The equation that models the relationship between the quantity of coffee beans removed (n) and the quantity of coffee beans remaining in the storage bin (q) is:
q = 1500 - n
The equation that model the relationship
The equation q = 1500 - n represents a linear relationship between the quantity of coffee beans removed (n) and the quantity of coffee beans remaining in the storage bin (q).
In this equation, 1500 represents the initial quantity of coffee beans in the storage bin. As coffee beans are removed (n), the quantity of coffee beans remaining (q) decreases.
For example, if you remove 100 grams of coffee beans (n = 100) from the storage bin, the equation becomes q = 1500 - 100, which means there will be 1400 grams of coffee beans remaining in the storage bin.
The equation can be used to calculate the quantity of coffee beans remaining in the storage bin after a certain amount has been removed. It assumes that the quantity of coffee beans removed is subtracted from the initial quantity of coffee beans (1500 grams) to get the remaining quantity (q).
A coffee storage bin contains 1500 grams of coffee beans. To make a cup of coffee, grams of coffee beans are removed.
The equation _______
models the relationship between the quantity of coffee beans removed, , and the quantity of coffee beans remaining in the storage bin, .
q = 1500 + n
q = 1500 - n
q = 1500n