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punctured

punctured, ppl. a. (ˈpʌŋktjʊəd) [f. prec.] 1. Pricked, pierced, perforated. Also fig.1672 R. Veel New Court Songs 6 In vain the Surgeon does apply Soft Balsom to a punctur'd Heart. 1797 Abernethy Surg. & Phys. Ess. iii. 97 One of the punctured places ulcerated. 1896 Wells Wheels Chance ix. 62 Just t... Oxford English Dictionary

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Punctured code

However, with puncturing the same decoder can be used regardless of how many bits have been punctured, thus puncturing considerably increases the flexibility wikipedia.org

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Punctured Lung: Symptoms, Treatments, and Recovery - Healthline

chest pain that increases after coughing or taking a deep breath. shortness of breath. abnormal breathing. tightness in the chest. a rapid heart rate. pale or blue skin due to lack of oxygen ...

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What you should know about a punctured lung - Medical News Today

The symptoms of a punctured lung can vary. Usually, the greater the portion of the lung that has collapsed, the worse the symptoms are. Typical symptoms include: Shortness of breath: Because the ...

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Tillie's Punctured Romance

Tillie's Punctured Romance is the name of two early comedy films: Tillie's Punctured Romance (1914 film), starring Marie Dressler, Mabel Normand, and Charles Chaplin Tillie's Punctured Romance (1928 film), starring W. wikipedia.org

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Complex structures on punctured disks. Let $X$ be a smooth surface diffeomorphic to the punctured unit disk $\\{(x,y)\in \mathbb{R}^2 \ | \ 0<x^2+y^2<1\\}$ in the plane. It admits a lot of non equivalent complex struc...

The following is (an adaptation of) theorem 10 of section 6.5 in Ahlfors "Complex Analysis". > Suppose $\Omega \subset \Bbb C$ is an $n$-connected domain for which none of the connected components of $S^2 \setminus \Omega$ are a single point. Then for some real numbers $\lambda_1, ..., \lambda_{n-1}...

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Is the plane minus a line segment homeomorphic with punctured plane? Is $\mathbb R^2$ minus a line segment i.e. $\mathbb R^2 \setminus ([0,1]\times \\{0\\}) $ homeomorphic with a punctured plane $\mathbb R^2\setminus ...

The map $(x,y)\mapsto (u,v)$, described below, is continuous on $\mathbb{R}^2\setminus \\{(0,0)\\}$. Indeed, each of the three pieces is continuous, and they agree on overlaps. $$v=y,\qquad u=\begin{cases} x,\quad &x\le 0,\\\ x/|y|,\quad & 0\le x\le |y|, \\\ x-|y|+1,\quad &x>|y| \end{cases} $$ Also,...

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Annulus Homotopic to punctured plane I know a circle is homtopic to a punctured plane, and by the same reasoning, the aannulus must also be, as it a "step" in the homotopy (IE the annulus is a "stretched" circle). The...

Fact, $S^1\simeq \mathbb{R}\setminus \\{(0,0)\\}$. I want to show that $Y=\\{(x,y)\in \mathbb{R}^2| 1\leq x^2+y^2 \leq 2\\} $ is homotpic to $\mathbb{R}\setminus \\{(0,0)\\}$. This can be done by showing $Y\simeq S^1$. Let $f:S^1\to Y$ send $(x,y)\to (x,y)$. For $(x,y)=z$, let $g(z)= \frac{z}{||z||}...

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The quotient of $\mathbb{C}$ under the cyclic group is the punctured plane? For $G$ is a group generated by a translation, that is, $$G=\langle f \rangle$$ where $f(z)=z+a$ and $a\in \mathbb{C}$. Then consider the qu...

Hint: manipulate the exponential mapping $\exp:\mathbb{C}/2\pi i\mathbb{Z}\to\mathbb{C}^{\times}$.

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Homeomorphism between punctured disk and circle Is there a homeomorphism between the circle $S^1$ and the punctured disk $D^2 \setminus \\{p\\}$, $p\in D^2$ ? Intuitively it seems that when you puncture the disk you...

