Difference between revisions of "2012 AMC 12A Problems/Problem 18"
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We can use POP(Power of a point) to solve this problem. First, notice that the area of <math>\triangle ABC</math> is <math>\sqrt{39(39 - 27)(39 - 26)(39 - 25)} = 78\sqrt{14}</math>. Therefore, using the formula that <math>sr = A</math>, where <math>s</math> is the semi-perimeter and <math>r</math> is the length of the inradius, we find that <math>r = 2\sqrt{14}</math>. | We can use POP(Power of a point) to solve this problem. First, notice that the area of <math>\triangle ABC</math> is <math>\sqrt{39(39 - 27)(39 - 26)(39 - 25)} = 78\sqrt{14}</math>. Therefore, using the formula that <math>sr = A</math>, where <math>s</math> is the semi-perimeter and <math>r</math> is the length of the inradius, we find that <math>r = 2\sqrt{14}</math>. | ||
− | Draw radii to the three tangents, and let the tangent hitting <math>BC</math> be <math>T_1</math>, the tangent hitting <math>AB</math> be <math>T_2</math>, and the tangent hitting <math>AC</math> be <math>T_3</math>. Let <math>BI = x</math>. By the pythagorean theorem, we know that <math>BT_1 = \sqrt{x^2 - 56}</math>. By POP, we also know that <math>BT_2</math> is also <math>\sqrt{x^2 - 56}</math>. Because we know that <math>BC = 25</math>, we find that <math>CT_1 = 25 - \sqrt{x^2 - 56}</math>. We can rinse and repeat and find that <math>AT_2 = 26 - (25 - \sqrt{x^2 - 56}) = 1 + \sqrt{x^2 - 56}</math> | + | Draw radii to the three tangents, and let the tangent hitting <math>BC</math> be <math>T_1</math>, the tangent hitting <math>AB</math> be <math>T_2</math>, and the tangent hitting <math>AC</math> be <math>T_3</math>. Let <math>BI = x</math>. By the pythagorean theorem, we know that <math>BT_1 = \sqrt{x^2 - 56}</math>. By POP, we also know that <math>BT_2</math> is also <math>\sqrt{x^2 - 56}</math>. Because we know that <math>BC = 25</math>, we find that <math>CT_1 = 25 - \sqrt{x^2 - 56}</math>. We can rinse and repeat and find that <math>AT_2 = 26 - (25 - \sqrt{x^2 - 56}) = 1 + \sqrt{x^2 - 56}</math>. We can find <math>AT_2</math> by essentially coming in from the other way. Since <math>AB = 27</math>, we also know that <math>AT_3 = 27 - \sqrt{x^2 - 56}</math>. By POP, we know that <math>AT_2 = AT_3</math>, so <math>1 + \sqrt{x^2 - 56} = 27 - \sqrt{x^2 - 56}</math>. |
Let <math>\sqrt{x^2 - 56} = A</math>, for simplicity. We can change the equation into <math>1 + A = 27 - A</math>, which we find <math>A</math> to be <math>13</math>. Therefore, <math>\sqrt{x^2 - 56} = 13</math>, which further implies that <math>x^2 - 56 = 169</math>. After simplifying, we find <math>x^2 = 225</math>, so <math>x = \boxed{\textbf{(A) } 15}</math> | Let <math>\sqrt{x^2 - 56} = A</math>, for simplicity. We can change the equation into <math>1 + A = 27 - A</math>, which we find <math>A</math> to be <math>13</math>. Therefore, <math>\sqrt{x^2 - 56} = 13</math>, which further implies that <math>x^2 - 56 = 169</math>. After simplifying, we find <math>x^2 = 225</math>, so <math>x = \boxed{\textbf{(A) } 15}</math> |
Revision as of 16:01, 2 July 2020
Problem
Triangle has , , and . Let denote the intersection of the internal angle bisectors of . What is ?
Solution 1
Inscribe circle of radius inside triangle so that it meets at , at , and at . Note that angle bisectors of triangle are concurrent at the center (also ) of circle . Let , and . Note that , and . Hence , , and . Subtracting the last 2 equations we have and adding this to the first equation we have .
By Heron's formula for the area of a triangle we have that the area of triangle is . On the other hand the area is given by . Then so that .
Since the radius of circle is perpendicular to at , we have by the pythagorean theorem so that .
Solution 2
We can use mass points and Stewart's to solve this problem. Because we are looking at the Incenter we then label with a mass of , with , and with . We also label where the angle bisectors intersect the opposite side , , and correspondingly. It follows then that point has mass . Which means that is split into a ratio. We can then use Stewart's to find . So we have . Solving we get . Plugging it in we get . Therefore the answer is
-Solution by arowaaron
Solution 3
We can use POP(Power of a point) to solve this problem. First, notice that the area of is . Therefore, using the formula that , where is the semi-perimeter and is the length of the inradius, we find that .
Draw radii to the three tangents, and let the tangent hitting be , the tangent hitting be , and the tangent hitting be . Let . By the pythagorean theorem, we know that . By POP, we also know that is also . Because we know that , we find that . We can rinse and repeat and find that . We can find by essentially coming in from the other way. Since , we also know that . By POP, we know that , so .
Let , for simplicity. We can change the equation into , which we find to be . Therefore, , which further implies that . After simplifying, we find , so
~EricShi1685
See Also
2012 AMC 12A (Problems • Answer Key • Resources) | |
Preceded by Problem 17 |
Followed by Problem 19 |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 • 24 • 25 | |
All AMC 12 Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.