what does the slope of the line tell you about the situation? brooke buys 120 apples. brooke uses 1 apple…

what does the slope of the line tell you about the situation? brooke buys 120 apples. brooke uses 1 apple for every 5 pies she bakes. brooke uses 5 apples for every pie she bakes. brooke has 60 apples left after she has baked 12 pies.

what does the slope of the line tell you about the situation? brooke buys 120 apples. brooke uses 1 apple for every 5 pies she bakes. brooke uses 5 apples for every pie she bakes. brooke has 60 apples left after she has baked 12 pies.

Answer

Explanation:

Step1: Recall slope - concept

Slope represents rate of change. In this context, it's change in apples per change in pies made.

Step2: Identify points

Let's take two points from the line: (0, 120) and (20, 20).

Step3: Calculate slope

The slope formula is $m=\frac{y_2 - y_1}{x_2 - x_1}$. Here, $x_1 = 0,y_1=120,x_2 = 20,y_2 = 20$. So $m=\frac{20 - 120}{20-0}=\frac{- 100}{20}=-5$. This means for every 1 unit increase in pies made (x - value), the number of apples (y - value) decreases by 5.

Answer:

Brooke uses 5 apples for every pie she bakes.