The first point to graph in a direct variation equation is (0,0). How can you find another point using the slope?
Practice makes perfect
A direct variation equation follows a certain format.
y= mx
In this form, m represents the slope or constant of variation. If we highlight the coefficient of x in our given equation, we can see that the constant of variation is - 1.
y= - 1 * x
By rewriting this value as a fraction, we can form a ratio of rise over run.
m=rise/run=-1/1
This slope means that the graph decreases by 1 vertically as it increases by 1 horizontally. The graphs of direct variation equations pass through the origin, (0,0). To graph this equation, we will first plot a point at the origin and use the slope to plot a second point.
Finally, we complete the graph by sketching a line that passes through both points.
