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I know I can use Mathematica, but sadly I dont have one. I just want to find the A,B,C,D form matrix

| X1^3 x1^2 X1 1 |   |A|   |y0|
| X2^3 x2^2 X2 1 |   |B|   |y1|
| X3^3 x3^2 X3 1 | X |C| = |y2|
| X4^3 x4^2 X4 1 |   |D|   |y3|

I just want to find the simplified equations for A, B, C and D.

Actually I am trying to do a program in arduino that requires curve fitting using 4 points, so that I can predict the future points. I have seen this post , but parabola isn't accurate enough for my need.

I have already tried http://www.wolframalpha.com/.

linearSolve [{{(x1)^3, (x1)^2, x1, 1},
              {(x2)^3, (x2)^2, x2, 1},
              {(x3)^3, (x3)^2, x3, 1},
              {(x4)^3, (x4)^2, x4, 1}}, {{y1},{y2},{y3},{y4}}]

It returns a long result, which can be simplified. But, I cannot enter the full result in the search bar for simplifying (It gives me the error :Input Too Long!).

Any Ideas? Well I guess it would be possible in desktop versions.

Even after that, if the result is quite long, please substitute x1 = 0 and let me know the simplified result.

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3 Answers 3

up vote 0 down vote accepted
// Input data: arrays x[] and y[]
// x[1],x[2],x[3],x[4] - X values
// y[1],y[2],y[3],y[4] - Y values

// Calculations
A = 0
B = 0
C = 0
D = 0
S1 = x[1] + x[2] + x[3] + x[4]
S2 = x[1]*x[2] + x[1]*x[3] + x[1]*x[4] + x[2]*x[3] + x[2]*x[4] + x[3]*x[4]
S3 = x[1]*x[2]*x[3] + x[1]*x[2]*x[4] + x[1]*x[3]*x[4] + x[2]*x[3]*x[4]
for i = 1 to 4 loop
   C0 = y[i]/(((4*x[i]-3*S1)*x[i]+2*S2)*x[i]-S3)
   C1 = C0*(S1 - x[i])
   C2 = S2*C0 - C1*x[i]
   C3 = S3*C0 - C2*x[i]
   A = A + C0
   B = B - C1
   C = C + C2
   D = D - C3
end-loop

// Result: A, B, C, D
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This is exactly what I wanted. Thanks a lot @Egor –  matt007 Jun 4 '13 at 9:06

If you don't have Mathematica you can use wolframalpha

Your equation:

http://www.wolframalpha.com/input/?i=A+x_1^3+%2B+B+x_1^2+%2B+C+x_1+%2B+D+%3D+y_0%2C+A+x_2^3+%2B+B+x_2^2+%2B+C+x_2+%2B+D+%3D+y_1%2C+A+x_3^3+%2B+B+x_3^2+%2B+C+x_3+%2B+D+%3D+y_2%2C+A+x_4^3+%2B+B+x_4^2+%2B+C+x_4+%2B+D+%3D+y_3

(can't post this as a link here for some reason :-/)

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Thanyou for the input. Actually I had already tried that. But, it doesnt solve for A,B,C,D as you can see. I had also tried using linearSolve. It does solve, but the result is too long and there is no way I can simply it. The typing space in the search bar is smaller than the equation. I am sorry, it doesnt work out my friend, –  matt007 Jun 2 '13 at 13:30
    
Matrix inversion is the first step. –  Egor Skriptunoff Jun 2 '13 at 13:35

If possible, it would be simpler to solve this numerically.

By the way, you can still compute a closed form solution, but it is quite long. It just require a 4x4 matrix inverison.

let P = ((x1 - x2) (x1 - x3) (x2 - x3) (x1 - x4) (x2 - x4) (x3 - x4))

Your solution is:

A = [x1 (x1 - x4) x4 (y1 - y2) + x3^2 (x4 y0 + x1 y1 - x4 y1 - x1 y3) + x2^2 (-x4 y0 - x1 y2 + x4 y2 + x3 (y0 - y3) + x1 y3) + x2 (x4^2 (y0 - y2) + x1^2 (y2 - y3) + x3^2 (-y0 + y3)) + x3 (x4^2 (-y0 + y1) + x1^2 (-y1 + y3))]/P

B = [-x1 (x1 - x4) x4 (x1 + x4) (y1 - y2) + x3 (x4^3 (y0 - y1) + x1^3 (y1 - y3)) + x3^3 (-x4 y0 - x1 y1 + x4 y1 + x1 y3) + x2^3 (x4 y0 + x1 y2 - x4 y2 - x1 y3 + x3 (-y0 + y3)) + x2 (x4^3 (-y0 + y2) + x3^3 (y0 - y3) + x1^3 (-y2 + y3))]/P

C = [x1^2 (x1 - x4) x4^2 (y1 - y2) + x3^3 (x4^2 (y0 - y1) + x1^2 (y1 - y3)) + x2^2 (x4^3 (y0 - y2) + x1^3 (y2 - y3) + x3^3 (-y0 + y3)) + x3^2 (x4^3 (-y0 + y1) + x1^3 (-y1 + y3)) + x2^3 (x4^2 (-y0 + y2) + x3^2 (y0 - y3) + x1^2 (-y2 + y3))]/P

D = [x1 (x1 - x3) x3 (x1 - x4) (x3 - x4) x4 y1 + x2 x4^2 (-x3^3 y0 + x3^2 x4 y0 + x1^2 (x1 - x4) y2) + x1^2 x2 x3^2 (-x1 + x3) y3 + x2^3 (x4 (-x3^2 y0 + x3 x4 y0 + x1 (x1 - x4) y2) + x1 x3 (-x1 + x3) y3) + x2^2 (x1 x4 (-x1^2 + x4^2) y2 + x3^3 (x4 y0 - x1 y3) + x3 (-x4^3 y0 + x1^3 y3))]/P

(beware of singularities, i.e. when P is 0)

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Thanks @mescalinum , This is definitely smaller than the equation I got. But it still scares me because I am going to program in arduino, and such a long equation will definitely slow down execution. Well, the only sacrifice I can make is by substituting x1 = 0. Can you please put x1=0 and tell me the result? –  matt007 Jun 2 '13 at 14:13
    
you get: A = [x3 x4^2 (-y0 + y1) + x3^2 (x4 y0 - x4 y1) + x2^2 (-x4 y0 + x4 y2 + x3 (y0 - y3)) + x2 (x4^2 (y0 - y2) + x3^2 (-y0 + y3))]/P B = [x3 x4^3 (y0 - y1) + x3^3 (-x4 y0 + x4 y1) + x2 (x4^3 (-y0 + y2) + x3^3 (y0 - y3)) + x2^3 (x4 y0 - x4 y2 + x3 (-y0 + y3))]/P C = [x3^3 x4^2 (y0 - y1) + x3^2 x4^3 (-y0 + y1) + x2^3 (x4^2 (-y0 + y2) + x3^2 (y0 - y3)) + x2^2 (x4^3 (y0 - y2) + x3^3 (-y0 + y3))]/P D = [x2^3 x4 (-x3^2 y0 + x3 x4 y0) + x2 x4^2 (-x3^3 y0 + x3^2 x4 y0) + x2^2 (x3^3 x4 y0 - x3 x4^3 y0)]/P –  mescalinum Jun 2 '13 at 18:01

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