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15 votes
15 votes
Solve the triangle. Round to the nearest tenth when necessary or to the nearest minute as appropriate. B = 53.6° C = 104.9° b = 24.1 A = 21.5°, a = 11, c = 28.9 A = 21.5°, a = 13, c = 30.9 A = 19.5°, a = 28.9, c = 11 A = 19.5°, a = 30.9, c = 13

User Scottwb
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1 Answer

20 votes
20 votes

Answer:


a =11.0


\angle A =21.5^o


c = 28.9

Explanation:

Given


\angle B = 53.6^o


\angle C = 104.9^o


b=24.1

Required

Solve the triangle

We have:


\angle A + \angle B + \angle C =180^o --- angles in a triangle

Substitute known values


\angle A + 53.6^o + 104.9^o =180^o

So, we have:


\angle A =180^o-53.6^o - 104.9^o


\angle A =21.5^o

To solve for the sides, we make use of sine rule:


(a)/(\sin A) =(b)/(\sin B) = (c)/(\sin C)

So, we have:


(a)/(\sin (21.5)) =(24.1)/(\sin 53.6) = (c)/(\sin 104.9)

Solving for (a), we have:


(a)/(\sin (21.5)) =(24.1)/(\sin 53.6)

Make (a) the subject


a =(24.1)/(\sin 53.6) * \sin (21.5)


a =(24.1)/(0.8049) * 0.3665


a =11.0

To solve for (c), we have:


(24.1)/(\sin 53.6) = (c)/(\sin 104.9)

Make (c) the subject


c = (24.1)/(\sin 53.6) * \sin 104.9


c = (24.1)/(0.8049) * 0.9664


c = 28.9

User ViviG
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2.8k points