4. A rectangular garden is to be surrounded by 4 sides of a brick wall costing \( \$ 20 / \mathrm{ft}, \$ 10 / \mathrm{ft}, \$ 9 / \mathrm{ft} \), and \( \$ 8 / \mathrm{ft} \) for the sides. The \( \$ 20 \) side must be next to the \( \$ 10 \) side. Find the maximum area when you only have a budget of \( \$ 5200 \). [8] (2dp)

To maximize the area of the rectangular garden while adhering to your budget of \$5200 for the brick walls, let's break it down. You have a cost breakdown of the walls: the length side at \$20/ft adjacent to the shorter side at \$10/ft, with two other sides costing \$9/ft and \$8/ft. Setting up the equations: Denote the sides of the rectangular garden as \( x \) (longer side, \$20 and \$10) and \( y \) (shorter side, \$9 and \$8). The total cost can be represented as: \[ 20x + 10x + 9y + 8y = 30x + 17y \] To stay within your budget: \[ 30x + 17y = 5200 \] From here, you can express one variable in terms of the other: \[ y = \frac{5200 - 30x}{17} \] The area \( A \) of the rectangle is given by \( A = x \times y \), which can be substituted to find: \[ A = x \cdot \left(\frac{5200 - 30x}{17}\right) \] This quadratic area function can be maximized using calculus or by solving for the vertex of the parabola defined by its standard form. Plugging in appropriate values will yield the dimensions that maximize the area within the constraints provided. Alternatively, conducting a quick check of the boundary values against the budget will help ensure you are maximizing the area appropriately. Happy gardening!