sphere with a radius called the Schwarzschild radius, named after the German physicist Karl Schwarzschild, who first calculated it. For a black hole with the mass of the Sun, the Schwarzschild radius is about 3 kilometers (1.9 miles). In comparison, the radius of the Sun is about 700,000...
He did such a good job that the event horizon of a black hole, the boundary beyond which nothing escapes, is known in fancy science circles as the “schwarzschild radius”. Fortunately, for reasonable situations (not-black-hole situations), you can calculate the time dilation ...
Once inside the event horizon, all "events" (points in space-time) stop, and nothing (even light) can escape. The radius of the event horizon is called the Schwarzschild radius, named after astronomer Karl Schwarzschild, whose work led to the theory of black holes. Types of Black Holes ...
Given a metric we can calculate ##K=R^{abcd}R_{abcd}## and for our current version of the Schwarzschild metric [tex]d\tau^2=(1-r_s/r)dt^2-(1-r_s/r)^{-1}dr^2-r^2d\Omega^2[/tex] we have ##K=48G^2M^2/c^4r^6## (according to http://en.wikipedia.org/wiki/Kretsc...
I am trying to add multiple classes to theclassNameattribute on eachli: <likey={index}className={activeClass,data.class, "main-class"}> My React component is: varAccountMainMenu=React.createClass({getInitialState:function() {return{focused:0}; },clicked...
RE: How to calculate the maximum acceleration that a tractor can achieve IRstuff (Aerospace) 9 Mar 16 19:26 It wouldn't turn into a singularity on its own, but it's theoretically possible to have a black hole with Earth mass. The Schwarzschild radius is admittedly small, about 88 mm....
Ok, to calculate the volume of a sphere around a point one needs to calculate the integral of VV, and as rr is dependent on the position, I would suggest to write down Something like V=∫f(A,r)drV=∫f(A,r)dr But I do not know how this looks in detail... Could you help me...