Area of a square find a polynominal A(X) that represents the area of the shaded region u have a square with an arrow pointing left and right at top of the square with x @ the top and a arrow up and down on the right side of the square.The #3 on the right and left of the square and the #3 at the top and bottom of the square.
We do not have access to your figure to help.
To find a polynomial A(X) that represents the area of the shaded region in the given square, we need to break down the problem step by step.
Step 1: Understand the given information.
- The square has sides of length 3 units.
- There is an arrow pointing left and right at the top of the square, with 'x' written above it.
- There is an arrow pointing up and down on the right side of the square, with the number '3' written next to it.
Step 2: Determine the dimensions of the shaded region.
Based on the given information, the shaded region is a rectangle formed by extending the height and width of the square, as indicated by the arrows.
Step 3: Expression for the width and height of the rectangle.
- The width of the rectangle is the length of the side of the square, which is 3 units.
- The height of the rectangle can be represented by using 'x' units, as indicated by the arrow above the square.
Step 4: Calculate the area of the shaded region.
The area of a rectangle is given by the formula 'Area = Width × Height'. In this case, the area of the shaded region can be represented as A(x) = 3x.
Therefore, the polynomial A(X) = 3x represents the area of the shaded region in the given square.