Math / CalculusQuestionFind the limit as xxx approaches 3 for the expression x−1/2(5x−7)1/3x^{-1/2}(5x-7)^{1/3}x−1/2(5x−7)1/3.Studdy Solutionimplify the expression to get the final result.=23= \frac{2}{\sqrt{3}}=32So, limx→3[x−1/2(5x−)1/3]=23\lim{x \rightarrow3}\left[x^{-1 /2}(5 x-)^{1 /3}\right] = \frac{2}{\sqrt{3}}limx→3[x−1/2(5x−)1/3]=32.View Full Solution - FreeWas this helpful?