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solve sin2x-sin4x+sin6x=0 |
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Answer» Sin2x-sin4x+sin6x=0 (sin6x+sn2x)-sin4x=0 We know that sinx +siny=2sin(x+Y/2)cos(x-y/2) Thereofre , =2sin(6x+2x/2)cos(6x-2x/2)-sin4x=0 =2sin8x/2cos4x/2-sin4x sin4x(2cos2x-1)=0 Therefore, sin4x=0 or 2cos2x-1=0 sin4x=0 or 2cos2x=1 sin4x=0 or cos2x=1/2
Now Let sinx=siny sin4x=sin4y now sin4x=0 Therfore sin4y=0 sin4y=sin(0) 4y=0 y=0 Now cos2x=1/2 Let cosx=cosy Cos2x=cos2y cos2y=1/2 ;cos(2y)=π/3;2y=π/3; Now, for sin4x=sin4y the general solution will be 4x=nπ±(-1)ⁿ4y Putting y=0 4x=nπ x=nπ/4 For cos2x=cos2y is 2x=2nπ±2y now 2y=π/3 2x=2nπ±π/3 on solving we get x=nπ±π/6 Therfore for sin4x=0 ,x=nπ/4 and for cos2x=1/2,x=nπ±π/6 |
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