December 21, 2018
#2088: Schwarzschild's Cat explain

[A graph is shown. The x-axis is labeled “Cat size” and the y-axis, “Cat cuteness”. Parallel to and a short distance from the y axis is a dashed line the same length as the y-axis line, representing a vertical asymptote; the space between the y axis and the dashed line is labelled “Critical Limit”. Graphed is a function coming down from infinity, starting close to the dashed line; it then levels off and does not reach zero on-screen. At the top end of the graph is the text “Schwarzschild’s Cat” and an arrow pointing upwards outside of the graph.]