How do you find the product of $(8x + 7)(x + 2)$ ?

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How do you find the product of $(8x + 7)(x + 2)$ ?

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Answer 1 · 2017-09-15T15:34:20

$8x^2+23x+14$

Explanation:

$(8x+7)(x+2)$
First, we will distribute parentheses/brackets
from $(8x+7)(x+2)$ to
$8x*x+8x*2+7*x+7*2$
Example:
$(w+x)(y+z)=wy+wz+xy+xz$
In this case, $w$ would be $8x$ , $x$ would be $7$ , $y$ would be $x$ and $z$ would be $2$ .

$8x*x+8x*2+7*x+7*2$ is the same as
$8x x+8x*2+7x+7*2$
Now we will do:
$8x^2+8x*2+7x+7*2$
Why did $8x x$ change to $8x^2$ ?
It's because of this:
$aa = a^(1+1)=a^2$

So, now you have $8x^2+8x*2+7x+7*2$
You want to solve bit by bit. First we'll start with $8x*2$ . $8*2=16$ So we can replace $8x*2$ with $16x$ .
$8x^2+16x+7x+7*2$
$16x+7x=23x$
$8x^2+23x+7*2$
$7*2=14$

$8x^2+23x+14$
That's your answer! ^

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How do you find the product of $(8x + 7)(x + 2)$ ?

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