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Stationary point

Sameer Ninawe

17/03/2017 1 0

Find the stationary point for the curve y = x³ – 3x² + 3x – 3, and its type.

y = x³ – 3x² + 3x – 3

dy/dx = 3x² – 6x + 3

= 3(x² – 2x + 1)

= 3(x – 1)²

dy/dx = 3(x – 1)² = 0

doubleright x = 1

When x = 1, y = 1³ – 3×1² + 3×1 – 3

= 1 – 3 + 3 – 3 = -2

(1, -2) is a stationary point.

To determine it type, check dy/dx or y’ around x = 1.

x	0 (LHS)	1	2 (RHS)
	3(-1)² = 3 >0	0	3(1)² = 3 >0
Curve	Increasing	Stationary	Increasing

Since the curve is increasing on both sides of (1, -2), the curve is monotonic increasing.
And (1, -2) is a point of horizontal inflection.

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Stationary point

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