math-geo-01
1.000
Challenge ยท difficulty 4/5
# Incircle Contact Chord Meets the Base In triangle $ABC$ we have $AB = 13$, $BC = 14$, and $CA = 15$. The incircle of triangle $ABC$ is tangent to side $AB$ at $F$ and tangent to side $CA$ at $E$. Line $EF$ is extended until it meets line $BC$ at a point $P$. Find the length $BP$. Give your final answer as an integer.
Proposed solution
Alright, I have this problem about a triangle ABC with sides AB = 13, BC = 14, and CA = 15. There's an incircle that touches AB at F and CA at E. Then, EF is extended to meet BC at P, and I need to find BP. ### Step 1: Understand the Triangle and Its Properties First, I need to draw the triangle ABC based on the given side lengths. It's a scalene triangle since all sides are different. ### Step 2: Find the Semiperimeter and Area I recall that for any triangle, the semiperimeter (s) is half the perimeter. So: - Perimeter = AB + BC + CA = 13 + 14 + 15 = 42 - Semiperimeter, s = 42 / 2 = 21 Now, to find the area, I can use Heron's formula: Area = โ[s(s - a)(s - b)(s - c)] = โ[21(21 - 13)(21 - 14)(21 - 15)] = โ[21 * 8 * 7 * 6] Let's break it down: - 21 * 8 = 168 - 7 * 6 = 42 - 168 * 42 = (170 - 2)(40 + 2) = 170*40 + 170*2 - 2*40 - 2*2 = 6800 + 340 - 80 - 4 = 7056 So, Area = โ7056 = 84 ### Step 3: Find the Inradius The area of the triangle is also equal to the product of the semiperimeter and the inradius (r). So: 84 = 21 * r โ r = 84 / 21 = 4 ### Step 4: Find the Points of Tangency E and F The incircle is tangent to the sides. The lengths of the tangents from the vertices to the points of tangency can be found using the formula: - For vertex A: AF = AE = s - BC = 21 - 14 = 7 - For vertex B: BF = BD = s - CA = 21 - 15 = 6 - For vertex C: CE = CD = s - AB = 21 - 13 = 8 But in the problem, the incircle is tangent to AB at F and to CA at E. So: - AF = 7 โ F is 7 units from A on AB. - AE = 7 โ E is 7 units from A on CA. ### Step 5: Find Coordinates to Visualize the Problem To make it easier, I think I can place the triangle in a coordinate system. Let's say: - Point A is at the origin (0,0). - Side AB is along the x-axis. So, point B is at (13,0) since AB = 13. - Point C is somewhere in the plane. I need to find its coordinates. First, find the angle at A using the cosine rule: cos(A) = (ABยฒ + ACยฒ - BCยฒ) / (2 * AB * AC) = (13ยฒ + 15ยฒ - 14ยฒ) / (2 * 13 * 15) = (169 + 225 - 196) / 390 = (394 - 196)/390 = 198/390 = 33/65 Now, the coordinates of C can be found using the angle A and the lengths AB and AC. - C_x = AC * cos(A) = 15 * (33/65) = 495/65 = 7.6 - C_y = AC * sin(A) = 15 * โ(1 - (33/65)ยฒ) = 15 * โ[(65ยฒ - 33ยฒ)/65ยฒ] = 15 * โ[(4225 - 1089)/4225] = 15 * โ(3136/4225) = 15 * 56/65 = 840/65 = 12.942857... ### Step 6: Find the Equation of EF Points E and F are the points of tangency on CA and AB, respectively. - F is on AB, 7 units from A โ F is at (7,0). - E is on CA, 7 units from A โ E is 7/15 of the way from A to C. But C is at (7.6, 12.942857...), so E's coordinates are: - E_x = A_x + (7/15) * (C_x - A_x) = 0 + (7/15)*7.6 โ 3.542857 - E_y = A_y + (7/15) * (C_y - A_y) โ 0 + (7/15)*12.942857 โ 6.285714 Now, the line EF goes from F (7,0) to E (3.542857, 6.285714). First, find the slope (m) of EF: m = (6.285714 - 0) / (3.542857 - 7) โ 6.285714 / (-3.457143) โ -1.818182 Now, the equation of the line EF in point-slope form using point F (7,0): y - 0 = m (x - 7) โ y = -1.818182 (x - 7) ### Step 7: Find the Equation of BC Points B and C are at (13,0) and (7.6, 12.942857...). Slope of BC: m_BC = (12.942857 - 0) / (7.6 - 13) โ 12.942857 / (-5.4) โ -2.396822 Equation of BC using point B (13,0): y - 0 = m_BC (x - 13) โ y โ -2.396822 (x - 13) ### Step 8: Find the Intersection Point P P is the intersection of EF and BC. From EF: y โ -1.818182 (x - 7) From BC: y โ -2.396822 (x - 13) Set them equal: -1.818182 (x - 7) โ -2.396822 (x - 13) Let's solve for x: -1.818182x + 12.727274 โ -2.396822x + 31.158686 -1.818182x + 2.396822x โ 31.158686 - 12.727274 0.57864x โ 18.431412 x โ 18.431412 / 0.57864 โ 31.85 Now, find y using EF's equation: y โ -1.818182 (31.85 - 7) โ -1.818182 * 24.85 โ -45.19 But P is supposed to be on BC, and BC goes from (13,0) to (7.6,12.94). The y-coordinate of P is negative, but C has a positive y-coordinate. This suggests P is outside the segment BC, but the problem says "meets line BC at P," so it's acceptable