Question

How do you find the distance from A (-2,-2) to the line joining B(5,2) and c(-1,4)?

Answer 1

`d=19/sqrt(10)=(19sqrt(10))/10`

Explanation:

The equation of the line BC is obtained by the following formula:

`(y-y_1)/(y_2-y_1)=(x-x_1)/(x_2-x_1)`

where you state `B=(x_1;y_1),C=(x_2;y_2)`

Then

`(y-2)/(4-2)=(x-5)/(-1-5)`

`(y-2)/2=(5-x)/6`

`3y-6=5-x`

`color(red)((1))` `x+3y-11=0`

in the form

`ax+by+c=0`

Then you can find the requested distance by the following formula:

`d=(|ax_0+by_0+c|)/sqrt(a^2+b^2)`

where `A(x_0;y_0)=(-2;-2)` is the given point and

`a=1;b=3;c=-11` the features of the line BC `color(red)((1))`

Then the requested distance is:

`d=|1*(-2)+3*(-2)-11|/sqrt(1^2+3^2)`

`d=|-2-6-11|/sqrt(10)`

`d=19/sqrt(10)=(19sqrt(10))/10`