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Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Formula

GoMass of Sun given Attractive Force Potentials Formula

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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. Check FAQs

M sun = \frac{V s \cdot {r s}^{3}}{{[Earth-R]}^{2} \cdot f \cdot P s}

M_sun - Mass of the Sun?V_s - Attractive Force Potentials for Sun?r_s - Distance?f - Universal Constant?P_s - Harmonic Polynomial Expansion Terms for Sun?[Earth-R] - Earth mean radius?

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Example

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Here is how the Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion equation looks like with Values.

Here is how the Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion equation looks like with Units.

Here is how the Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion equation looks like.

2.2E+30 = \frac{1.6E+25 \cdot {1.5E+8}^{3}}{{6371.0088}^{2} \cdot 2 \cdot 3E+14}

2.2E+30kg = \frac{1.6E+25 \cdot {1.5E+8km}^{3}}{{6371.0088km}^{2} \cdot 2 \cdot 3E+14}

2.2E+30 = \frac{1.6E+25 \cdot {1.5E+8}^{3}}{{6371.0088}^{2} \cdot 2 \cdot 3E+14}

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Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Solution

Follow our step by step solution on how to calculate Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion?

FIRST Step Consider the formula

M sun = \frac{V s \cdot {r s}^{3}}{{[Earth-R]}^{2} \cdot f \cdot P s}

Next Step Substitute values of Variables

∴

M sun = \frac{1.6E+25 \cdot {1.5E+8km}^{3}}{{[Earth-R]}^{2} \cdot 2 \cdot 3E+14}

Next Step Substitute values of Constants

∴

M sun = \frac{1.6E+25 \cdot {1.5E+8km}^{3}}{{6371.0088km}^{2} \cdot 2 \cdot 3E+14}

Next Step Convert Units

∴

M sun = \frac{1.6E+25 \cdot {1.5E+11m}^{3}}{{6371.0088km}^{2} \cdot 2 \cdot 3E+14}

Next Step Prepare to Evaluate

∴

M sun = \frac{1.6E+25 \cdot {1.5E+11}^{3}}{{6371.0088}^{2} \cdot 2 \cdot 3E+14}

Next Step Evaluate

∴

M sun = 2.21730838599745E+30kg

LAST Step Rounding Answer

∴

M sun = 2.2E+30kg

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Formula Elements

Variables

Constants

Mass of the Sun

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.

Symbol: M_sun

Measurement: WeightUnit: kg

Note: Value can be positive or negative.

Formulas to find Mass of the Sun

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.

Symbol: V_s

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Attractive Force Potentials for Sun

Distance

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.

Symbol: r_s

Measurement: LengthUnit: km

Note: Value should be greater than 0.

Formulas to find Distance

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.

Symbol: f

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Universal Constant

Harmonic Polynomial Expansion Terms for Sun

Harmonic Polynomial Expansion Terms for Sun describes the gravitational potential of a celestial body like the Sun.

Symbol: P_s

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Harmonic Polynomial Expansion Terms for Sun

Earth mean radius

Earth mean radius represents the average distance from the Earth's center to any point on its surface, providing a single value to characterize the size of the Earth.

Symbol: [Earth-R]

Value: 6371.0088 km

Other Formulas to find Mass of the Sun

Go Mass of Sun given Attractive Force Potentials

M sun = \frac{V s \cdot r S/MX}{f}

Other formulas in Attractive Force Potentials category

Go Attractive Force Potentials per unit Mass for Moon

V M = \frac{f \cdot M}{r S/MX}

Go Attractive Force Potentials per unit Mass for Sun

V s = \frac{f \cdot M sun}{r S/MX}

Go Mass of Moon given Attractive Force Potentials

M = \frac{V M \cdot r S/MX}{f}

Go Moon's Tide-generating Attractive Force Potential

V M = f \cdot M \cdot ((\frac{1}{r S/MX}) - (\frac{1}{r m}) - ([Earth-R] \cdot \frac{\cos (θ m/s)}{{r m}^{2}}))

How to Evaluate Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion?

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion evaluator uses Mass of the Sun = (Attractive Force Potentials for Sun*Distance^3)/([Earth-R]^2*Universal Constant*Harmonic Polynomial Expansion Terms for Sun) to evaluate the Mass of the Sun, The Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion formula is 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 is denoted by M_sun symbol.

How to evaluate Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion using this online evaluator? To use this online evaluator for Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion, enter Attractive Force Potentials for Sun (V_s), Distance (r_s), Universal Constant (f) & Harmonic Polynomial Expansion Terms for Sun (P_s) and hit the calculate button.

FAQs on Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion

What is the formula to find Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion?

The formula of Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion is expressed as Mass of the Sun = (Attractive Force Potentials for Sun*Distance^3)/([Earth-R]^2*Universal Constant*Harmonic Polynomial Expansion Terms for Sun). Here is an example- 2.2E+30 = (1.6E+25*150000000000^3)/([Earth-R]^2*2*300000000000000).

How to calculate Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion?

With Attractive Force Potentials for Sun (V_s), Distance (r_s), Universal Constant (f) & Harmonic Polynomial Expansion Terms for Sun (P_s) we can find Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion using the formula - Mass of the Sun = (Attractive Force Potentials for Sun*Distance^3)/([Earth-R]^2*Universal Constant*Harmonic Polynomial Expansion Terms for Sun). This formula also uses Earth mean radius constant(s).

What are the other ways to Calculate Mass of the Sun?

Here are the different ways to Calculate Mass of the Sun-

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

Can the Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion be negative?

Yes, the Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion, measured in Weight can be negative.

Which unit is used to measure Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion?

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion is usually measured using the Kilogram[kg] for Weight. Gram[kg], Milligram[kg], Ton (Metric)[kg] are the few other units in which Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion can be measured.

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Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Formula

​GoMass of Sun given Attractive Force Potentials Formula

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Example

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Solution

Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion Formula Elements

Other Formulas to find Mass of the Sun

Other formulas in Attractive Force Potentials category

How to Evaluate Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion?

FAQs on Mass of Sun given Attractive Force Potentials with Harmonic Polynomial Expansion

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GoMass of Sun given Attractive Force Potentials Formula