Suppose f(3) = 2 and f'(3) = −1. a. If h(x) = x^2f(x), compute h'(3). b....

Suppose that f(2) = −4, g(2) = 2, f '(2) = −5, and g'(2) = 1....

Suppose that f(2) = −4, g(2) = 2, f '(2) = −5, and g'(2) = 1. Find h'(2). a. h(x)=2f(x)-5g(x) h'(2)=? b. h(x)=f(x)g(x) h'(2)=? c. h(x)=f(x)/g(x) h'(2)=? d. h(x)=g(x)/1+f(x) h'(2)=?

Suppose f(x)=?2x2?9x?2 f(x)=-2x2-9x-2. Compute the following: A.) f(?5)+ f(1)= B.) f(?5)? f(1)=

Suppose f(x)=?2x2?9x?2 f(x)=-2x2-9x-2. Compute the following: A.) f(?5)+ f(1)= B.) f(?5)? f(1)=

Let h(x) = f (g(x) − (x^2 + 1)) . If f(0) = 3, f(2) =...

Let h(x) = f (g(x) − (x^2 + 1)) . If f(0) = 3, f(2) = 5, f ' (0) = −5, f ' (2) = 11, g(1) = 2, and g ' (1) = 4. What is h(1) and h ' (1)?

If f (2) = 1, \ f '(2) = - 3 and g (x) = log_2...

If f (2) = 1, \ f '(2) = - 3 and g (x) = log_2 (x ^ 2f (x) / cos (f (x)) then g' (2) is equal to: a)-9.625983 B)-3.327777 c)-4.800967 d)-12.01444 E)The answer doesn´t exist

Suppose the derivative of f exists, and assume that f(1) = 4, and f'(1) = 5....

Suppose the derivative of f exists, and assume that f(1) = 4, and f'(1) = 5. Let g(x) = x^2f(x), and h(x) = f(x)/x-2 a) g' (1) = ?? find the equation of the tangent line to g(x) at x = 1 y = ?? b) h'(1) = ?? Find the equation of the tangent line to h(x) at x = 1 y = ??

Taylor series f(xi+1)=f(xi)+f'(xi)h+(f''(xi)/2!)h2+(f'''(xi)/3!)h3+..... given f''(xi)=(-f(xi+3)+4f(xi+2)-5f(xi+1​)+2f(xi))/h2 derive the second derivative of forward finite difference  

Taylor series f(xi+1)=f(xi)+f'(xi)h+(f''(xi)/2!)h2+(f'''(xi)/3!)h3+..... given f''(xi)=(-f(xi+3)+4f(xi+2)-5f(xi+1​)+2f(xi))/h2 derive the second derivative of forward finite difference  

suppose and are functions that are differentiable at x=0 and that f(1)=2, f'(1)=-1, g(1)=-2, and g'(1)=3....

suppose and are functions that are differentiable at x=0 and that f(1)=2, f'(1)=-1, g(1)=-2, and g'(1)=3. Find the value of h'(1). 1) h(x)=f(x) g(x) 2) h(x)=xf(x) / x+g(x)

f(x) =x2 -x use f'(x)=lim h->0 f(x+h) - f(x)/h find: 1. f '(x) 2. f '(2)...

f(x) =x2 -x use f'(x)=lim h->0 f(x+h) - f(x)/h find: 1. f '(x) 2. f '(2) 3. Find the equation of a tangent line to the given function at x=2 4. f ' (-3) 5. Find the equation of a tangent line to the given function at x=-3

Taylor series f(xi+1)=f(xi)+f'(xi)h+(f''(xi)/2!)h2+(f'''(xi)/3!)h3+..... given f''(xi)=(-f(xi+3)+4f(xi+2)-5f(xi+1​)+2f(xi))/h2 derive the second derivative of forward finite difference n=3 what is...

Taylor series f(xi+1)=f(xi)+f'(xi)h+(f''(xi)/2!)h2+(f'''(xi)/3!)h3+..... given f''(xi)=(-f(xi+3)+4f(xi+2)-5f(xi+1​)+2f(xi))/h2 derive the second derivative of forward finite difference n=3 what is the order of error

1. Let f (x, y) = xy((x^2-y^2)/(x^2+y^2)) if, (x, y) 6= (0, 0), 0, if (x,...

1. Let f (x, y) = xy((x^2-y^2)/(x^2+y^2)) if, (x, y) 6= (0, 0), 0, if (x, y) = (0, 0) (it's written as a piecewise function) (a) Compute ∂f/∂y (0, 0) and ∂f/∂x (0, 0). (b) Compute ∂f/∂y (x, 0) for all x, and ∂f/∂x (0, y) for all y (c) Use part (a) and (b) to compute ∂^2f/∂y∂x (0, 0) and ∂^2f/ ∂x∂y (0, 0), then verify that: ∂^2f/∂y∂x (0, 0) does not equal ∂^f/ ∂x∂y (0, 0)