The straight line through two points will have an equation in the form \(y = mx + c\). Then, we can find the value of \(c\), the \(y\)-intercept, by substituting the coordinates of one point into ...

c\) is the number where the line crosses the \(y\)-axis. This is the \(y\)-intercept. To draw a graph of \(y = mx + c\) for given values of \(x\): Use the pairs of values in the table to list the ...

I’m sure most of us have experience in drawing lines of best fit, where we line up a ruler, think “this seems about right”, and draw some lines from the X to the ... the intercept, which we can do ...

Then, we can find the value of \(c\), the \(y\)-intercept ... the value of m in the equation of the line, so the equation will be \(y = - \frac{2}{3}x + c\). Next, find the value of \(c\).

Then, we can find the value of \(c\), the \(y\)-intercept ... the value of m in the equation of the line, so the equation will be \(y = - \frac{2}{3}x + c\). Next, find the value of \(c\).