To prove: 2(sin⁶ x + cos⁶ x) – 3(sin⁴ x + cos⁴ x)+ 1 = 0

Proof:

Take LHS:

2(sin⁶ x + cos⁶ x) – 3(sin⁴ x + cos⁴ x)+ 1

Identities used:

(a + b)² = a² + b² + 2ab

a³ + b³ = (a + b) (a² + b² – ab)

Therefore,

= 2{(sin² x)³ + (cos² x)³} – 3{(sin² x)² + (cos² x)²} + 1

= 2{(sin² x + cos² x)(sin⁴ x + cos⁴ x – sin² x cos² x} – 3{(sin² x)² + (cos² x)² + 2sin² x cos² x – 2sin² x cos² x }+ 1

= 2{(1)(sin⁴ x + cos⁴ x + 2 sin² x cos² x – 3 sin² x cos² x}–3{(sin² x + cos² x)² – 2sin² x cos² x} + 1

{∵ sin² x + cos² x = 1}

= 2{(sin² x + cos² x)² – 3 sin² x cos² x} – 3{(1)² – 2sin² x cos² x } + 1

= 2{(1)² – 3 sin² x cos² x} – 3(1 – 2sin² x cos² x) + 1

= 2(1 – 3 sin² x cos² x) – 3 + 6 sin² x cos² x + 1

= 2 – 6 sin² x cos² x – 2 + 6 sin² x cos² x

= 0

= RHS

Hence Proved