The equation 8 cosx.cos2x.cos4x=(sin6x)/...

The equation `8 cosx.cos2x.cos4x=(sin6x)/(sinx)` has a solution if

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The equation 8cosx cos2x cos4x = (sin6x)/(sinx) has a solution given by :

8cos x cos2x cos4x = (sin6x) / (sin x)

The general solution of the equation 8 cos x cos 2x cos 4x=sin 6x/sinx is

The general solution of the equation 8 cos x cos 2x cos 4x = sin 6x//sin x is

The general solution of the equation 8 cos x cos 2x cos 4x = sin 6x//sin x is

The general solution of the equation 8 cos x cos 2x cos 4x = sin 6x//sin x is

The equation "sin"^(6) x + "cos"^(6) x = lambda , has a solution if

The equation "sin"^(6) x + "cos"^(6) x = lambda , has a solution if

16 sin x cosx cos 2x cos 4x cos 8x in

Number of solution of the equation cos^(4)2x+2sin^(2)2x=17(cosx+sinx)^(8), 0 lt x lt 2pi is

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