Question

Which is the rate of change of the function described in the table?

12/5
5
25/2
25

Answer 1

The rate of change of the function can be determined by finding the slope of the function at different points in the table.

Step-by-step explanation:

The rate of change of a function can be determined by finding the slope of the function at different points. In this case, we can use the values provided in the table to find the rate of change. The rate of change is equal to the difference in the y-values divided by the difference in the x-values.

Let's take the first two points in the table as an example. The first point is (12/5, 5) and the second point is (5, 25/2). The difference in the y-values is 25/2 - 5 = 15/2, and the difference in the x-values is 5 - 12/5 = 23/5. Therefore, the rate of change is (15/2) / (23/5) = 15/2 * 5/23 = 75/46. So, the rate of change of the function for these two points is 75/46.

Answer 2

Answer: 5

Rate of change=slope=rise/run=change in y/change in x

Rate of change=(5/2-1/2)/(1-0)=5