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It is straightforward to show the continuity of the polynomials, and so we hate that silly ^{[citation needed]} on Polynomial » Polynomial functions.

Weierstrass? Great choice! Great choice! Let's go!

Unfolding Weierstrass's continuity, one observes that any monomial,

ax^{k}:{a,x\in \mathbb {R} },\ {n\in \mathbb {N} }

is continuous, and then use the standard result that the sum of two continuous functions on some domain, in this case $\mathbb {R}$ , is also continuous on that domain. Iteratively applying the result permits the conclusion that the sum of a finite number of monomials,

\sum _{i=0}^{n}a_{i}x^{i}

is continuous, i.e. that any polynomial is continuous.

Doc's not fucking having it. He says the fucking result for the case $x 0 = 0$ is so obvious $(δ = | ε | 1/ n)$ it's not worth worrying about, so he says to get your shit in gear and forget about $x 0 = 0$ already:

\mathrm {Let} \ x_{0}\in \mathbb {R} \backslash \{0\},\ \mathrm {and\ let} \ \varepsilon >0\ \mathrm {be\ given.} \ \mathrm {We\ need} \ \delta >0:

Well, we're talking monomials, so we have:

f(x)=ax^{n}

So let $ε > 0$ be given. We need to show $\exists δ > 0$ such that

First we note that,

{\begin{aligned}|ax^{n}-ax_{0}^{n}|&=|((ax-ax_{0})+ax_{0})^{n}-ax_{0}^{n}|.\end{aligned}}

Next we use the binomial expansion:

((ax-ax_{0})+ax_{0})^{n}=\sum _{k=0}^{n}{n \choose k}\ (ax-ax_{0})^{k}\ ax_{0}^{n-k}.

So we get,

{\begin{aligned}|ax^{n}-ax_{0}^{n}|&={\Big |}\sum _{k=0}^{n}{n \choose k}\ (ax-ax_{0})^{k}\ ax_{0}^{n-k}-ax_{0}^{n}{\Big |}\\&\leq \sum _{k=1}^{n}{n \choose k}\left|(ax-ax_{0})^{k}\ ax_{0}^{n-k}\right|.\end{aligned}}

There are $n$ terms in this sum, so we can say that

If,\ \forall k\in \{1,\dots ,n\},\ {\binom {n}{k}}|(ax-ax_{0})^{k}\ ax_{0}^{n-k}|<\varepsilon /n\ ,\ then\ |ax^{n}-ax_{0}^{n}|<\varepsilon .

To guarantee the above, we just pick

\delta =\min \left\{\ \left({\frac {\varepsilon }{{n \choose k}n|ax_{0}|}}\right)^{\frac {1}{k}},\ \ k\in \{1,\dots ,n\}\ \right\}.

OK, so we've just shown any monomial is continuous. Now, as we said at the outset, we just use the fact that, loosely speaking, $f + g$ is continuous if $f$ and $g$ are cts. And we're done. LudicrousTripe (talk) 01:30, 12 November 2013 (UTC)