If (1 – x + x 2 ) n = a 0 + a 1 x + a 2 x 2 + … + a 2n x 2n , find the value of a 0 + a 2 + a 4 + … + a 2n .

Question

Philoid · Accepted Answer

(1 – x + x²)ⁿ = a₀ + a₁x + a₂x² + … + a_2nx²ⁿ

At x = 1

(1 – 1 + 1²)ⁿ = a₀ + a₁(1) + a₂(1)² + … + a_2n(1)²ⁿ

a₀ + a₁ + a₂ + … + a_2n = 1 …(1)

At x = -1

(1 – (-1) + (-1)²)ⁿ = a₀ + a₁(-1) + a₂(-1)² + … + a_2n(-1)²ⁿ

a₀ - a₁ + a₂ - … + a_2n = 3ⁿ …(2)

On adding eq.1 and eq.2

(a₀ + a₁ + a₂ + … + a_2n) + (a₀ - a₁ + a₂ - … + a_2n) = 1 + 3ⁿ

2(a₀ + a₂ + a₄ + … + a_2n) = 1 + 3ⁿ

a₀ + a₂ + a₄ + … + a_2n =