Difference between revisions of "2020 AIME II Problems/Problem 13"
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Convex pentagon <math>ABCDE</math> has side lengths <math>AB=5</math>, <math>BC=CD=DE=6</math>, and <math>EA=7</math>. Moreover, the pentagon has an inscribed circle (a circle tangent to each side of the pentagon). Find the area of <math>ABCDE</math>. | Convex pentagon <math>ABCDE</math> has side lengths <math>AB=5</math>, <math>BC=CD=DE=6</math>, and <math>EA=7</math>. Moreover, the pentagon has an inscribed circle (a circle tangent to each side of the pentagon). Find the area of <math>ABCDE</math>. | ||
− | ==Solution 1 | + | ==Solution 1== |
Assume the incircle touches <math>AB</math>, <math>BC</math>, <math>CD</math>, <math>DE</math>, <math>EA</math> at <math>P,Q,R,S,T</math> respectively. Then let <math>PB=x=BQ=RD=SD</math>, <math>ET=y=ES=CR=CQ</math>, <math>AP=AT=z</math>. So we have <math>x+y=6</math>, <math>x+z=5</math> and <math>y+z</math>=7, solve it we have <math>x=2</math>, <math>z=3</math>, <math>y=4</math>. Let the center of the incircle be <math>I</math>, by SAS we can proof triangle <math>BIQ</math> is congruent to triangle <math>DIS</math>, and triangle <math>CIR</math> is congruent to triangle <math>SIE</math>. Then we have <math>\angle AED=\angle BCD</math>, <math>\angle ABC=\angle CDE</math>. Extend <math>CD</math>, cross ray <math>AB</math> at <math>M</math>, ray <math>AE</math> at <math>N</math>, then by AAS we have triangle <math>END</math> is congruent to triangle <math>BMC</math>. Thus <math>\angle M=\angle N</math>. Let <math>EN=MC=a</math>, then <math>BM=DN=a+2</math>. So by law of cosine in triangle <math>END</math> and triangle <math>ANM</math> we can obtain <cmath>\frac{2a+8}{2(a+7)}=\cos N=\frac{a^2+(a+2)^2-36}{2a(a+2)}</cmath>, solved it gives us <math>a=8</math>, which yield triangle <math>ANM</math> to be a triangle with side length 15, 15, 24, draw a height from <math>A</math> to <math>NM</math> divides it into two triangles with side lengths 9, 12, 15, so the area of triangle <math>ANM</math> is 108. Triangle <math>END</math> is a triangle with side lengths 6, 8, 10, so the area of two of them is 48, so the area of pentagon is <math>108-48=\boxed{60}</math>. | Assume the incircle touches <math>AB</math>, <math>BC</math>, <math>CD</math>, <math>DE</math>, <math>EA</math> at <math>P,Q,R,S,T</math> respectively. Then let <math>PB=x=BQ=RD=SD</math>, <math>ET=y=ES=CR=CQ</math>, <math>AP=AT=z</math>. So we have <math>x+y=6</math>, <math>x+z=5</math> and <math>y+z</math>=7, solve it we have <math>x=2</math>, <math>z=3</math>, <math>y=4</math>. Let the center of the incircle be <math>I</math>, by SAS we can proof triangle <math>BIQ</math> is congruent to triangle <math>DIS</math>, and triangle <math>CIR</math> is congruent to triangle <math>SIE</math>. Then we have <math>\angle AED=\angle BCD</math>, <math>\angle ABC=\angle CDE</math>. Extend <math>CD</math>, cross ray <math>AB</math> at <math>M</math>, ray <math>AE</math> at <math>N</math>, then by AAS we have triangle <math>END</math> is congruent to triangle <math>BMC</math>. Thus <math>\angle M=\angle N</math>. Let <math>EN=MC=a</math>, then <math>BM=DN=a+2</math>. So by law of cosine in triangle <math>END</math> and triangle <math>ANM</math> we can obtain <cmath>\frac{2a+8}{2(a+7)}=\cos N=\frac{a^2+(a+2)^2-36}{2a(a+2)}</cmath>, solved it gives us <math>a=8</math>, which yield triangle <math>ANM</math> to be a triangle with side length 15, 15, 24, draw a height from <math>A</math> to <math>NM</math> divides it into two triangles with side lengths 9, 12, 15, so the area of triangle <math>ANM</math> is 108. Triangle <math>END</math> is a triangle with side lengths 6, 8, 10, so the area of two of them is 48, so the area of pentagon is <math>108-48=\boxed{60}</math>. | ||
