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How do you find #lim (1-5t^-1)/(4+6t^-1)# as #t->0#?

1 Answer

Feb 11, 2017

#5/6#

Explanation:

Since #t^-1=1/t# you could rewrite:

#lim_(t->0) (1-5/t)/(4-6/t)=lim_(t->0) ((t-5)/cancelt)/((4t-6)/cancelt)=lim_(t->0)(t-5)/(4t-6)=5/6#

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