Final answer:
Given that h(x) = (1/4)x^3+2x-1 and g is the inverse. By solving, will get g'(5) = 0.048
Step-by-step explanation:
To find the value of g'(5), we need to find the value of g'(x) and substitute x = 5 into the resulting function.
Since g is the inverse of h, we can find g'(x) using the formula:
g'(x) = 1 / h'(g(x))
First, let's find h'(x) by taking the derivative of h(x).
The derivative of (1/4)x^3+2x-1 is (3/4)x^2+2.
Now, we substitute x = g(x) into the derivative of h to find g'(x):
g'(x) = 1 / ((3/4)x^2+2)
Finally, substitute x = 5 into the equation to find g'(5):
g'(5) = 1 / ((3/4)(5^2)+2)
g'(5) = 0.048 (rounded to 3 decimal places).