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==Solution 2 (Complex Bash)== | ==Solution 2 (Complex Bash)== | ||
Suppose that the circle intersects <math>\overline{AB}</math>, <math>\overline{BC}</math>, <math>\overline{CD}</math>, <math>\overline{DE}</math>, and <math>\overline{EA}</math> at <math>P</math>, <math>Q</math>, <math>R</math>, <math>S</math>, and <math>T</math> respectively. Then <math>AT = AP = a</math>, <math>BP = BQ = b</math>, <math>CQ = CR = c</math>, <math>DR = DS = d</math>, and <math>ES = ET = e</math>. So <math>a + b = 5</math>, <math>b + c = 6</math>, <math>c + d = 6</math>, <math>d + e = 6</math>, and <math>e + a = 7</math>. Then <math>2a + 2b + 2c + 2d + 2e = 30</math>, so <math>a + b + c + d + e= 15</math>. Then we can solve for each individually. <math>a = 3</math>, <math>b = 2</math>, <math>c = 4</math>, <math>d = 2</math>, and <math>e = 4</math>. To find the radius, we notice that <math>4 \arctan(\frac{2}{r}) + 4 \arctan(\frac{4}{r}) + 2 \arctan (\frac{3}{r}) = 360 ^ \circ</math>, or <math>2 \arctan(\frac{2}{r}) + 2 \arctan(\frac{4}{r}) + \arctan (\frac{3}{r}) = 180 ^ \circ</math>. Each of these angles in this could be represented by complex numbers. When two complex numbers are multiplied, their angles add up to create the angle of the resulting complex number. Thus, <math>(r + 2i)^2 \cdot (r + 4i)^2 \cdot (r + 3i)</math> is real. Expanding, we get: | Suppose that the circle intersects <math>\overline{AB}</math>, <math>\overline{BC}</math>, <math>\overline{CD}</math>, <math>\overline{DE}</math>, and <math>\overline{EA}</math> at <math>P</math>, <math>Q</math>, <math>R</math>, <math>S</math>, and <math>T</math> respectively. Then <math>AT = AP = a</math>, <math>BP = BQ = b</math>, <math>CQ = CR = c</math>, <math>DR = DS = d</math>, and <math>ES = ET = e</math>. So <math>a + b = 5</math>, <math>b + c = 6</math>, <math>c + d = 6</math>, <math>d + e = 6</math>, and <math>e + a = 7</math>. Then <math>2a + 2b + 2c + 2d + 2e = 30</math>, so <math>a + b + c + d + e= 15</math>. Then we can solve for each individually. <math>a = 3</math>, <math>b = 2</math>, <math>c = 4</math>, <math>d = 2</math>, and <math>e = 4</math>. To find the radius, we notice that <math>4 \arctan(\frac{2}{r}) + 4 \arctan(\frac{4}{r}) + 2 \arctan (\frac{3}{r}) = 360 ^ \circ</math>, or <math>2 \arctan(\frac{2}{r}) + 2 \arctan(\frac{4}{r}) + \arctan (\frac{3}{r}) = 180 ^ \circ</math>. Each of these angles in this could be represented by complex numbers. When two complex numbers are multiplied, their angles add up to create the angle of the resulting complex number. Thus, <math>(r + 2i)^2 \cdot (r + 4i)^2 \cdot (r + 3i)</math> is real. Expanding, we get: | ||
− | < | + | |
− | < | + | <cmath>(r^2 + 4ir - 4)(r^2 + 8ir -16)(r + 3i)</cmath> |
+ | |||
+ | <cmath>(r^4 + 12ir^3 - 52r^2 - 96ir + 64)(r + 3i)</cmath> | ||
+ | |||
On the last expanding, we only multiply the reals with the imaginaries and vice versa, because we only care that the imaginary component equals 0. | On the last expanding, we only multiply the reals with the imaginaries and vice versa, because we only care that the imaginary component equals 0. | ||
