Given the function f(x)= ln x^2f(x)=lnx2, how do you determine whether f satisfies the hypotheses of the Mean Value Theorem on the interval [1,3] and find the c?

1 Answer
KillerBunny
Oct 1, 2016

c = 2/ln(3)c=2ln(3)

Explanation:

First of all, let's remind that the Mean Value Theorem states that, if ff is a continuous function on the closed interval [a,b][a,b], and differentiable on the open interval (a,b)(a,b), then there exists some cc in (a,b)(a,b) such that

f'(c) = (f(b)-f(a))/(b-a)

id est, there exists an inner point in which the tangent line is parallel to the line connecting f(a) and f(b).

Since your function is continuous in [1,3] and differentiable in (1,3), we can invoke the theorem.

Moreover, we can observe that ln(x^2)=2ln(x), which will simplify a bit our computations. In fact, we have:

  • f'(x) = 2/x
  • f(b) = f(3) = 2ln(3)
  • f(a) = f(1) = 2ln(1)=0
  • b-a = 3-1 = 2

So, we need to solve for c the equation

f'(c) = (f(b)-f(a))/(b-a) \to 2/c = (2ln(3))/2 = ln(3)

Inverting both sides, we have

2/c = ln(3) \iff c/2 = 1/ln(3)

And finally, multiplying by 2 both sides,

c/2 = 1/ln(3) \iff c = 2/ln(3)

We can also check that 2/ln(3) is approximately 1.8204..., so it is indeed a number between 1 and 3.

Related questions
See all questions in Mean Value Theorem for Continuous Functions
Impact of this question
10557 views around the world
You can reuse this answer
Creative Commons License