Identify the constant of proportionality from the graph.
(1 point)
1/2
2/3
3/2
2
To identify the constant of proportionality from the graph, we need to determine the ratio of the y-coordinate to the x-coordinate for any point on the graph. Since we are given only four options and there is no specific graph provided, we cannot accurately identify the constant of proportionality.
To identify the constant of proportionality from a graph, you need to determine the ratio of the dependent variable (y) to the independent variable (x) for any point on the graph. In this case, the constant of proportionality is the ratio of y to x.
However, since you only provided the options without any accompanying graph, I am unable to determine the correct answer among the given options. If you provide the graph or more information, I can help you further.
To identify the constant of proportionality from a graph, you need to look at the relationship between the variables being plotted. In this case, we don't have the graph, so I can't provide a direct answer. However, I can explain how to find the constant of proportionality from a graph.
The constant of proportionality is the value that relates the dependent variable (y) to the independent variable (x) in a proportional relationship. It can be found by determining the slope of the graph.
To find the slope, you need to identify any two points on the graph. Then, calculate the change in y (vertical change) divided by the change in x (horizontal change) between those two points. The slope represents the rate at which y changes with respect to x.
Once you have the slope (which is the constant of proportionality for a linear relationship), you can compare it to the given options of 1/2, 2/3, 3/2, or 2. The correct option should match the calculated slope from the graph.
Without the graph, it is not possible to determine the constant of proportionality or choose the correct option.