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Question

Prove that: cos2A+cos2B+cos2C=12cosAcosBcosC.

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Solution

We write cos2A=1sin2A

and as in ΔABC A+B+C=180

cosC=cos(180AB)=cos(A+B)

L.H.S.=1sin2A+cos2B+cos2C

=1+(cos2Bsin2A)+cos2C

=1+cos(B+A)cos(BA)+cos2C ..... (cos2Csin2D=cos(C+D)cos(CD))

=1cosCcos(BA)+cos2C

=1cosC[cos(BA)cosC]

=1cosC[cos(BA)+cos(B+A)] .

=1cosC(2cosAcosB) ....... By compound angles formula

=12cosAcosBcosC.

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