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I have three dials: D1, D2 and D3. Together their values should always be 100% and their default Values are 50%, 25% and 25% respectively.

When a user edits D2 or D3, D1 should act as the FIRST pot to pull from and Deposit to.

Here is the problem: what if the editable dials are increased past the point of D1 reserves? I need to find a way to have the the remaining pull from the dial not being edited at that moment.

I guess I am looking for a elegant solution as opposed to a hack. Any one got such a solution?

http://jsfiddle.net/cborgia/ByWCA/

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Just move the other two by half the change of the one the user's moving. –  Ignacio Vazquez-Abrams Aug 5 '12 at 23:59
    
I asked my question without the detail needed to explain why that is not sufficient. I will edit to further explain the concept of dial 1 acting as a "reserve") –  cborgia Aug 6 '12 at 0:11
1  
@ChristopherBorgia—if you can't explain the logic for the dial values, it will be a guessing game for those who wish to help. –  RobG Aug 6 '12 at 0:31
    
Just move D1 to its limit, then move the other dial to take up the remaining change. You don't really have any more elegant options. –  Beta Aug 6 '12 at 0:48

1 Answer 1

What you are trying to do is solve an equation of three functions like:

X + Y +  Z = K;

where:

X = x + a(dx)
Y = y + b(dy)
Z = z + c(dz)
K = 100

and

  1. a, b and c are functions
  2. x, y and z are the current values of the knobs and
  3. dx, dy and dz are the changes in knob values

The functions are solved given values for K (always 100) and one of X, Y and Z where X, Y and Z are in the range 0 to 100 inclusive.

You don't say what should happen as X, Y and Z approach 0 or 100 - are they proportionally reduced, or is the excess or deficit applied to the other non–user adjusted knob?

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Thanks @RobG for given me the direction to start working in. I'm taking a crack at it now. –  cborgia Aug 6 '12 at 1:25
    
Christopher, this is normally addressed using differential calculus and related rates since you will have one equation with two unknowns that must satisfy other equations. You can likely get a reasonable solution by estimating one of the unknowns and solving for the other. That will only get you close, so use the result to make a better estimate and go again and so on until it's close enough. –  RobG Aug 6 '12 at 2:39
    
Nope. It's kicking my BUTT. no mater what I do they do not react the way I am intending them too. I'll keep trying, but if you have any more advice, it would help out a lot (oh and proportionally reduced is what I am going for). –  cborgia Aug 6 '12 at 4:59

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