Find all numbers C that satisfy the conclusion of the MVT of f(x) = Xln(x) [1,2] ?
1 Answer
May 27, 2018
Explanation:
The mean value theorem states that there are numbers
#f'(c) = (f(b) - f(a))/(b - a)# if a function is continuous on#[a, b]# and differentiable on#(a, b)# .
Let's do the math.
#f'(c) = (2ln(2) - 0)/(2 - 1)#
#f'(c) = 2ln2#
We now set this equal to the derivative of
#f'(c) = lnc + c(1/c) = lnc + 1#
Therefore
#lnc + 1 = 2ln2#
#lnc = 2ln2 - 1#
#lnc = ln4 - lne#
#lnc = ln(4/e)#
#c = 4/e#
Hopefully this helps!
