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11 votes
11 votes
Pls help me with this!

Pls help me with this!-example-1
User Ristorante
by
2.5k points

2 Answers

16 votes
16 votes

Answer:

0.69

Explanation:

In a right triangle, the cosine of one of the acute angles is the ratio of the adjacent ("next to") side to the hypotenuse.

In this triangle, the side adjacent to angle T has length
√(38). Now you need the length of the hypotenuse, ST. Use the Pythagorean Theorem:


ST^2=(√(38))^2+(√(41))^2 \\\\ST^2=38+41\\\\ST=√(79)

Build the ratio (adjacent) / (hypotenuse) and approximate it with a decimal.


cos(T)=(√(38))/(√(79)) \approx 0.69

User Jlnorsworthy
by
3.3k points
9 votes
9 votes


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To find :-

Cos T = ?

Given :-

Perpendicular(P) = RS = √41

Base(B) = RT = √38

Formula to be used :-

We will use here a trignometry formula to find hypotenuse (H) which is ST.

(hypotenuse)² = (perpendicular)² + (base)²


\cos(A) = (base)/(hypotenuse)

Solution:-

H² = P² + B²

H² = (√41)² + (√38)²

H² = 41 + 38

H² = 79

H = √79


\cos(T) = (B)/(H) \\ \cos(T) = ( √(38) )/( √(79) ) \\ \cos(T) = (6.17)/(8.89) \\ \cos(T) = 0.69

Result :-

The value of cos(T) is 0.69.

User Chondrops
by
2.5k points
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