Using the vertex form, find a formula for the parabola with vertex (2,14) that passes through the point (1,7)?
7=a(1-2)^2+14
so I got a to be -7
so the answer should be y=-7(x-2)^2+14 but my online math hw says I'm not correct?
7=a(1-2)^2+14
so I got a to be -7
so the answer should be y=-7(x-2)^2+14 but my online math hw says I'm not correct?
2 Answers
Explanation:
There can be two parabolas with vertex at
One of the form
Case 1 - If
and equation is
Case 2 - If
and equation is
graph{(y+7x^2-28x+14)(49x+y^2-28y+98)((x-1)^2+(y-7)^2-0.05)((x-2)^2+(y-14)^2-0.05)=0 [-10.21, 9.79, 4.52, 14.52]}
y=-7(x-2)^2+14
x=-1/49(y-14)^2+2
Explanation:
Given -
Vertex
Passes through point
This parabola may be either open down or open to left.
The equation of the parabola that opens down.
y=a(x-h)+k
Where
y=a(x-2)^2+14
The parabola is passing through point
Substitute this to find the value of
a(1-2)^2+14=7
a+14 = 7
a=7-14=-7
Then the required equation is -
y=-7(x-2)^2+14
Parabola May open to left. Then the equation is -
x=a(y-k)^2+h
x=a(y-14)^2+2
a(y-14)^2+2=x
a(7-14)^2+2=1
49a+2=1
49a=1-2=-1
a=-1/49
Then the equation is -
x=-1/49(x-14)^2+2