Find the value of cotθ - tan(90° -θ).
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Answered by
1
Answer:
0
Step-by-step explanation:
cotθ is special in that it is both a reciprocal and a complementary function to tanθ
That is,
cotθ = 1/tanθ AND cotθ = tan(90-θ)
Therefore, tan(90-θ) = cotθ
To find:
cotθ - tan(90° -θ)
= cotθ - cotθ
= 0
Answered by
0
We know that tan (90-theta) = Cot THETA
THERFORE IT BECOMES => Cot THETA - Cot THETA = 0 .
Hope it helps you.
Namaste.
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