91Ó°ÊÓ

For the following exercises, find the local and/or absolute maxima for the functions over the specified domain. $$y=\left(x-x^{2}\right)^{2} \text { over }[-1,1]$$

For the following exercises, find the local and/or absolute maxima for the functions over the specified domain. $$y=\frac{1}{\left(x-x^{2}\right)} \text { over }[0,1]$$

Find the local and/or absolute maxima for the functions over the specified domain. \(y=\frac{1}{\left(x-x^{2}\right)}\) over [0,1]

For the following exercises, find the local and/or absolute maxima for the functions over the specified domain. $$y=\sqrt{9-x} \text { over }[1,9]$$

Find the local and/or absolute maxima for the functions over the specified domain. \(y=\sqrt{9-x}\) over [1,9]

Find the local and/or absolute maxima for the functions over the specified domain. \(y=x+\sin (x)\) over \([0,2 \pi]\)

For the following exercises, find the local and/or absolute maxima for the functions over the specified domain. $$y=x+\sin (x) \text { over }[0,2 \pi]$$

For the following exercises, find the local and/or absolute maxima for the functions over the specified domain. $$y=\frac{x}{1+x} \text { over }[0,100]$$

Find the local and/or absolute maxima for the functions over the specified domain. \(y=\frac{x}{1+x}\) over [0,100]

For the following exercises, find the local and/or absolute maxima for the functions over the specified domain. $$y=|x+1|+|x-1| \text { over }[-3,2]$$