Answer :
Certainly! Let's proceed with the given problem step-by-step.
We are given the following elements in our problem:
- Initial money: \$23
- Number of bagels: 5
- Cost of each bagel: \$3
We want to determine two things:
1. The total amount of money spent on bagels.
2. The amount of money left after purchasing the bagels.
Let's break this down:
1. Calculate the total amount of money spent:
For this, we multiply the number of bagels by the cost of each bagel:
[tex]\[ 5 \text{ bagels} \times \[tex]$3 \text{ per bagel} = \$[/tex]15
\][/tex]
So, the total amount of money spent on bagels is \$15.
2. Calculate the amount of money left:
To find out how much money is left after purchasing the bagels, we subtract the amount of money spent from the initial amount of money:
[tex]\[ \[tex]$23 - \$[/tex]15 = \$8
\][/tex]
So, the amount of money left after purchasing the bagels is \$8.
Therefore, the detailed solution is as follows:
- Money spent on bagels: \$15
- Money left after spending: \$8
These calculations give us the final results of \[tex]$15 spent and \$[/tex]8 remaining.
We are given the following elements in our problem:
- Initial money: \$23
- Number of bagels: 5
- Cost of each bagel: \$3
We want to determine two things:
1. The total amount of money spent on bagels.
2. The amount of money left after purchasing the bagels.
Let's break this down:
1. Calculate the total amount of money spent:
For this, we multiply the number of bagels by the cost of each bagel:
[tex]\[ 5 \text{ bagels} \times \[tex]$3 \text{ per bagel} = \$[/tex]15
\][/tex]
So, the total amount of money spent on bagels is \$15.
2. Calculate the amount of money left:
To find out how much money is left after purchasing the bagels, we subtract the amount of money spent from the initial amount of money:
[tex]\[ \[tex]$23 - \$[/tex]15 = \$8
\][/tex]
So, the amount of money left after purchasing the bagels is \$8.
Therefore, the detailed solution is as follows:
- Money spent on bagels: \$15
- Money left after spending: \$8
These calculations give us the final results of \[tex]$15 spent and \$[/tex]8 remaining.