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How do you find #lim sqrtt(sqrt(t+2)-sqrt(t+1))# as #t->oo#?

1 Answer

Feb 13, 2017

#1/2#

Explanation:

#sqrtt(sqrt(t+2)-sqrt(t+1))=sqrtt((t+2-(t+1)))/(sqrt(t+2)+sqrt(t+1))=#
#(sqrtt/sqrtt) 1/((sqrt(1+2/t)+sqrt(1-1/t)))=1/(sqrt(1+2/t)+sqrt(1+1/t))#

so

#lim_(t->oo)sqrtt(sqrt(t+2)-sqrt(t+1))=lim_(t->oo)1/(sqrt(1+2/t)+sqrt(1+1/t))=1/2#

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