Let f(3) = 0, f '(3) = 6, g(3) = 1, and g '(3) = 1/3. If h(x) = f(x)*g(x), find h '(3).

2 answers

1. Use the rule of products:
   h'(x)
   =d(f(x)*g(x))/dx
   =f(x)*g'(x)+f'(x)*g(x)
   
   For h'(3), substitute f(3),g'(3),f'(3) and g(3) above to evaluate.
   
   Post your answer for a check if you wish.

   Answer ID
   539812

   Created
   May 1, 2011 12:34am UTC

   Rating
   1

   URL
   https://questions.llc/answers/539812

2. 6(h - 3) if h = -5

   Answer ID
   2310575

   Created
   January 25, 2022 1:12pm UTC

   Rating
   0

   URL
   https://questions.llc/answers/2310575