Akshada Kulkarni
National Institute of Information Technology (NIIT), Neemrana
Akshada Kulkarni has created this Calculator and 400+ more calculators!
Suman Ray Pramanik
Indian Institute of Technology (IIT), Kanpur
Suman Ray Pramanik has verified this Calculator and 100+ more calculators!

2 Other formulas that you can solve using the same Inputs

Radial momentum of electron when angular momentum is given
Radial momentum=sqrt((Total momentum^2)-(Angular Momentum^2)) GO
Total momentum of electrons in the elliptical orbit
Total momentum=sqrt((Angular Momentum^2)+(Radial momentum^2)) GO

11 Other formulas that calculate the same Output

Orbital Angular Momentum
Angular Momentum=sqrt(Azimuthal Quantum Number*(Azimuthal Quantum Number+1))*Plancks Constant/(2*pi) GO
Spin Angular Momentum
Angular Momentum=sqrt(Spin Quantum Number*(Spin Quantum Number+1))*Plancks Constant/(2*pi) GO
Angular momentum of electron
Angular Momentum=(Minor axis of elliptical orbit*[hP])/(2*pi) GO
Initial angular momentum
Angular Momentum=Moment of Inertia*Initial angular velocity GO
Angular momentum in terms of kinetic energy
Angular Momentum=sqrt(2*Moment of Inertia*Kinetic Energy) GO
Angular Momentum Using Quantum Number
Angular Momentum=(Quantum Number*Plancks Constant)/(2*pi) GO
Angular moment of momentum at inlet
Angular Momentum=Tangential velocity at inlet*Radius 1 GO
Angular moment of momentum at exit
Angular Momentum=Tangential velocity at exit*Radius 1 GO
Angular momentum using moment of inertia
Angular Momentum=Moment of Inertia*Angular Velocity GO
Angular Momentum
Angular Momentum=Moment of Inertia*Angular Velocity GO
Angular Momentum
Angular Momentum=Mass*Velocity*Radius GO

Angular momentum of electron when radial momentum is given Formula

Angular Momentum=sqrt((Total momentum^2)-(Radial momentum^2))
L=sqrt((p^2)-(p<sub>r</sub>^2))
More formulas
Angular momentum of electron GO
Quantum number of electron in elliptical orbit GO
Radial momentum of an electron GO
Energy of an electron in an elliptical orbit GO
Total momentum of electrons in the elliptical orbit GO
Radial quantization number of electron in elliptical orbit GO
Angular quantization number of electron in elliptical orbit GO
Radial momentum of electron when angular momentum is given GO

What is Sommerfeld atomic model?

Sommerfeld model was proposed to explain the fine spectrum. Sommerfeld predicted that electrons revolve in elliptical orbits as well as circular orbits. During the motion of electrons in a circular orbit, the only angle of revolution changes while the distance from the nucleus remains the same but in an elliptical orbit, both are changed. The distance from the nucleus is termed as radius vector and the angle of revolution predicted is the azimuthal angle.

How to Calculate Angular momentum of electron when radial momentum is given?

Angular momentum of electron when radial momentum is given calculator uses Angular Momentum=sqrt((Total momentum^2)-(Radial momentum^2)) to calculate the Angular Momentum, The Angular momentum of electron when radial momentum is given is defined as the rotational equivalent of linear momentum. It is denoted as L. Angular Momentum and is denoted by L symbol.

How to calculate Angular momentum of electron when radial momentum is given using this online calculator? To use this online calculator for Angular momentum of electron when radial momentum is given, enter Total momentum (p) and Radial momentum (pr) and hit the calculate button. Here is how the Angular momentum of electron when radial momentum is given calculation can be explained with given input values -> 173.2051 = sqrt((200^2)-(100^2)).

FAQ

What is Angular momentum of electron when radial momentum is given?
The Angular momentum of electron when radial momentum is given is defined as the rotational equivalent of linear momentum. It is denoted as L and is represented as L=sqrt((p^2)-(pr^2)) or Angular Momentum=sqrt((Total momentum^2)-(Radial momentum^2)). Total momentum for a system is simply the total mass of the objects multiplied by their velocity. and Radial momentum is a vector quantity that is a measure of the rotational momentum of a rotating electron in an elliptical orbit.
How to calculate Angular momentum of electron when radial momentum is given?
The Angular momentum of electron when radial momentum is given is defined as the rotational equivalent of linear momentum. It is denoted as L is calculated using Angular Momentum=sqrt((Total momentum^2)-(Radial momentum^2)). To calculate Angular momentum of electron when radial momentum is given, you need Total momentum (p) and Radial momentum (pr). With our tool, you need to enter the respective value for Total momentum and Radial momentum 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 Angular Momentum?
In this formula, Angular Momentum uses Total momentum and Radial momentum. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Angular Momentum=Moment of Inertia*Angular Velocity
  • Angular Momentum=Mass*Velocity*Radius
  • Angular Momentum=(Quantum Number*Plancks Constant)/(2*pi)
  • Angular Momentum=sqrt(Azimuthal Quantum Number*(Azimuthal Quantum Number+1))*Plancks Constant/(2*pi)
  • Angular Momentum=sqrt(Spin Quantum Number*(Spin Quantum Number+1))*Plancks Constant/(2*pi)
  • Angular Momentum=(Minor axis of elliptical orbit*[hP])/(2*pi)
  • Angular Momentum=Moment of Inertia*Angular Velocity
  • Angular Momentum=sqrt(2*Moment of Inertia*Kinetic Energy)
  • Angular Momentum=Tangential velocity at inlet*Radius 1
  • Angular Momentum=Tangential velocity at exit*Radius 1
  • Angular Momentum=Moment of Inertia*Initial angular velocity
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