− | < | + | |
− | < | + | <cmath>15ir^4 - 252ir^2 + 192i = 0</cmath> |
− | < | + | |
+ | <cmath>5r^4 - 84r^2 + 64 = 0</cmath> | ||
+ | |||
+ | <cmath>(5r^2 - 4)(r^2 - 16) = 0</cmath> | ||
+ | |||
<math>r</math> must equal 4, as r cannot be negative or be approximately equal to 1. | <math>r</math> must equal 4, as r cannot be negative or be approximately equal to 1. | ||
Thus, the area of <math>ABCDE</math> is <math>4 \cdot (a + b + c + d + e) = 4 \cdot 15 = \boxed{60}</math> | Thus, the area of <math>ABCDE</math> is <math>4 \cdot (a + b + c + d + e) = 4 \cdot 15 = \boxed{60}</math> | ||
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-nihao4112 | -nihao4112 | ||
− | ==Solution 3 (Guess)== | + | ==Solution 3 (Guess 1)== |
This pentagon is very close to a regular pentagon with side lengths <math>6</math>. The area of a regular pentagon with side lengths <math>s</math> is <math>\frac{5s^2}{4\sqrt{5-2\sqrt{5}}}</math>. <math>5-2\sqrt{5}</math> is slightly greater than <math>\frac{1}{2}</math> given that <math>2\sqrt{5}</math> is slightly less than <math>\frac{9}{2}</math>. <math>4\sqrt{5-2\sqrt{5}}</math> is then slightly greater than <math>2\sqrt{2}</math>. We will approximate that to be <math>2.9</math>. The area is now roughly <math>\frac{180}{2.9}</math>, but because the actual pentagon is not regular, but has the same perimeter of the regular one that we are comparing to we can say that this is an overestimate on the area and turn the <math>2.9</math> into <math>3</math> thus turning the area into <math>\frac{180}{3}</math> which is <math>60</math> and since <math>60</math> is a multiple of the semiperimeter <math>15</math>, we can safely say that the answer is most likely <math>\boxed{60}</math>. | This pentagon is very close to a regular pentagon with side lengths <math>6</math>. The area of a regular pentagon with side lengths <math>s</math> is <math>\frac{5s^2}{4\sqrt{5-2\sqrt{5}}}</math>. <math>5-2\sqrt{5}</math> is slightly greater than <math>\frac{1}{2}</math> given that <math>2\sqrt{5}</math> is slightly less than <math>\frac{9}{2}</math>. <math>4\sqrt{5-2\sqrt{5}}</math> is then slightly greater than <math>2\sqrt{2}</math>. We will approximate that to be <math>2.9</math>. The area is now roughly <math>\frac{180}{2.9}</math>, but because the actual pentagon is not regular, but has the same perimeter of the regular one that we are comparing to we can say that this is an overestimate on the area and turn the <math>2.9</math> into <math>3</math> thus turning the area into <math>\frac{180}{3}</math> which is <math>60</math> and since <math>60</math> is a multiple of the semiperimeter <math>15</math>, we can safely say that the answer is most likely <math>\boxed{60}</math>. | ||
~Lopkiloinm | ~Lopkiloinm | ||
− | ==Solution 4 (Official MAA 1)== | + | ==Solution 4 (Guess 2)== |
