cos p theta=cos q theta,p!=q," then "...

cos p theta=cos q theta,p!=q," then "

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cos p theta=cos q theta,p!=q, thetn

If cos p theta+cos q theta=0 , then prove that the different values of theta are in A.P. with common difference 2pi// (p pm q) .

If cos p theta+cos q theta=0 , then prove that the different values of theta are in A.P. with common difference 2pi// (p pm q) .

If cos p theta+cos q theta=0 , then prove that the different values of theta are in A.P. with common difference 2pi// (p pm q) .

If the solutions for theta of cos p theta+cos q theta=0,p>q>0 are in A.P then numerically smallest common differece of A.P is

if the solution for theta of cos p theta + cos q theta =0 p gt q gt 0 are in AP. Then the numerically smallest common difference of AP is

If cos p theta + cos q theta = 0 and if p ne q, then theta is equal to (n is any integer )

If sin theta=p and cos theta=q then the value of (p-2p^(3))/(2q^(3)-q) is

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