There is a typo in the equation, sorry.
The second term in the minimum should be
.
Rather than solve the inequality in (b) to get this bound, you may rather just verify that this is a bound by showing that if
, then the inequality in (b) is satisfied, namely
.
Quote:
Originally Posted by mileschen
For Problem 2.14(c), to determine the min value, the way I think would be try to solve the equation in (b) and get L. Maybe L is the second part of the min. However, how to solve the equation is a really hard question. Thus, could anyone tell me how to solve the equation or give me a hint on how to get the right answer?
