we have the formula of wave number
wave number = 1/ = 109677((1/n1)^2 - (1/n2)^2)
1/97.5 * 10^-7 cm = 109677((1/1^2) - (1/n2)^2)
n2 = 3.93 which is nearly equal to 4
A hydrogen atom, initially in the ground state, absorbs a 97.5 nm photon. What is the...
A ground state hydrogen atom absorbs a photon of light having a wavelength of 92.27 nm. It then gives off a photon having a wavelength of 383.4 nm. What is the final state of the hydrogen atom? Values for physical constants can be found here. Number
A ground state hydrogen atom absorbs a photon of light having a wavelength of 92.57 nm. It then gives off a photon having a wavelength of 1944 nm. What is the final state of the hydrogen atom? Values for physical constants can be found in the Chempendix. Cni 2canned with Eam Scanner
A ground state hydrogen atom absorbs a photon of light having a wavelength of 93.03 nm. it then gives off a photon having a wavelength of 2165 nm. What is the final state of the hydrogen atom?
A ground state hydrogen atom absorbs a photon of wavelength A. The atom's electron is excited to the orbital level n 6. What was the wavelength absorbed (in nm)?
A ground state hydrogen atom absorbs a photon of light having a wavelength of 92.3 nm. What is the final state of the hydrogen atom? Values for physical constants can be found in the Chempendix. = 4 x10° PETERS > Activities and Due Dates > HW #15 1555/1800 Resources [ Give Up? Feedback Resu Attem Quantum numbers arise naturally from the mathematics used to describe the possible states of an electron in an atom. The four quantum numbers, the principal...
A hydrogen atom initially in its ground state i.e., n= 1 level, absorbs a photon and ends up in n= 3 level. What must have been the frequency of the incident photon? (b) Now the electron makes spontaneous emission and comes back to the ground state. What are the possible frequencies of the photons emitted during this process?
A hydrogen atom initially in its ground state absorbs a photon and ends up in the n=12 state. Calculate the energy of the incident photon Submit Answer Tries 0/10 If the above atom in the n=12 state eventually returns to the ground state (n=1), calculate the energy of the emitted photon.
A hydrogen atom in the ground state absorbs a 20 eV photon. What is the speed of the liberated electron?
The electron in a ground-state H atom absorbs a photon of wavelength 121.57 nm. To what energy level does the electron move?
A hydrogen atom initially in its ground state (n = 1) absorbs a photon and ends up in the state for which n = 3. (a) What is the energy of the absorbed photon? eV (b) If the atom eventually returns to the ground state, what photon energies could the atom emit? 13.6 eV, 1.89 eV, 10.2 eV12.09 eV 12.09 eV, 1.89 eV1.89 eV, 10.2 eV12.09 eV, 1.89 eV, 10.2 eV