Prove that #cos^3Acos(3A)+sin^3A(sin3A)=cos^3 2A# ?
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Please refer to a Proof given in the Explanation Section.
Recall that,
#cos3A=4cos^3A-3cosA, &, sin3A=3sinA-4sin^3A.#
Sub.ing these, we have,
#:." The L.H.S.="cos^3A(4cos^3A-3cosA)+sin^3A(3sinA-4sin^3A),#
#=4cos^6A-3cos^4A+3sin^4A-4sin^6A,#
#=4(cos^6A-sin^6A)-3(cos^4A-sin^4A),#
#=4{(cos^2A)^3-(sin^2A)^3}-3{(cos^2A)^2-(sin^2A)^2},#
#=4{cos^2A-sin^2A){(cos^2A)^2+cos^2Asin^2A+(sin^2A)^2}#
#-3(cos^2A-sin^2A)(cos^2A+sin^2A),#
#=(cos^2A-sin^2A)[4{(cos^2A)^2+cos^2Asin^2A+(sin^2A)^2}-3*1],#
#=(cos^2A-sin^2A)[4cos^4A+4cos^2Asin^2A+4sin^4A-3(cos^2A+sin^2A)^2],#
#=(cos^2A-sin^2A)[4cos^4A+4cos^2Asin^2A+4sin^4A-3(cos^4A+2cos^2Asin^2A+sin^4a)],#
#=(cos^2A-sin^2A)[cos^4A-2cos^2Asin^2A+sin^4A],#
#=(cos^2A-sin^2A)(cos^2A-sin^2A)^2,#
#=(cos^2A-sin^2A)^3,#
#=(cos2A)^3,#
#=cos^3 2A,#
#"=The R.H.S."#
Enjoy Maths.!
Kindly refer to a Proof in the Explanation.
Here is a Second Method to solve the Problem.
We know the following Identities :
#cos3A=4cos^3A-3cosA, and, sin3A=3sinA-4sin^3A.#
#:. cos^3A=1/4(cos3A+3cosA).......(1), and,#
# sin^3A=1/4(3sinA-sin3A).............(2).# Using these, we have,
#"The L.H.S="1/4{(cos3A+3cosA)cos3A+(3sinA-sin3A)sin3A],#
#=1/4{cos^2 3A+3cos3AcosA+3sinAsin3A-sin^2 3A},#
#=1/4{(cos^2 3A-sin^2 3A)+3(cos3AcosA+sin3AsinA)},#
#=1/4{cos(2xx3A)+3cos(3A-A)},#
#=1/4{cos(3xx2A)+3cos2A},#
#=1/4(cos3theta+3costheta), where, theta=2A,#
#=cos^3 theta..........[because, (1)],#
#=cos^3 2A,#
#"=The R.H.S."#
Enjoy Maths.!
#LHS=cos^3Acos3A+sin^3Asin3A#
#=1/2(cos^2A*2cosAcos3A+sin^2A*2sinAsin3A)#
#=1/2[cos^2A(cos4A+cos2A)+sin^2A(cos2A-cos4A)]#
#=1/2[cos^2A*cos4A+cos^2A*cos2A+sin^2A*cos2A-sin^2A*cos4A]#
#=1/2[cos^2A*cos4A-sin^2A*cos4A+cos^2A*cos2A+sin^2A*cos2A]#
#=1/2[(cos^2A-sin^2A)cos4A+(cos^2A+sin^2A)cos2A]#
#=1/2[cos2A*cos4A+cos2A]#
#=1/2[cos2A(cos4A+1)]#
#=1/2*cos2A*2cos^2 2A#
#=cos^3 2A=RHS#