Meadows and Malls Reflection
By Payton J Vaughn
The Meadows and Malls unit was about an area that would have to be split up between a few different groups, such as the marines, mining, shops, and forest. (or something along those lines)
In the beginning, we were given a few letter algorithms that we had to solve like: -3x + 21y = 38 and x - 8 = 64. We solved those, but then were given equations like x + y + z = 200 and 7x + 127y +6 28z = 4500. With the unit problem, there were six different variables we had to solve for (impossible without matrices). Matrices is a grid-like where you enter information and are able to do common math on that one matrices like it is a simple letter [x]. A matrices can be an infinite amount of numbers like a 2x3 and a 3x2 (those can be multiplied because of their first and last two numbers [3]. A matrices can be a 50x1000000000 and a 1000000000x2 and that would work multiplication wise. With our problem, we got a 6x6 and a 6x1.
The Meadows and Malls unit was about an area that would have to be split up between a few different groups, such as the marines, mining, shops, and forest. (or something along those lines)
In the beginning, we were given a few letter algorithms that we had to solve like: -3x + 21y = 38 and x - 8 = 64. We solved those, but then were given equations like x + y + z = 200 and 7x + 127y +6 28z = 4500. With the unit problem, there were six different variables we had to solve for (impossible without matrices). Matrices is a grid-like where you enter information and are able to do common math on that one matrices like it is a simple letter [x]. A matrices can be an infinite amount of numbers like a 2x3 and a 3x2 (those can be multiplied because of their first and last two numbers [3]. A matrices can be a 50x1000000000 and a 1000000000x2 and that would work multiplication wise. With our problem, we got a 6x6 and a 6x1.