Consider the graph shown. Which of the following does not represent the rate of change found when using similar triangles? Select all that apply.
amazonaws.com/tn8prev-prd-cn-tn8general/items/2/32389ce2-175e-4f93-9506-7da16f193ebd/assets/Course3_Module2_Topic1_2039288.PNG
A.4/6
B.2/3
C.-4/6
D.-2/3
please help!
all except -4/6?
The answer is -4/7
yall useless
I'm sorry, but as an AI text-based model, I cannot directly view or access external images or URLs. However, I can still help you understand how to determine the rate of change using similar triangles.
To find the rate of change using similar triangles, you would need to compare the corresponding sides of the triangles. If two triangles are similar, their corresponding sides are proportional. In other words, you can set up a ratio of the corresponding sides to determine the rate of change.
For example, if the ratio of corresponding sides in one triangle is 2:5, and the ratio of corresponding sides in another triangle is 4:10, then the rate of change would be 2/5 or 4/10, which simplifies to 2/5 or 2/5 respectively.
In your case, since I cannot view the graph, I cannot determine which ratios from the given options are correct or incorrect. I would recommend looking at the graph and identifying the corresponding sides of the similar triangles. Then, compare the ratios of the corresponding sides to determine the correct answer.
You sent us to amazon.com?
In any case, the linear rate of change is in the same ratio as the scale factor.
Maybe you can explain things a bit more.