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What is the value of csc A in the triangle below
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What is the value of csc A in the triangle below

What is the value of csc A in the triangle below-example-1
User Markus Marvell
by
6.6k points

2 Answers

3 votes
csc = 1/sin

sin A = 16/(sqrt(9^2 + 16^2))

sin A = 16/sqrt(337)

csc A = sqrt(337)/16

B
User Adrian Rosca
by
7.6k points
3 votes

Step 1

Find the length of AC

In the right triangle ABC

Applying the Pythagoras Theorem


AC^(2)=AB^(2)+BC^(2)

In this problem we have


AB=9\ units\\BC=16\ units

Substitute


AC^(2)=9^(2)+16^(2)


AC^(2)=337


AC=√(337)\ units

Step 2

Find the csc(A)

we know that


csc(A)=(1)/(sin(A))


sin(A)=(BC)/(AC)

so


csc(A)=(AC)/(BC)

substitute


csc(A)=(√(337))/(16)

therefore

the answer is


csc(A)=(√(337))/(16)

User CookieEater
by
6.7k points
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