If a graph is proportional, what characteristic does it display? It will climb rapidly, indicating a steep slope. It will climb rapidly, indicating a steep slope. It will curve. It will curve. It will have y-values larger than their corresponding x-values. It will have y -values larger than their corresponding x -values. It will pass through the point (0, 0).
If a graph is proportional, it will pass through the point (0, 0).
If a graph is proportional, it will have a straight line that passes through the point (0, 0).
If a graph is proportional, it will display a characteristic where the relationship between the variables follows a straight line. In other words, as one variable increases, the other variable also increases at a constant rate. To determine if a graph is proportional, you can examine the pattern of the data points.
One characteristic is that the graph will have a steep slope. As you move along the line, the graph will climb rapidly, indicating a steep slope. This means that for a given change in one variable, there is a large corresponding change in the other variable.
Another characteristic is that the graph will pass through the point (0, 0). This means that when both variables have a value of zero, the graph intersects the origin of the coordinate plane. This indicates that when one variable is zero, the other variable is also zero.
In addition, a proportional graph will have y-values larger than their corresponding x-values. As you move along the graph from left to right, the y-values will increase at a greater rate than the x-values. This indicates that the relationship between the variables is proportional.
It's worth noting that a proportional graph does not curve. If you observe a curve in the graph, it suggests a different type of relationship between the variables, such as exponential or quadratic, rather than proportionality.