Rajan is filling a basket with pears of equal weight. Draw a graph and write an equation to represent this situation.

Question

Rajan is filling a basket with pears of equal weight. Draw a graph and write an equation to represent this situation.
The table shows the relationship between the number of pears and the total weight of the basket. After 1 pear, the total weight of the basket is 12 ounces. After 4 pears, the total weight is 39 ounces. Plot the two points on the graph to show the total weight of the basket of pears after 1 pear and 4 pears are put in the basket.
Number of pears	Total weight (oz)
1	12
4	39
You got it!
For each pear added to the basket, the total weight increases at a constant rate. So, we can draw a line through these two points to show the linear relationship between the number of pears and the total weight in ounces. Let’s write an equation to represent this line in the form y=mx+b. Start by finding m, or the slope. What is the slope of this line?
x
y
(1, 12)(4, 39)
0
1
2
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4
5
0
3
6
9
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39
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48
Number of pears
Total weight (oz)
y= mx + b

Slope = 
Nice!
What does the slope of 9 represent in this situation? 
x
y
(1, 12)(4, 39)
0
1
2
3
4
5
0
3
6
9
12
15
18
21
24
27
30
33
36
39
42
45
48
Number of pears
Total weight (oz)
y= mx + b
Slope = 9

The weight of the basket increases 9 ounces for each pear.

The weight of the basket increases 1 ounce for every 9 pears.

The initial weight of the basket is 9 ounces.
Good work!
To represent the relationship between the number of pears and the total weight of the basket, a linear equation can be written in the form y=mx+b. In this equation, m is the slope of the line, or the rate of change of the weight of the basket. We just solved for and interpreted the slope. Substitute the slope for m in our equation.
x
y
(1, 12)(4, 39)
0
1
2
3
4
5
0
3
6
9
12
15
18
21
24
27
30
33
36
39
42
45
48
Number of pears
Total weight (oz)
y= mx + b
y= 
 x+b

Slope = 9
Nice!
Now let’s solve for b in our equation, or the vertical intercept. To solve for b, we can substitute the x and y-values for a point on the line into the equation. x represents the number of pears and y represents the total weight of the basket. Let’s use the point (1, 12). Start by substituting the values of x and y into the equation.
x
y
(1, 12)(4, 39)
0
1
2
3
4
5
0
3
6
9
12
15
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21
24
27
30
33
36
39
42
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48
Number of pears
Total weight (oz)
y
=
9x
+
b

12
=
9
·

1
+
b
You got it!
Now, solve for the value of b, or the vertical intercept.
x
y
(1, 12)(4, 39)
0
1
2
3
4
5
0
3
6
9
12
15
18
21
24
27
30
33
36
39
42
45
48
Number of pears
Total weight (oz)
y=9x+b

12
=
9·1+b
 
b
=

GPT-4o mini · Answer

To solve for $ b $, let's use the equation you have set up: $$ 12 = 9 \cdot 1 + b $$ Now calculate $ 9 \cdot 1 $: $$ 12 = 9 + b $$ To isolate $ b $, subtract 9 from both sides: $$ 12 - 9 = b $$ So, we have: $$ b = 3 $$ Now, we can write the complete equation of the line, which describes the relationship between the number of pears (x) and the total weight of the basket (y): $$ y = 9x + 3 $$ ### Summary: - The slope $ m = 9 $ indicates that for every pear added, the total weight of the basket increases by 9 ounces. - The y-intercept $ b = 3 $ indicates that the initial weight of the basket when no pears are added is 3 ounces. So the final equation is: $$ y = 9x + 3 $$