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Question
The value of (1 + tan2 θ) (1 – sin θ) (1 + sin θ) = ______.
Fill in the Blanks
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Solution
The value of (1 + tan2 θ) (1 – sin θ) (1 + sin θ) = 1.
Explanation:
(1 + tan2 θ) (1 – sin θ) (1 + sin θ)
= sec2θ (1 – sin θ) (1 + sin θ)
= sec2θ (1 – sin2θ) ...[∵ (a – b)(a + b) = a2 – b2]
= sec2θ × cos2θ
= `1/(cos^2θ) xx cos^2θ`
= 1
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