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Question

Let α,βR be such that limx0x2sin(βx)αxsin x=1. Then 6(α+β) is equal to ___


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Solution

Let α,βϵR be such that
limx0x2sin(βx)αxsin x=1, then 6(α+β) equals
Using the infinite series expansion of sin x, this can be written as
limx0x2{βx(βx)33!+(βx)55!}αx{xx33!+x55!}
limx0x3{ββ3x23!+β5x45!}x(α1)+{x33!x55!+}=1
Since the value of the limit is equal to 1 we do not want the term (α1)x to exist in the denominator. Hence α1=0α=1
limx0/x3{ββ3x23!+β5x45!}/x3{13!x25!+}=1
limx0ββ3x23!+β5x45!13!x25!+=1
β16=1β=16
6(α+β)=6(1+16)=7


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