The curve y = 2x³ + ax + bx + 7 has a stationary point at the point (2, -13). a) Find the value of a and the value of b.b) Find the coordinates of the second stationary point on the curve. C)Determine the nature of the two stationary points.
d) Find the coordinates of the point on the curve where the gradient is minimum and state the value of the minimum gradient.
*If possible pls send it together with the working way, thank you so much

Question

chongkeagan · Accepted Answer

Jawab:y = 2x³+ax²+bx+7 ⇒ substitute with (2, -13)-13 = 2(2)³+a(2)²+b(2)+7 (I assume it's supposed ax², not ax)-13 = 16+4a+2b+74a+2b=-36b = -18-2a ⇒ [1]a.stationary point ⇒ gradient = 0 (y' = 0)y = 2x³+ax²+bx+7y' = 6x² + 2ax +b0 = 6x² + 2ax +b ⇒ x = 20 = 6(2)² + 2a(2) +b ⇒ substitute with [1]0 = 24 + 4a + (-18-2a)2a = -6a = -3b = -18-2a = -18-2(-3) = -12b.y' = 6x² + 2ax +b0 = 6x² + 2(-3)x +(-12)0 = 6x² - 6x -120 = x² - x - 2(x-2)(x+1) = 0x₁ = 2x₂ = -1y = 2x³-3x²-12x+7y(-1) = 2(-1)³-3(-1)²-12(-1)+7        = 14coordinate (-1, 14)c. (-1, 14) maximum point    (2, -13) minimum pointd. y' = gradientgradient min = y' min                      = 6x² - 6x -12 min ⇒ y'' = 0y'' = 12x - 60 = 12x - 6x = 1/2y(1/2) = 2(1/2)³-3(1/2)²-12(1/2)+7          = 1/2coordinate ([tex]rac{1}{2}[/tex] , [tex]rac{1}{2}[/tex])

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