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Prove csc(pi/2 -x) = sec x
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Prove csc(pi/2 -x) = sec x

User Cbarrick
by
5.2k points

1 Answer

4 votes

Answer:

see explanation

Explanation:

Consider the left side

Using the trigonometric identities

csc x =
(1)/(sinx) and sec x =
(1)/(cosx)

Note that sin(
(\pi )/(2) - x) = cos x

Hence

csc(
(\pi )/(2) - x)

=
(1)/(sin((\pi )/(2)-x) )

=
(1)/(cosx)

= sec x = right side ⇒ proven

User Alexandr Tatarinov
by
5.5k points
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