Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion Calculator

✖Universal Constant is a physical constant that is thought to be universal in its application in terms of Radius of the Earth and Acceleration of Gravity.ⓘ Universal Constant [f]			+10% -10%
✖Mass of the Sun defined as the total amount of matter that the Sun contains. This includes all of its components, such as hydrogen, helium, and trace amounts of heavier elements.ⓘ Mass of the Sun [M_sun]			+10% -10%
✖Mean Radius of the Earth is defined as the arithmetic average of the Earth's equatorial and polar radii.ⓘ Mean Radius of the Earth [R_M]			+10% -10%
✖Distance from the center of the Earth to the center of the Sun is called an astronomical unit (AU). One astronomical unit is approximately 149,597,870.7 kilometers.ⓘ Distance [r_s]			+10% -10%
✖Harmonic Polynomial Expansion Terms for Sun describes the gravitational potential of a celestial body like the Sun.ⓘ Harmonic Polynomial Expansion Terms for Sun [P_s]			+10% -10%

✖Attractive Force Potentials for Sun is referred to the gravitational force exerted by the Sun on an object and can be described by the gravitational potential.ⓘ Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion [V_s]

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Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion Solution

STEP 0: Pre-Calculation Summary

Formula Used

Attractive Force Potentials for Sun = Universal Constant*Mass of the Sun*(Mean Radius of the Earth^2/Distance^3)*Harmonic Polynomial Expansion Terms for Sun
V_s = f*M_sun*(R_M^2/r_s^3)*P_s
This formula uses 6 Variables

Variables Used

Attractive Force Potentials for Sun - Attractive Force Potentials for Sun is referred to the gravitational force exerted by the Sun on an object and can be described by the gravitational potential.
Universal Constant - Universal Constant is a physical constant that is thought to be universal in its application in terms of Radius of the Earth and Acceleration of Gravity.
Mass of the Sun - (Measured in Kilogram) - Mass of the Sun defined as the total amount of matter that the Sun contains. This includes all of its components, such as hydrogen, helium, and trace amounts of heavier elements.
Mean Radius of the Earth - (Measured in Meter) - Mean Radius of the Earth is defined as the arithmetic average of the Earth's equatorial and polar radii.
Distance - (Measured in Meter) - Distance from the center of the Earth to the center of the Sun is called an astronomical unit (AU). One astronomical unit is approximately 149,597,870.7 kilometers.
Harmonic Polynomial Expansion Terms for Sun - Harmonic Polynomial Expansion Terms for Sun describes the gravitational potential of a celestial body like the Sun.

STEP 1: Convert Input(s) to Base Unit

Universal Constant: 2 --> No Conversion Required
Mass of the Sun: 1.989E+30 Kilogram --> 1.989E+30 Kilogram No Conversion Required
Mean Radius of the Earth: 6371 Kilometer --> 6371000 Meter (Check conversion here)
Distance: 150000000 Kilometer --> 150000000000 Meter (Check conversion here)
Harmonic Polynomial Expansion Terms for Sun: 300000000000000 --> No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

V_s = f*M_sun*(R_M^2/r_s^3)*P_s --> 2*1.989E+30*(6371000^2/150000000000^3)*300000000000000

Evaluating ... ...

V_s = 1.43524970576E+25

STEP 3: Convert Result to Output's Unit

1.43524970576E+25 --> No Conversion Required

FINAL ANSWER

1.43524970576E+25 ≈ 1.4E+25 <-- Attractive Force Potentials for Sun

(Calculation completed in 00.004 seconds)

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< Attractive Force Potentials Calculators

Attractive Force Potentials per unit Mass for Moon

LaTeX Go Attractive Force Potentials for Moon = (Universal Constant*Mass of the Moon)/Distance of Point

Mass of Moon given Attractive Force Potentials

LaTeX Go Mass of the Moon = (Attractive Force Potentials for Moon*Distance of Point)/Universal Constant

Attractive Force Potentials per unit Mass for Sun

LaTeX Go Attractive Force Potentials for Sun = (Universal Constant*Mass of the Sun)/Distance of Point

Mass of Sun given Attractive Force Potentials

LaTeX Go Mass of the Sun = (Attractive Force Potentials for Sun*Distance of Point)/Universal Constant

Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion Formula

LaTeX Go

Attractive Force Potentials for Sun = Universal Constant*Mass of the Sun*(Mean Radius of the Earth^2/Distance^3)*Harmonic Polynomial Expansion Terms for Sun
V_s = f*M_sun*(R_M^2/r_s^3)*P_s

What do you mean by Tidal Force?

