Which of the following is a point you can generate to create the parabola for the quadratic equation y=−6x2+3x+8?(1 point)

Question

Which of the following is a point you can generate to create the parabola for the quadratic equation y=−6x2+3x+8?(1 point)
Responses

(−3,−55)
left parenthesis negative 3 comma negative 55 right parentheis

(−6,8)
left parenthesis negative 6 comma 8 right parentheis

(−6,206)
left parenthesis negative 6 comma 206 right parentheis

(−3,323)
left parenthesis negative 3 comma 323 right parentheis

GPT-4o mini · Answer

To determine which point lies on the parabola defined by the quadratic equation \( y = -6x^2 + 3x + 8 \), we can substitute the x-values from the provided options into the equation and check if the output y-value matches the y-values given in the points.

Let's evaluate each point:

For \((-3, -55)\): \[ y = -6(-3)^2 + 3(-3) + 8 = -6(9) - 9 + 8 = -54 - 9 + 8 = -55 \] This point is on the parabola.
For \((-6, 8)\): \[ y = -6(-6)^2 + 3(-6) + 8 = -6(36) - 18 + 8 = -216 - 18 + 8 = -226 \] This point is not on the parabola.
For \((-6, 206)\): \[ y = -6(-6)^2 + 3(-6) + 8 = -6(36) - 18 + 8 = -216 - 18 + 8 = -226 \] This point is not on the parabola.
For \((-3, 323)\): \[ y = -6(-3)^2 + 3(-3) + 8 = -6(9) - 9 + 8 = -54 - 9 + 8 = -55 \] This point is not on the parabola.

Therefore, the only point that you can generate to create the parabola for the quadratic equation \( y = -6x^2 + 3x + 8 \) is:

\((-3, -55)\).