You would want to find were it starts on the graph so that would be your starting point on the table and then you would have to go up by rise over run for x and then you are mostliky done
Linear inequalities in two variables involve expressions that use inequality symbols (such as <, >, ≤, or ≥), while linear equations in two variables use an equality sign (=). The solution to a linear equation represents a specific line on a graph, while the solution to a linear inequality represents a region of the graph, typically shaded to show all the points satisfying the inequality. Moreover, linear inequalities allow for a range of values, whereas linear equations specify exact values for the variables.
Because its linear and the equation is a problem to solve
One of the most common ways to represent linear equations is to use constants. You can also represent linear equations by drawing a graph.
Yes, the graph of a linear equation can be a line. There are special cases, sometimes trivial ones like y=y or x=x which are linear equations, but the graph is the entire xy plane. The point being, linear equations most often from a line, but there are cases where they do not.
A "system" of equations is a set or collection of equations that you deal with all together at once. Linear equations (ones that graph as straight lines) are simpler than non-linear equations, and the simplest linear system is one with two equations and two variables.
To graph equations, first, rearrange the equation into a format like (y = mx + b) for linear equations, where (m) is the slope and (b) is the y-intercept. Plot the y-intercept on the graph, then use the slope to find another point. For nonlinear equations, calculate several values of (x) to find corresponding (y) values, then plot these points and connect them to form the curve. Finally, label your axes and provide a title for clarity.
When you graph a linear equation, you make a line. A line continues infinitely.
The intersection of two lines in a graph of a system of linear equations represents the solution because it indicates the point where both equations are true simultaneously. This point has coordinates that satisfy both equations, meaning that the values of the variables at this point fulfill the conditions set by each equation. Consequently, the intersection reflects a unique solution for the system, representing the values of the variables that solve both equations. If the lines do not intersect, it indicates that there is no common solution.
Aidan beavis perera
Equations = the method
The statement "A system of linear equations is a set of two or more equations with the same variables and the graph of each equation is a line" is true.
the equation graphs