How do you verify #(sin z + cos z) (tan z + cot z) = sec z + csc z#?

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How do you verify #(sin z + cos z) (tan z + cot z) = sec z + csc z#?

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Answer 1 · 2016-04-13T07:31:00

#tan z + cot z = sin z/cos z + cos z/sin z = (sin^2z + cos^2z)/(sin z cos z)=1/(sin z cos z)#. On the left of given equation, it reduces to (1/cos z +1/sin z)= sec z + csc z, as required..

Explanation:

#sin^2z + cos^2z = 1#

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How do you verify #(sin z + cos z) (tan z + cot z) = sec z + csc z#?

1 Answer

Explanation:

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