For $\displaystyle -{10}\le{x}\le{12}$ the function $\displaystyle {f}$ is defined by $\displaystyle {f{{\left({x}\right)}}}={x}^{{{5}}}{\left({x}+{2}\right)}^{{{6}}}$

On which two intervals is the function increasing (enter intervals in ascending order)?
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and
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Find the region in which the function is positive: Preview Question 6 Part 5 of 7   to Preview Question 6 Part 6 of 7  


Where does the function achieve its minimum? Preview Question 6 Part 7 of 7