1. f(x)=sin2x find f'(x) and f'(5) 2. f(x)=sin3x find f'(x) and f'(3) 3. f(x)=sin(x3) find f'(x)...

1. Let ?(?)=8(sin(?))? find f′(2). 2. Let ?(?)=3?sin−1(?) find f′(x) and f'(0.6).

1. Let ?(?)=8(sin(?))? find f′(2). 2. Let ?(?)=3?sin−1(?) find f′(x) and f'(0.6).

1. If f(x) = ∫10/x t^3 dt then: f′(x)= ? and f′(6)= ? 2. If f(x)=∫x^2/1...

1. If f(x) = ∫10/x t^3 dt then: f′(x)= ? and f′(6)= ? 2. If f(x)=∫x^2/1 t^3dt t then f′(x)= ? 3. If f(x)=∫x3/−4 sqrt(t^2+2)dt then f′(x)= ? 4. Use part I of the Fundamental Theorem of Calculus to find the derivative of h(x)=∫sin(x)/−2 (cos(t^3)+t)dt. what is h′(x)= ? 5. Find the derivative of the following function: F(x)=∫1/sqrt(x) s^2/ (1+ 5s^4) ds using the appropriate form of the Fundamental Theorem of Calculus. F′(x)= ? 6. Find the definitive integral: ∫8/5...

Find f(x). f '''(x) = sin x, f(0) = 1, f '(0) = 2, f ''(0)...

Find f(x). f '''(x) = sin x, f(0) = 1, f '(0) = 2, f ''(0) = 3

sin(x)=x-x3/3!+x5/5! Below is the expansion of the Taylor series sin (x) function around the x =...

sin(x)=x-x3/3!+x5/5! Below is the expansion of the Taylor series sin (x) function around the x = [x] point. Please continue.

f(x) = − cos(x^2 ) + 2 sin(x) [1,3.5] 1) find f'(x) and the roots on...

f(x) = − cos(x^2 ) + 2 sin(x) [1,3.5] 1) find f'(x) and the roots on the given interval. 2) find all critical points of f(x) on the given interval. 3) find absolute max and min of f(x) on the given interval.

1. Find the derivative of f(x)= √4-sin(x)/3-cos(x) 2. Find the derivative of 1/(x^2-sec(8x^2-8))^2

1. Find the derivative of f(x)= √4-sin(x)/3-cos(x) 2. Find the derivative of 1/(x^2-sec(8x^2-8))^2

Find the 5th Taylor polynomial of f(x) = 1 + x + 2x^5 +sin(x^2)  based at b...

Find the 5th Taylor polynomial of f(x) = 1 + x + 2x^5 +sin(x^2)  based at b = 0.

f f(x)= 4x?1 if ?4?x?4 and x3?4 if 4<x?5 ?, ?find: (a)? f(0), (b)? f(1), (c)...

f f(x)= 4x?1 if ?4?x?4 and x3?4 if 4<x?5 ?, ?find: (a)? f(0), (b)? f(1), (c) ?f(44?), (d) f(5)

Let f(x) =(x)^3/2 (a) Find the second Taylor polynomial T2(x) based at b = 1. x3....

Let f(x) =(x)^3/2 (a) Find the second Taylor polynomial T2(x) based at b = 1. x3. (b) Find an upper bound for |T2(x)−f(x)| on the interval [1−a,1+a]. Assume 0 < a < 1. Your answer should be in terms of a. (c) Find a value of a such that 0 < a < 1 and |T2(x)−f(x)| ≤ 0.004 for all x in [1−a,1+a].

1- For the following functions, find all critical numbers exactly. f(x) = x − 2 sin...

1- For the following functions, find all critical numbers exactly. f(x) = x − 2 sin x for −2π < x < 2π f(x) = e^−x −e^−3x for x > 0 f(x) = x^5 − 2x^3