Answer:
[tex]y=2x^2-3x+1[/tex]
Step-by-step explanation:
The equation of a parabola can generally be expressed in the following form:
[tex]y=ax^2 + bx+c[/tex] (0)
where
a, b and c are the coefficients of the second, first and zero-degree terms.
Here we know that the parabola must pass through the following points:
Point 1: (0,1)
Point 2: (-1,6)
Point 3: (2,3)
This means that we can substitute the values of x and y into eq.(0), and we get 3 equations in 3 unknown variables, a, b and c.
Using point 1:
[tex]1=a\cdot (0)^2+b\cdot (0)+c\\\rightarrow c=1[/tex] (1)
Using point 2:
[tex]6=a\cdot (-1)^2 + b\cdot (-1) +c\\\rightarrow 6=a-b+c[/tex] (2)
Using point 3:
[tex]3=a\cdot (2)^2 + b\cdot (2)+c\\\rightarrow 3=4a+2b+c[/tex] (3)
Substituting eq(1) into (2) we get:
[tex]6=a-b+1\\b=a-5[/tex]
And substituting into eq(3) we find a:
[tex]3=4a +2(a-5)+1\\3=4a+2a-10+1\\12=6a\\a=2[/tex]
And then we solve also for b:
[tex]b=a-5=2-5=-3[/tex]
So the equation of the parabola is
[tex]y=2x^2-3x+1[/tex]
