# Solving second degree simultaneous equation

What would be the solution to the following two equations ?

A1uv + B1u + C1v + D1 = 0

A2uv + B2u + C2v + D2 = 0

u, v in [0, 1]

The solution needs to be blazing fast because it needs to be solved for each pixel, hopefully a direct rather than iterative solution.

This is basically trying to find the inverse of a coons patch where the boundaries are straight lines.

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mathoverflow.net? –  John Weldon Dec 11 '09 at 20:50
What are you trying to solve for? –  Chris Cudmore Dec 11 '09 at 20:51
@John: They have that?! Awesome, thanks for the link! –  Crowe T. Robot Dec 11 '09 at 20:51
type it into wolframalpha.com –  Daniel Elliott Dec 11 '09 at 20:53
@chris u and v is what I am trying to solve for. –  Sid Datta Dec 11 '09 at 21:02

Solve equation 1 for u, you get `u = (-C_1v -D_1)/(A_1v+B_1)`. Substitute that into equation 2, multiply through by `(A_1v+B_1)`, and you should get a quadratic in v. Use the quadratic equation to solve for v.

Bonus points for figuring out what happens when `A_1v+B_1` is zero.

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I used wolfram alpha.

The generic form timed out while calculating, but I did get a solution substituting one constant with a number.

The resulting solution was pages long :P.

I thing I will have to go with some other solution that approximates u,v, the direct solution will be too slow for a per pixel approach.

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