use l'hopital's rule to evaluate the $\backslash$lim$\_($x$->\backslash$infty $)(3$x$^(2)-5$x$)/(5$x$^(2)+4).$ Then determine the limit using limit laws and commonly known limits$.$

choose the limit equivalent to the given limit that can be evaluated using limit laws and commonly known limits

A$)\backslash$lim$\_($x$->\backslash$infty $)((3)/(5)-(5$x$)/(4))$

B$)\backslash$lim$\_($x$->\backslash$infty $)(3-5$x$)/(5+4)$

C$)\backslash$lim$\_($x$->-\backslash$infty $)(3$x$-5)/(5$x$+(4)/($x$))$

D$)\backslash$lim$\_($x$->\backslash$infty $)(3-(5)/($x$))/(5+(4)/($x$^(2)))$

The limit found using either method is in $\backslash$lim$\_($x$->\backslash$infty $)(3$x$^(2)-5$x$)/(5$x$^(2)+4)$