Problem:
What is the maximum value of 4t(2tβ3t)tβ for real values of t ?
Answer Choices:
A. 161β
B. 151β
C. 121β
D. 101β
E. 91β Solution:
We proceed by using AMβGM. We get 2(2tβ3t)+3tββ₯(2tβ3t)(3t)β. Thus, squaring gives us that 4tβ1β₯(2tβ3t)(3t). Remembering what we want to find, we divide both sides of the inequality by the positive amount of 3β 4t1β. We get the maximal values as (C)121ββ, and we are done.
OR
Set u=t2βt. Then the expression in the problem can be written as
It is easy to see that u=61β is attained for some value of t between t=0 and t=1, thus the maximal value of R is (C)121ββ.
Solution 3 (Calculus Needed) We want to maximize f(t)=4t(2tβ3t)tβ=4ttβ 2tβ3t2β. We can use the first derivative test. Use quotient rule to get the following: