What type of relationship is shown between the x- and y-values on the graph?
1. What type of relationship is shown between the x- and y-values on the graph? (1 point)
A.linear
B.nonlinear
C.clustering****
D.no relationship
2. What type of relationship is shown between the x- and y-values on the graph? (1 point)
A.linear
B.nonlinear****
C.clustering
D.no relationship
3. Part A What type of relationship is shown between the x- and y-values on the graph? (3 points)
A.linear****
B.nonlinear
C.clustering
D.no relationship
Part B Which statements are true about the data shown in the graph? (3 points)
A. As the x-values increase, the y-values increase.****
B. The rate of change in the graph is constant.****
C. The data shows a negative trend.
D. The graph shows several outliers.****
1. C
2. B
3. A
4. A,B,D
^^^ Those answers ARE correct, but for some reason number 3 part A says there are 1/3 points... Even though there is only one avaliable point. Just a crazy miskate the school made.
Yea it gave me a 6/8 because part A says 1/3 but there is only 1 point available But just like Anonymous said its the school's fault but ( Im Correct ) answers are 100% just that you won't get 100% on the test youll get a 75% which is basically a 100%
We can't see your graph.
Yeah, I have found MANY mistakes since my 4 years at Connections academy!
this is the question i need help w … which statement is true about the ordered pair ( 1.5, -0.5)
24k supreme is right
which statement is true about the relationship of the data displayed in the graph?
To determine the type of relationship between the x- and y-values on a graph, you need to analyze the pattern or trend of the plotted points. Here's how you can do it:
1. Identify the graph type: Determine the type of graph you are working with, such as a line graph, scatter plot, bar graph, or any other specific type.
2. Examine the direction: Look at the general direction of the plotted points. Does the data tend to increase or decrease as the x-values increase? This will help you understand if there is a positive or negative relationship.
3. Identify linearity: If the graph shows a clear, straight line, you can infer a linear relationship between the x- and y-values. A linear relationship means that the change in the y-value corresponds directly to a consistent change in the x-value.
4. Analyze the slope: If there is a linear relationship, calculate the slope of the line. A positive slope (rising line) indicates a positive relationship, meaning that as the x-values increase, the y-values also increase. A negative slope (falling line) suggests a negative relationship, where increasing x-values cause decreasing y-values.
5. Consider non-linearity: If the graph does not show a straight line, there may be a nonlinear relationship. In this case, look for a curve or any distinct pattern the plotted points form. It could indicate exponential, logarithmic, quadratic, or other non-linear relationships.
Remember that the type of relationship may vary depending on the context and the specific data being plotted.