Asked by TayB

L'Hospital's Rule Lim(lnx)^(x-1) x->1+ This is what I did so far... Form: 0^0 ln(lnx)/ (1/x... Using L'Hospital's rule: find, lim as x approaches (-) infinity of xsin(1/x) Using L'Hospital's Rule, find, the limit as x approaches 0 of x^(sinx) find L- Hospital lim x_---- inf 1/e^(-x)= using L'Hospital's rule, evalutate; LIM as x->0 e^x +cos x / e^x + sin x I'm at LIM x->0 e^x+c... Use L'Hospital's Rule to solve: lim u --> 1 of (u-1)^3/ ((1/u) - u^2 + (3/u) - 3) Ok, so what... use L'Hospital's rule to evaluate: limit as x approaches to 0 of (1/sinx -1/x) Use l'Hospital's Rule to show that lim x-> infinity (1+1/x)^x =e Use l'Hospital's Rule to evaluate ((te^7t)/7)-((e^7t)/49)? find the limit using l'hospital's rule lim x-->negative infinity (x ln(1-1/x)