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प्रश्न
Without using tables verify that cos 60° = cos2 30° – sin2 30°.
बेरीज
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उत्तर
Given: cos 60° = cos2 30° – sin2 30°.
Step-wise calculation:
1. Use the double-angle identity cos (2θ) = cos2θ – sin2θ.
2. Put θ = 30°:
cos 60° = cos2 30° – sin2 30° ...(This is the identity specialized to 30°)
3. Evaluate the basic values:
`cos 30^circ = sqrt(3)/2` and `sin 30^circ = 1/2`
4. Compute:
cos2 30° – sin2 30°
= `(sqrt(3)/2)^2 - (1/2)^2`
= `3/4 - 1/4`
= `1/2`
5. Note `cos 60^circ = 1/2`, matching the result.
`cos 60^circ = 1/2 = cos^2 30^circ - sin^2 30^circ`, so the identity is verified.
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