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Find the cosine of each acute angle in the triangle below. Select all that apply.

Find the cosine of each acute angle in the triangle below. Select all that apply.-example-1

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In the given triangle by using Pythagoras theorem ,


\begin{gathered} 17^2=x^2+8^2 \\ x^2=17^2-8^2 \\ x^2=\text{ 289 - 64} \end{gathered}

Further,


\begin{gathered} x^2\text{ = 225} \\ x\text{ = }\sqrt[]{225} \\ x\text{ = 15 units } \end{gathered}

Cosine of the acute angle is calculated as,


\begin{gathered} \cos (\theta_1)\text{ = }(15)/(17) \\ \end{gathered}

and


\cos (\theta_2)\text{ = }(8)/(17)

Thus the required answer is ,


\begin{gathered} \cos (\theta_1)\text{ = }(15)/(17) \\ \cos (\theta_2)\text{ = }(8)/(17) \end{gathered}

Find the cosine of each acute angle in the triangle below. Select all that apply.-example-1

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