1 Answer

Rowena · Answer 1 · 2021-09-24T06:55:09+0000

Answer:

The first step when rewriting
$y = 6\cdot x^(2)+18\cdot x + 14$ consists in applying distributive property. (Step 2).

Explanation:

We present the procedure, in which
$y = 6\cdot x^(2)+18\cdot x + 14$ is transformed into the form
$y = a\cdot (x-h)^(2) + k$ :

1)
$y = 6\cdot x^(2)+18\cdot x + 14$ Given

2)
$y = 6\cdot \left( x^(2)+3\cdot x + (7)/(3)\right)$ Distributive property/
$(a\cdot c)/(b\cdot c) = (a)/(b)$

3)
$y = 6\cdot \left[x^(2)+3\cdot x + (7)/(3)+\left(-(1)/(12) \right)+(1)/(12) \right]$ Modulative property/Existence of the additive inverse.

4)
$y = 6\cdot \left(x^(2)+3\cdot x+(9)/(4) \right)+6\cdot \left((1)/(12)\right)$ Definition of subtraction/Associative and distributive properties.

5)
$y = 6\cdot \left(x+(3)/(2) \right)^(2)+(1)/(2)$ Perfect square trinomial/
$a \cdot (b)/(c) = (a\cdot b)/(c)$ /Result.

As we can see, the first step when rewriting
$y = 6\cdot x^(2)+18\cdot x + 14$ consists in applying distributive property. (Step 2).

Please log in or register to add a comment.