Question

Point A is at `(4 ,-2 )` and point B is at `(1 ,-3 )`. Point A is rotated `pi/2` clockwise about the origin. What are the new coordinates of point A and by how much has the distance between points A and B changed?

Answer 1

The new point `A(-2, -4)`
and No change in distance. Same distance`=sqrt10`

Explanation:

the equation passing thru the origin (0, 0) and point A(4, -2) is

`y=-1/2 x`

and distance from (0, 0) to A(4, -2) is `=2sqrt5`

the equation passing thru the origin (0, 0) and perpendicular to line `y=-1/2 x` is

`y=2x" " "`first equation

We are looking for a new point `A(x_1, y_1)` on the line `y=2x` at the 3rd quadrant and `2sqrt5` away from the origin (0, 0).

Use distance formula for "distance from line to a point not on the line"

`d=(ax_1+by_1+c)/(+-sqrt(a^2+b^2)`

Use equation, `y=-1/2x` which is also `x+2y=0`

`a=1` and `b=2` and `c=0`

`d=2sqrt5=(x_1+2y_1)/(+-sqrt(1^2+2^2))`

`2sqrt5=(x_1+2y_1)/(-sqrt(5))" " "`choose negative because,
`(x_1, y_1)` is below the line.

`-2sqrt5*sqrt5=x_1+2y_1`

`-10=x_1+2y_1" " "`second equation

`y_1=2x_1" " "`first equation

Using first and second equation. Solve for `(x_1, y_1)`

and `x_1=-2` and `y_1=-4`