$S^1$ is compact but the punctured disk is not. You can continuously deform the punctured disc to get $S_1$ by using the retraction mapping: Just walk every point in the punctured disc away from the

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Please explain how to repair a punctured tire

hello YouTube today we're going to discover how to fix a punctured tire as you can see right here looks like we picked up a 10 millimeter screw bolt something to look for any air bubbles coming up and I don't see any and on that note this tires ready be put back on that's it you've learned how to plug your punctured

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Singularities of a complex function in the punctured disc Let $f$ be a holomorphic funclion in the punctured disc $\\{z: 0<|z|<1\\}$ such that $|f(z)|\leq 100 + |\log|z||$, $\forall z\in\mathbb{C}$. Does the point adm...

By Riemann's theorem on removable singularities $$ \bigl\lvert \oint_{\gamma_C} f(z) z^n\,dz \bigr\rvert \leq \oint_{\gamma_C} \bigl\lvert f(z) z^n\bigr\rvert\,dz \leq \oint_{\gamma_C} (100 + \mid \log \mid z \mid \mid) \bigl\lvert z^n\bigr\rvert\,dz = \\\ = 2\pi r^{n+1}100 + \int_{0}^{2\pi}r^n \mid...

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Relationship between punctures and tube pressure What could be the relation between a bicycle's inner tube getting punctured and the pressure of the tube. Are they directly proportional? I.e, if the pressure of Bicy...

It's not going to be directly proportional. Leaving aside the quality of the tyre and what it will be rated for, the shape of the graph is likely to be a U shape: * at the lower pressures the tube will be susceptible to puncture because it cannot repel sharps adequately, in addition really low press...

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Please explain how to repair a punctured car tyre

we show your girl sets on the house of freaks Jack and a couch on you hiya well to make you look always it is guys can all canoe jaws because alloy wheels after the comments from the outside of the middle on the inside steel now this site has been repaired before when what say I repaired no yearsI f...

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Does the torus cover the punctured disc? I am working through Massey's introduction to algebraic topology, < and I have come to the section on covering spaces where it mentions that every induced homomorphism from the...

Since a torus is compact and a punctured disc is not, the covering map doesn't preserve compactness and is therefore not a continuous map.

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punctured

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punctured

Punctured code

Punctured Lung: Symptoms, Treatments, and Recovery - Healthline

What you should know about a punctured lung - Medical News Today

Tillie's Punctured Romance

Complex structures on punctured disks. Let $X$ be a smooth surface diffeomorphic to the punctured unit disk $\\{(x,y)\in \mathbb{R}^2 \ | \ 0<x^2+y^2<1\\}$ in the plane. It admits a lot of non equivalent complex struc...

Is the plane minus a line segment homeomorphic with punctured plane? Is $\mathbb R^2$ minus a line segment i.e. $\mathbb R^2 \setminus ([0,1]\times \\{0\\}) $ homeomorphic with a punctured plane $\mathbb R^2\setminus ...

Annulus Homotopic to punctured plane I know a circle is homtopic to a punctured plane, and by the same reasoning, the aannulus must also be, as it a "step" in the homotopy (IE the annulus is a "stretched" circle). The...

The quotient of $\mathbb{C}$ under the cyclic group is the punctured plane? For $G$ is a group generated by a translation, that is, $$G=\langle f \rangle$$ where $f(z)=z+a$ and $a\in \mathbb{C}$. Then consider the qu...

Homeomorphism between punctured disk and circle Is there a homeomorphism between the circle $S^1$ and the punctured disk $D^2 \setminus \\{p\\}$, $p\in D^2$ ? Intuitively it seems that when you puncture the disk you...

Please explain how to repair a punctured tire

Singularities of a complex function in the punctured disc Let $f$ be a holomorphic funclion in the punctured disc $\\{z: 0<|z|<1\\}$ such that $|f(z)|\leq 100 + |\log|z||$, $\forall z\in\mathbb{C}$. Does the point adm...

Relationship between punctures and tube pressure What could be the relation between a bicycle's inner tube getting punctured and the pressure of the tube. Are they directly proportional? I.e, if the pressure of Bicy...

Please explain how to repair a punctured car tyre

Does the torus cover the punctured disc? I am working through Massey's introduction to algebraic topology, < and I have come to the section on covering spaces where it mentions that every induced homomorphism from the...