My matrix algebra and order of operations has gotten rusty. I want to solve for a matrix in terms of other matrices given a set of matrix equations as follows:
{A} = [D] {C}
{A} = [T] {R} and {C} = [T] {S}
{R} = [Q} {S}
solve for [Q] in terms of [D] and [T]
I ended up with {R} = inv[T] [D] [T] {S} such that [Q]=inv[T] [D] [T] but I don't believe this is correct. Could you please advise?
Thanks.
{A} = [D] {C}
{A} = [T] {R} and {C} = [T] {S}
{R} = [Q} {S}
solve for [Q] in terms of [D] and [T]
I ended up with {R} = inv[T] [D] [T] {S} such that [Q]=inv[T] [D] [T] but I don't believe this is correct. Could you please advise?
Thanks.