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Consider a triangle ABC like the one below. Suppose that B = 46°, C = 72°, and a = 74. (The figure is not drawn to scale.) Solve the triangleRound your answers to the nearest tenth.If there is more than one solution, use the button labeled "or".

User Homero
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1 Answer

21 votes
21 votes

A triangle has 3 sides and 3 angles

Angles

B = 46 degrees (given)

C = 72 degrees

To find angle A

A + 46 + 72 = 180 (sum of angles in a triangle)

A + 118 = 180

A = 180 - 118

A=62

A = 62.0 degrees (to the nearest tenth)

Sides

a = 74 (given)

To find side b and c

We use sine rule


\begin{gathered} (\sin A)/(a)=(\sin B)/(b) \\ (\sin62)/(74)=(\sin46)/(b) \\ \text{Cross multiplying, we have} \\ b\text{ x sin62 = 74 x sin 46} \\ b=\frac{74\text{ x 0.7193}}{0.883} \\ b=60.28 \end{gathered}

Therefore b = 60.3 (to the nearest tenth)


\begin{gathered} (\sin C)/(c)=(\sin A)/(a) \\ (\sin 72)/(c)=(\sin 62)/(74) \\ \text{Cross multiplying we have,} \\ c\text{ x sin62 = 74 x sin72} \\ c=\frac{74\text{ x 0.9511}}{0.883} \\ c=79.71 \end{gathered}

Therefore c = 79.7 (to the nearest tenth)

User Keith Hanlan
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