How do you find #lim (1+5/sqrtu)/(2+1/sqrtu)# as #u->0^+# using l'Hospital's Rule?

2 Answers
Steve M
May 5, 2017

# lim_(u rarr 0^+) (1+5/sqrt(u))/(2+1/sqrt(u)) = 5 #

Explanation:

We do not need to apply L'Hôpital's as this is a trivial limit to evaluate:

# lim_(u rarr 0^+) (1+5/sqrt(u))/(2+1/sqrt(u)) = lim_(u rarr 0^+) (1+5/sqrt(u))/(2+1/sqrt(u))*sqrt(u)/sqrt(u) #
# " " = lim_(u rarr 0^+) (sqrt(u)+5)/(2sqrt(u)+1) #
# " " = 5/1 #

Note that the above limit is only valid for #u rarr 0^+# as:

# u rarr 0^+ => u > 0 => sqrt(u) in RR #

Whereas:

# u rarr 0^- => u < 0 => sqrt(u) in CC #

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