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Question
Evaluate:
`(4 cos 57^circ)/(sin 33^circ) - (sqrt(3) · cos 38^circ "cosec" 52^circ)/(tan 20^circ tan 60^circ tan 70^circ)`
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Solution
Given: `(4 cos 57^circ)/(sin 33^circ) - (sqrt(3) · cos 38^circ "cosec" 52^circ)/(tan 20^circ tan 60^circ tan 70^circ)`.
Step-wise calculation:
1. sin 33° = cos 57°
Since 33° + 57° = 90°.
So, `(4 cos 57^circ)/(sin 33^circ)`
= `(4 cos 57^circ)/(cos 57^circ)`
= 4
2. cosec 52° = `1/(sin 52^circ)` and sin 52° = cos 38°
Since 52° + 38° = 90°.
Hence, `cos 38^circ · "cosec" 52^circ`
= `cos 38^circ · 1/(cos 38^circ)`
= 1
So, the numerator of the second term is `sqrt(3)`.
3. tan 70° = cot 20°
= `1/(tan 20^circ)`
70° + 20° = 90°
So, tan 20° · tan 70° = 1.
Therefore, tan 20° · tan 60° · tan 70°
= 1 · tan 60°
= tan 60°
= `sqrt(3)`
4. Thus, the second term = `sqrt(3)/sqrt(3)` = 1.
5. Whole expression = 4 – 1 = 3.
Value = 3.
