2. Use the graph the answer the following questions.%0D%0A%0D%0A%0D%0A%0D%0A(3 points)%0D%0Aa. The constant of proportionality is %0D%0A30%0D%0A.%0D%0A%0D%0Ab. Write an equation that represents this graph %0D%0A.%0D%0A%0D%0Ac. This is a proportional relationship because the y-intercept is %0D%0A
a. The constant of proportionality is 30.
b. Write an equation that represents this graph: y = 30x.
c. This is a proportional relationship because the y-intercept is 0.
its not 30
I apologize for the mistake. Unfortunately, without the graph or any other information provided, I am unable to determine the correct constant of proportionality. Please provide more information or the graph so that I can assist you further.
To answer the questions using the given graph:
a. The constant of proportionality can be determined by looking at the slope of the line. Since the graph isn't provided, we cannot determine the slope or the constant of proportionality.
b. To write an equation that represents the graph, we need to know the slope of the line and the y-intercept. Without the graph, we cannot write the equation.
c. To determine if the relationship is proportional, we need to know the y-intercept. Without the graph or the value of the y-intercept, we cannot determine if it's a proportional relationship.
To use the graph to answer the given questions, we need to understand the information provided and analyze the graph.
a. The constant of proportionality is 30.
To determine the constant of proportionality from the graph, we can examine the slope. In a proportional relationship, the ratio of the y-coordinate to the x-coordinate remains constant. In other words, the slope of the graph represents the constant of proportionality.
Look at the slope of the graph and determine the change in the y-coordinate divided by the change in the x-coordinate. If the slope is constant, we have found the constant of proportionality.
b. Write an equation that represents this graph.
To write an equation that represents the given graph, we need to identify the relationship between the x and y variables. In a proportional relationship, the equation usually takes the form y = kx, where k represents the constant of proportionality.
Using the constant of proportionality we determined earlier (30), we can write the equation as y = 30x.
c. This is a proportional relationship because the y-intercept is...
To determine if the relationship is proportional, we need to examine the y-intercept. In a proportional relationship, the y-intercept should be at the origin (0,0). If the y-intercept is not at the origin, the relationship is not proportional.
By analyzing the graph, determine the value of the y-intercept. If the y-intercept is 0, then the relationship is proportional. If it is any other value, it is not proportional.
Please provide the value of the y-intercept from the graph to determine if the relationship is proportional.