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double g[2][2];

g[0][0] = cos(M_PI*0.5*(c - w*0.5));
g[0][1] = sin(M_PI*0.5*(c - w*0.5));

g[1][0] = cos(M_PI*0.5*(c + w*0.5));
g[1][1] = sin(M_PI*0.5*(c + w*0.5));

The matrix g is given. How do I rewrite the above to find the value of (c,w)?

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closed as off topic by Daren Thomas, Lightness Races in Orbit, N 1.1, Puppy, Dori Apr 6 '11 at 10:08

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Writing your maths equations in C and/or C++ doesn't make this a programming question! –  Lightness Races in Orbit Apr 6 '11 at 9:31
    
math.stackexchange.com might be a better place for this type of questions. –  NPE Apr 6 '11 at 9:33
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-1 math question disguised as programming. –  Cheers and hth. - Alf Apr 6 '11 at 9:46

2 Answers 2

Use atan2 to determine pi/2*(c-w/2) and pi/2*(c+w/2) -- of course there's an ambiguity of integer*2pi in both and there's nothing you can do about that. So you know have a,b such that c-w/2 = a + 4*m and c+w/2 = b + 4*n where m,n are unknown integers.

Now c = (a+b)/2 + 2*(m+n) and w = (b-a) + 4*(n-m) where, again, m,n are arbitrary unknown integers.

You might prefer to write, let's say, k=m+n; then c = (a+b)/2 + 2k and w = (b-a) + 4k - 4m where now k,m are arbitrary unknown integers.

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you got something like

g1 = cos(a - b)
g2 = sin(a - b)
g3 = cos(a + b)
g4 = sin(a + b)

so

atan2(g1,g2) = A = a - b [+ N*2*PI]
atan2(g3,g4) = B = a + b [+ N*2*PI]

and

a = (A + B) / 2
b = B - a

It is more a math question than a programming question though.

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Using only the cosines will give you some spurious solutions that would have been ruled out by considering the signs of the sines. Better to use atan2 in situations like this. –  Gareth McCaughan Apr 6 '11 at 9:28
    
That's right. I agree. This solution is not good. –  log0 Apr 6 '11 at 9:34
    
Should be fine now. –  log0 Apr 6 '11 at 9:43

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