The process of utilizing a table of values to graph an equation requires the selection of diverse values for the variable. These chosen values are then inserted into the equation and corresponding results are obtained through solving. These value pairs are subsequently marked as points on a graph, and a line or curve is sketched to symbolize the equation.
| Topic | Problem | Solution |
|---|---|---|
| None | Graph the line. \[ y=-5 x+6 \] Check | 1. Identify slope and y-intercept: Slope \(m = -5\), y-intercept \(b = 6\) |
| None | Graph the line. \[ y=4 x \] | The given equation is \(y=4x\). This is a linear equation in two variables x and y. |
| None | Ex. 1 Graph the equation $y=2 x+3$ | Choose some values for x and calculate the corresponding values for y. Let's choose x = -2, 0, 2. |
| None | For the demand equation below, $x$ represents the… | Given the demand equation: \(2x + 4p - 32 = 0\) and \(p = 2\) |