− | Let <math>\omega</math> be the inscribed circle, <math>I</math> be its center, and <math>r</math> be its radius. The area of <math>ABCDE</math> is equal to its semiperimeter, <math>15,</math> times <math>r</math>, so the problem is reduced to finding <math>r</math>. Let <math>a</math> be the length of the tangent segment from <math>A</math> to <math>\omega</math>, and analogously define <math>b</math>, <math>c</math>, <math>d</math>, and <math>e</math>. Then <math>a+b=5</math>, <math>b+c= c+d=d+e=6</math>, and <math>e+a=7</math>, with a total of <math>a+b+c+d+e=15</math>. Hence <math>a=3</math>, <math>b=d=2</math>, and <math>c=e=4</math>. It follows that <math>\angle B= \angle D</math> and <math>\angle C= \angle E</math>. Let <math>Q</math> be the point where <math>\omega</math> is tangent to <math>\overline{CD}</math>. Then <math>\angle IAE = \angle IAB =\frac{1}{2}\angle A</math>. The sum of the internal angles in polygons <math>ABCQI</math> and <math>AIQDE</math> are equal, so <math>\angle IAE + \angle AIQ + \angle IQD + \angle D + \angle E = \angle IAB + \angle B + \angle C + \angle CQI + \angle QIA</math>, which implies that <math>\angle AIQ</math> must be <math>180^\circ</math>. Therefore points <math>A</math>, <math>I</math>, and <math>Q</math> are collinear. | + | Because the AIME answers have to be a whole number it would meant the radius of the circle have to be a whole number, thus by drawing the diagram and experimenting, we can safely say the radius is 4 and the answer is 60 |
+ | |||
+ | (Edit: While the guess would be technically correct, the assumption that the radius would have to be a whole number for the ans to be a whole number is wrong) | ||
+ | |||
+ | By EtherealMidnight | ||
+ | |||
+ | (Edit: I think that will actually work because the area of <math>ABCDE</math> is equal to the semi-perimeter times the radius. By a simple calculation, we know that the semi-perimeter is an integer so the radius should also be an integer) | ||
+ | |||
+ | By YBSuburbanTea | ||
+ | |||
+ | ...the radius could be a fraction with denominator 3, 5, or 15, and the area of the pentagon would still be an integer. - GeometryJake | ||
+ | |||
+ | ==Solution 5 (Official MAA 1)== | ||
+ | Let <math>\omega</math> be the inscribed circle, <math>I</math> be its center, and <math>r</math> be its radius. The area of <math>ABCDE</math> is equal to its semiperimeter, <math>15,</math> times <math>r</math>, so the problem is reduced to finding <math>r</math>. Let <math>a</math> be the length of the tangent segment from <math>A</math> to <math>\omega</math>, and analogously define <math>b</math>, <math>c</math>, <math>d</math>, and <math>e</math>. Then <math>a+b=5</math>, <math>b+c= c+d=d+e=6</math>, and <math>e+a=7</math>, with a total of <math>a+b+c+d+e=15</math>. Hence <math>a=3</math>, <math>b=d=2</math>, and <math>c=e=4</math>. It follows that <math>\angle B= \angle D</math> and <math>\angle C= \angle E</math>. Let <math>Q</math> be the point where <math>\omega</math> is tangent to <math>\overline{CD}</math>. Then <math>\angle IAE = \angle IAB =\frac{1}{2}\angle A</math>. Now we claim that points <math>A, I, Q</math> are collinear, which can be proved if <math>\angle{AIQ}=\angle{QIA}=180^{\circ}</math>. The sum of the internal angles in polygons <math>ABCQI</math> and <math>AIQDE</math> are equal, so <math>\angle IAE + \angle AIQ + \angle IQD + \angle D + \angle E = \angle IAB + \angle B + \angle C + \angle CQI + \angle QIA</math>, which implies that <math>\angle AIQ</math> must be <math>180^\circ</math>. Therefore points <math>A</math>, <math>I</math>, and <math>Q</math> are collinear. | ||
<asy> | <asy> | ||
defaultpen(fontsize(8pt)); | defaultpen(fontsize(8pt)); | ||
