We will investigate how to construct an equation of a parabola given three points.
A parabola is described as a polynomial relationship of highest order 2. The general equation of a parabola is given as follows:
Where,
To determine the values of these constants we will utilize a set of pair off coordinates given as follows:
The process off evaluating the three constants ( a,b, and c ) is to plug in the respective coordinates in the general form of a parabolic function. Then develop a system of equations which can be solved simultaneously.
Using the pair ( 0 , 7 ). We will plug in the respective coordinates in the general form and evaluate:
Taking the pairs ( -1 , 14 ) and ( 1 , 6 ). We get a pair of equations as follows:
Now once we have developed a system of linear equations. We will solve them simultaneously by elimination:
Now use back substitution to plug in the value of constant ( a = 3 ) into either of the equations ( Eq1 or Eq2) as follows:
We have the values of the three constants:
The equation of the parabola turns out to be: