In computational matrix algebra, iterative methods are generally needed for large problems.
The study of matrix algebra first emerged in England in the mid-1800s.
Her work in general focused on linear and matrix algebra.
Nevertheless, the same result can be reached avoiding matrix algebra, which is more geometrical.
It also requires matrix algebra, complex numbers, probability theory, and partial differential equations.
When last heard of he was teaching matrix algebra at a theological college in Denver.
More generally, one can consider finite direct sums of matrix algebras.
To calculate the rotation two methods can be used, either matrix algebra or complex numbers.
All of the computations can be reduced to 2x2 matrix algebra.
He also worked on group theory and matrix algebra.