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Solve the triangle: a = 12,c = 2-2, B = 33". If it is not possible, say so.A= 25.1",b = 1.8, C = 121.9"This triangle is not solvable.A = 45*,b= V2.C = 102VEA= 30', b = -, C = 117"

User Seymone
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1 Answer

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26 votes

ANSWER:

A=25.1 degrees

b = 1.8

C = 121.9 degrees

SOLUTION:

We can solve this problem using the cosine law, since we are given the length of 2 sides of triangle and the angle they formed.


b\text{ =}\sqrt[]{c^2+a^2-2ac\cos B}

We substitute the given


\begin{gathered} b\text{ =}\sqrt[]{(2\sqrt[]{2})^2+(\sqrt[]{2})^2-2(\sqrt[]{2})(2\sqrt[]{2})\cos 33} \\ b\text{ = 1.8} \end{gathered}

Using Sine Law, we can get the angles


\begin{gathered} (1.8)/(\sin 33)=\frac{\sqrt[]{2}}{\sin A} \\ A=25.1 \end{gathered}

Since the total angle inside a triangle is 180, the angle at C is


C-33-25.1=121.9

User Paul Stevens
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