What is the equation of the line normal to $f(x)=x/(x-2)$ at $x=1$ ?

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Answer 1 · 2017-03-03T12:15:16

Equation of normal is $x-2y-3=0$

The line normal to $f(x)$ at $x=x_0$ is perpendicular to the tangent at the point $(x_0,f(x_0))$ .

As slope of the tangent at $x=x_0$ is $f'(x_0)$ , the slope of normal is $-1/(f'(x_0))$ and equation of normal is $y-f(x_0)=-1/(f'(x_0))(x-x_0)$ .

Here we are seeking normal at $x=1$ and as $f(x)=x/(x-2)$ , at this point $f(1)=1/(1-2)=-1$ .

For slope let us work out derivative of $f(x)=x/(x-2)=1+2/(x-2)$

and $f'(x)=-2/(x-2)^2$ and slope of tangent at $x=1$ is $f'(1)=-2/(1-2)^2=-2$

The slope of normal is then $-1/-2=1/2$

and equation of tangent is $y-(-1)=-2(x-1)$ or $2x+y-1=0$ and that of

normal is $y-(-1)=1/2(x-1)$ or $2y+2=x-1$ or $x-2y-3=0$
graph{(x-2y-3)(xy-x-2y)(2x+y-1)=0 [-10, 10, -5, 5]}

What is the equation of the line normal to f(x)=x/(x-2) f(x)=x/(x-2) at x=1 x=1?