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Total number of orbital in the 5th energy level is
An electron is excited to fourth energy level in an atom. It will
Using Bohr's postulates, derive the expression for the total energy of the electron revolving in n^(th) orbit of hydrogen atom. Find the wavelength of H_(alpha) line, given the value of Rydberg constant, R = 1.1 xx 10^(7) m^(1)
In H-atom energy of electron is determined by :
If n and l are respectively the principal and azimuthal quantum numbers , then the expression for calculating the total number of electrons in any energy level is :
The correct order of energy difference between adjacent energy levels in H - atom .
Using Rutherford's model of the atom, derive the expression for the total energy of the electron in hydrogen atom. What is the significance of total negative energy possessed by the electron?
The energy of the electron in the hydrogen atom is given by the expression
When we write expression for energy of electron in n^"th" orbit of hydrogen atom we take zero potential energy at n=oo , But potential energy depends on point in reference. If we take total energy of electron in n=1 orbit as zero then , match the following :
Magnetic moment due to the motion of the electron in n^(th) energy state of hydrogen atom is proportional to :
