# Applying multiple percentages simultaneously

I have a source value that I need to apply multiple percentages, but at the same time, and the percentages have to take into account the other percentages.

Take for instance:
Value = 100
Percentage1 = 10%
Percentage2 = 15%
Percentage3 = 17%

I need to work out what the final value would be, but when adding Percentage1 it has to take into account the values from Percentage2 and Percentage3.

The only way I have managed this at the moment is to recursively calculate the value with the last values of the other percentages until there are no more changes, but I'm not even sure if that is right.

Is there a smarter way of calculating this?

EDIT: This is basically to calculate multiple fees. So say you put up a listing on eBay and you get charged 10% for listing on eBay, and the buyer has bought through paypal, and you get charged 15% for a paypal transaction, and then you get charged a further 17% due to shipping, we are trying to work out what the final fees will be and then scale the value accordingly.

This is the code that I'm using:

``````    Dim Value As Decimal = 100
Dim Fee1Percent As Decimal = 0.1
Dim Fee2Percent As Decimal = 0.15
Dim Fee3Percent As Decimal = 0.17

Dim PreviousFee1 As Decimal
Dim PreviousFee2 As Decimal
Dim PreviousFee3 As Decimal

Dim Fee1 As Decimal
Dim Fee2 As Decimal
Dim Fee3 As Decimal

Do
PreviousFee1 = Fee1
PreviousFee2 = Fee2
PreviousFee3 = Fee3

Fee1 = Math.Round((Value + PreviousFee2 + PreviousFee3) * Fee1Percent, 4, MidpointRounding.AwayFromZero)
Fee2 = Math.Round((Value + PreviousFee1 + PreviousFee3) * Fee2Percent, 4, MidpointRounding.AwayFromZero)
Fee3 = Math.Round((Value + PreviousFee1 + PreviousFee2) * Fee3Percent, 4, MidpointRounding.AwayFromZero)

Loop Until PreviousFee1 = Fee1 AndAlso PreviousFee2 = Fee2 AndAlso PreviousFee3 = Fee3
``````

This is my recursive list, so you start with the initial value of 100, and then use the previous values of the other fees until there are no more changes (rounded to 4 decimal places)

``````10.0        15.00       17.00
13.200      19.0500     21.2500
14.0300     20.1675     22.4825
14.2650     20.4769     22.8136
14.3291     20.5618     22.9061
14.3468     20.5853     22.9315
14.3517     20.5917     22.9385
14.3530     20.5935     22.9404
14.3534     20.5940     22.9409
14.3535     20.5941     22.9411
14.3535     20.5942     22.9411
14.3535     20.5942     22.9411
``````

So in this case my final sum is 157.8888

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10% of 100 == 10, 15% of 100 == 15, 17% of 100 == 17. I know you know this, but I don't know what you mean by Percentage1 has to take into account the values from Percentage2 and Percentage3. Perhaps an example will help me to understand your question. –  High Performance Mark Jan 28 '13 at 14:05
Essentially, on the first look, the final value is 142, but Percentage1 has to take into account the 15 and the 17. Same for the other two percentages. –  Fozzedout Jan 28 '13 at 14:11
No, that didn't help. –  High Performance Mark Jan 28 '13 at 14:18
"Apply" how? Increase/decrease by `x` percent? "Take into account" how? by applying the percentage to the previous result? –  D Stanley Jan 28 '13 at 14:19
I've edited my question to make it clearer –  Fozzedout Jan 28 '13 at 14:27

There are several ways you can design this score function:

• Multiply the percentages: `0.10 * 0.15 * 0.17` * value
• Minimum of the percentages: `min(0.10, 0.15, 0.17)` * value = `0.10` * value
• Weight the percentages (using weights `0.7`, `0.1` and `0.2` which add up to `1.0`): `(0.10 * 0.7 + 0.15 * 0.1 + 0.17 * 0.2)` * value
• ...

It depends on what you want to optimize

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I think I understand now. You want to be able to quote a price inclusive of listing fee, transaction fee and shipping; more to the point, given a listed price you want to calculate what the 3 fees might be and how much is left.

If your price is 100, then you simply add the 10% listing fee, the 15% transaction fee and the 17% shipping cost separately, to get a total price of 142.

If the total price is 100 then we know, from a little simple algebra, that `100/142` of that is the price, `10/142` of that is the listing fee, `15/142` is the transaction fee and `17/142` is the shipping cost. In this case the components of the final price of `100` are `70.42+7.04+10.56+11.97`. Note I've just rounded all the separate components to 2dp so the total may not be exactly `100.00` in this case.

EDIT

What ? The fees are cumulative ! What kind of crooks are you dealing with ?

Do you mean that you start with a basic price of 100, then add 10%, then add 15% of the total of the first two elements, then add 17% of that total ? If so, start multiplying:

``````100 * 1.10 = 110
110 * 1.15 = 126.50
126.50 * 1.17 = 148.01
``````

Or you could simply calculate `1.1*1.15*1.17==1.48` and use that as your multiplier to go from initial price to 'full' price.

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Right, the issue is, I'm starting with the minimum amount, and then I need to calculate the fees to add onto the value for the final listing price, but every time I add the cost, it then affects the overall fees. –  Fozzedout Jan 28 '13 at 14:38
Exactly my problem, cumulative. Lets say that my profit is at the absolute minimum, so I need to calculate the fees up front, but if I list at 148 instead of 100, then the fees will be calculated on the 148 instead of the 100. So I then need to adjust accordingly –  Fozzedout Jan 28 '13 at 14:55

The issue was a wrong approach to my calculations: I had to mark up the base price using a reverse calc of the percentages

So using the 10%, 15% and 17%, here is the math: 100 / (1 - 0.1 - 0.15 - 0.17) = 172.414

And the proof:
10% - 17.2414
15% - 25.8621
17% - 29.3103
With a final total of 72.414, leaving, exactly 100.

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