cosx+cosy=1/3,sinx+siny=1/4=>sin(x+y)...

`cosx+cosy=1/3,sinx+siny=1/4=>sin(x+y)`

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Prove that: (cosx-cosy)^2+(sinx-siny)^2=4sin^2 (x-y)/2

Prove that : (cosx-cosy)^2+(sinx-siny)^2=4sin^2((x-y)/2) .

Prove that (cosx + cosy)/(sinx - siny) = cot ((x-y)/2)

if x and y are acute angles such that cosx + cosy = 3/2 and sinx + siny = 3/4 then sin(x+y)=

if x and y are acute angles such that cosx + cosy = 3/2 and sinx + siny = 3/4 then sin(x+y)=

Prove that (cosx+cosy)^2+(sinx-siny)^2=4cos^2((x+y)/2)

Prove that (cosx +cosy)^2+(sinx+siny)^2=4cos^2((x-y)/2)

If cos x. cosy+sinx.siny=-1 then cosx+cosy is :

Prove the following: (cosx-cosy)^2+(sinx-siny)^2=4sin^2(frac(x-y)(2))

Prove that : (cosx-cosy)^(2)+(sinx-siny)^(2)=4sin^(2)""(x-y)/(2)

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