Gravitational Potential when Point is Inside of Conducting Solid Sphere Solution

STEP 0: Pre-Calculation Summary
Formula Used
Gravitational Potential = -([G.]*Mass)/Radius
V = -([G.]*m)/R
This formula uses 1 Constants, 3 Variables
Constants Used
[G.] - Gravitational constant Value Taken As 6.67408E-11
Variables Used
Gravitational Potential - (Measured in Joule per Kilogram) - Gravitational Potential is defined as the amount of work done by external agent in bringing a body of unit mass from infinity to that point by keeping no change in kinetic energy.
Mass - (Measured in Kilogram) - Mass is the quantity of matter in a body regardless of its volume or of any forces acting on it.
Radius - (Measured in Meter) - The Radius of the sphere helps defines a three-dimensional counterpart of a circle, with all its points lying in space at a constant distance from the fixed point.
STEP 1: Convert Input(s) to Base Unit
Mass: 33 Kilogram --> 33 Kilogram No Conversion Required
Radius: 1.25 Meter --> 1.25 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
V = -([G.]*m)/R --> -([G.]*33)/1.25
Evaluating ... ...
V = -1.76195712E-09
STEP 3: Convert Result to Output's Unit
-1.76195712E-09 Joule per Kilogram --> No Conversion Required
FINAL ANSWER
-1.76195712E-09 -1.8E-9 Joule per Kilogram <-- Gravitational Potential
(Calculation completed in 00.004 seconds)

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Birsa Institute of Technology (BIT), Sindri
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7 Gravitational Potential Calculators

Gravitational Potential of Thin Circular Disc
Go Gravitational Potential = -(2*[G.]*Mass*(sqrt(Distance from Center to Point^2+Radius^2)-Distance from Center to Point))/Radius^2
Gravitational Potential when Point is Inside of Non Conducting Solid Sphere
Go Gravitational Potential = -([G.]*Mass*(3*Distance between Centers^2-Distance from Center to Point^2))/(2*Radius^3)
Gravitational Potential of Ring
Go Gravitational Potential = -([G.]*Mass)/(sqrt(Radius of Ring^2+Distance from Center to Point^2))
Gravitational Potential when Point is Outside of Non Conducting Solid Sphere
Go Gravitational Potential = -([G.]*Mass)/Distance from Center to Point
Gravitational Potential when Point is Outside of Conducting Solid Sphere
Go Gravitational Potential = -([G.]*Mass)/Distance from Center to Point
Gravitational Potential
Go Gravitational Potential = -([G.]*Mass)/Displacement of Body
Gravitational Potential when Point is Inside of Conducting Solid Sphere
Go Gravitational Potential = -([G.]*Mass)/Radius

Gravitational Potential when Point is Inside of Conducting Solid Sphere Formula

Gravitational Potential = -([G.]*Mass)/Radius
V = -([G.]*m)/R

How is gravitational potential calculated when point p is inside of conducting solid sphere ?

The gravitational potential when point p is inside of non conducting solid sphere is calculated by the formula V= -GM/a where G is the universal gravitational constant whose value is G = 6.674×10-11 m3⋅kg-1⋅s-2 , M is the mass and a is the radius of the sphere.

What is the unit and dimension of gravitational potential when point p is inside of conducting solid sphere ?

The unit of gravitational potential when point p is inside of conducting solid sphere is Jkg-1. The dimension of gravitational potential is [ M0L2T-2].

How to Calculate Gravitational Potential when Point is Inside of Conducting Solid Sphere?

Gravitational Potential when Point is Inside of Conducting Solid Sphere calculator uses Gravitational Potential = -([G.]*Mass)/Radius to calculate the Gravitational Potential, Gravitational potential when point is inside of conducting solid sphere at a point in the gravitational field of a body is defined as the amount of work done by an external agent in bringing a body of unit mass from infinity to that point by keeping no change in kinetic energy. Gravitational Potential is denoted by V symbol.

How to calculate Gravitational Potential when Point is Inside of Conducting Solid Sphere using this online calculator? To use this online calculator for Gravitational Potential when Point is Inside of Conducting Solid Sphere, enter Mass (m) & Radius (R) and hit the calculate button. Here is how the Gravitational Potential when Point is Inside of Conducting Solid Sphere calculation can be explained with given input values -> -1.8E-9 = -([G.]*33)/1.25.

FAQ

What is Gravitational Potential when Point is Inside of Conducting Solid Sphere?
Gravitational potential when point is inside of conducting solid sphere at a point in the gravitational field of a body is defined as the amount of work done by an external agent in bringing a body of unit mass from infinity to that point by keeping no change in kinetic energy and is represented as V = -([G.]*m)/R or Gravitational Potential = -([G.]*Mass)/Radius. Mass is the quantity of matter in a body regardless of its volume or of any forces acting on it & The Radius of the sphere helps defines a three-dimensional counterpart of a circle, with all its points lying in space at a constant distance from the fixed point.
How to calculate Gravitational Potential when Point is Inside of Conducting Solid Sphere?
Gravitational potential when point is inside of conducting solid sphere at a point in the gravitational field of a body is defined as the amount of work done by an external agent in bringing a body of unit mass from infinity to that point by keeping no change in kinetic energy is calculated using Gravitational Potential = -([G.]*Mass)/Radius. To calculate Gravitational Potential when Point is Inside of Conducting Solid Sphere, you need Mass (m) & Radius (R). With our tool, you need to enter the respective value for Mass & Radius and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Gravitational Potential?
In this formula, Gravitational Potential uses Mass & Radius. We can use 6 other way(s) to calculate the same, which is/are as follows -
  • Gravitational Potential = -([G.]*Mass*(3*Distance between Centers^2-Distance from Center to Point^2))/(2*Radius^3)
  • Gravitational Potential = -([G.]*Mass)/Distance from Center to Point
  • Gravitational Potential = -([G.]*Mass)/Distance from Center to Point
  • Gravitational Potential = -(2*[G.]*Mass*(sqrt(Distance from Center to Point^2+Radius^2)-Distance from Center to Point))/Radius^2
  • Gravitational Potential = -([G.]*Mass)/(sqrt(Radius of Ring^2+Distance from Center to Point^2))
  • Gravitational Potential = -([G.]*Mass)/Displacement of Body
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