Question

A line segment with endpoints at `(1 , -2 )` and `(1, 8 )` is rotated clockwise by `(3 pi)/2`. What are the new endpoints of the line segment?

Answer 1

The new end points are
#(-4,3) and (6,3)#

Explanation:

The line joining `(1,-2) and (1,8)`
forms a line parallel to y axis since x is same (1) for both the points

Let the line rotate with the line between the points as diameter.
The centre will be the mid point of the two points

`=(1, (-2+8)/2)`
`=-1,3`

When the line rotates clockwise by`(3pi)/2`, about its mid point `(-1,3)` the y coordinate remains same as the centre.

Radius of rotation being distance from centre to its end point
from `(-1,3)` to `(1,8)` which is `8-3=5`

x coordinate of `(1,-2)` is reduced by `5, thus1 - 5 = -4`
x coordinate of `(1,8)` is increased by `5, thus 1 + 5 = 6`

Now, #(1,-2) has# `become (-4,3)`

Also, #(1,8) has# # become (6,3) #

Thus, the new end points are
#(-4,3) and (6,3)#