsi f(x) = -2 cos x + 1 adalah
- nilai maksimum dari fungsi trigonometri f(x) = ⅕ sin (5x - x/6) adalah
- grafik fungsi trigonometri dapat digambarkan dengan dua cara, yaitu menggunakan tabel dan menggunakan lingkaran
- suatu fungsi yang grafiknya berulang secara terus-menerus dalam periode tertentu disebut fungsi
- nilai maksimum dari fungsi trigonometri f (x) = cos (8x - x/8) - ⅔ adalah
- rentang pengulangan bentuk grafik disebut
- menggambar grafik fungsi trigonometri menggunakan tabel digambar pada bidang
21 Clues: y = -x² + 4x - 3 • dalam grafik fungsi sinus, k adalah • rentang pengulangan bentuk grafik disebut • sifat grafik y = tan x, tidak mempunyai nilai • nilai maksimum dari fungsi y = -2 cos 3/2x adalah • nilai minimum dari fungsi f(x) = 2 sin (x - x/3) + 1 • nilai maksimum dari fungsi y = 2 sin (x+60°) + 1 adalah • nilai maksimum dari f(x) = 12 cos x - 5 sin x + 3 adalah • ...
TTS MATEMATIKA 2023-08-27
Across
- Sebutan lain dari fungsi On-To
- Himpunan yang membatasi "keluaran" suatu fungsi
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Gabungan objek yang memiliki definisi yang jelas
Down
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(c)=7,maka nilai c
16 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1) • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3) • ...
TTS MATEMATIKA 2023-08-27
Across
- fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3)
- Fungsi yang memiliki hubungan kebalikan antara dua fungsi dan dari fungsi asalnya
- fungsi f dirumuskan dengan f(x)=2x-3. Jika f(c)=7,maka nilai c
- Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3)
- Jika f(x)= 2x+c dan f(5)= -6 maka nilai c
- Fungsi susunan dari beberapa fungsi yang terhubung dan berkaitan
- Sifat Mengubah pengelompokan dari bilangan yang dijumlah tidak akan mengubah hasil penjumlahan
Down
- Diketahui f(x)=3x²+4x-7 dan g(x)= 2x² +2, maka (f+g)(2) adalah
- fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1)
- Gabungan objek yang memiliki definisi yang jelas
- Himpunan yang membatasi "keluaran" suatu fungsi
- Anggota himpunan dari daerah asal biasanya terletak di sebelah kiri
- Sebutan lain dari fungsi On-To
- Fungsi yang elemen domain dan kodomain hanya boleh berelasi satu kali
- Keuntungan di peroleh mengikuti fungsi f(x)= 12x + 284, untuk setiap x potongan kue yang terjual. Maka jika terjual sebanyak 18 kue, berapa keuntungan
- Diketahui g(x)= 7x-5 dan h(x)= 3x-3, maka (g-h)(3) adalah
16 Clues: Sebutan lain dari fungsi On-To • Jika f(x)= 2x+c dan f(5)= -6 maka nilai c • Jika f(x)= 2x+5 dan g(x)= x-2 maka (G o F) (3) • Himpunan yang membatasi "keluaran" suatu fungsi • Gabungan objek yang memiliki definisi yang jelas • fungsi f(x)=2x-2 dan h(x)= x² +7, maka (F o H) (-3) • fungsi f(x)=2x-1 dan h(x)= x² +7, maka (F o H) (-1) • ...
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. • ...