1Consider this right triangle.K1257°Enter the length of JL, to the nearest whole number.

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Running Rabbit asked Apr 2, 2023

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1Consider this right triangle.K1257°Enter the length of JL, to the nearest whole number.

Mathematics
college

Running Rabbit asked Apr 2, 2023

by Running Rabbit

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1 Answer

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To solve for the length of JL in the right triangle, we will apply

SOHCAHTOA

For this particular question, we will use CAH

$\cos \theta=(adjacent)/(hypotenuse)$
$\cos 57=(JL)/(12)$
$\text{Cross multiply}$
$\begin{gathered} 12*\cos 57=JL \\ 12*0.54464\text{ =JL} \\ 6.53568\text{ = JL} \\ 7\text{ (to the nearest whole number) = JL} \end{gathered}$

Scosman answered Apr 9, 2023

by Scosman

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