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Find the measure of angles G and the length of GH

Find the measure of angles G and the length of GH-example-1
User Karol Borkowski
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1 Answer

8 votes
8 votes

Since △GHI is a right triangle, then, from the Pythagorean Theorem, the lengths of its sides satisfy the following equation:


GI^2=GH^2+HI^2

Where GI is the hypotenuse of the right triangle, and GH and HI are the legs of the right triangle.

Since GH is unknown, isolate it from the equation:


GH=\sqrt[]{GI^2-HI^2}

Substitute the values of GI and HI:


\begin{gathered} GH=\sqrt[]{26^2-10^2} \\ =\sqrt[]{676-100} \\ =\sqrt[]{576} \\ =24 \end{gathered}

Therefore, GH=24.

On the other hand, recall the definition of sine of an angle on a right triangle:


\sin (G)=\frac{\text{opposite leg}}{\text{hypotenuse}}

The leg opposite to G is HI, and the hypotenuse of the right triangle is GI. Then:


\begin{gathered} \sin (G)=(10)/(26) \\ \Rightarrow\sin (G)=(5)/(13) \end{gathered}

Take the inverse sine function from both sides:


\Rightarrow G=\sin ^(-1)((5)/(13))

Use a calculator to find the inverse sine of 5/13:


\therefore G=22.61986495\ldots

Therefore, the angle G is approximately 22.6°.

User Bojan Petkovski
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