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Question
Find the value of A if tan 4A = cot (A – 15°) where 4A and (A – 15°) are acute angles.
Sum
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Solution
Given: tan 4A = cot (A – 15°) and 4A and (A – 15°) are acute angles.
Step-wise calculation:
1. Use cot x = tan (90° – x):
tan 4A = cot (A – 15°)
= tan [90° – (A – 15°)]
= tan (105° – A)
2. Since 4A and (A – 15°) are acute, 4A and 105° – A lie in (0°, 90°).
So, their principal tangent values must be equal without adding 180°: 4A = 105° – A.
3. Solve: 5A = 105°
⇒ A = 21°
4. Check angle ranges:
(A – 15°) = 6° ...(acute)
4A = 84° ...(acute)
Both conditions are satisfied.
A = 21°.
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Chapter 18: Trigonometric Ratios of Some Standard Angles and Complementary Angles - Exercise 18C [Page 380]
