How do you determine all values of c that satisfy the mean value theorem on the interval [6,10] for #f(x)= ln (x-5)#?

1 Answer
Dec 16, 2016

#c= (4 + ln3125)/ln5#

Explanation:

The function #ln(x- 5)# is defined and continuous for all #x > 5#.

We can therefore most certainly use the mean value theorem to solve for #C#. The theorem states that if #f(x)# is defined, continuous and differentiable on the interval #[a, b]#, then there is certainly one number #C# that satisfies #f'(C) = (f(b) - f(a))/( b - a)#. In other words, the average rate of change will be equal to the instantaneous rate of change at some point #C# on the function.

We start by finding the derivative of #f(x)#. Let #y = lnu# and #u = x - 5#.

Then #dy/(du) = 1/u# and #(du)/dx = 1#.

#dy/dx = 1/u xx 1#

#dy/dx= 1/(x - 5)#

By the mean value theorem:

#1/(c- 5) = (f(10) - f(6))/(10 - 6)#

#1/(c- 5) =(ln5 - ln1)/4#

#1/(c- 5) = (ln5 - 0)/4#

#4 = (c- 5)ln5#

#4 = cln5 - 5ln5#

#4 + ln3125 = cln5#

#c= (4 + ln3125)/ln5 ~= 7.485#

Hopefully this helps!