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Difference between revisions of "2024 AIME II Problems/Problem 15"

(Solution)
(Solution)
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Solution:
 
Solution:
Using the <cmath>Egger's Eg(g)regious Eggo Eggnog Egg law</cmath>,
+
Using the <cmath>Egger's Eg(g)regious Eggo Eggnog Egg law</cmath>,  
 
we can use the <math>Monkey Math Law</math> to find the total number of true eggs. Thus, we have 69696 total true eggs that are 69able. Then we square root and this yields <math>\boxed{264}</math>.
 
we can use the <math>Monkey Math Law</math> to find the total number of true eggs. Thus, we have 69696 total true eggs that are 69able. Then we square root and this yields <math>\boxed{264}</math>.

Revision as of 00:39, 24 January 2024

Problem: Suppose we have $69$ chicken eggs and $696$ egg eggs. Find the square root of the total number of true eggs that are 69able.

Solution: Using the \[Egger's Eg(g)regious Eggo Eggnog Egg law\], we can use the $Monkey Math Law$ to find the total number of true eggs. Thus, we have 69696 total true eggs that are 69able. Then we square root and this yields $\boxed{264}$.

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