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 ...

The constant term in the equation (the + 1 or ‒ 2) shows the point where the graph crosses the \(y\)-axis. This is known as the \(y\)-intercept and is represented by the letter \(c\) in \(y = mx ...

Any equation that can be rearranged into the form \(y = mx + c\), will have a straight line graph. \(m\) is the gradient, or steepness of the graph, and \(c\) is the \(y\)-intercept, or where the ...

Sometimes: the gradient of the line or curve has a particular meaning the \(y\)-intercept (where the graph crosses the vertical axis) has a particular meaning the area under the graph has a ...

Sometimes: the gradient of the line or curve has a particular meaning the y-intercept (where the graph crosses the vertical axis) has a particular meaning the area has a particular meaning This ...

In order to work with gradients and straight lines successfully, a good understanding of coordinates and linear graphs is needed ... the line is 3 Find the \(y\)-intercept of the line.

From the graph, we can also see that the y-intercept is 6, therefore we can say that the equation of the straight line is \(y = mx + 6\). Now we need to find the gradient.