Let V be a finite-dimensional vector space and let B ={α 1…,α n } be a basis for V . Let ( | ) be the inner product of V. If c 1,...,c n , are n is a scalar, then show that there exist one vector α∈ V such that (α∣αj)=cj, j=1 ,…,n.
We have given that V is a finite dimensional vector space.
Consider α∈ V defined as
α = α₁β₁ + α₂β₂ + -----+ αₙβₙ where,
β₁ = α₁
β₂= α₂ - (α₁ |β₁)/β₁/β₂ |(β₁)
similarly, __
βⱼ = αⱼ - ( ∑ (αⱼ|βⱼ) / βᵢ|(βᵢ) βᵢ ) , j = 2,n bar
As defined aᵢ, i = 1, j bar
α₁ = c₁/ (β₁ )|β₁
___
α₂ = c₁/ (β₁ )|β₁ - a₁ ( α₂|β₂/β₁|β₂)
proceeding like as we get
_______
αⱼ = 1/β₁|(β₁) (cⱼ - ∑ αⱼ ( αⱼ |βⱼ)
then conider
(α|αⱼ )= ( α₁β₁ + α₂β₂ + -- + αₙβₙ |αⱼ )
= α₁β₁ + α₂β₂ + -- + αₙβₙ |βⱼ ) + ∑ α₁β₁+ α₂β₂ +---+αⱼβᵢ /βᵢβᵢ)
______
(α|αⱼ) =αⱼ(βⱼ |βⱼ) + (cⱼ - ∑ αⱼ ( αⱼ |βⱼ) βⱼ |βⱼ
__ ___
= (cⱼ - ∑ αᵢ ( αⱼ |βᵢ) + ∑αⱼ |βᵢ
(α|αⱼ) = cj, j = 1,n
Hence proved.
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