For the function g$($x$)=($x$^(4))/(7),$do the following:

$($a$)$Approximate g$\text{'}(5)$to two decimals.

limx$->3-$g$($x$)-$g$(3)$x$-3$~~

limx$->3+$g$($x$)-$g$(3)$x$-3$~~

g$\text{'}(5)$~~

$($b$)$Approximate g$\text{'}(0)$to two decimals.

limx$->0-$g$($x$)-$g$(0)$x$-0$~~

limx$->0+$g$($x$)-$g$(0)$x$-0$~~

g$\text{'}(0)$~~

For the function g$($x$)=$x$^((4)/(7)),$ do the following:

Approximate g$^(\text{'})(5)$ to two decimals.

$\backslash$lim$\_($x$->3^(-))($g$($x$)-$g$(3))/($x$-3)$~~

$\backslash$lim$\_($x$->3^(+))($g$($x$)-$g$(3))/($x$-3)$~~

g$^(\text{'})(3)$~~

Approximate g$^(\text{'})(0)$ to two decimals.

$\backslash$lim$\_($x$->0^(-))($g$($x$)-$g$(0))/($x$-0)$~~

$\backslash$lim$\_($x$->0^(+))($g$($x$)-$g$(0))/($x$-0)$~~

g$^(\text{'})(0)$~~