$\text { Locate the absolute extrema of the function } g ( t ) = \frac { t ^ { 2 } } { t ^ { 2 } + 2 } \text { on the closed interval }$ $[ - 3,3 ] \text {. }$
A) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs at the critical number $x = 0$.
The absolute minimum is $\frac { 9 } { 5 }$, and it occurs at the left endpoint $x = - 3$.
B) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs at either endpoint $x = \pm 3$.
The absolute minimum is 0 , and it occurs at the critical number $x = 0$.
C) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs only at the left endpoint $x = - 3$.
The absolute minimum is 0 and it occurs at the critical number $x = 0$.
D) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs at the critical number $x = 0$.
The absolute minimum is $\frac { 9 } { 5 }$, and it occurs at the right endpoint $x = 3$.
E) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs only at the right endpoint $x = 3$ The absolute minimum is 0 and it occurs at the critical number $x = 0$.

Question

$\text { Locate the absolute extrema of the function } g ( t ) = \frac { t ^ { 2 } } { t ^ { 2 } + 2 } \text { on the closed interval }$ $[ - 3,3 ] \text {. }$ 
A) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs at the critical number $x = 0$.
The absolute minimum is $\frac { 9 } { 5 }$, and it occurs at the left endpoint $x = - 3$.
B) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs at either endpoint $x = \pm 3$.
The absolute minimum is 0 , and it occurs at the critical number $x = 0$.
C) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs only at the left endpoint $x = - 3$.
The absolute minimum is 0 and it occurs at the critical number $x = 0$.
D) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs at the critical number $x = 0$.
The absolute minimum is $\frac { 9 } { 5 }$, and it occurs at the right endpoint $x = 3$.
E) The absolute maximum is $\frac { 9 } { 11 }$, and it occurs only at the right endpoint $x = 3$ The absolute minimum is 0 and it occurs at the critical number $x = 0$.

Quizplus · Accepted Answer

The Answer is B

Locate the absolute extrema of the function g(t)=t2t2+2 on the closed interval \text { Locate the absolute extrema of the function } g ( t ) = \frac { t ^ { 2 } } { t ^ { 2 } + 2 } \text { on the closed interval } Locate the absolute extrema of the function g(t)=t2+2t2​ on the closed interval

$\text { Locate the absolute extrema of the function } g ( t ) = \frac { t ^ { 2 } } { t ^ { 2 } + 2 } \text { on the closed interval }$