It's the End of the Origin As We Know It

(And I Feel Affine)

That's great, it starts with a vector space,
lines are subspace and so are planes,
and Erhardt Schmidt is not afraid.

I have an operator matrix
in terms of a distingiushed basis.
If the world has a different view,
there's a matrix for that operator too.

Projection transformation with skew sparse cross dot
Trace of a row space, cayley and hamilton have found an independent base
for a partial pivot.

Problems sets coming in a hurry
with midterms breathing down your neck.
Matrix factorization methods include gauss jordan lq
Look at that normal plane, affine, then.

Uh oh, underflow,
Condition number is a little low,
So save your code, serve your code,
World has its own basis,
Dummy change your own basis,
Dummy with the product in the hilbert space with the norm, norm.
New eigenvalue eigenvector adjoint cofactor best fit row vector.

Chorus:
        It's the end of the origin as we know it,
        It's the end of the origin as we know it,
        It's the end of the origin as we know it,
                (it's time I did my homework alone)
        It's the end of the origin as we know it,
                (it's time I did my homework alone)
        It's the end of the origin as we know it,
                (it's time I did my homework alone)
        And I feel affine.
        I feel affine.


Just the other night I
Came up with a new factorization for I
It's pretty trivial I won't lie
or Gilbert Strangify.