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Substituting <math>x=r^2</math> gives the quadratic equation <math>5x^2-84x+64=0</math>, with solutions <math>\frac{42 - 38}{5}=\frac45</math>, and <math>\frac{42 + 38}{5}= 16</math>. The solution <math>r^2=\frac45</math> corresponds to a five-pointed star, which is not convex. Indeed, if <math>r<3</math>, then <math> \tan \left(\frac{\angle A}{2}\right)</math>, <math>\tan \left(\frac{\angle C}{2}\right)</math>, and <math>\tan \left(\frac{\angle E}{2}\right)</math> are less than <math>1,</math> implying that <math>\angle A</math>, <math>\angle C</math>, and <math>\angle E</math> are acute, which cannot happen in a convex pentagon. Thus <math>r^2=16</math> and <math>r=4</math>. The requested area is <math>15\cdot4 = \boxed{60}</math>. | Substituting <math>x=r^2</math> gives the quadratic equation <math>5x^2-84x+64=0</math>, with solutions <math>\frac{42 - 38}{5}=\frac45</math>, and <math>\frac{42 + 38}{5}= 16</math>. The solution <math>r^2=\frac45</math> corresponds to a five-pointed star, which is not convex. Indeed, if <math>r<3</math>, then <math> \tan \left(\frac{\angle A}{2}\right)</math>, <math>\tan \left(\frac{\angle C}{2}\right)</math>, and <math>\tan \left(\frac{\angle E}{2}\right)</math> are less than <math>1,</math> implying that <math>\angle A</math>, <math>\angle C</math>, and <math>\angle E</math> are acute, which cannot happen in a convex pentagon. Thus <math>r^2=16</math> and <math>r=4</math>. The requested area is <math>15\cdot4 = \boxed{60}</math>. | ||
− | ==Solution | + | ==Solution 6 (Official MAA 2)== |
− | Define <math>a</math>, <math>b</math>, <math>c</math>, <math>d</math>, <math>e</math>, and <math>r</math> as in Solution | + | Define <math>a</math>, <math>b</math>, <math>c</math>, <math>d</math>, <math>e</math>, and <math>r</math> as in Solution 5. Then, as in Solution 5, <math>a=3</math>, <math>b=d=2</math>, <math>c=e=4</math>, <math>\angle B= \angle D</math>, and <math>\angle C= \angle E</math>. Let <math>\alpha =\frac{\angle A}{2}</math>, <math>\beta = \frac{\angle B}{2}</math>, and <math>\gamma=\frac{\angle C}{2}</math>. It follows that <math>540^{\circ} = 2\alpha + 4 \beta + 4 \gamma</math>, so <math>270^{\circ} = \alpha + 2\beta + 2 \gamma</math>. Thus |
<cmath>\tan(2\beta + 2 \gamma) = \frac{1}{\tan \alpha},</cmath> | <cmath>\tan(2\beta + 2 \gamma) = \frac{1}{\tan \alpha},</cmath> | ||
<math>\tan(\beta) = \frac{r}{2}</math>, <math>\tan(\gamma) = \frac{r}{4}</math>, and <math>\tan(\alpha) = \frac {r}{3}</math>. By the Tangent Addition Formula, | <math>\tan(\beta) = \frac{r}{2}</math>, <math>\tan(\gamma) = \frac{r}{4}</math>, and <math>\tan(\alpha) = \frac {r}{3}</math>. By the Tangent Addition Formula, | ||
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Therefore | Therefore | ||
<cmath>\frac{12r(8-r^2)}{(8-r^2)^2-36r^2} = \frac{3}{r},</cmath> | <cmath>\frac{12r(8-r^2)}{(8-r^2)^2-36r^2} = \frac{3}{r},</cmath> | ||
− | which simplifies to <math>5r^4 - 84r^2 + 64 = 0</math>. Then the solution proceeds as in Solution | + | which simplifies to <math>5r^4 - 84r^2 + 64 = 0</math>. Then the solution proceeds as in Solution 5. |
− | ==Solution | + | |
− | Define <math>a</math>, <math>b</math>, <math>c</math>, <math>d</math>, <math>e</math>, and <math>r</math> as in Solution | + | ==Solution 7 (Official MAA 3)== |
+ | Define <math>a</math>, <math>b</math>, <math>c</math>, <math>d</math>, <math>e</math>, and <math>r</math> as in Solution 5. Note that | ||
