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Question
In ΔABC, prove that `sec (C + A)/2 = "cosec" B/2`.
Theorem
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Solution
Given: Triangle ABC, so A + B + C = 180°.
To Prove: `sec (C + A)/2 = "cosec" B/2`.
Proof [Step-wise]:
1. From the angle-sum in a triangle:
A + B + C = 180°
2. Hence, `(C + A)/2 = (180^circ - B)/2`
= `90^circ - B/2`
3. Therefore, `sec((C + A)/2) = sec(90^circ - B/2)`.
4. Use the cofunction identity:
`sec(90^circ - x) = 1/cos(90^circ - x)`
= `1/(sin x)`
= cosec x
5. Apply that identity with `x = B/2`:
`sec(90^circ - B/2) = "cosec" (B/2)`
`sec (C + A)/2 = "cosec" B/2`, as required.
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Chapter 18: Trigonometric Ratios of Some Standard Angles and Complementary Angles - Exercise 18C [Page 380]
