The curve C has equation y = \frac{1}{2}x^3 - 9x^2 + \frac{8}{x} + 30, \quad x > 0 (a) Find \frac{dy}{dx} - Edexcel - A-Level Maths Pure - Question 5 - 2011 - Paper 2

To verify that the point P(4, -8) lies on C, we substitute (x = 4) into the equation:

(y = \frac{1}{2}(4)^3 - 9(4)^2 + \frac{8}{4} + 30)

Calculating this:

1. (\frac{1}{2}(64) = 32)
2. (-9(16) = -144)
3. (\frac{8}{4} = 2)
4. Then add: (32 - 144 + 2 + 30 = -80)

Since the calculated y-value (-80) does not equal -8, point P(4, -8) does not lie on curve C.

First, substitute (x = 4) into the derivative to find the gradient at P:

1. Calculate (\frac{dy}{dx}) at (x = 4): (\frac{dy}{dx} = \frac{3}{2}(4)^2 - 18(4) - \frac{8}{(4)^2}) (= \frac{3}{2}(16) - 72 - \frac{8}{16}) (= 24 - 72 - 0.5 = -48.5)

The gradient of the normal is the negative reciprocal: (m_{normal} = -\frac{1}{-48.5} = \frac{1}{48.5})

Using point-slope form of the line equation: (y - y_1 = m(x - x_1))

Substituting P(4, -8): (y - (-8) = \frac{1}{48.5}(x - 4)) (y + 8 = \frac{1}{48.5}(x - 4)) Multiplying through by 48.5: (48.5y + 388 = x - 4) Rearranging: (x - 48.5y - 392 = 0) Thus: (1x - 48.5y - 392 = 0).

To convert to integer coefficients, multiply through by 2: (2x - 97y - 784 = 0).