Example 29 - Prove cos2 x + cos2 (x + pi/3) + cos2 (x - pi/3)

E𝑥ample 29 Prove that cos2 𝑥+cos2 (𝑥+"π" /3) + cos2 (𝑥 − "π" /3) = 3/2 Lets first calculate all 3 terms separately We know that cos 2x = 2cos2 x – 1 cos 2x + 1 = 2cos2 x 𝑐𝑜𝑠⁡〖2𝑥 + 1〗/2 = cos2 x So, cos2x = cos⁡〖2x + 1〗/2 Replacing x with x + 𝜋/3 is about cos2 (x + 𝜋/3) = cos⁡〖2( 𝑥 + 𝜋/3) + 1〗/2 = cos⁡〖 (2𝑥 + 2𝜋/3) + 1〗/2 Similarly , replacing x with x + 𝜋/3 in cos2x = 𝑐𝑜𝑠⁡〖2𝑥 + 1〗/2 cos2 (x – 𝜋/3) = cos⁡〖2( 𝑥 − 𝜋/3) + 1〗/2 = cos⁡〖( 2𝑥 − 2𝜋/3) + 1〗/2 Now we solve L.H.S cos2x + cos2 ( 𝑥+ 2𝜋/3) + cos2 ( 𝑥 − 2𝜋/3) = (1 + cos⁡2𝑥)/2 + (1 + cos⁡( 2𝑥 + 2𝜋/3))/2 + 〖1 + cos〗⁡( 2𝑥 − 2𝜋/3)/2 = 1/2 [1+cos⁡2𝑥 + 1+ cos⁡〖( 2𝑥+2𝜋/3) 〗 + 〖1+ cos〗⁡( 2𝑥−2𝜋/3) ] = 1/2 [ 1 + 1 + 1 + cos 2x + cos ( 2𝑥+2𝜋/3) + 〖 cos〗⁡( 2𝑥−2𝜋/3)] = 1/2 [ 3 + cos 2x + cos ( 2𝑥 + 2𝜋/3) + 〖 cos〗⁡( 2𝑥 − 2𝜋/3)] = 1/2 ["3 + cos 2x + 2cos " ( (2𝑥 + 2𝜋/3 + 2𝑥 − 2𝜋/3)/2)" ." 〖 cos〗⁡( (2𝑥 + 2𝜋/3 − (2𝑥 +2𝜋/3))/2) ] = 1/2 ["3 + cos 2x + 2cos " ( (2𝑥 + 2𝑥 + 2𝜋/3 − 2𝜋/3)/2)" ." 〖 cos〗⁡( (2𝑥 − 2𝑥 + 2𝜋/3 + 2𝜋/3)/2) ] = 1/2 ["3 + cos 2x + 2cos " ( (4𝑥+0)/2)" ." 〖 cos〗⁡( (0 + 4𝜋/3)/2) ] = 1/2 [ 3 + cos 2x + 2cos ( (4𝑥+0)/2) .〖 cos〗⁡( (0 + 4𝜋/3)/2) = 1/2 ["3 + cos 2x + 2cos " ( 4𝑥/2)" ." 〖 cos〗⁡( (4𝜋/3)/2) ] = 1/2 ["3 + cos 2x + 2cos 2x cos " 2𝜋/3] = 1/2 ["3 + cos 2x + 2cos 2x cos " (𝜋− 𝜋/3)] = 1/2 ["3 + cos 2x + 2cos 2x " (− "cos " (𝜋/3))] = 1/2 [ 3 + cos 2x + 2cos 2x (− 1/2)] = 1/2 [ 3 + cos 2x – 2 × 1/2 × cos 2x ] = 1/2 [ 3 + cos 2x – cos 2x ] = 1/2 [ 3 + 0] = 3/2 = R.H.S. Hence, L.H.S. = R.H.S. Hence proved

Example 29 - Class 11