We are given that f(3) = 4, f′(3) = 8, f′′(3) = 11. Use this information...

Given F(2) = 1, F'(2) = 7, F(4) = 3, F′(4) = 7 and G (4)...

Given F(2) = 1, F'(2) = 7, F(4) = 3, F′(4) = 7 and G (4) = 2 , G′(4)= 6, G(3)= 4, G′(3)=11, find the following. (a) H(4) if H(x) = F(G(x)) H(4) = (b) H′(4) if H(x) = F(G(x)) H′(4) = (c) H(4) if H(x) = G(F(x)) H(4) = (d) H′(4) if H(x) = G(F(x)) H'(4)=

f(5) = 3, f'(−12) = 11, f '(5) = 4, g(5) = −12, g'(3) = 8...

f(5) = 3, f'(−12) = 11, f '(5) = 4, g(5) = −12, g'(3) = 8 and g'(5) = 5. Find the following values. 1. (f∘g)'(5) 2. (g∘f)'(5) 3. (g/f)'(5) 4. (f/g)'(5) 5. (fg)'(5)

If F(x) = f(g(x)), where f(−5) = 8, f '(−5) = 4, f '(−3) = 4,...

If F(x) = f(g(x)), where f(−5) = 8, f '(−5) = 4, f '(−3) = 4, g(−3) = −5, and g'(−3) = 4, find F '(−3). F '(-3)=______

Let F(x)=f(x3) and G(x)=(f(x))3 . You also know that a2=12,f(a)=3,f′(a)=8,f′(a3)=4. Find F'(a)= and G'(a)= . Let...

Let F(x)=f(x3) and G(x)=(f(x))3 . You also know that a2=12,f(a)=3,f′(a)=8,f′(a3)=4. Find F'(a)= and G'(a)= . Let F(x)=f(f(x))and G(x)=(F(x))2 . You also know that f(4)=13,f(13)=2,f′(13)=5,f′(4)=11. Find F′(4)= and G′(4)=

You are given a function f : [4, 8] → [-3, -2] and the partition P...

You are given a function f : [4, 8] → [-3, -2] and the partition P = {4,5,7,8} of the interval [4, 8]. Which of the following are true and which are false? U(f,P) > 0 U(f,P) < L(f,P) L(f,P) ≤ 0 U(f,P) ≤ -8

Use the secant method to estimate the root of f(x) = -56x + (612/11)*10-4 x2 -...

Use the secant method to estimate the root of f(x) = -56x + (612/11)*10-4 x2 - (86/45)*10-7x3 + (3113861/55) Start x-1= 500 and x0=900. Perform iterations until the approximate relative error falls below 1% (Do not use any interfaces such as excel etc.)

Let f(x)=3x4+8 and g(x)=x+4. (f∘g)(x)= Let f(x)=9x+9 and g(x)=5−7x2. (f∘g)(−2)=(f∘g)(−2)= Let h(x)=(f∘g)(x)=1/(x+8)^3. Find f(x) given g(x)=x+8....

Let f(x)=3x4+8 and g(x)=x+4. (f∘g)(x)= Let f(x)=9x+9 and g(x)=5−7x2. (f∘g)(−2)=(f∘g)(−2)= Let h(x)=(f∘g)(x)=1/(x+8)^3. Find f(x) given g(x)=x+8. f(x)=

Find the absolute maximum and absolute minimum values of f on the given interval: x^4-8x^2+8 [-3,...

Find the absolute maximum and absolute minimum values of f on the given interval: x^4-8x^2+8 [-3, 4] Absolute minimum: Absolute maximum:

Analyze and plot the graph of f(x)= x^4/2 - 2x^3/3. for this, find; 1) domain of...

Analyze and plot the graph of f(x)= x^4/2 - 2x^3/3. for this, find; 1) domain of f: 2)Vertical asymptotes: 3) Horizontal asymptotes: 4) Intersection in y: 5) intersection in x: 6) Critical numbers 7) intervals where f is increasing: 8) Intervals where f is decreasing: 9) Relatives extremes Relatives minimums: Relatives maximums: 10) Inflection points: 11) Intervals where f is concave upwards: 12) intervals where f is concave down: 13) plot the graph of f on the plane:

a) Find f(x) is f(x) is differentiable everywhere and f'(x)= { 2x+8, x<2 3x2, x>2 given...

a) Find f(x) is f(x) is differentiable everywhere and f'(x)= { 2x+8, x<2 3x2, x>2 given f(1)=1 b) the point (-1,2) is on the graph of y2-x2+2x=5. Approximate the value of y when x=1.1. Then use dy/dx and d2y/dx2 to determine if the point (1,-2) is a max, min, or neither.