Final answer:
The area of a square with side lengths represented by the function G(x) = -2x + 5 is found by squaring the function, resulting in A = (-2x + 5)^2.
Step-by-step explanation:
To find the area of a square when the side lengths are given by the function G(x) = -2x + 5, you need to plug in a value for x that makes sense in the context of the problem. However, since no value for x is provided, we'll find the area in terms of x by squaring the function G(x). So, the area A of the square is A = [G(x)]^2 = (-2x + 5)^2.
The detailed steps to find the area are:
- Identify the function representing the side length of the square, which is G(x) = -2x + 5.
- Since the area of a square is the side length squared, square the function: A = (-2x + 5)^2.
- Thus, the area in terms of x is A which is the side length function squared.