Find an use the equation of a line

In coordinate geometry, we are often asked to find the equation of a line. However, as you have learnt, there are lots of rules we can use to find equations. Let's go over them now.

 

Slope-intercept form

To use the slope-intercept rule, we need to be able to find the slope and the $y$y-intercept of a line.

It's written in the form:

$y=mx+b$y=mx+b

where $m$m is the slope and $b$b is the $y$y-intercept

Example

Question 1

Write down the equation of line L1 in slope-intercept form, given that its slope is $-3$−3 and its $y$y-intercept is $-2$−2.

Think: If we consider the slope-intercept form of the line ($y=mx+b$y=mx+b), we can find immediately find the equation if we know the slope and the $y$y-intercept.

Do: Substitute $m=-3$m=−3 and $b=-2$b=−2 into the slope-intercept form.

Solution: The equation of line L1 is $y=-3x-2$y=−3x−2

 

Point-slope formula

If we don't know the $y$y-intercept of the line but we do know a point on the line, we can use the point-slope formula, which is:

$y-y_1=m\left(x-x_1\right)$y−y1​=m(x−x1​)

 

Question 2

 

The two point formula

We can also use two pairs of coordinates to find the equation of a line. All we have to do is substitute the coordinates into the two point formula:

$\frac{y-y_1}{x-x_1}=\frac{y_2-y_1}{x_2-x_1}$y−y1​x−x1​​=y2​−y1​x2​−x1​​

 

Question 3

 

General form

Another way of writing the equation of a straight line is called general form. A straight line is in general form when it is written with all terms on one side of the equation and zero on the other, with integer coefficients. In particular, the coefficient of $x$x should be positive (the sign can be easily changed by multiplying the whole equation by $-1$−1).

That is, a straight line is in general form when it is of the form

$ax+by+c=0$ax+by+c=0

for integers $a$a, $b$b and $c$c with $a>0$a>0.

 

Question 4