<cmath>\arctan\left(\frac{a}{r}\right) + \arctan\left(\frac{b}{r}\right) + \arctan\left(\frac{c}{r}\right) + \arctan\left(\frac{d}{r}\right) + \arctan\left(\frac{e}{r}\right) = 180^{\circ}.</cmath> | <cmath>\arctan\left(\frac{a}{r}\right) + \arctan\left(\frac{b}{r}\right) + \arctan\left(\frac{c}{r}\right) + \arctan\left(\frac{d}{r}\right) + \arctan\left(\frac{e}{r}\right) = 180^{\circ}.</cmath> | ||
Hence | Hence | ||
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Therefore | Therefore | ||
<cmath>\operatorname{Im} \big( (r + 3i)(r+2i)^2(r+4i)^2 \big) = 0.</cmath> | <cmath>\operatorname{Im} \big( (r + 3i)(r+2i)^2(r+4i)^2 \big) = 0.</cmath> | ||
− | Simplifying this equation gives the same quadratic equation in <math>r^2</math> as in Solution | + | Simplifying this equation gives the same quadratic equation in <math>r^2</math> as in Solution 5. |
− | ==Video Solution== | + | ==Solution 8 (The same circle)== |
+ | [[File:2020 AIME II 13.png|500px|right]] | ||
+ | Notation shown on diagram. As in solution 5, we get <math>\overline{AQ} \perp \overline{CD}, AG = 3, GB = 2, CQ = 4</math> and so on. | ||
+ | |||
+ | Let <math> \overline{AB}</math> cross <math> \overline{CD}</math> at <math>F, \overline{AE}</math> cross <math> \overline{CD}</math> at <math>F', CF = x.</math> | ||
+ | <math>FQ = FG \implies FB = x+2.</math> | ||
+ | <math>\angle BAQ = \angle EAQ \implies DF' = x + 2, EF' = x.</math> | ||
+ | Triangle <math>\triangle AFF'</math> has semiperimeter <math>s = 2x + 11.</math> | ||
+ | |||
+ | The radius of <i><b>incircle</b></i> <math>\omega</math> is | ||
+ | <math>r =\sqrt{\frac{s-FF’}{s}}(s-AF) = \sqrt{\frac{3}{2x +11}}(x+4). </math> | ||
+ | |||
+ | Triangle <math>\triangle BCF</math> has semiperimeter <math>s = x + 4.</math> | ||
+ | |||
+ | The radius of <i><b>excircle </b></i> <math>\omega</math> is | ||
+ | <math>r = \sqrt{\frac{s(s-BF)(s-CF)}{s-BC}} = \sqrt{ \frac{(x+4)\cdot 2 \cdot 4}{x - 2}}.</math> | ||
+ | |||
+ | It is the same radius, therefore | ||
+ | <cmath> \sqrt{\frac{3}{2x +11}}(x+4) = \sqrt{\frac{8(x+4)}{x – 2}} \implies \frac {3(x+4)}{2x+11} = \frac {8}{x-2} \implies (x-8)(3x + 14) = 0 \implies x = 8, r = 4.</cmath> | ||
+ | |||
+ | Then the solution proceeds as in Solution 5. | ||
+ | |||
+ | '''vladimir.shelomovskii@gmail.com, vvsss''' | ||
+ | |||
+ | ==Video Solution 1 by MOP 2024== | ||
+ | https://youtube.com/watch?v=BXEXcCNXrlM | ||
+ | |||
+ | ~r00tsOfUnity | ||
+ | |||
+ | ==Video Solution 2== | ||
https://youtu.be/bz5N-jI2e0U?t=327 | https://youtu.be/bz5N-jI2e0U?t=327 | ||
− | ==Video Solution | + | ==Video Solution 3== |
− | https:// | + | https://youtu.be/_fwkGTdMd8U |
+ | |||
+ | ==Video Solution 4== | ||
+ | https://youtu.be/kn3c2LStiHA | ||
+ | (solve in 5 minutes) | ||
+ | |||
+ | ~MathProblemSolvingSkills.com | ||
+ | |||
{{AIME box|year=2020|n=II|num-b=12|num-a=14}} | {{AIME box|year=2020|n=II|num-b=12|num-a=14}} | ||
+ | [[Category: Intermediate Geometry Problems]] | ||
{{MAA Notice}} | {{MAA Notice}} |
Latest revision as of 22:00, 8 January 2024
Contents
- 1 Problem
- 2 Solution 1
- 3 Solution 2 (Complex Bash)
- 4 Solution 3 (Guess 1)
- 5 Solution 4 (Guess 2)
- 6 Solution 5 (Official MAA 1)
- 7 Solution 6 (Official MAA 2)
- 8 Solution 7 (Official MAA 3)
- 9 Solution 8 (The same circle)
- 10 Video Solution 1 by MOP 2024
- 11 Video Solution 2
- 12 Video Solution 3
- 13 Video Solution 4
Problem
Convex pentagon has side lengths , , and . Moreover, the pentagon has an inscribed circle (a circle tangent to each side of the pentagon). Find the area of .
