Write this equation in vertex form. y = x^2 -12x +20

Question

asked Feb 2, 2020 141k views

2 Answers

Joish · Answer 1 · 2020-02-05T04:38:55+0000

Answer:

y = (x-6)²-16

Explanation:

We have given a quadratic equation.

y = x²-12x+20

We have to rewrite above equation in vertex form.

y = a(x-h)²+k is vertex form of quadratic equation.

Adding and subtracting (-6)² to both sides of above equation, we have

y = x²-12x+20+(-6)²-(-6)²

y = x²-12x+(-6)²+20-(-6)²

y = (x-6)²+20-36

y = (x-6)²-16

The vertex form is y = (x-6)²-16 where (6,16) is vertex for equation of parabola.

Dave Neeley · Answer 2 · 2020-02-06T18:48:21+0000

Answer:

y = (x-6) ^ 2 -16

Explanation:

The vertex form for a quadratic equation has the following form:

y = (x-h) ^ 2 + k

Where the vertice of the equation is the point (h, k)

To transform the equation
y = x ^ 2 -12x +20 in its vertex forms we must find its vertex.

Be a quadratic equation of the form:

ax ^ 2 + bx + c

Where a, b and c are real numbers, then the vertex of the equation will be:

x = - (b)/(2a)

For the given equation:

$b = -12\\a = 1$

Therefore the vertice is:

$x = - (-12)/(2(1))\\\\x = 6$

Now we substitute x = 6 into the equation and find the value of k.

$y = (6) ^ 2 -12 (6) +20\\\\y = -16 = k$

Therefore the vertice is: (6, -16)

And the equation is:

y = (x-6) ^ 2 -16