Which polynomial expression represents the area of the outer most square tile, shown below?

Question

asked Mar 7, 2020 51.5k views

2 Answers

Marlon Dias · Answer 1 · 2020-03-09T02:50:16+0000

The answer is:

The last option,

The area of square is given by the following formula:

Area=l*l=l^(2)

Where, l is the side of the square, remember that a square has equal sides.

To solve the problem, we must remember the following notable product:

(a-b)^(2)=a^(2)-2ab+b^(2)

So, if the side of the given circle is (x-3), the area will be:

Area=l^(2)=(x-3)^(2)

Applying the notable product, we have:

$Area=(x-3)^(2)=x^(2) -(2)*(x)(3)+(-3)^(2)\\\\Area=x^(2) -(2)*(x)(3)+(-3)^(2)=x^(2)-6x+9$

So, the correct option is the last option:

x^(2)-6x+9

Have a nice day!

Scott Koland · Answer 2 · 2020-03-11T12:46:23+0000

ANSWER

${x}^(2) - 6x + 9$

Step-by-step explanation

The outermost square tile has side length,

l = x - 3

The area of a square is given by;

$Area= {l}^(2)$

We substitite the given expression for the side length into the formula to obtain,

$Area= {(x - 3)}^(2)$

Area= {(x - 3)}(x - 3)

We expand using the distributive property to obtain;

Area=x {(x - 3)} - 3(x - 3)

This gives us:

$Area= {x}^(2) - 3x - 3x + 9$

$Area= {x}^(2) - 6x + 9$

The last choice is correct.