Given the function #f(x)=abs(x-3)#, how do you determine whether f satisfies the hypotheses of the Mean Value Theorem on the interval [0,6] and find the c?

1 Answer
Sep 4, 2016

See below.

Explanation:

This function is the same as #absx# translated 3 to the right, so #f(x)# is continuous on #RR#, hence it is continuous on #[0,6]#.

#f# is not differentiable at #3#, so it does not satisfy the second hypothesis on #[0,6]#.

Because the hypotheses are not satisfied, the Mean Value Theorem gives no information about whether there is a #c# in #(0,6)# with #f'(c) = (f(6)-f(0))/(6-0)#.

Note that #f'(x) = {(-1, " if ",x <= -3),(1," if ",x >3):}#

While

# (f(6)-f(0))/(6-0) = (3-3)/6 = 0#.

There is no #c# at which #f'(c) = (f(6)-f(0))/(6-0)#.