Hi! Can someone help me out with my project involving quadratic functions?

Field You've been given $500.00 for your fencing. So first we are going to make as big of a rectangular field as we can with the money that we have for the fencing to surround it. The cost of premium fencing (only the best for your farm, of course) is $11.41 per metre. So with that, and the following equations, A=1*W P=21+2w where A is the area, P is the perimeter, I is the length, and w is the width of a rectangle, we can find the maximum area that we can have for this field. You should encounter a quadratic function, so using a graphing calculator, or an online graphing website, will help you see what that looks like. You can then use methods you learn in the chapter to find the maximum of this function. Use the following space for all your work: Perimeter of Fence =\fAtroduction Quadratic functions and strategies for solving them are pretty useful for plenty of things. One such example is minimizing or maximizing certain values. What does this mean exactly? Well let's describe what we mean by maximizing profits. A company's profit is dependent on what a product's price is. The number of products sold multiplied by the product's price is equal to the amount of money a company will make after the costs of production. We can maximize, or make this value as large as possible, by pricing the object properly. Next we can discuss what it means to minimize values by the concept of minimizing costs. When calculating the resources required for architectural purposes we typically have a certain cost per unit of length of whatever we are working with (wood, steel, etc.). Let's say we have a certain area that we wanted to surround with a certain resource, for example walls or a fence. We can minimize the amount of the resources required by simply minimizing the perimeter of this area. If the perimeter is smaller then it's clear to see that the amount of wood or steel used to make that perimeter will be smaller as well. Overall this is reducing costs while keeping the area of what we are surrounding constant. How helpful. as profits for this farm. In this project you will be in charge of your own farm. And you will be maximizing areas as well You have just been given a large plot of land through an inheritance and also a certain amount of money to building your own fencing and grow your own crops. First, you gotta build your fields