Question

Baljit builds a square frame that is 1 inch wider than the width of a square frame from the store. He writes the area enclosed by his frame with the polynomial `4x^2+4x+1`.?

a. Factor the polynomial that Baljit wrote. Explain how the factorization yields an expression for the width of the frame Baljit builds.
B. What is a variable expression for the area enclosed by the frame from the store. Explain how you know.

Answer 1

See the answers below

Explanation:

The given polynomial can be factorized as follows

A)

`4x^2+4x+1`

`=4x^2+2x+2x+1`

`=2x(2x+1)+(2x+1)`

`=(2x+1)(2x+1)`

`=(2x+1)^2`

The area of square frame built by Baljit is `(2x+1)^2=\text{(side)}^2`

Hence, the width or side of square frame is `2x+1`

B) Since square frame built by Baljit is `1` inch wider than the square frame from store

hence the side of square frame from store will be `2x+1-1=2x`

Now, the area enclosed by the square frame from store

`\text{(side)}^2`

`=(2x)^2`

`=4x^2`