Flaw in question Suppose 𝑉 is finite-dimensional with $\dim 𝑉 gt;1$ and . . . 2 Suppose $T:V\to V$ is linear and not zero Suppose that $V$ is $1$ -dimensional Then $T (x)=ax$ for some $a\ne 0$ Let $S:V\to V$ be linear; then $S (x)=bx$ for some $b$, and clearly $S=\frac {b} {a}T$ is a polynomial in $T$ Added to explain what is special when the dimension is 1
Suppose $A$ and $B$ are sets. Prove that $A\subseteq B$ if and only if . . . Suppose A is subset of B Let X belongs to A then by hypothesis, X will belong to B Hence X belong to A and X belong to B implies that X belongs to A intersection B Accordingly A is subset of A intersection B But we know that A intersection B is always subset of A Hence A intersection B is equal to A On the other hand, suppose A intersection B is equal to A Then in particular, A is
real analysis - Suppose $f : \mathbb {R} \to \mathbb {R}$ is a . . . To formally talk about $\mathbb {R}$, we need to have some theorems about it Specifically, we need to know $\mathbb {R}$ isn't too big (e g the density of $\mathbb {Q}$ in $\mathbb {R}$ or the Archimedean property), and $\mathbb {R}$ is big enough (e g the completeness of $\mathbb {R}$ or the connectedness of $\mathbb {R}$) The IVT almost gets us to the "big enough" but I don't think it
probability - Suppose a fair die is rolled 7 times independently . . . 3 Suppose a fair die is rolled seven times independently What is the probability that at least one of the six sides of the die never shows up in these seven rolls? Here is my approach: So at first my aim is to calculate the probability of all faces appearing at least once