Question

What is the slope of the line normal to the tangent line of `f(x) = x^2-3sqrtx` at `x= 3`?

Answer 1

`"Slope of Normal"=-(24+2*sqrt(3))/(141)`

Explanation:

Rewrite the square root: `sqrt(x)=x^(1/2)`

Apply the power rule twice to find the first derivative of `f(x)`.

`f'(x)=2x-3*1/2*x^(-1/2)`
`f'(x)=2x-3/(2sqrt(x))`

Evaluating `f'(x)` at `x=3` gives the slope of the tangent

`f'(3)=2*3-3/(2sqrt(3))=1/2*(12-sqrt(3))`

The gradient product of two slant lines perpendicular to each other should equal to `-1`, that is: they form a pair of negative reciprocals.

Hence, the slope of the normal would equal to the opposite of the slope of the tangent inversed

`"Slope of Normal"=-1/("Slope of Tangent")`

`" "color(white)(l)=-1/(1/2*(12-sqrt(3)))`

Simplifying

`-1/(1/2*(12-sqrt(3)))`
`=2*1/(sqrt(3)-12)*color(grey)((sqrt(3)+12)/(sqrt(3)+12))`
`=-(24+2*sqrt(3))/(141)`