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CURVE SKETCHING

𝑦 = βˆ’π‘₯3\3βˆ’ 2π‘₯2 + 5π‘₯ βˆ’ 2

ANSWER: 𝐢𝑃: π‘₯ = 1,βˆ’5 , IP : π‘₯ = βˆ’2, Decreasing on (βˆ’βˆž,βˆ’5) & (1, ∞), Increasing on (βˆ’5,1) , CU on
(βˆ’βˆž,βˆ’2) CD on (βˆ’2, ∞), Minimum point (βˆ’5,βˆ’106\3) , Maximum point (1,2\3)

I WANT THE STEPS PLEASE

y' = -x^2 - 4x + 5 = -(y+5)(y-1)

y'=0 at x = -5,1
y'<0 for x < -5 or x>1; y'>0 for -5<x<1
y" = -2x-4
y"(-5) > 0, so y is concave up (minimum)

So now you have the steps for these three. Go back and review the section where it covers 1st and2nd derivative tests.