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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Find the value of K so that the function is continuous

f(n) = \begin{cases} \frac{ln(3x+1)}{5x}, & \text{ $x$ >0} \\[2ex] \frac{2x^2 -1}{k+2}, & \text{if $x$ $\leq$0} \end{cases} The value I found is $k$ =$-\frac{11}{3}$ but I'm not sure I did it right, here's what I did: $\lim\limits_{x \to 0}…
Robangiu
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Can a Function Mapping into a Higher Order Domain be Continuous?

Just a simple question: Can a function mapping $\mathbb{R}^m$ into $\mathbb{R}^n$ be a continuous function when m < n? My gut says "No." My brain says "Go to bed already." I'm trying to prove something using a result that holds for continuous…
kh7
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Is a linear and nonlinear function (at the same time) possible?

Is it possible for an elementary continuous and non-piecewise function to be linear on some part of the interval and nonlinear on another part of the interval? For instance; a function has second derivative zero on [1,4] and after x = 4, it starts…
artmyb
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Definition range and and continuity of a function with two variables

I have the following function: $$ g_{n}(x) = \frac{x^n}{1+x^n} $$ with $$ g_{n}:D_{n} \rightarrow \mathbb{R} $$ I want to define the maximal definition range of $ D_{n} \subset \mathbb{R} $ and check where the function g is continuous, but have some…
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Showing $f$ is not locally Lipschitz continuous in its 2nd argument

$$f(t,x)=\begin{cases}0,&& t\le0\\2t, && t>0 \ \wedge \ x<0\\ 2t-\frac{4x}{t}, && t>0 \ \wedge \ 0\le x\le t^2\\ -2t, && t>0 \ \wedge \ t^2
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Continuity of composite function

$f:\mathbb{R}\to\mathbb{R}$ is a continuous function. I need to check whether $g(x)$ is also continuous for: $$ g(x)=\frac{1}{\min\{f(x),-1\}} $$ Two questions: Can I show the continuity of $g(x)$ by using $f(x)=x$ or should I use more generalized…
syntagma
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Continuity of a piecewise defined function

The function f(x) is defined by: f(x)=x, if x is rational f(x)=2x, if x is irrational Is f continuous? Now my answer was the following: let a=√2 (any irrational number would do). Then f(a)=2√2. But, as x gets arbitrarily close to a, x is rational,…
user600210
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Points of discontinuity and non differentiability of $| \sin(\pi/x)|$?

What are the points of discontinuity and non-differentiability of $| \sin(\pi/x)|$? I tried finding out the points of discontinuity for the function but couldn't understand why would a mod function by discontinuous at all... Plz help me out , also…
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Continuous map example

I am trying to understand the distinction between continuous maps between varieties and morphisms between varieties, and I believe a concrete example illustrating the distinction will help. What is an example of a continuous map $\pi:A\rightarrow B$…
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$f(\mathbb{Q}) \subset \mathbb{R} - \mathbb{Q}$ and $f(\mathbb{R} - \mathbb{Q}) \subset \mathbb{Q}$

Continuous function $f$ such that $f(\mathbb{Q}) \subset \mathbb{R} - \mathbb{Q}$ and $f(\mathbb{R} - \mathbb{Q}) \subset \mathbb{Q}$ (I know this question has already been asked and answered but there the idea used was the cardinality of…
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Proof or counterexample: If $f:D\rightarrow \Bbb R$ is continuous on topological space $D$, and $k\in \Bbb R$, then $kf$ is continuous on $D$.

So basically, the question is pretty straight forward. But I’m having troubles proving or countering the following statement, because of the constant k. If $f:D\rightarrow \Bbb R$ is continuous on a topological space $D$ and $k\in \Bbb R$, then…
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Continuity of a function $f(x)=\begin{cases} -1, & x<0 \\ b, & x=0 \\ +1, & x>0 \end{cases}$

This is a homework problem so I would prefer hints to answers. $b \in \mathbb{R} $ $f(x)=\begin{cases} -1, & x<0 \\ b, & x=0 \\ +1, & x>0 \end{cases}$ Does a number b exist so that $f(x)$ is continous? I believe $f(x)$to be continuous for $x>0$ and…
Winther
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Is a function with an undefined removable discontinuity considered continuous?

I've heard a few times the definition of a continuous function simplified to "Being able to draw the graph of the function without picking our pencil". A more rigorous definition states that a function is continuous on a domain $(a,b)$ if for all…
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continuous function on a set of infimums

The function $f:[0;1]\rightarrow\mathbb{R}$ is defined by $f(x):= \inf\{|nx-1|:n\in\mathbb{N}\}$.$\:$Show that $f$ is continuous on $(0;1]$. First of all I'm not sure if I fully understand the function. $\:$We fix one "$x_0$" and then multiply it by…
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Continuity of a function and bound

Please, check my solution. Task: let $f(x): \mathbb{R} \rightarrow \mathbb{R}$. If $f(x)\le M$ for every $x\in\mathbb{Q}$ then is is also $\le M$ for every irrational number. Me solution: if it is continuous then for every $\varepsilon > 0$ we can…
user596269