Ask a New Question

suppose f(pi/3)=4 and f'(pi/3)=(-3). Let g(x) = f(x) sin(x) and h(x) = cos(x)/f(x)

Find the following.
(a) g'(pi/3)=
(b) h'(pi/3)=

1 answer

g' (x) = f(x) cos x + f'(x) sin x = 4 cos (pi/3) - 3 sin (pi/3)
= 4 (1/2) - 3* sqrt3 / 2

h' = [ -f(x)sin x - f'(x) cos x ] / [ f(x) ]^2
same way now

Ask a New Question or answer this question.

Similar Questions

Suppose sin(4) -Use the trig identity sin² (A) + cos2 (4) - 1 to find cos(4) in quadrant I. Show all steps and round to
1. 1 answer
Suppose sinA = 12/13 with 90º≤A≤180º. Suppose also that sinB = -7/25 with -90º≤B≤0º. Find cos(A - B).
1. 0 answers
Suppose sinA = 12/13 with 90º≤A≤180º. Suppose also that sinB = -7/25 with -90º≤B≤0º. Find cos(A - B).
1. 0 answers
Suppose sinA = 12/13 with 90º≤A≤180º. Suppose also that sinB = -7/25 with -90º≤B≤0º. Find cos(A + B).
1. 0 answers

more similar questions