Hi All,
I have a polynomial which is a function of x (2nd order) and y (fifth order) and I wish to solve for y. My equation is:
p00 + p10*x + p01*y + p20*x^2 + p11*x*y + p02*y^2 + p21*x^2*y + p12*x*y^2 + p03*y^3 + p22*x^2*y^2 + p13*x*y^3 + p04*y^4 + p23*x^2*y^3 + p14*x*y^4 + p05*y^5
I have tried:
syms x y z p00 p10 p01 p20 p11 p02 p21 p12 p03 p22 p13 p04 p23 p14 p05
eqn = p00 + p10*x + p01*y + p20*x^2 + p11*x*y + p02*y^2 + p21*x^2*y + p12*x*y^2 + p03*y^3 + p22*x^2*y^2 + p13*x*y^3 + p04*y^4 + p23*x^2*y^3 + p14*x*y^4 + p05*y^5 == z
and this has returned:
soly = root(p05*z1^5 + p14*x*z1^4 + p04*z1^4 + p23*x^2*z1^3 + p13*x*z1^3 + p03*z1^3 + p22*x^2*z1^2 + p12*x*z1^2 + p02*z1^2 + p11*x*z1 + p21*x^2*z1 + p01*z1 - z + p20*x^2 + p10*x + p00, z1, 1)
I'm afraid i don't recognize this format. Where did z1 come from and I assume the the 1 (before the closing parenthisis) implies that it is the first and only solution? Nor am I sure about the root.
I have tried something similar in the past:
syms x y z p00 p10 p01 p20 p11 p02 p30 p21 p12
eqn = p00 + p10*x + p01*y + p20*x^2 + p11*x*y + p02*y^2 + p30*x^3 + p21*x^2*y + p12*x*y^2 == z
and this yielded a more familiar format:
-(p01 + p11*x + p21*x^2 + (p11^2*x^2 + p21^2*x^4 - 4*p00*p02 + 4*p02*z + p01^2 + 2*p01*p21*x^2 - 4*p02*p20*x^2 - 4*p10*p12*x^2 - 4*p02*p30*x^3 + 2*p11*p21*x^3 - 4*p12*p20*x^3 - 4*p12*p30*x^4 - 4*p00*p12*x + 2*p01*p11*x - 4*p02*p10*x + 4*p12*x*z)^(1/2))/(2*(p02 + p12*x))
-(p01 + p11*x + p21*x^2 - (p11^2*x^2 + p21^2*x^4 - 4*p00*p02 + 4*p02*z + p01^2 + 2*p01*p21*x^2 - 4*p02*p20*x^2 - 4*p10*p12*x^2 - 4*p02*p30*x^3 + 2*p11*p21*x^3 - 4*p12*p20*x^3 - 4*p12*p30*x^4 - 4*p00*p12*x + 2*p01*p11*x - 4*p02*p10*x + 4*p12*x*z)^(1/2))/(2*(p02 + p12*x))
Regards and thanks in advance.
Tim
