To show \aleph \le |S| you can establish a bijection between the infinite binary strings and the subset of S consisting of those sequences that increase by one bit at a time just by reading off ...

First of all you have confusing notation, as you use v_2 for both the vector and the component of the vector. That said, in my answer, v is a vector with components v_1 and v_2 You have a ...

I suspect your friend is thinking as follows: the digits of \pi are "basically random," so the walk generated by \pi should go "all over the place." There are two pieces to this to consider: How ...

5.\;Again here, since w is not an eigenvector of C we cannot have Cw=\lambda w...so there must be some vector u, so that Cw=u+\lambda w. In fact we can do better, by noticing Aw=1\cdot(\alpha v)+\lambda w ...

One very good reason to choose \mathbb C is that it is the simplest and obvious choice that makes the statement true.

Because you are looking for a Jordan canonical basis, Ax = 2x+v , where x is the generalized eigenvector you're looking for. Equivalently, (A-2I)x = v . Applying A-2I one more time to ...