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How do you evaluate the limit #x-sqrt(x^2+x)# as x approaches #oo#?

1 Answer

Aug 8, 2016

#= - 1/2#

Explanation:

#lim_(x to oo) x-sqrt(x^2+x)#

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

and Binomial expansion

#= lim_(x to oo) x-x (1+1/2 *1/x + O (1/x^2) )#

#= lim_(x to oo) x- x - 1/2 + O(1/x)#

#= - 1/2#

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