Back to Exercise: Apply Law of Sines and Cosines

Exercises: Apply the Law of Sines and the Law of Cosines

Grade 10·22 problems·~35 min·Common Core Math - HS Geometry·standard·hsg-srt-d-11
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A

Recall / Warm-Up

1.

Which formula correctly states the Law of Sines for triangle ABCABC?

2.

A triangle has two sides and the included angle known (SAS). Which law should you use first to find the missing side?

3.

A bearing of 150° points in which direction relative to north?

B

Fluency Practice

Triangle ABC with angle A = 35 degrees, angle B = 85 degrees, and side a = 10, with side b to be found
1.

In triangle ABCABC, angle A=35°A = 35\degree, angle B=85°B = 85\degree, and side a=10a = 10. Use sin(35°)0.574\sin(35\degree) \approx 0.574 and sin(85°)0.996\sin(85\degree) \approx 0.996. Find side bb. Round to the nearest tenth.

2.

In triangle ABCABC, angle A=50°A = 50\degree, angle C=70°C = 70\degree, and side c=20c = 20. Use sin(50°)0.766\sin(50\degree) \approx 0.766 and sin(70°)0.940\sin(70\degree) \approx 0.940. Find side aa. Round to the nearest tenth.

3.

In triangle ABCABC, angle A=30°A = 30\degree, side a=8a = 8, and side b=12b = 12. Compute sinB=bsinAa=12×0.58=0.75\sin B = \dfrac{b \sin A}{a} = \dfrac{12 \times 0.5}{8} = 0.75. How many valid triangles exist with these measurements?

Triangle ABC with sides a = 8 and b = 11 and included angle C = 50 degrees, with side c to be found
4.

In triangle ABCABC, side a=8a = 8, side b=11b = 11, and angle C=50°C = 50\degree. Use cos(50°)0.643\cos(50\degree) \approx 0.643. Find side cc. Round to the nearest tenth.

5.

In triangle ABCABC, all three sides are known: a=5a = 5, b=7b = 7, c=9c = 9. Use the Law of Cosines to find angle CC (the largest angle, opposite side cc). Use cos1(0.100)95.7°\cos^{-1}(-0.100) \approx 95.7\degree. Round to the nearest tenth of a degree.

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