Question

1. find the measure of side bc. 12. find the measure of side ad.

Explanation:

Problem 11: Find the measure of side \( BC \)

Step 1: Analyze triangle \( ACD \)

In right triangle \( ACD \), \( \angle D = 50^\circ \), \( AD = 17.0 \, \text{m} \), and \( AC \perp CD \). First, find \( AC \) using \( \sin(50^\circ) \):
\( \sin(50^\circ) = \frac{AC}{AD} \)
\( AC = AD \cdot \sin(50^\circ) = 17.0 \cdot \sin(50^\circ) \approx 17.0 \cdot 0.7660 \approx 13.022 \, \text{m} \).

Step 2: Analyze triangle \( ABC \)

Since \( \angle BAC = 90^\circ - \angle CAD \), and \( \angle CAD = 90^\circ - 50^\circ = 40^\circ \), so \( \angle BAC = 50^\circ \) (because \( \angle BAD = 90^\circ \)). Thus, triangles \( ABC \) and \( ACD \) are congruent (by ASA: right angle, \( AC \) common, \( \angle BAC = \angle D = 50^\circ \)). Wait, alternatively, since \( \angle B = 40^\circ \) (complementary to \( 50^\circ \))? Wait, no—actually, \( \angle BAC = 40^\circ \) (since \( \angle BAD = 90^\circ \), \( \angle CAD = 50^\circ \), so \( \angle BAC = 40^\circ \))? Wait, maybe better: in \( \triangle ACD \), \( \cos(50^\circ) = \frac{CD}{AD} \), so \( CD = 17.0 \cdot \cos(50^\circ) \approx 17.0 \cdot 0.6428 \approx 10.9276 \, \text{m} \).

But since \( \triangle ABC \cong \triangle ADC \)? Wait, \( \angle BAC = \angle D = 50^\circ \), \( \angle ACB = \angle ACD = 90^\circ \), \( AC = AC \), so by AAS, \( \triangle ABC \cong \triangle ADC \). Thus, \( BC = CD \). Wait, no—wait, \( AD = 17 \), \( \angle D = 50^\circ \), \( AC \) is height. Wait, maybe I made a mistake. Let's re-express:

Wait, \( \angle BAD = 90^\circ \) (right angle at \( A \)), \( AC \perp BD \), so \( \triangle ABC \sim \triangle DAC \) (similar triangles, AA: \( \angle ACB = \angle DCA = 90^\circ \), \( \angle B = \angle DAC \) because \( \angle B + \angle BAC = 90^\circ \), \( \angle DAC + \angle BAC = 90^\circ \), so \( \angle B = \angle DAC \)). Thus, \( \triangle ABC \sim \triangle DAC \), so \( \frac{BC}{AC} = \frac{AC}{CD} \), but maybe easier: since \( \triangle ACD \) is right-angled, \( AC = AD \sin(50^\circ) \), \( CD = AD \cos(50^\circ) \). Then, in \( \triangle ABC \), \( \angle B = 50^\circ \) (since \( \angle BAD = 90^\circ \), \( \angle D = 50^\circ \), so \( \angle B = 40^\circ \)? Wait, no—sum of angles in \( \triangle BAD \): \( 90^\circ + 50^\circ + \angle B = 180^\circ \), so \( \angle B = 40^\circ \). Then \( \angle BAC = 50^\circ \). So in \( \triangle ABC \), \( \tan(50^\circ) = \frac{BC}{AC} \), and \( AC = AD \sin(50^\circ) \). Wait, this is getting confusing. Wait, maybe the triangles are congruent: \( AD = AB = 17 \)? Wait, the diagram shows \( AD = 17 \), and \( \angle BAD = 90^\circ \), \( AC \perp BD \). So \( AC \) is the altitude to the hypotenuse of right triangle \( BAD \), so \( AC^2 = BC \cdot CD \), and \( AB = AD = 17 \) (isosceles right triangle? No, \( \angle D = 50^\circ \), so not isosceles). Wait, maybe the problem has \( AB = AD \)? Wait, the diagram: \( A \) is top, \( B \) and \( D \) on base, \( C \) is foot of perpendicular from \( A \) to \( BD \). So \( \triangle ACD \) is right-angled at \( C \), \( AD = 17 \), \( \angle D = 50^\circ \). Then \( AC = AD \sin(50^\circ) \), \( CD = AD \cos(50^\circ) \). Then, since \( \angle BAC = \angle D = 50^\circ \) (because \( \angle BAD = 90^\circ \), so \( \angle BAC + \angle CAD = 90^\circ \), and \( \angle CAD + \angle D = 90^\circ \), so \( \angle BAC = \angle D = 50^\circ \)), so \( \triangle ABC \) is right-angled at \( C \), with \( \angle BAC = 50^\circ \), \( AC \) as adjacent side, \( BC \) as opposite side. Thus, \( \tan(50^\circ) = \frac{BC}{AC} \), so \( BC = AC…

Step 1: Find \( AC \) in \( \triangle ACD \)

\( \sin(50^\circ) = \frac{AC}{AD} \implies AC = AD \cdot \sin(50^\circ) = 17.0 \cdot \sin(50^\circ) \approx 13.02 \, \text{m} \).

Step 2: Find \( BC \) in \( \triangle ABC \)

\( \tan(50^\circ) = \frac{BC}{AC} \implies BC = AC \cdot \tan(50^\circ) \approx 13.02 \cdot 1.1918 \approx 15.5 \, \text{m} \).

From the diagram, \( AD = 17.0 \, \text{m} \).

Answer:

\( BC \approx \boldsymbol{15.5 \, \text{m}} \) (or more precisely, \( 17 \sin(50^\circ) \tan(50^\circ) \approx 15.5 \, \text{m} \)).

Problem 12:

If \( AD \) is labeled as \( 17.0 \, \text{m} \) in the diagram, then: