Question #d78f0

1 Answer
Eddie
Sep 2, 2016

=0

Explanation:

lim_(x to oo) (sin^2x)/(x^2+1)

We don't need to do very much here. sin x is a periodic and continuous function such that sin (x) in [-1,1] , x in (-oo, oo)

we can lift it out of the limit so that

lim_(x to oo) (sin^2x)/(x^2+1)

= (lim_(x to oo) sin^2x)/(lim_(x to oo)(x^2+1))

= lim_(x to oo) sin^2x lim_(x to oo) 1/(x^2+1)

and the limit of the quotient is the quotient of the limits, where the limits are known, so...
= lim_(x to oo) (sin^2x)(lim_(x to oo) 1)/(lim_(x to oo) ( x^2+1))

= (sin^2x) ( 1)/(oo) = 0

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