# find the average distance from a point in a ball of radius a

find the average distance from a point in a ball of radius a

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• find the average distance from a point in a ball of radius a
• Best Answer: You only need a simple integration to figure this out. Let’s start with the average from a point in a CIRCLE of radius b to its center because thats a bit easier to see. the “number” of points with a distance of exactly r from the center is the circumference of a circle of diameter r (or 2 * pi …

• find the average distance from a point in a ball of radius a
• Answer to Use spherical coordinates : Find the average distance from a point in a ball of radius a to its center…. Skip Navigation. Chegg home. Books. Study. Textbook Solutions Expert Q&A. Writing. Math Solver. … Find the average distance from a point in a ball of radius a to its center. Expert Answer 100% (16 ratings) Previous question …

• find the average distance from a point in a ball of radius a
• Find the average value of the square of the distance from a point on the boundary of a ball of radius 2 in R^3 to the points inside the ball. Having a little trouble with this homework problem. I can’t figure out how to set up the problem. Note that it is not asking for the average distance to the center, but to all internal points.

• find the average distance from a point in a ball of radius a
• Find the average distance between a point in the sphere to the origin. … Average distance from a point in a sphere to the origin. Ask Question … but I think you mean a ball, not a sphere. If the points were on the surface of the sphere the average distance would obviously be the radius. \$\endgroup\$ – Javier Nov 12 ’12 at 21:16.
• https://math.stackexchange.com/questions/235940/average-distance-from-a-point-in-a-sphere-to-the-origin

• find the average distance from a point in a ball of radius a
• That distance depends only on how far away the point is from the centre. To calculate the mean distance between a specific point inside and the sphere, split the sphere into thin wedges joined together at the axis on which the point lies; then the mean distance is independent of the wedge.
• https://math.stackexchange.com/questions/875011/average-distance-from-a-point-in-a-ball-to-a-point-on-its-boundary

• find the average distance from a point in a ball of radius a
• Answer to Find the average distance from a point in a ball of radius a to its center? using triple integrals in spherical coordina… Skip Navigation. Chegg home. Books. … Question: Find The Average Distance From A Point In A Ball Of Radius A To Its Center? Using Triple Integrals In Spherical Coordinates. This problem has been solved!

• Circle
• The average distance from any point inside a circle radius 10 to an arbitrary point on the edge of the circle? How do we find the cdf of distance between two points inside a circle of radius R,distance b/w points is d.?

• find the average distance from a point in a ball of radius a
• Thus the average squared distance between two point in a unit disk is 1, and the average cubed distance is 2048/(525π). Incidentally, this last formula shows that if C n denotes the nth Catalan number, then the average (2k)th power of distances on a unit disk is just C k+1 /(k+1).
• https://mathpages.com/home/kmath324/kmath324.htm

• find the average distance from a point in a ball of radius a
• Now given the radius variable I want a new column say “X” that for each point only contains the number of other points that are within “radius”. I do not care about which points these are. While this R – Finding closest neighboring point and number of neighbors within a given radius, coordinates lat-long topic and answer get close it does not solve the specific question of the simple count.

• find the average distance from a point in a ball of radius a
• Average Radial Distance of Points within a Circle Date: 03/26/2003 at 03:35:51 From: Dashiel Subject: The Average Radial Distance of Points Within a Circle I’m trying to determine the average value of a circular/radial gradient that is at full value (white, call it 100% brightness) in the center, and drops in a linear fashion to zero (black, call it 0% brightness) at the radius.
• http://mathforum.org/library/drmath/view/62529.html