URGENT I HAVE ALMOST 0 TIME LEFT I NEED LAST MINUTE HELP A parabola has zeros of 7 and 1 and passes through the point (3,4). Determine the equation of the parabola.

Question

asked Aug 23, 2023 6.1k views

2 Answers

Konstantin Pribluda · Answer 1 · 2023-08-24T22:48:52+0000

Spot the quadratic equation:-

Find a through (3,4)

Equation:-

Wim Ombelets · Answer 2 · 2023-08-27T06:14:10+0000

Answer:

The zeros are the points where the parabola intercepts the x-axis.

$\sf x = 7 \implies x - 7 = 0$

$\sf x = 1 \implies x - 1 = 0$

$\sf \implies y = a(x - 7)(x - 1)$ where a is some constant

If the parabola passes through point (3, 4) then:

$\sf \implies a(3 - 7)(3 - 1) = 4$

$\sf \implies a(-4)(2) = 4$

$\sf \implies -8a = 4$

$\sf \implies a = -\frac12$

So the equation of the parabola is:

$\sf y = -\frac12(x - 7)(x - 1)$

Or in standard form:

$\sf y = -\frac12x^2+4x-\frac72$