TS EAMCET · Maths · Trigonometric Ratios & Identities
If \(\mathrm{A}+\mathrm{B}+\mathrm{C}=4 \mathrm{~S}\) then \(\sin (2 \mathrm{~S}-\mathrm{A})+\sin (2 \mathrm{~S}-\mathrm{B})+\sin (2 \mathrm{~S}-\mathrm{C})-\sin 2 \mathrm{~S}=\)
- A \(4 \cos \frac{\mathrm{~A}}{2} \cos \frac{\mathrm{~B}}{2} \cos \frac{\mathrm{C}}{2}\)
- B \(4 \sin \frac{\mathrm{~A}}{2} \cos \frac{\mathrm{~B}}{2} \cos \frac{\mathrm{C}}{2}\)
- C \(4 \cos \frac{\mathrm{~A}}{2} \sin \frac{\mathrm{~B}}{2} \cos \frac{\mathrm{C}}{2}\)
- D \(4 \sin \frac{\mathrm{~A}}{2} \sin \frac{\mathrm{~B}}{2} \sin \frac{\mathrm{C}}{2}\)
Answer & Solution
Correct Answer
(D) \(4 \sin \frac{\mathrm{~A}}{2} \sin \frac{\mathrm{~B}}{2} \sin \frac{\mathrm{C}}{2}\)
Step-by-step Solution
Detailed explanation
Let \(\alpha = 2S-A\), \(\beta = 2S-B\), \(\gamma = 2S-C\). \(\alpha+\beta+\gamma = (2S-A)+(2S-B)+(2S-C) = 6S-(A+B+C)\). Given \(\mathrm{A}+\mathrm{B}+\mathrm{C}=4 \\mathrm{~S}\), so \(\alpha+\beta+\gamma = 6S-4S = 2S\). The expression becomes…
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