How do you write the function in standard form y=2(x-1)(x-6)?

1 Answer
Solace M.
May 24, 2018

y=2x^2-14x+12

Explanation:

Standard form of a quadratic takes the shape ax^2+bx+c=0. This usually comes about from an expansion of the expression (alphax+beta)(gammax+delta), using the distributive property such that (a+b)(c+d)=ac+ad+bc+bd.

Using these rules, we now expand the expression
y=(2)(x-1)(x-6) by first multiplying the first two brackets, to get
y=( 2*x + 2*-1)(x-6) = (2x-2)(x-6). Next we expand the last two brackets, to get
y=2x*x+2x*(-6)+(-2)* x+(-2)*(-6) = 2x^2-12x-2x+12
Lastly we simplify by grouping like terms, to get
y=2x^2-14x+12, the answer.

I hope that helped!

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