Question 1107683
sin(x)cos^3(x) - cos(x)sin^3(x) = (1/4) * sin(4x)
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multiply both sides of = by 4
:
4(sin(x)cos^3(x) - cos(x)sin^3(x)) = sin(4x)
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apply the identity cos^2(x) = 1-sin^2(x) to cos^3(x)
:
4(cos(x)(1-sin^2(x))sin(x) - cos(x)sin^3(x)) = sin(4x)
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4((cos(x)-cos(x)sin^2(x))sin(x) - cos(x)sin^3(x)) = sin(4x)
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4(cos(x)sin(x)-cos(x)sin^3(x) - cos(x)sin^3(x)) = sin(4x)
:
4(cos(x)sin(x)-2cos(x)sin^3(x)) = sin(4x)
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4cos(x)sin(x)-8cos(x)sin^3(x) = sin(4x)
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use double angle identity on sin(4x)
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4cos(x)sin(x)-8cos(x)sin^3(x) = 2cos(2x)sin(2x)
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use double angle identity on cos(2x)
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4cos(x)sin(x)-8cos(x)sin^3(x) = 2(1-2sin^2(x))sin(2x)
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use double angle identity on sin(2x)
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4cos(x)sin(x)-8cos(x)sin^3(x) = 2 * 2cos(x)sin(x) * (1-2sin^2(x))
:
4cos(x)sin(x)-8cos(x)sin^3(x) = 4cos(x)sin(x) - 8cos(x)sin^3(x)
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both sides are the same, the identity is correct
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