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National Institute of Technology (NIT), Jamshedpur
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Potential Energy of Electron Solution

STEP 0: Pre-Calculation Summary
Formula Used
energy = 1.085*10^-18*(Atomic number)^2/(Quantum Number)^2
e = 1.085*10^-18*(Z)^2/(n)^2
This formula uses 2 Variables
Variables Used
Atomic number- Atomic number is the number of protons present inside the nucleus of an atom of an element.
Quantum Number- Quantum Number describe values of conserved quantities in the dynamics of a quantum system.
STEP 1: Convert Input(s) to Base Unit
Atomic number: 17 --> No Conversion Required
Quantum Number: 1 --> No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
e = 1.085*10^-18*(Z)^2/(n)^2 --> 1.085*10^-18*(17)^2/(1)^2
Evaluating ... ...
e = 3.13565E-16
STEP 3: Convert Result to Output's Unit
3.13565E-16 Joule --> No Conversion Required
FINAL ANSWER
3.13565E-16 Joule <-- Energy
(Calculation completed in 00.000 seconds)

10+ Bohr's atomic model Calculators

Radius of Bohr's orbit
radius_of_orbit = ((Quantum Number^2)*([hP]^2))/(4*(pi^2)*[Mass-e]*[Coulomb]*Atomic number*([Charge-e]^2)) Go
Total energy of electron in nth orbit
energy = (-([Mass-e]*([Charge-e]^4)*(Atomic number^2))/(8*([Permitivity-vacuum]^2)*(Quantum Number^2)*([hP]^2))) Go
Radius of Bohr's orbit for the Hydrogen atom
radius_of_orbit = ((Quantum Number^2)*([hP]^2))/(4*(pi^2)*[Mass-e]*[Coulomb]*([Charge-e]^2)) Go
Ionization potential
ionization_potential = ([Rydberg]*(Atomic number^2))/(Quantum Number^2) Go
Time period of revolution of electron
time_period_of_electron = (2*pi*Radius of orbit)/Velocity of electron Go
Radius of orbit when kinetic energy of electron is given
radius_of_orbit = (Atomic number*([Charge-e]^2))/(2*Kinetic Energy) Go
Velocity of electron in orbit when angular velocity is given
velocity_of_electron = Angular Velocity*Radius of orbit Go
Radius of orbit when angular velocity is given
radius_of_orbit = Velocity of electron/Angular Velocity Go
Angular velocity of electron
angular_velocity = Velocity of electron/Radius of orbit Go
Wave number when frequency of photon is given
wave_number_of_particle = Frequency of photon/[c] Go

Potential Energy of Electron Formula

energy = 1.085*10^-18*(Atomic number)^2/(Quantum Number)^2
e = 1.085*10^-18*(Z)^2/(n)^2

What is Bohr's theory?

Bohr's Theory is a theory of atomic structure in which the hydrogen atom (Bohr atom ) is assumed to consist of a proton as nucleus, with a single electron moving in distinct circular orbits around it, each orbit corresponding to a specific quantized energy state: the theory was extended to other atoms.

How to Calculate Potential Energy of Electron?

Potential Energy of Electron calculator uses energy = 1.085*10^-18*(Atomic number)^2/(Quantum Number)^2 to calculate the Energy, The Potential Energy Of Electron. formula is defined as .the energy consumed by a particle in moving from one point to another. Energy and is denoted by e symbol.

How to calculate Potential Energy of Electron using this online calculator? To use this online calculator for Potential Energy of Electron, enter Atomic number (Z) and Quantum Number (n) and hit the calculate button. Here is how the Potential Energy of Electron calculation can be explained with given input values -> 3.136E-16 = 1.085*10^-18*(17)^2/(1)^2.

FAQ

What is Potential Energy of Electron?
The Potential Energy Of Electron. formula is defined as .the energy consumed by a particle in moving from one point to another and is represented as e = 1.085*10^-18*(Z)^2/(n)^2 or energy = 1.085*10^-18*(Atomic number)^2/(Quantum Number)^2. Atomic number is the number of protons present inside the nucleus of an atom of an element and Quantum Number describe values of conserved quantities in the dynamics of a quantum system.
How to calculate Potential Energy of Electron?
The Potential Energy Of Electron. formula is defined as .the energy consumed by a particle in moving from one point to another is calculated using energy = 1.085*10^-18*(Atomic number)^2/(Quantum Number)^2. To calculate Potential Energy of Electron, you need Atomic number (Z) and Quantum Number (n). With our tool, you need to enter the respective value for Atomic number and Quantum Number 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 Energy?
In this formula, Energy uses Atomic number and Quantum Number. We can use 10 other way(s) to calculate the same, which is/are as follows -
  • radius_of_orbit = (Atomic number*([Charge-e]^2))/(2*Kinetic Energy)
  • velocity_of_electron = Angular Velocity*Radius of orbit
  • radius_of_orbit = Velocity of electron/Angular Velocity
  • radius_of_orbit = ((Quantum Number^2)*([hP]^2))/(4*(pi^2)*[Mass-e]*[Coulomb]*Atomic number*([Charge-e]^2))
  • radius_of_orbit = ((Quantum Number^2)*([hP]^2))/(4*(pi^2)*[Mass-e]*[Coulomb]*([Charge-e]^2))
  • energy = (-([Mass-e]*([Charge-e]^4)*(Atomic number^2))/(8*([Permitivity-vacuum]^2)*(Quantum Number^2)*([hP]^2)))
  • angular_velocity = Velocity of electron/Radius of orbit
  • wave_number_of_particle = Frequency of photon/[c]
  • ionization_potential = ([Rydberg]*(Atomic number^2))/(Quantum Number^2)
  • time_period_of_electron = (2*pi*Radius of orbit)/Velocity of electron
Where is the Potential Energy of Electron calculator used?
Among many, Potential Energy of Electron calculator is widely used in real life applications like {FormulaUses}. Here are few more real life examples -
{FormulaExamplesList}
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