Answer:
The required system of equations is:
2x + 3.25y = 231.75
x = y + 3
where x is the number of pounds of bananas and y is the number of pounds of peaches
Explanation:
1- Defining the variables:
Assume that the number of pounds of bananas sold is x
Assume that the number of pounds of peaches sold is y
2- Setting the system of equations:
We are given that:
i. Each pound of bananas sells for $2
Money gained from selling x pounds of bananas is 2x
ii. Each pound of peach sells for $3.23
Money gained from selling y pounds of peaches is 3.25y
iii. Nicole made $231.75 in total. This means that:
2x + 3.25y = 231.75 .................> equation I
iv. Nicole sold 3 more pounds of bananas than pounds of peaches. This
means that:
pounds of bananas = pounds of peaches + 3
x = y + 3 ..................> equation II
3- Solving the equations (if required):
In equation II, we have: x = y + 3
Substitute with equation II in equation I and solve for y as follows:
2x + 3.25y = 231.75
2(y+3) + 3.25y = 231.75
2y + 6 + 3.25y = 231.75
5.25y = 231.75 - 6
5.25y = 225.75
y = 43
Substitute with y in equation II to get x:
x = y + 3
x = 43 + 3 = 46
Based on the above:
Number of pounds of bananas = x = 46 pounds
Number of pounds of peaches = y = 43 pounds
Hope this helps :)
