Find the second derivative of: f(x) = tan(x)
f(x)=3+x^2 +tan(pi x/2) Find (f^-1)’(a) (the derivative of f^-1 at (x=a ) if a=3 (ther Find (F-1)'(a) he derivative off atxeal it a = 3 πα f(x) = 3 + x2 + tan
5. Find the derivative of f(x) = ln (sec(x) + tan *' (x)). 6. Find an equation of the tangent line to the curve y = x’ In(x) when x = e?
Q2 a) Find the second derivative of the following function y = tan x + sin-1x b) Using chain rule find any as function of y for the following function y = Vē – 1, x = t2 In x c) Using L'Hopital's rule find the limits as x approach 1 of the function d) find for the function y = ln xy + log10 (x + 3) + 2*+sinh-1x dx
Find The indicated second-order Partial derivative. fxx(x,y) if f(x,y)=5x-3y+3 Find the indicated second-order partial derivative. fxx (x,y) if f(x,y) = 5x - 3y + 3 fxx(x,y) =
Find The indicated second-order Partial derivative. fxx(x,y) if f(x,y)=5x-3y+3 Find the indicated second-order partial derivative. fxx (x,y) if f(x,y) = 5x - 3y + 3 fxx(x,y) =
Let f(x)= x/n(x). Find the value of x for which the second derivative F"(x) equals to zero.
(1 point) Find the critical points of f(x) and use the Second Derivative Test of possible) to determine whether each corresponds to a local minimum or maximum. Let f(x) = x exp(-x) e lest ? Critical Point 1 - Critical Point 2 - is what by the Second Derivative Test? is what by the Second Derivative Test?
4pts 1) Find the second derivative of the function f(x) = 3x4 + 2Vx
(a) A function / has first derivative f'(z) = and second derivative 3) f"(x) It is also known that the function f has r-intercept at (-3,0), and a y-intercept at (0,0) (i) Find all critical points, and use them to identify the intervals over which you will examine the behaviour of the first derivative ii) Use the f'(), and the First Derivative Test to classify each critical point. (ii) Use the second derivative to examine the concavity around critical points...
Find the second derivative of the function. y = 4(x2 + 2x)3 y" = _______ Find the third derivative of the function. f(x) = x4-4x3 f'''(x) = _______