Questions tagged [continuity]

Intuitively, a continuous function is one where small changes of input result in correspondingly small changes of output. Use this tag for questions involving this concept. As there are many mathematical formalizations of continuity, please also use an appropriate subject tag such as (real-analysis) or (general-topology)

Analytic Definition: Let $(X, d_X)$ and $(Y, d_Y)$ be metric spaces. A map $f : X \to Y$ is said to be continuous at $x_0$ if for every $\varepsilon > 0$, there is $\delta > 0$ such that $d_Y(f(x_0), f(x)) < \delta$ whenever $d_X(x_0, x) < \varepsilon$. A map $f : X \to Y$ is said to be continuous if it is continuous at $x_0$ for all $x_0 \in X$.

Topological Definition: Let $(X,\mathcal T_X)$ and $(Y, \mathcal T_Y)$ be topological spaces. A map $f : X \to Y$ is said to be continuous if $U \in \mathcal T_Y$ implies that $f^{-1}(U) \in \mathcal T_X$.

In the case of metric spaces, the metric induces a topology, and the two notions of continuity coincide. Note that multiple metrics can induce the same topology, and that not all topologies are metrizable (can be generated from some metric).

Continuity is a sufficient condition for the intermediate value theorem. It is also a necessary condition for the extreme value theorem, as well as differentiability.

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Proof of a continuity for a function represented by an integral.

Please think this problem easy. I faced the following problem the other day. Let $f\in C(0,1]\cap L^{1}(0,1)$. Prove that the function $$ t\mapsto\int_{0}^{t}\frac{f(\tau)}{\sqrt{t-\tau}}d\tau $$ is continuous on $(0,1]$. It seems not easy to…
user
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Functions that change definition with the type of input

Here are some functions that I came over in a question in my mathematics book of chapter continuity. Note that $I$ is the irrational numbers in the following definitions. $$f(x)=\begin{cases} 1 &&\text{if } x \in \mathbb Q \\ 0 &&\text{if } x \in…
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Show that $g(x)=\sqrt{x^{2}+4}$ is continuous at $x=1$

Let $g(x)=\sqrt{x^{2}+4}$ from $\mathbb{R}\rightarrow \mathbb{R}$. I want to show that $g$ is continuous at $x=1$. I have to show that for any $\epsilon>0$, there exists a $\delta>0$ such that $|x-1|< \delta \implies |g(x)-g(1)|<\epsilon$. So I do…
OGC
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Showing value exists with intermediate-value theorem

I have this problem: "Show that the function $f(x) = (x-a)^{2}(x-b) + x$ has a value $f(c) = \frac{a+b}{2}$ for a number c" I am new to this kind of problems and I am having a bit of trouble expressing my answer. Can anyone give me some advice? I…
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Continuity of a function defined on the rationals

I'm presented with the following question, which I think is meant to be a precursor to material on completeness. Let $\alpha$ be an irrational number. Show that the function $f:\mathbb{Q} \to \mathbb{Q}$ defined by $$f(x) = \begin{cases} x, &…
elDin0
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Is the function $g:\mathbb{R} \setminus\{0\} \to \mathbb{R}$ given by $g(x) = 1/x^3$ continuous? Why or why not?

Is the function $g:\mathbb{R} \setminus\{0\} \to \mathbb{R}$ given by $g(x) = 1/x^3$ continuous? Why or why not? A real valued function $f$ is continuous at $a \in \mathbb R$ if the $\lim_{x \to a}f(x) = f(a)$ And more formally a function is…
Ivan
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How to show that this function is continuous

I'm trying to show continuity of the function $$\frac {\ln(1+x^2+y^2)}{x^2+y^2}$$ for $(x,y)\neq 0$, $$f(x,y)=1$$ for $(x,y)= 0$, on $\mathbb{R}^2$ But I am not able to. The numerator is stuck for me as I don't know how to get around the log…
Jacob
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$f$ is monotone on D and $f(D)$ is an interval

$f$ is monotone on D and $f(D)$ is an interval then $f$ is continuous Is my proof right? pf) First, suppose it is monotone increasing Since $f(D)$ is an interval there is $[c,d]$ such that $f(x)\in [c,d]\subset(f(x)-\epsilon,f(x)+\epsilon)\cap f(D)$…
user128766
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Continuous functions

I have a question for you. Let $f\colon\mathbb{R}\rightarrow \mathbb{R}$ continuous. Assume that there exists $s,t\in\mathbb{R}$, with $t>s$, such that $f(s)=0$ and $f(t)>0$. I want to prove that there exists an interval $I=[a,b]$ contained in…
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Continuous function does not map closed set to closed set

I have a question in my textbook ask me to use this function $f(x)=x^2/(1+x^2)$ to show that continuous function does not necessarily map a closed set to a closed set. But I can't find any example to show a closed set map to an open set using this…
Odin
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Continuity of $\arctan\big( \frac{ln(2-x)}{(x-2)}e^x \big)$

I have to examen the continuity of this function: with a an element of [0, +∞[ So far, I've found this: Using the basic algebraic functions I can rewrite f(x) as: f(x) = arctg o P o (exp, Q o (ln o T(2) o T, T(-2))) Now we proof the continuity…
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continuity and differentiable equivalent to 0

This is how I have the proof for this set up. However now I'm not really sure that saying "f'(x)=(f(1)-0)/1=f(1). This is equivalent to f'(x)=f(b). Hence we can write that f'(x)≥f(x)." is the right route to go? Does this look like the right…
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Construction of continuous function

Suppose a function $\phi:[0,1] \rightarrow [-1,1]$. Assume that the function $\phi$ has discontinuity at $x=1$ and $\phi(1)=0$. Question: Is it possible to construct a bijection and continuous function $\phi$ which satisfies all the conditions…
Idonknow
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Can unbounded discontinuous functions be locally bounded?

Consider the function $$f(x) = \frac{x^3}{1+x^3}$$ Obviously this function is discontinuous at $x = -1$ therefore discontinuous on $\mathbb{R}$. Moreover, it is unbounded at the same point. Now, I would not say that this function is locally bounded…
mesllo
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extension of a continuous function

Suppose $f:X\to Y$ is a continuous map between two metric spaces. Can we extend $f$ to a function $f':X'\to Y'$ in such a way that $f'$ is also continuous ($X'$ and $Y'$ are also metric spaces), where $X$ and $Y$ are open subsets of $X'$ and $Y'$…
SAUVIK
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