Question 829382
<pre>
y = {{{x*sqrt(1-2x)}}} at the point (-4,-12)

The derivative is the slope of the tangent line.
The slope of the normal is the negative reciprocal of
the slope of the tangent line.

So.
1. We find the derivative.
2. We substitute x=-4 and simplify
3. We take the negative reciprocal of the result of 2
4. We use the point-slope formula with this slope and the given point.

{{{y}}}{{{""=""}}}{{{x*sqrt(1-2x)}}}

{{{matrix(2,1,"",y)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",x*(1-2x)^(1/2))}}} 


{{{matrix(2,1,"",dy/dx)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",x*(1/2)(1-2x)^(-1/2)(-2))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",(1-2x)^(1/2)(1))}}} 


{{{matrix(2,1,"",dy/dx)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",-x(1-2x)^(-1/2))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",(1-2x)^(1/2))}}} 

We substitute x=-4

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",-(-4)(1-2(-4))^(-1/2))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",(1-2(-4))^(1/2))}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",4(1+8)^(-1/2))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",(1+8)^(1/2))}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",4(9)^(-1/2))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",(9)^(1/2))}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",4(9)^(-1/2))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",(9)^(1/2))}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",4/sqrt(9))}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",sqrt(9))}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",4/3)}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",3)}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",4/3)}}}{{{matrix(2,1,"",""+"")}}}{{{matrix(2,1,"",9/3)}}}

{{{matrix(2,2,"","",dy/dx,at_x=-4)}}}{{{matrix(2,1,"",""="")}}}{{{matrix(2,1,"",13/3)}}}

The slope of the tangent line is {{{13/3}}}, so the slope of the
normal is {{{-3/13}}}

So we want the equation of the line through (-4,-12) with slope {{{-3/13}}}

y - y<sub>1</sub> = m(x - x<sub>1</sub>)
where (x<sub>1</sub>,y<sub>1</sub>) = (-4,-12)

{{{y - (-12)}}}{{{""=""}}}{{{expr(-3/13)(x-(-4))}}}

{{{y +12)}}}{{{""=""}}}{{{expr(-3/13)(x+4)}}}

Multiply through by 13

13y+156 = -3(x+4)

13y+156 = -3x-12
 
 3x+13y = -168

Here's the graph, it looks like a normal (perpendicular) line.
So it must be correct.

{{{drawing(3600/17,400,-6,3,-14,3,

graph(3600/17,400,-6,3,-14,3,x*sqrt(1-2x)),line(-17,-9,22,-18))}}} 

Edwin</pre>