(1)
where m is the gradient and
is
the–
intercept, or
GCSE Maths Notes: Gradients and Equations of Lines
The general equation of a line may be wriiten as
(1)
where m is the gradient andis
the–
intercept, or
where
is
again the gradient.
We may be asked:
Find the equation of the
line which passes through the two points
and
we have to find the
gradient
We can then use either equation (1)
in which case we have to solve for
by
putting on of the two points in the question into the line. Suppose
we pick the first point,
so
the equation of the line is
(1)
If we are also asked to
express the equation of the line in the form
we
can multiply (1) by 3 to clear the fractions:
then
subtract
from
both sides to give:
To use the equationwe
find the gradient as above then choose one of the points and
substitute it into the equation as
For
example, suppose we choose the first point above:
Then add 5 to both sides to
obtain
We
can also rearrange this into the form
as
above.
We may also have to find the equation of a line from a graph. The method is shown below.
We use the equation
We
can read
the
intercept
off the graph. It is 2. We find the gradient using
The most obvious points to pick for
and
are
where the graph crosses the coordinate axes. These are the points
and
The
gradient is
The
equation of the line is then