Which of the following linear systems matches with the linear system i..
Which of the following linear systems matches with the linear system in the graph? => 3 y = -2, y = 1 or 3 y = 2 x , y = - x - 1 or 3 y = 2 x , y = x - 1 or None of the above..
Which of the following is the graph of a linear system of constraints..
Which of the following is the graph of a linear system of constraints? => The linear graph or The linear region or The feasible region or The constraint region..
Solving Algebraic systems of equations through graphing.
Solving Systems of Linear Equations by Graphing
Question : One approach for finding the solution for a system of linear equations is to graph two lines on the same coordinate system and the coordinates of the point where the lines intersect is the solution for the system, this approach is called. What? choices
graphical method
coordinate system method
intersection method
Answer : coordinate.. More from Yahoo Answers
Answer : coordinate.. More from Yahoo Answers
Question : I really need help put it in middle school way plz
Answer : I see the time is almost up, so I will try to give you a quick pointer or two. I am sorry that this is just the quick-and-dirty, but I'm a soft-hearted teacher, and I can t stand just to see you go without any help, at all! Say you have a problem, 2x + 5y = 23, 3x - 2y = 6. You want to find the value of x and of y that makes both of these equations true. You may know some other methods, including, even trial and error. But I want to show you the graphic method for solving this problem. And you will see that it works! You start by drawing a line for 2x + 5y = 23. It passes through all the points where that statement is true. You can make a table, if you want, to find some points where that is the case. Now, you draw another line to show the points where 3x 2y = 6. You can make a table, also, to find some points where that is true. When x is zero, it is clear that 2y = 6 in other words, y = -3. So, put a dot at x=0, y = -3. When y = 0, then x=6, according to th.... More from Yahoo Answers
Answer : I see the time is almost up, so I will try to give you a quick pointer or two. I am sorry that this is just the quick-and-dirty, but I'm a soft-hearted teacher, and I can t stand just to see you go without any help, at all! Say you have a problem, 2x + 5y = 23, 3x - 2y = 6. You want to find the value of x and of y that makes both of these equations true. You may know some other methods, including, even trial and error. But I want to show you the graphic method for solving this problem. And you will see that it works! You start by drawing a line for 2x + 5y = 23. It passes through all the points where that statement is true. You can make a table, if you want, to find some points where that is the case. Now, you draw another line to show the points where 3x 2y = 6. You can make a table, also, to find some points where that is true. When x is zero, it is clear that 2y = 6 in other words, y = -3. So, put a dot at x=0, y = -3. When y = 0, then x=6, according to th.... More from Yahoo Answers
Looking for More Help!
