Finding the Equation of a Quadratic With Given Roots
If a quadratic equation has roots
and
then
and
are factors, so
is also a factor. This completely defines the quadratic apart from a constant factor. If
is this factor then the quadratic factorises as
If the quadratic has the single rootthe it must factorise as
We can findif we have the coordinates of some point on the curve.
Example: A quadratic equation has roots 1, 3 and passes through the point
Find the equation of the curve.
Because the roots are 1 and 3, the equation of the curve must be of the form
Since
lies on the curve, we must have
The equation of the quadratic is
Example: A quadratic equation has the single root 2 and passes through the point
Find the equation of the curve.
Because the root is 2 the equation of the curve must be of the form
Since
lies on the curve, we must have
The equation of the quadratic is
Example: A quadratic equation has the roots
and
and passes through the point
Find the equation of the curve.
Because the roots areand
the equation of the curve must be of the form
on expanding tge brackets. Sincelies on the curve, we must have
The equation of the quadratic is