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A is an acute angle in a right triangle, Given that Sin A= 7/25, what is the ratio for Cos A? Enter your answer in the box as a fraction in simplest form.
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5 votes
A is an acute angle in a right triangle, Given that Sin A= 7/25, what is the ratio for Cos A? Enter your answer in the box as a fraction in simplest form.

A is an acute angle in a right triangle, Given that Sin A= 7/25, what is the ratio-example-1
User Jason Harris
by
5.4k points

2 Answers

5 votes

\sin \theta = (opp)/(hyp)


\sin A = (7)/(25) = (opp)/(hyp)


a^2 + b^2 = c^2


a^2 + 7^2 = 25^2


a^2 = 625 - 49


a = √(576)


a = 24


adj = a = 24


\cos A = (adj)/(hyp)


\cos A = (24)/(25)
User Bosko Skrbina
by
6.1k points
0 votes
Find the adjacent side of the triangle ...
7² + x² = 25²
x² = 25² - 7²
x² = 576
x = 24
The adjacent side of the triangle is 24

Given that sin A =
(7)/(25)
Since sin A =
(o)/(h)
We can conclude that o = 7 and h = 25

cos A =
(a)/(h)
cos A =
(24)/(25)
User Mistercx
by
6.0k points
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