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Barack Obama

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I did. It's not something that I'm proud of. It was a mistake … But you know, I'm not going to. I never understood that line. The point was to inhale. That was the point.
--
When asked "Unlike other presidents, did you inhale?"

 
Barack Obama

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How could one argue with a man who was always drawing lines and circles to explain the position; who, one day, drew a diagram [here Michael illustrated with pen and paper] saying 'take a point A, draw a straight line to point B, now three-fourths of the way up the line take a point C. The straight line AB is the road to the Republic; C is where we have got to along the road, we canot move any further along the straight road to our goal B; take a point out there, D [off the line AB]. Now if we bend the line a bit from C to D then we can bend it a little further, to another point E and if we can bend it to CE that will get us around Cathal Brugha which is what we want!' How could you talk to a man like that?

 
Eamon de Valera
 

Neither the circle without the line, nor the line without the point, can be artificially produced. It is, therefore, by virtue of the point and the Monad that all things commence to emerge in principle.
That which is affected at the periphery, however large it may be, cannot in any way lack the support of the central point.

 
John Dee
 

The geometric line is an invisible thing. It is the track made by the moving point; that is, its product. It is created by movement – specifically through the destruction of the intense self-contained repose of the point. Here, the leap out of the static to the dynamic occurs. […] The forces coming from without which transform the point into a line, can be very diverse. The variation in lines depends upon the number of these forces and upon their combinations.

 
Wassily Kandinsky
 

...the stereographic projection of the spherical surface. From the north pole P we draw radial lines to project every point of the surface of the sphere upon the horizontal plane [below, perpendicular to a line joining it to P and the sphere's center]. In general this transformation is unique and continuous , although the metrical relations are distorted; for the point P, however, it shows a singularity. Point P is mapped upon the infinite; i.e., no finitely located point of the plane corresponds to it. It can be shown that every transformation possesses a singularity in at least one point. The surface of the sphere is therefore called topologically different from the plane. Only a "sphere without a north pole" [point] would be topologically equivalent to a plane. ...such a sphere has a point-shaped hole without a boundary and is no longer a closed surface.

 
Hans Reichenbach
 

This was probably rooted in a belief that had been inculcated to him from the get-go: that there was an objective reality, which all people worth talking to could observe and understand, and that there was no point in arguing about anything that could be so observed and so understood. As long as you made a point of hanging out exclusively with people who had the wit to see and to understand that objective reality, you didn’t have to waste a lot of time talking. When a thunderstorm was headed your way across the prairie, you took the washing down from the line and closed the windows. It wasn’t necessary to have a meeting about it. The sales force didn’t need to get involved.

 
Neal Stephenson
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