The Tidal Force is a gravitational effect that stretches a body along the line towards the center of mass of another body due to a gradient (difference in strength) in gravitational field from the other body; it is responsible for diverse phenomena, including tides, tidal locking, breaking apart of celestial bodies.

How to Calculate Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion?

Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion calculator uses Attractive Force Potentials for Sun = Universal Constant*Mass of the Sun*(Mean Radius of the Earth^2/Distance^3)*Harmonic Polynomial Expansion Terms for Sun to calculate the Attractive Force Potentials for Sun, The Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion formula is defined to make the potential energy of the system decrease. As the atoms first begin to interact, the attractive force is stronger than the repulsive force and so the potential energy of the system decreases. Attractive Force Potentials for Sun is denoted by V_s symbol.

How to calculate Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion using this online calculator? To use this online calculator for Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion, enter Universal Constant (f), Mass of the Sun (M_sun), Mean Radius of the Earth (R_M), Distance (r_s) & Harmonic Polynomial Expansion Terms for Sun (P_s) and hit the calculate button. Here is how the Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion calculation can be explained with given input values -> 1.4E+25 = 2*1.989E+30*(6371000^2/150000000000^3)*300000000000000.

FAQ

What is Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion?

The Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion formula is defined to make the potential energy of the system decrease. As the atoms first begin to interact, the attractive force is stronger than the repulsive force and so the potential energy of the system decreases and is represented as V_s = f*M_sun*(R_M^2/r_s^3)*P_s or Attractive Force Potentials for Sun = Universal Constant*Mass of the Sun*(Mean Radius of the Earth^2/Distance^3)*Harmonic Polynomial Expansion Terms for Sun. Universal Constant is a physical constant that is thought to be universal in its application in terms of Radius of the Earth and Acceleration of Gravity, Mass of the Sun defined as the total amount of matter that the Sun contains. This includes all of its components, such as hydrogen, helium, and trace amounts of heavier elements, Mean Radius of the Earth is defined as the arithmetic average of the Earth's equatorial and polar radii, Distance from the center of the Earth to the center of the Sun is called an astronomical unit (AU). One astronomical unit is approximately 149,597,870.7 kilometers & Harmonic Polynomial Expansion Terms for Sun describes the gravitational potential of a celestial body like the Sun.

How to calculate Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion?

The Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion formula is defined to make the potential energy of the system decrease. As the atoms first begin to interact, the attractive force is stronger than the repulsive force and so the potential energy of the system decreases is calculated using Attractive Force Potentials for Sun = Universal Constant*Mass of the Sun*(Mean Radius of the Earth^2/Distance^3)*Harmonic Polynomial Expansion Terms for Sun. To calculate Attractive Force Potentials per unit Mass for Sun given Harmonic Polynomial Expansion, you need Universal Constant (f), Mass of the Sun (M_sun), Mean Radius of the Earth (R_M), Distance (r_s) & Harmonic Polynomial Expansion Terms for Sun (P_s). With our tool, you need to enter the respective value for Universal Constant, Mass of the Sun, Mean Radius of the Earth, Distance & Harmonic Polynomial Expansion Terms for Sun 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 Attractive Force Potentials for Sun?

In this formula, Attractive Force Potentials for Sun uses Universal Constant, Mass of the Sun, Mean Radius of the Earth, Distance & Harmonic Polynomial Expansion Terms for Sun. We can use 2 other way(s) to calculate the same, which is/are as follows -

Attractive Force Potentials for Sun = (Universal Constant*Mass of the Sun)/Distance of Point
Attractive Force Potentials for Sun = (Universal Constant*Mass of the Sun)*((1/Distance of Point)-(1/Distance)-(Mean Radius of the Earth*cos(Angle made by the Distance of Point)/Distance^2))

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