Question
Download Solution PDFयदि \(\frac{{\sin \theta + \cos \theta }}{{\sin \theta - \cos \theta }} = \frac{3}{2}\) है, तो \({\sin ^4}\theta - {\cos ^4}\theta \) का मान ज्ञात कीजिए।
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFदिया गया है:
\(\frac{{\sin \theta + \cos \theta }}{{\sin \theta - \cos \theta }} = \frac{3}{2}\)
प्रयुक्त सूत्र:
tan θ = \(\frac{sin\theta}{cos\theta}\)
तन θ = \(\frac{\ perpendicular}{\ base}\)
गणना:
2(sinθ + cosθ ) = 3(sinθ - cosθ)
2 sinθ + 2cosθ = 3 sinθ - 3 cosθ
5 cosθ = sinθ
\(\frac{sin\theta}{cos\theta}\) = 5
tanθ = 5
अब, लंब = 5 और आधार = 1
पाइथागोरस प्रमेय का प्रयोग करके,
H2 = P2 + B2
H2 = 25 + 1
H = \(\sqrt26\)
अब, sinθ = P/H और cosθ = B/H
sinθ = \(\frac{5}{\sqrt26}\)
cosθ = \(\frac{1}{\sqrt26}\)
प्रश्न के अनुसार,
\({\sin ^4}\theta - {\cos ^4}\theta \) = ( \(\frac{5}{\sqrt26}\) ) 4 - ( \(\frac{1}{\sqrt26}\) ) 4
\(=\frac{625}{676}\) - \(\frac{1}{676}\)
= \(\frac{625-1}{676}\)
= \(\frac{624}{676}\\=\frac{12}{13}\)
∴ सही उत्तर \(\frac{12}{13}\) है।
Last updated on Jul 7, 2025
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