The big problem I see here is that you want to use a comma. I don't know of a wrapper class that does this. However, it is possible to solve your problem like this. Normally I would say that you should convert to a double and divide, but that isn't really needed here. What you need is some math to get the value of every digit.

```
(price - price%1000)/1000
```

The modulus will remove the excess not divisible by 1000. After division you will have 3 for the Car example you gave. Some implementations won't need the modulus part of the equation and will round it properly. I don't like to trust these things. Things get a little trickier after the first digit.

You need to declare 4 variables to hold each place as you work through the number. If you want prices higher than 99.99 you need more places. lets say you have int A, B, C, and D. For simplicity's sake I will also use a variable temp.

```
A = (price - price%1000)/1000
temp = price - (A*1000)
B = (temp - temp%100)/100
temp = temp - (B*100)
C = (temp - temp%10)/10
temp = temp - (C*10)
D = temp
```

Using this procedure you can get the number in each place of the integer into A, B, C, and D. The temp variable has the part removed after you calculate that place. This allows the same math function to work for the next place. Really you can do this without temp but it might needlessly confuse a user of your code (or yourself lol). Now that you have the places you can put them piecemeal into whatever output you want.

`std::cout<<"$"<<A<<B<<","<<C<<D;`

That is just an example for C++. Ideally you would also check if A, B, ect. are 0 and account for that.

store a decimalnot an integer. You should use the proper data type for the job. Why are you storing a decimal as an integer anyway? Are you worried about loss of precision in floats, do you have legacy data?haveencountered attempts to solve unrelated errors (like the lack of a proper decimal type, coder confusion about the differences between numeric and float types) that somehow became legacy. A`numeric(9,2)`

unambiguously defines the precision of a number while an integer value depends on interpretation by the application1more comment