Question

Bradley is extending his rectangular living room. The original dimensions are 6 feet by 11 feet. If he extended his room by `x+8` feet, what is the new area? How many square feet of area did he add?

Answer 1

New room is 266 sq. ft for an addition of 200 sq. ft.

Explanation:

We've got a room that is being extended. The old room is 6 feet by 11 feet, which means that the area of the living room was:

`Area=base xx width`

`Area = 11 xx 6=66` square feet

We're extending the room by a factor of `x+8`, which means for each side, we're adding 8 feet. That looks like:

`Area=(11+8)xx(6+8)=19xx14=266` square feet, an addition of 200 square feet.

Answer 2

`(1):"The New Area="2(2x^2+49x+297)"sq.ft."`

`(2):"Addition in Area="2(2x^2+49x+264)"sq.ft."`

Explanation:

The length of the living room is `11'`

After extension of `(x+8)'` on each side,

the new length becomes `11+(x+8)+(x+8)=(2x+27)'`

Similarly, the new width is `(2x+22)'`

Hence, `"The New Area=new length"xx"new width"`

`=(2x+27)(2x+22)`

`=(2x)^2+(27+22)(2x)+(27xx22)`

`=4x^2+98x+594`

`=2(2x^2+49x+297)"sq.ft."`

Prior to the Extension,

the Arrea of the Living Room`=6'xx11'=66"sq.ft"`

Hence, due to Extension,

`"Addition in Area= New Area - Old Area"`

`= (4x^2+98x+594)-(66)`

`=4x^2+98x+528`

`=2(2x^2+49x+264)"sq.ft."`