2025 AMC 10A Problems/Problem 23: Difference between revisions

Revision as of 14:56, 6 November 2025

Problem 23

Triangle $\triangle ABC$ has side lengths $AB = 80$ , $BC = 45$ , and $AC = 75$ . The bisector $\angle B$ and the altitude to side $\overline{AB}$ intersect at point $P$ . What is $BP$ ?

$\textbf{(A)}~18\qquad\textbf{(B)}~19\qquad\textbf{(C)}~20\qquad\textbf{(D)}~21\qquad\textbf{(E)}~22$

Solution 1(Takes some time)

Let $CH$ be the altitude from vertex $C$ to the side $\overline{AB}$ , so $H$ is a point on $AB$ and $\angle CHB = 90^\circ$ . Let $BD$ be the angle bisector of $\angle B$ , where $D$ is on $AC$ .

Point $P$ is the intersection of the altitude $CH$ and the angle bisector $BD$ .

We want to find the length of $BP$ .

Consider the triangle $\triangle BPH$ . Since $P$ lies on the altitude $CH$ , the angle $\angle BHP$ is the same as $\angle CHB$ , which is $90^\circ$ . Therefore, $\triangle BPH$ is a right-angled triangle.

In the right $\triangle BPH$ , the angle $\angle PBH$ is the angle formed by the angle bisector $BD$ and the side $AB$ . By definition of the angle bisector, $\angle PBH = \angle ABC / 2 = B/2$ .

Using trigonometry in the right $\triangle BPH$ , we have:

$\cos(\angle PBH) = \frac{\text{adjacent}}{\text{hypotenuse}} = \frac{BH}{BP}$

$\cos(B/2) = \frac{BH}{BP}$

Rearranging this gives:

$BP = \frac{BH}{\cos(B/2)}$

To solve the problem, we need to find the lengths of $BH$ and the value of $\cos(B/2)$ .

1. Find the length of BH} $BH$ is the projection of side $BC$ onto $AB$ . In the right-angled triangle $\triangle CHB$ , $BH = BC \cdot \cos(B) = a \cdot \cos(B)$ . We can find $\cos(B)$ using the Law of Cosines on $\triangle ABC$ :

$b^2 = a^2 + c^2 - 2ac \cos(B)$

$AC^2 = BC^2 + AB^2 - 2(BC)(AB) \cos(B)$

$75^2 = 45^2 + 80^2 - 2(45)(80) \cos(B)$

$5625 = 2025 + 6400 - 7200 \cos(B)$

$5625 = 8425 - 7200 \cos(B)$

$7200 \cos(B) = 8425 - 5625$

$7200 \cos(B) = 2800$

$\cos(B) = \frac{2800}{7200} = \frac{28}{72} = \frac{7}{18}$

Now, we can find $BH$ :

$BH = a \cdot \cos(B) = 45 \cdot \left(\frac{7}{18}\right) = \frac{45 \cdot 7}{18} = \frac{(5 \cdot 9) \cdot 7}{2 \cdot 9} = \frac{35}{2}$

2. Find the value of $\cos(B/2)$ } We use the half-angle identity for cosine: $\cos(B) = 2\cos^2(B/2) - 1$ . We know $\cos(B) = 7/18$ :

$\frac{7}{18} = 2\cos^2(B/2) - 1$

$\frac{7}{18} + 1 = 2\cos^2(B/2)$

$\frac{25}{18} = 2\cos^2(B/2)$

$\cos^2(B/2) = \frac{25}{36}$

$\cos(B/2) = \sqrt{\frac{25}{36}} = \frac{5}{6}$

(We take the positive root because $B/2$ must be an acute angle).

Now we substitute our values for $BH$ and $\cos(B/2)$ into the equation for $BP$ :

$BP = \frac{BH}{\cos(B/2)} = \frac{35/2}{5/6}$

$BP = \frac{35}{2} \cdot \frac{6}{5} = \frac{35 \cdot 6}{2 \cdot 5} = \frac{210}{10} = 21$

The length of $BP$ is 21. ~Jonathanmo

Solution 2

Let $D$ be the foot of the altitude from $C$ to $AB$ . We wish to find $BD$ and $DP$ .

First, notice that $AD^2 + CD^2 = AC^2$ and $BD^2+CD^2=BC^2$ by the Pythagorean Theorem. Subtracting the second equation from the first, we get $AD^2-BD^2=(AD-BD)(AD+BD)=AC^2-BC^2$ Plugging in values and simplifying, we see that $AD-BD =45$ . Knowing that $AD+BD=80$ , we can solve the system of equations to get $AD = \frac{125}{2}$ , $BD=\frac{35}{2}$ . Plug those values back into their original equations and we find that $CD = \frac{25}{2}\sqrt{11}$ . To find $DP$ , we use the Angle Bisector Theorem. The ratio between $BD$ and $BC$ is $\frac{7}{18}$ , so $DP = \frac{7}{25} \cdot CD = \frac{7}{2}\sqrt{11}$ . Finally, we use the Pythagorean Theorem to get $BD^2+DP^2=(\frac{35}{2})^2+(\frac{7}{2}\sqrt{11})^2=\frac{1764}{4}=441=BP^2$ so $BP=\boxed{\textbf{(D)}~21}$ .

~ChickensEatGrass

@@ Line 80: / Line 80: @@
 Let <imath>D</imath> be the foot of the altitude from <imath>C</imath> to <imath>AB</imath>. We wish to find <imath>BD</imath> and <imath>DP</imath>.
-First, notice that <imath>AD^2 + CD^2 = AC^2</imath> and <imath>BD^2+CD^2=BC^2</imath> by the Pythagorean Theorem. Subtracting the second equation from the first, we get <cmath>AD^2-BD^2=(AD-BD)(AD+BD)=AC^2-BC^2</cmath> Plugging in values, we see that <imath>AD-BD =45</imath>. So, <imath>AD = \frac{125}{2}</imath>, <imath>BD=\frac{35}{2}</imath>, and <imath>CD = \frac{25}{2}\sqrt{11}</imath>.
+First, notice that <imath>AD^2 + CD^2 = AC^2</imath> and <imath>BD^2+CD^2=BC^2</imath> by the Pythagorean Theorem. Subtracting the second equation from the first, we get <cmath>AD^2-BD^2=(AD-BD)(AD+BD)=AC^2-BC^2</cmath> Plugging in values and simplifying, we see that <imath>AD-BD =45</imath>. Knowing that <imath>AD+BD=80</imath>, we can solve the system of equations to get <imath>AD = \frac{125}{2}</imath>, <imath>BD=\frac{35}{2}</imath>. Plug those values back into their original equations and we find that <imath>CD = \frac{25}{2}\sqrt{11}</imath>.
 To find <imath>DP</imath>, we use the Angle Bisector Theorem. The ratio between <imath>BD</imath> and <imath>BC</imath> is <imath>\frac{7}{18}</imath>, so <imath>DP = \frac{7}{25} \cdot CD = \frac{7}{2}\sqrt{11}</imath>. Finally, we use the Pythagorean Theorem to get <cmath>BD^2+DP^2=(\frac{35}{2})^2+(\frac{7}{2}\sqrt{11})^2=\frac{1764}{4}=441=BP^2</cmath>
 so <imath>BP=\boxed{\textbf{(D)}~21}</imath>.
 ~ChickensEatGrass

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2025 AMC 10A Problems/Problem 23: Difference between revisions

Revision as of 14:56, 6 November 2025

Problem 23

Solution 1(Takes some time)

Solution 2