Question

How do you write the equation of the line that contains (-2, 5) and (4, 5)?

Answer 1

`y=5`

Explanation:

First, find the slope of the line using this formula:

`m=(y_2-y_1)/(x_2-x_1)`

Where `m` is the slope and

`(-2,5) => (x_1,y_1)`

`(4,5) => (x_2,y_2)`

`m=(5-5)/(4+2)=0/6=0`

Because the slope of this line is `0`, that means that the line is going to be a horizontal line.

Now, to find the equation of the line, use point slope form:

`y-y_1=m(x-x_1)`

Choose a set of points to plug into `x_1` and `y_1`

The equation should be the same regardless of the points you choose

Using `(-2,5)` and slope of `0`:

`y-5=0(x+2)`

Distribute `0` throughout the set of parenthesis

`y-5=0x+0`

Perform the opposite operation to isolate y by adding `5` on both sides of the equation

`y=0x+5 or y=5`