Difference between revisions of "2012 AIME II Problems/Problem 5"

Revision as of 13:29, 4 April 2012

Problem 5

In the accompanying figure, the outer square $S$ has side length $40$ . A second square $S'$ of side length $15$ is constructed inside $S$ with the same center as $S$ and with sides parallel to those of $S$ . From each midpoint of a side of $S$ , segments are drawn to the two closest vertices of $S'$ . The result is a four-pointed starlike figure inscribed in $S$ . The star figure is cut out and then folded to form a pyramid with base $S'$ . Find the volume of this pyramid.

$[asy] pair S1 = (20, 20), S2 = (-20, 20), S3 = (-20, -20), S4 = (20, -20); pair M1 = (S1+S2)/2, M2 = (S2+S3)/2, M3=(S3+S4)/2, M4=(S4+S1)/2; pair Sp1 = (7.5, 7.5), Sp2=(-7.5, 7.5), Sp3 = (-7.5, -7.5), Sp4 = (7.5, -7.5); draw(S1--S2--S3--S4--cycle); draw(Sp1--Sp2--Sp3--Sp4--cycle); draw(Sp1--M1--Sp2--M2--Sp3--M3--Sp4--M4--cycle); [/asy]$

Solution

The volume of this pyramid can be found by the equation $V=\frac{1}{3}bh$ , where $b$ is the base and $h$ is the height. The base is easy, since it is a square and has area $15^2=225$ .

To find the height of the pyramid, the height of the four triangles is needed, which will be called $h^\prime$ . By drawing a line through the middle of the larger square, we see that its length is equal to the length of the smaller triangle and two of the triangle's heights. Then $40=2h^\prime +15$ , which means that $h^\prime=12.5$ .

When the pyramid is made, you see that the height is the one of the legs of a right triangle, with the hypotenuse equal to $h^\prime$ and the other leg having length equal to half of the side length of the smaller square, or $7.5$ . So, the Pythagorean Theorem can be used to find the height.

$h=\sqrt{12.5^2-7.5^2}=\sqrt{100}=10$

Finally, $V=\frac{1}{3}bh=\frac{1}{3}(225)(10)=\boxed{750.}$

@@ Line 15: / Line 15: @@
 == Solution ==
-{{solution}}
+The volume of this pyramid can be found by the equation <math>V=\frac{1}{3}bh</math>, where <math>b</math> is the base and <math>h</math> is the height. The base is easy, since it is a square and has area <math>15^2=225</math>.
+To find the height of the pyramid, the height of the four triangles is needed, which will be called <math>h^\prime</math>. By drawing a line through the middle of the larger square, we see that its length is equal to the length of the smaller triangle and two of the triangle's heights. Then <math>40=2h^\prime +15</math>, which means that  <math>h^\prime=12.5</math>.
+When the pyramid is made, you see that the height is the one of the legs of a right triangle, with the hypotenuse equal to <math>h^\prime</math> and the other leg having length equal to half of the side length of the smaller square, or <math>7.5</math>. So, the Pythagorean Theorem can be used to find the height.
+<math>h=\sqrt{12.5^2-7.5^2}=\sqrt{100}=10</math>
+Finally, <math>V=\frac{1}{3}bh=\frac{1}{3}(225)(10)=\boxed{750.}</math>
 == See Also ==
 {{AIME box|year=2012|n=II|num-b=4|num-a=6}}

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Difference between revisions of "2012 AIME II Problems/Problem 5"

Revision as of 13:29, 4 April 2012

Problem 5

Solution

See Also