Question 1108325
-(x+5)^2(x-4)^3
derivative is 2(x+5)(-1)(x-4)^3+3(x-4)^2*-(x+5)^2
The minus signs cancel and set equal to 0.
2(x+5)(x-4)^3+3(x-4)^2(x+5)^2=0
at x=-5 or x=4, the derivative has a critical point.
there should be one more.
2(x+5)(x-4)^3=-3(x-4)^2*2(x+5)^2
2(x-4)^3=-3(x-4)^2*2(x+5)
2(x-4)=-3*2(x+5)
2X-8=-6X-30
8x=-22
x=-22/8
Graphing is a good way to see it.
{{{graph(300,300,-10,10,-100,5000,-(x+5)^2(x-4)^3)}}}
Without the graph, one can look at extreme values.  As x becomes more negative, then it is minus the square* minus^3, and that is positive.  So from x going from -oo to -5, the function is decreasing.
As x gets large positive, it is decreasing, so from -22/8 ( a local maximum), to +oo, it is decreasing.