What is the equation of the line normal to f(x)=(x-4)(x-2)+2x^2-3x+4f(x)=(x4)(x2)+2x23x+4 at x=0x=0?

1 Answer
Lotusbluete
Dec 3, 2015

y = 1/9x + 12y=19x+12

Explanation:

Let's simplify the function first.

f(x) = (x-4)(x-2) + 2x^2 - 3x + 4f(x)=(x4)(x2)+2x23x+4

color(white)(xxx) = x^2 - 6x + 8 + 2x^2 - 3x + 4×x=x26x+8+2x23x+4

color(white)(xxx) = 3 x^2 - 9x + 12×x=3x29x+12

As next, to find the slope of the tangent and normal line, we need to compute the derivative of the function:

f'(x) = 6x - 9

Evaluating the derivative at x=0 gives you the slope of the tangent at x = 0:

m_t = f'(0) = -9

The slope of the normal line at x = 0 can be computed as

m_n = - 1 / m_t = 1/9

Now, we have the slope of the normal line and we have the x value of a point on this line: x = 0. Let's find the according y value by evaluating f(0):

f(0) = 3 * 0 - 9 * 0 + 12 = 12

The normal line can be described via the line equation

y = m_n * x + n

Plug the values m_n = 1/9, x = 0 and y = 12 to find n:

12 = 1/9 * 0 + n

=> n = 12

So, the equation of the normal line is

y = 1/9x + 12

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