Suppose I have in Matlab a symbolic equation like this
syms x y z real
T = 2*x^2 + k*y^2 + 6*k*x*y
How can I find the matrix B such that
T = [x y] * B * [x y]'
Thanks for your help.
Suppose I have in Matlab a symbolic equation like this
syms x y z real
T = 2*x^2 + k*y^2 + 6*k*x*y
How can I find the matrix B such that
T = [x y] * B * [x y]'
Thanks for your help.
I'm not sure I understand the problem here. If you know the coefficients, can't you just extract them from the equation and create B from that?
I.e.:
[x y ] * [ a b ; c d ] * [ x y ]' = ax^2 + dy^2 + (b + c)xy = ax^2 + dy^2 + exy
So
B = [ a 0 ; b e ]
Ok. I've just resolved this problem by myself.
B = 0.5 * jacobian(jacobian(T,V),V)
where V
is a vector of variables.
The explanation it's a bit mathematical. If you want more details just ask to me. :)