we have (x+1)^2≥α(α+1)... (1)
Is x^2≥α(α−1)
we can chose x+1 to be t and have
t^2≥α(α+1)
now as t is positive so t > α
let t = α+h ( h >0)
so t^2 - α(α+1)
= (α+h)^2 - α(α+1)
= 2αh + h^2 - α >= 0 given (1)
we need to show that
(t-1)^2≥α(α-1)
(t-1)^2-α(α-1)
= (α+h-1)^2 - α(α-1)
= (α^2+h^2+1+ 2αh - 2α +2h) - α(α-1)
= h^2+1+ 2αh - α +2h
= ( h^2 + 2αh - α) + ( 1+ 2h)
> 0 as ( h^2 + 2αh - α) from (1)
hence proved that (t-1)^2≥α(α-1)
Is x^2≥α(α−1)
we can chose x+1 to be t and have
t^2≥α(α+1)
now as t is positive so t > α
let t = α+h ( h >0)
so t^2 - α(α+1)
= (α+h)^2 - α(α+1)
= 2αh + h^2 - α >= 0 given (1)
we need to show that
(t-1)^2≥α(α-1)
(t-1)^2-α(α-1)
= (α+h-1)^2 - α(α-1)
= (α^2+h^2+1+ 2αh - 2α +2h) - α(α-1)
= h^2+1+ 2αh - α +2h
= ( h^2 + 2αh - α) + ( 1+ 2h)
> 0 as ( h^2 + 2αh - α) from (1)
hence proved that (t-1)^2≥α(α-1)
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