Prove that: 4 (sin^4 30° + cos^4 60°) – 3 (cos^2 45° – sin^2 90°) = 2 - Mathematics

प्रश्न

Prove that:

4 (sin⁴ 30° + cos⁴ 60°) – 3 (cos² 45° – sin² 90°) = 2

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उत्तर

LHS = 4 (sin⁴ 30° + cos⁴ 60°) – 3 (cos² 45° – sin² 90°)

= `4[(1/2)^4 + (1/2)^4] - 3[(1/sqrt2)^2 + (1)^4]`

= `4[(1)/(16) + (1)/(16)] - 3[(1)/(2) - 1]`

= `(4 xx 2)/(16) + 3 xx (1)/(2)`

= 2

RHS = 2

LHS = RHS

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सेलिना Concise Mathematics [English] Class 9 ICSE

पाठ 23 Trigonometrical Ratios of Standard Angles [Including Evaluation of an Expression Involving Trigonometric Ratios]
Exercise 23 (A) | Q 6.2 | पृष्ठ २९१

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पाठ 18 Trigonometric Ratios of Some Standard Angles and Complementary Angles
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Prove that: 4 (sin^4 30° + cos^4 60°) – 3 (cos^2 45° – sin^2 90°) = 2 - Mathematics

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Prove that: 4 (sin^4 30° + cos^4 60°) – 3 (cos^2 45° – sin^2 90°) = 2 - Mathematics

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