find the polynomial for the perimeter and for the area
A+2
A
To find the polynomial for the perimeter, you need to consider the formula for the perimeter of a shape.
The perimeter of a shape is the sum of all its sides. In the given expression, A+2, A represents the length of one side of the shape, and 2 represents the length of one of the other sides. Since there are only two sides mentioned in the expression, it's likely that we are dealing with a rectangle or a square.
A rectangle has two equal pairs of sides, while a square has all sides equal. Let's assume that A represents the length of one side of a rectangle or a square.
Therefore, the polynomial for the perimeter would be: P = A + 2 + A + 2 = 2A + 4
Now, let's move on to finding the polynomial for the area.
The area of a rectangle or a square is given by multiplying the length and the width. Since A represents the length of one side, we can write the polynomial for the area as:
A = A * 2
Simplifying this expression, we get:
A = 2A
So, the polynomial for the area is: A = 2A