Show that limit of #sqrt(x){sqrt(x+2)-sqrt(x)}=1# as x approaches to infinity?

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Answer 1 · 2017-12-08T14:25:06

#lim_(xrarroo) sqrt(x)(sqrt(x+2)-sqrt(x))# has indeterminate form #oo(oo-oo)#

Use a conjugate to rewrite the expression.

#(sqrt(x)(sqrt(x+2)-sqrt(x)))/1 * ((sqrt(x+2)+sqrt(x)))/((sqrt(x+2)+sqrt(x))) = (sqrtx((x+2)-x))/(sqrt(x+2)+sqrt(x))#

# = (2sqrtx)/(sqrt(x+2)+sqrt(x))#

Now the limit has indeterminate form #oo/oo#. Remove a common factor of #sqrtx#

# = (cancel(sqrtx)(2))/(cancel(sqrtx)(sqrt(1+2/sqrtx)+1))#

The limit as #xrarroo# is #2/(sqrt(1+0)+1) = 2/2 = 1#