Solution 1
Assume the incircle touches , , , , at respectively. Then let , , . So we have , and =7, solve it we have , , . Let the center of the incircle be , by SAS we can proof triangle is congruent to triangle , and triangle is congruent to triangle . Then we have , . Extend , cross ray at , ray at , then by AAS we have triangle is congruent to triangle . Thus . Let , then . So by law of cosine in triangle and triangle we can obtain , solved it gives us , which yield triangle to be a triangle with side length 15, 15, 24, draw a height from to divides it into two triangles with side lengths 9, 12, 15, so the area of triangle is 108. Triangle is a triangle with side lengths 6, 8, 10, so the area of two of them is 48, so the area of pentagon is .
-Fanyuchen20020715
Solution 2 (Complex Bash)
Suppose that the circle intersects , , , , and at , , , , and respectively. Then , , , , and . So , , , , and . Then , so . Then we can solve for each individually. , , , , and . To find the radius, we notice that , or . Each of these angles in this could be represented by complex numbers. When two complex numbers are multiplied, their angles add up to create the angle of the resulting complex number. Thus, is real. Expanding, we get:
On the last expanding, we only multiply the reals with the imaginaries and vice versa, because we only care that the imaginary component equals 0.
must equal 4, as r cannot be negative or be approximately equal to 1. Thus, the area of is
-nihao4112
Solution 3 (Guess 1)
This pentagon is very close to a regular pentagon with side lengths . The area of a regular pentagon with side lengths is . is slightly greater than given that is slightly less than . is then slightly greater than . We will approximate that to be . The area is now roughly , but because the actual pentagon is not regular, but has the same perimeter of the regular one that we are comparing to we can say that this is an overestimate on the area and turn the into thus turning the area into which is and since is a multiple of the semiperimeter , we can safely say that the answer is most likely .
~Lopkiloinm
Solution 4 (Guess 2)
Because the AIME answers have to be a whole number it would meant the radius of the circle have to be a whole number, thus by drawing the diagram and experimenting, we can safely say the radius is 4 and the answer is 60
(Edit: While the guess would be technically correct, the assumption that the radius would have to be a whole number for the ans to be a whole number is wrong)
By EtherealMidnight
(Edit: I think that will actually work because the area of is equal to the semi-perimeter times the radius. By a simple calculation, we know that the semi-perimeter is an integer so the radius should also be an integer)
By YBSuburbanTea
...the radius could be a fraction with denominator 3, 5, or 15, and the area of the pentagon would still be an integer. - GeometryJake
Solution 5 (Official MAA 1)
Let be the inscribed circle, be its center, and be its radius. The area of is equal to its semiperimeter, times , so the problem is reduced to finding . Let be the length of the tangent segment from to , and analogously define , , , and . Then , , and , with a total of . Hence , , and . It follows that and . Let be the point where is tangent to . Then . Now we claim that points are collinear, which can be proved if . The sum of the internal angles in polygons and are equal, so , which implies that must be . Therefore points , , and are collinear. Because , it follows thatAnother expression for can be found as follows. Note that and , so and Applying the Law of Cosines to and gives and Hence
yielding equivalently Substituting gives the quadratic equation , with solutions , and . The solution corresponds to a five-pointed star, which is not convex. Indeed, if , then , , and are less than implying that , , and are acute, which cannot happen in a convex pentagon. Thus and . The requested area is .
Solution 6 (Official MAA 2)
Define , , , , , and as in Solution 5. Then, as in Solution 5, , , , , and . Let , , and . It follows that , so . Thus , , and . By the Tangent Addition Formula, and Therefore which simplifies to . Then the solution proceeds as in Solution 5.
Solution 7 (Official MAA 3)
Define , , , , , and as in Solution 5. Note that Hence Therefore Simplifying this equation gives the same quadratic equation in as in Solution 5.
Solution 8 (The same circle)
Notation shown on diagram. As in solution 5, we get and so on.
Let cross at cross at Triangle has semiperimeter
The radius of incircle is
Triangle has semiperimeter
The radius of excircle is
It is the same radius, therefore
Then the solution proceeds as in Solution 5.
vladimir.shelomovskii@gmail.com, vvsss
Video Solution 1 by MOP 2024
https://youtube.com/watch?v=BXEXcCNXrlM
~r00tsOfUnity
Video Solution 2
https://youtu.be/bz5N-jI2e0U?t=327
Video Solution 3
Video Solution 4
https://youtu.be/kn3c2LStiHA (solve in 5 minutes)
~MathProblemSolvingSkills.com
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