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How do you find the Limit of #ln(1+5x) - ln(3+4x)# as x approaches infinity?

1 Answer

Jun 16, 2016

#log_e(5/4)#

Explanation:

#f(x)=log_e(1+5x) - log_e(3+4x) = log_e((1+5x)/(3+4x))#

So #lim_{x->oo}f(x) = log_e(lim_{x->oo}(1+5x)/(3+4x)) = log_e(lim_{x->oo}(1/x+5)/(3/x+4)) =log_e(5/4)#

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