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-   -   Gravity shells (https://www.askmehelpdesk.com/showthread.php?t=591201)

  • Aug 4, 2011, 10:50 PM
    nykkyo
    gravity shells
    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank’s constant. I’m using matrix algebra for mapping the contours (of the accelerations) in a plane (I’m using a projection, of vectors, on a plane; because my computer memory is limited).
    the contour lines, in the plane. They are conversions from polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).





    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank’s constant. I’m using matrix algebra for mapping the contours (of the accelerations) in a plane (I’m using a projection, of vectors, on a plane; because my computer memory is limited).
    the contour lines, in the plane. They are conversions from polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).












    Report post | Thu, 04 Aug 2011 08:16 pm

    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank’s constant. I’m using matrix algebra for mapping the contours (of the accelerations) in a plane (I’m using a projection, of vectors, on a plane; because my computer memory is limited).
    the contour lines, in the plane. They are conversions from polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).












    Report post | Thu, 04 Aug 2011 08:16 pm

    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank’s constant. I’m using matrix algebra for mapping the contours (of the accelerations) in a plane (I’m using a projection, of vectors, on a plane; because my computer memory is limited).
    the contour lines, in the plane. They are conversions from polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).












    Report post | Thu, 04 Aug 2011 08:16 pm

    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank’s constant. I’m using matrix algebra for mapping the contours (of the accelerations) in a plane (I’m using a projection, of vectors, on a plane; because my computer memory is limited).
    the contour lines, in the plane. They are conversions from polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).












    Report post | Thu, 04 Aug 2011 08:16 pm

    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank’s constant. I’m using matrix algebra for mapping the contours (of the accelerations) in a plane (I’m using a projection, of vectors, on a plane; because my computer memory is limited).
    the contour lines, in the plane. They are conversions from polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).







    The accelerations around a mass are in concentric spheres. Each sphere can be thought of as a shell. I was wondering if the concentric shells were separated by Plank's constant. I am using matrix algebra for mapping the contours (of the accelerations) in a plane (I am using a projection, of vectors, on a plane; because my computer memory is limited).
    The contour lines, in the plane, result from conversions of polar coordinates (relative to the masses) to x-y coordinates (relative to the plane).




    Report post | Thu, 04 Aug 2011 08:16 pm








    Report post | Thu, 04 Aug 2011 08:16 pm
  • Aug 5, 2011, 09:25 AM
    RickJ

    Nykko, PLEASE stop posting your question more than once.
    Thank you.

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