I want to view what the graph of, for example, $x=\sin t,\quad y = \sin(10t)$ looks like, but not as a static graph $\ y=f(x),\ $ but rather one where we can see the movement of the point on the $\ x-y\ $ graph $(\ x(t),\ y(t)\ ) = (\ \sin t,\ \sin(10t)\ )\ $ as $\ t\ $ varies, starting at a spec...
If downvote means no to yes/no question then well...with my 5 downvotes seems like 5 people don't seem to think there is something improve. Interesting..... Can you talk about (the rest of the) field axioms when the operations are not closed? check out this deleted post if you want if you can: ...
$\newcommand\C{\mathbb C}\newcommand\syz{\operatorname{syz}} \newcommand\x{\mathbf x}\newcommand\a{\mathbf a}$Let $\a=a_1,\dots,a_m$ and $\x = x_1,\dots, x_n$ be indeterminates and consider a polynomial $F(\a, \x) \in \C[\a,\x]$ and having a constant term $1$ with respect to the indeterminates $a...
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