VBA How to solve two equations with two unknowns

I am trying to calculate point on a line. I got the points of the edges and one distance between one edge to the point I want to find (which is B).

A(2,4)
B(x,y)
C(4,32)

The distance between A to B is 5.

How can I calculate Bx and By? using the following equations:

``````d = Math.Sqr((Bx-Ax)^2 + (By-Ay)^2)
d = Math.Sqr((Cx-Bx)^2 + (Cy-By)^2)
``````

and than compare the equations above.

Here is the equations with the points placed:

``````5 = Math.Sqr((Bx-2)^2 + (By-4)^2)
23.0713366 = Math.Sqr((4-Bx)^2 + (32-By)^2)
``````

or

``````Math.Sqr((Bx-2)^2 + (By-4)^2) - 5 = Math.Sqr((4-Bx)^2 + (32-By)^2) - 23.0713377
``````

How can I solve this using VBA?

Thank you!

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Your math and your text don't match up, please clarify. If you are looking for the point on A->B that is 5 distance from A, your equations have nothing to do with the problem. –  themel Sep 28 '11 at 14:32
@themel, I edited my post to clarify my question. hope it helps. –  Ron Sep 28 '11 at 14:42
How would you solve these equations using pen and paper? There's your answer. –  Jean-François Corbett Sep 28 '11 at 18:21
@Jean-FrançoisCorbett, I tried to solve it using pen and paper right after I posted it here, and to be honest I couldnt. But there's another reason I couldnt solve it > I didnt use math for long time and I kinda forgot even the basic > Example: I calculated (x-2)^ as x^2+4 which should be x^2+4x+4... –  Ron Sep 28 '11 at 19:38
I see... Do you know this site? math.stackexchange.com/ That's where math questions should be posted. –  Jean-François Corbett Sep 29 '11 at 6:52

I won't solve your equations above because they are an unnecessarily complex way to state the problem (and the existence of a solution is questionable in the presence of rounding), but all the points on the line `A=(Ax,Ay)` to `C=(Cx,Cy)` can be described as `B=(Ax,Ay) + t*(Cx-Ax,Cy-Ay)` with `t` between `0` and `1`.

The distance between `B` and `A` is then given by `d=t*Sqrt((Cx-Ax)^2+(Cy-Ay)^2)`, which you can invert to get the proper `t` for a given `d` - `t=d/Sqrt((Cx-Ax)^2+(Cy-Ay)^2)`

In your case, `B(t) = (2,4) + t*(2,28)`, `t=5/Sqrt(2^2+28^2) ~ 0.178` -> `B ~ (2,4) + 0.178 * (2,28) ~ (2.356, 8.987)`.

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+1 for not bothering with spoon-feeding a VBA solution! –  Jean-François Corbett Sep 28 '11 at 18:23