Anirudh Singh
National Institute of Technology (NIT), Jamshedpur
Anirudh Singh has created this Calculator and 300+ more calculators!
Urvi Rathod
Vishwakarma Government Engineering College (VGEC), Ahmedabad
Urvi Rathod has verified this Calculator and 500+ more calculators!

11 Other formulas that you can solve using the same Inputs

Velocity of alpha particle using distance of closest approach
Velocity of alpha particle=sqrt(([Coulomb]*Atomic number*([Charge-e]^2))/([Atomic-m]*Distance of closest approach)) GO
Distance of closest approach
Distance of closest approach=([Coulomb]*4*Atomic number*([Charge-e]^2))/([Atomic-m]*(Velocity of alpha particle^2)) GO
Energy in nth Bohr’s Orbit
Energy in nth Bohr's unit=-13.6*((Atomic number)^2)/((No of level in the orbit)^2) GO
Number Of Spectral Lines
Number Of Spectral Lines=(Quantum Number*(Quantum Number-1))/2 GO
Radius Of The Orbit
Radius=(Quantum Number*Plancks Constant)/(2*pi*Mass*Velocity) GO
Magnetic Moment
Magnetic Moment=sqrt(Quantum Number*(Quantum Number+2))*1.7 GO
Angular Momentum Using Quantum Number
Angular Momentum=(Quantum Number*Plancks Constant)/(2*pi) GO
Potential Energy Of Electron
Energy=1.085*10^-18*(Atomic number)^2/(Quantum Number)^2 GO
Total Energy Of Electron
Energy=-1.085*(Atomic number)^2/(Quantum Number)^2 GO
Bohr's Radius
Radius=(Quantum Number/Atomic number)*0.529*10^-10 GO
Number of neutrons
Number of Neutrons=Mass number-Atomic number GO

11 Other formulas that calculate the same Output

Energy of an electron in an elliptical orbit
Energy=(-((Atomic number^2)*[Mass-e]*([Charge-e]^4))/(8*([Permitivity-vacuum]^2)*([hP]^2)*(Quantum Number^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
Energy Of A Moving Particle Using Wavelength
Energy=(Plancks Constant*Velocity Of Light in Vacuum)/Wavelength GO
Energy Of A Moving Particle Using Wave Number
Energy=Plancks Constant*Velocity Of Light in Vacuum*Wave Number GO
Potential Energy Of Electron
Energy=1.085*10^-18*(Atomic number)^2/(Quantum Number)^2 GO
Total Energy Of Electron
Energy=-1.085*(Atomic number)^2/(Quantum Number)^2 GO
Energy of stationary state of hydrogen
Energy=-([Rydberg])*(1/(Quantum Number^2)) GO
Energy Of A Moving Particle Using Frequency
Energy=Plancks Constant*frequency GO
Energy of particle when de-Broglie wavelength is given
Energy=([hP]*[c])/Wavelength GO
Energy of a particle
Energy=[hP]*frequency GO
Einstein's mass-energy relation
Energy=Mass*([c]^2) GO

Kinetic Energy Of A Electron Formula

Energy=-2.178*10^-18*(Atomic number)^2/(Quantum Number)^2
e=-2.178*10^-18*(Z)^2/(n)^2
More formulas
Wave Number Of A Moving Particle GO
Bohr's Radius GO
Potential Energy Of Electron GO
Total Energy Of Electron GO
Change In Wavelength Of A Moving Particle GO
Change In Wave Number Of A Moving Particle GO
Wavelength Of A Moving Particle GO
Angular Momentum GO
Radius Of The Orbit GO
Velocity Of The Particle GO
Wavelength Using Energy GO
Frequency Using Energy GO
Electrostatic force between nucleus and electron GO
Radius of Bohr's orbit when atomic number is given GO
Velocity of electron in Bohr's orbit GO
Orbital frequency of an electron GO
Kinetic energy of electron when atomic number is given GO
Potential energy of electron when atomic number is given GO
Total energy of electron when atomic number is given GO
Time period of revolution of electron GO
Angular velocity of electron GO
Ionization potential GO
Wave number when frequency of photon is given GO
Radius of Bohr's orbit GO
Radius of Bohr's orbit for the Hydrogen atom GO
Total energy of electron in nth orbit GO
Radius of orbit when kinetic energy of electron is given GO
Velocity of electron in orbit when angular velocity is given GO
Radius of orbit when angular velocity is given GO
Orbital frequency when velocity of electron is given GO
Radius of orbit when potential energy of electron is given GO
Velocity of electron when time period of electron is given GO
Radius of orbit when time period of electron is given GO
Radius of orbit when total energy of electron is given GO

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 Kinetic Energy Of A Electron?

Kinetic Energy Of A Electron calculator uses Energy=-2.178*10^-18*(Atomic number)^2/(Quantum Number)^2 to calculate the Energy, The Kinetic Energy Of a Electron formula is defined as kinetic energy consumed by a moving particle when it moves from one point to another. Energy and is denoted by e symbol.

How to calculate Kinetic Energy Of A Electron using this online calculator? To use this online calculator for Kinetic Energy Of A Electron, enter Atomic number (Z) and Quantum Number (n) and hit the calculate button. Here is how the Kinetic Energy Of A Electron calculation can be explained with given input values -> -6.294E-16 = -2.178*10^-18*(17)^2/(1)^2.

FAQ

What is Kinetic Energy Of A Electron?
The Kinetic Energy Of a Electron formula is defined as kinetic energy consumed by a moving particle when it moves from one point to another and is represented as e=-2.178*10^-18*(Z)^2/(n)^2 or Energy=-2.178*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 Kinetic Energy Of A Electron?
The Kinetic Energy Of a Electron formula is defined as kinetic energy consumed by a moving particle when it moves from one point to another is calculated using Energy=-2.178*10^-18*(Atomic number)^2/(Quantum Number)^2. To calculate Kinetic Energy Of A 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 11 other way(s) to calculate the same, which is/are as follows -
  • Energy=Plancks Constant*frequency
  • Energy=1.085*10^-18*(Atomic number)^2/(Quantum Number)^2
  • Energy=-1.085*(Atomic number)^2/(Quantum Number)^2
  • Energy=(Plancks Constant*Velocity Of Light in Vacuum)/Wavelength
  • Energy=Plancks Constant*Velocity Of Light in Vacuum*Wave Number
  • Energy=-([Rydberg])*(1/(Quantum Number^2))
  • Energy=(-((Atomic number^2)*[Mass-e]*([Charge-e]^4))/(8*([Permitivity-vacuum]^2)*([hP]^2)*(Quantum Number^2)))
  • Energy=(-([Mass-e]*([Charge-e]^4)*(Atomic number^2))/(8*([Permitivity-vacuum]^2)*(Quantum Number^2)*([hP]^2)))
  • Energy=[hP]*frequency
  • Energy=([hP]*[c])/Wavelength
  • Energy=Mass*([c]^2)
Share Image
Let Others Know
Facebook
Twitter
Reddit
LinkedIn
Email
WhatsApp
Copied!