The value of r is varying at a constant rate of change with respect to s. Complete the following table. s (value of the independent quantity) r (value of the dependent quantity) 1 15 3 9 9 -9 12 −18 The question I need to answer is : **Define a formula to represent r in terms of s.** I'm sure it's just that I'm too tired to think about it thoroughly, but I cannot figure this one out. I understand that r and s are not proportional, but that Δr is proportional to Δs. This workbook requires the formula to be written a very specific way. I'm not sure if I'm writing it wrong or just getting the wrong answer. I solved the table by taking values of r and s and finding the value of change in Δr or Δs. Then plugging it into the formula for the constant rate of change to solve the rest. I'm just not sure how to write a formula to represent r in terms of s if they are not proportional.
The value of r is varying at a constant rate of change with respect to s.
Complete the following table.
s (value of the independent quantity) | r (value of the dependent quantity) |
1 | 15 |
3 | 9 |
9 | -9 |
12 | −18 |
The question I need to answer is :
**Define a formula to represent r in terms of s.**
I'm sure it's just that I'm too tired to think about it thoroughly, but I cannot figure this one out. I understand that r and s are not proportional, but that Δr is proportional to Δs. This workbook requires the formula to be written a very specific way. I'm not sure if I'm writing it wrong or just getting the wrong answer. I solved the table by taking values of r and s and finding the value of change in Δr or Δs. Then plugging it into the formula for the constant rate of change to solve the rest. I'm just not sure how to write a formula to represent r in terms of s if they are not proportional.
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