Expression for the cost of 2 pounds of apples and 1 head of lettuce from grocery store #1: 2A + L
Expression for the cost of 2 pounds of apples and 1 head of lettuce from grocery store #2: 2B + L
Note: A represents the cost of 1 pound of apples in store #1, B represents the cost of 1 pound of apples in store #2, and L represents the cost of 1 head of lettuce in both stores.
To determine if you can buy 3 dozen eggs and a frozen pizza with $20 at either store, we need the cost of 3 dozen eggs and the cost of a frozen pizza in each store.
If the total cost of 3 dozen eggs and a frozen pizza is less than or equal to $20 in either store, you can buy them.
To calculate the number of whole gallons of milk you can buy for $14 at each store, we need the cost of 1 gallon of milk in each store.
If the total cost is less than $14 for 1 gallon of milk in either store, you can buy it.
To determine the number of pounds of apples you can buy with a gallon of milk and $32 at each store, we need the cost of 1 gallon of milk and the cost of 1 pound of apples in each store.
We need to find how many pounds of apples you can buy with the remaining money after purchasing 1 gallon of milk, and then divide that by the cost of 1 pound of apples.
Now, let's create a similar problem:
Problem: You have $25 to spend. Grocery store #1 sells 3 pounds of oranges for $9, and 1 pound of cherries for $6. Grocery store #2 sells 2 pounds of oranges for $8 and 1 pound of cherries for $5. How many pounds of oranges can you buy with 1 pound of cherries at each store?
Expression for grocery store #1: 3O + C
Expression for grocery store #2: 2O + C
Note: O represents the cost of 1 pound of oranges and C represents the cost of 1 pound of cherries in both stores.
To determine the number of pounds of oranges you can buy with 1 pound of cherries at each store, we need to find how many pounds of oranges you can buy with the remaining money after purchasing 1 pound of cherries, and then divide that by the cost of 1 pound of oranges.
Answer the following questions: Write an expression to find the cost of 2 pounds of apples and 1 head of lettuce from grocery store #1. Write an expression to find the cost of 2 pounds of apples and 1 head of lettuce from grocery store #2. If you have $20 to spend, can you buy 3 dozen eggs and a frozen pizza from either store? Which one(s)? How many whole gallons of milk can you buy for $14 at each store? Remember, you can’t buy part of a gallon. Write and solve an equation to find your answer. If you have $32 to spend, how many pounds of apples can you buy with a gallon of milk at each store? Write and solve an equation to find your answer. Write your own problem similar to question 5 and then write and solve the equation showing how you got the answer.
5 answers
Write it as if I did it.
Sure! Here's how you can solve the problem:
Problem: You have $25 to spend. Grocery store #1 sells 3 pounds of oranges for $9, and 1 pound of cherries for $6. Grocery store #2 sells 2 pounds of oranges for $8 and 1 pound of cherries for $5. How many pounds of oranges can you buy with 1 pound of cherries at each store?
Expression for grocery store #1: 3O + C
Expression for grocery store #2: 2O + C
To find out the number of pounds of oranges you can buy with 1 pound of cherries at each store, we need to find how many pounds of oranges you can buy with the remaining money after purchasing 1 pound of cherries, and then divide that by the cost of 1 pound of oranges.
Let's calculate that for grocery store #1:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $6 = $19
2. Divide the remaining money by the cost of 1 pound of oranges: $19 ÷ 3O = Pounds of oranges
Now, let's do the same for grocery store #2:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $5 = $20
2. Divide the remaining money by the cost of 1 pound of oranges: $20 ÷ 2O = Pounds of oranges
By solving these equations, you will find the number of pounds of oranges you can buy with 1 pound of cherries at each store.
Problem: You have $25 to spend. Grocery store #1 sells 3 pounds of oranges for $9, and 1 pound of cherries for $6. Grocery store #2 sells 2 pounds of oranges for $8 and 1 pound of cherries for $5. How many pounds of oranges can you buy with 1 pound of cherries at each store?
Expression for grocery store #1: 3O + C
Expression for grocery store #2: 2O + C
To find out the number of pounds of oranges you can buy with 1 pound of cherries at each store, we need to find how many pounds of oranges you can buy with the remaining money after purchasing 1 pound of cherries, and then divide that by the cost of 1 pound of oranges.
Let's calculate that for grocery store #1:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $6 = $19
2. Divide the remaining money by the cost of 1 pound of oranges: $19 ÷ 3O = Pounds of oranges
Now, let's do the same for grocery store #2:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $5 = $20
2. Divide the remaining money by the cost of 1 pound of oranges: $20 ÷ 2O = Pounds of oranges
By solving these equations, you will find the number of pounds of oranges you can buy with 1 pound of cherries at each store.
Include the ANSWERS
Sure! Let's solve the problem and find the answers:
Problem: You have $25 to spend. Grocery store #1 sells 3 pounds of oranges for $9, and 1 pound of cherries for $6. Grocery store #2 sells 2 pounds of oranges for $8 and 1 pound of cherries for $5. How many pounds of oranges can you buy with 1 pound of cherries at each store?
Expression for grocery store #1: 3O + C
Expression for grocery store #2: 2O + C
Let's calculate that for grocery store #1:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $6 = $19
2. Divide the remaining money by the cost of 1 pound of oranges: $19 ÷ 3O = Pounds of oranges
So, in grocery store #1, you can buy $19 worth of oranges with 1 pound of cherries.
Now, let's do the same for grocery store #2:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $5 = $20
2. Divide the remaining money by the cost of 1 pound of oranges: $20 ÷ 2O = Pounds of oranges
So, in grocery store #2, you can buy $20 worth of oranges with 1 pound of cherries.
By solving these equations, we have found the answers. In grocery store #1, you can buy $19 worth of oranges with 1 pound of cherries, and in grocery store #2, you can buy $20 worth of oranges with 1 pound of cherries.
Problem: You have $25 to spend. Grocery store #1 sells 3 pounds of oranges for $9, and 1 pound of cherries for $6. Grocery store #2 sells 2 pounds of oranges for $8 and 1 pound of cherries for $5. How many pounds of oranges can you buy with 1 pound of cherries at each store?
Expression for grocery store #1: 3O + C
Expression for grocery store #2: 2O + C
Let's calculate that for grocery store #1:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $6 = $19
2. Divide the remaining money by the cost of 1 pound of oranges: $19 ÷ 3O = Pounds of oranges
So, in grocery store #1, you can buy $19 worth of oranges with 1 pound of cherries.
Now, let's do the same for grocery store #2:
1. Subtract the cost of 1 pound of cherries from $25: $25 - $5 = $20
2. Divide the remaining money by the cost of 1 pound of oranges: $20 ÷ 2O = Pounds of oranges
So, in grocery store #2, you can buy $20 worth of oranges with 1 pound of cherries.
By solving these equations, we have found the answers. In grocery store #1, you can buy $19 worth of oranges with 1 pound of cherries, and in grocery store #2, you can buy $20 worth of oranges with 1 pound of cherries.