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प्रश्न
Prove that `(tan θ)/(tan(90^circ - θ)) + (sin(90^circ - θ))/(cos θ) = sec^2θ`.
सिद्धांत
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उत्तर
Given: Let θ be an angle.
To Prove: `(tan θ)/(tan(90^circ - θ)) + (sin(90^circ − θ))/(cos θ) = sec^2θ`.
Proof [Step-wise]:
1. Use cofunction identities:
tan (90° – θ) = cot θ and sin (90° – θ) = cos θ
2. Replace these into the left-hand side (LHS):
LHS = `(tan θ)/(tan (90^circ - θ)) + (sin (90^circ - θ))/(cos θ)`
= `(tan θ)/(cot θ) + (cos θ)/(cos θ)`
3. Simplify each term:
`(tan θ)/(cot θ) = tan θ · tan θ`
= tan2θ
`(cos θ)/(cos θ) = 1`
So, LHS = tan2θ + 1.
4. Use the Pythagorean identity 1 + tan2θ = sec2θ to get LHS = sec2θ.
Hence, `(tan θ)/(tan(90^circ - θ)) + (sin(90^circ − θ))/(cos θ) = sec^2θ`, as required.
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पाठ 18: Trigonometric Ratios of Some Standard Angles and Complementary Angles - Exercise 18C [पृष्ठ ३८०]
