Difficult Question in Calculus — limits and integrals

omeraz100
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Homework Statement


file.php?id=21.png

(hebrew) : f(x) a continuous function. proof the following

Homework Equations


I guess rules of limits and integrals

The Attempt at a Solution


I've tried several approaches:
taking ln() of both sides and using L'Hospitale Rule.
Thought about using integral reduction formula.
But really nothing even got me close.
Looking forward to any advice
 
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omeraz100 said:

Homework Statement


file.php?id=21.png

(hebrew) : f(x) a continuous function. proof the following

Homework Equations


I guess rules of limits and integrals

The Attempt at a Solution


I've tried several approaches:
taking ln() of both sides and using L'Hospitale Rule.
Thought about using integral reduction formula.
But really nothing even got me close.
Looking forward to any advice
Please show us at least some of what you've tried. Per forum rules, you must show an attempt.
 
Last edited by a moderator:
omeraz100 said:

Homework Statement


file.php?id=21.png

(hebrew) : f(x) a continuous function. proof the following

Homework Equations


I guess rules of limits and integrals

The Attempt at a Solution


I've tried several approaches:
taking ln() of both sides and using L'Hospitale Rule.
Thought about using integral reduction formula.
But really nothing even got me close.
Looking forward to any advice

If I were doing it would let
M = \max_{x \in [a,b]} |f(x)|, \; L_t = \left( \int_a^b |f(x)|^t \, dx \right)^{1/t},
then I would show that: (1) ## \lim_{t \to \infty} L_t \leq M##; and (2) ##\lim_{t \to \infty} L_t \geq M##.

(1) is quite easy; (2) is a bit trickier and needs some properties of continuous functions on finite, closed intervals.
 

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