Difference between revisions of "2011 AIME II Problems/Problem 2"

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Solution: (Needs better solution, I cannot remember exactly how I got the side length)
 
Solution: (Needs better solution, I cannot remember exactly how I got the side length)
  
Drawing the square and examining the given lengths, you find that the three segments cut the square into three equal horizontal sections (see diagram)
+
Drawing the square and examining the given lengths, you find that the three segments cut the square into three equal horizontal sections (see geoboard diagram [that thing is actually pretty cool])
 
Therefore, (x being the side length), <math>sqrt(x^2+(x/3)^2)=30</math>, or <math>x^2+(x/3)^2=900</math>. Solving for x, we get that x=9sqrt(10), and <math>x^2</math>=810
 
Therefore, (x being the side length), <math>sqrt(x^2+(x/3)^2)=30</math>, or <math>x^2+(x/3)^2=900</math>. Solving for x, we get that x=9sqrt(10), and <math>x^2</math>=810
  

Revision as of 21:49, 30 March 2011

Problem:

On square ABCD, point E lies on side AD and point F lies on side BC, so that BE=EF=FD=30. Find the area of the square ABCD.


Solution: (Needs better solution, I cannot remember exactly how I got the side length)

Drawing the square and examining the given lengths, you find that the three segments cut the square into three equal horizontal sections (see geoboard diagram [that thing is actually pretty cool]) Therefore, (x being the side length), $sqrt(x^2+(x/3)^2)=30$, or $x^2+(x/3)^2=900$. Solving for x, we get that x=9sqrt(10), and $x^2$=810

Area of the square is 810.

<geogebra>bb56f64482bd0dabba65a4dcad9d52a05d440f19</geogebra>