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Chapter 6: Problem 52

How many possible values for \(l\) and \(m_{l}\) are there when (a) \(n=3 ;\) (b) \(n=5 ?\)

Short Answer

Expert verified
(a) For \(n=3\), the possible values of \(l\) are 0, 1, and 2. (b) For \(n=5\), the possible values of \(l\) are 0, 1, 2, 3, and 4.

Step by step solution

01

Calculate possible values of \(l\)#

For a given principal quantum number \(n\), \(l\) can take integer values from 0 to \(n-1\). We are asked to find the number of possible values of \(l\) for (a) \(n=3\) and (b) \(n=5\). For each case, we will list the possible values of \(l\).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Principal Quantum Number
The principal quantum number, denoted as n, plays a vital role in the quantum mechanics of atoms. Think of it as the address for an electron's energy level or shell.

The value of n starts from 1 and increases in positive integer steps (1, 2, 3, ...). As n increases, it represents electrons that are further from the nucleus, at higher energy levels, and with greater potential energy. Also, as n gets higher, the difference in energy between neighboring energy levels decreases.

For example, if an electron is in an atom with a principal quantum number of 3, it is in the third energy level. This not only affects its energy but also the number of orbital shapes available for electrons, which leads us to the next concept: the azimuthal quantum number.
Azimuthal Quantum Number
Following the address analogy, the azimuthal quantum number, usually notated as l, can be seen as specifying the 'street' or the shape of the orbital within the electron's energy level.

The value of l ranges from 0 to (n-1), where n is the principal quantum number. Each value of l corresponds to an orbital shape: 0 for s-orbital, 1 for p-orbital, 2 for d-orbital, and 3 for f-orbital. So with each increase in the principal quantum number, you get a new shape available for the electron to inhabit.

For instance, when n=3, the possible values for l are 0, 1, and 2, corresponding to s, p, and d orbitals. Having a grasp of how l is determined by n is crucial in understanding the distribution of electrons in an atom.
Magnetic Quantum Number
Drilling down further into electrons' addresses, the magnetic quantum number, designated as ml, indicates the 'house number' or the orientation of an orbital within a subshell.

This number ranges from -l to +l, including zero. Therefore, for each azimuthal quantum number, there are 2l+1 possible magnetic quantum numbers. So if you were looking at the p orbital, which has an l value of 1, your ml values could be -1, 0, and 1 – three possible orientations for an electron to exist in that orbital.

Each orientation corresponds to a different spatial direction magnetic field lines would pass through an electron, which is significant when considering how these electrons affect each other's presence and the overall electronic structure of the atom.

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Most popular questions from this chapter

(a) Calculate the energy of a photon of electromagnetic radiation whose frequency is \(6.75 \times 10^{12} \mathrm{~s}^{-1}\). (b) Calculate the energy of a photon of radiation whose wavelength is \(322 \mathrm{nm} .\) (c) What wavelength of radiation has photons of energy \(2.87 \times 10^{-18} \mathrm{~J} ?\)

For a given value of the principal quantum number, \(n\), how do the energies of the \(s, p, d,\) and \(f\) subshells vary for (a) hydrogen, (b) a many-electron atom?

Scientists have speculated that element 126 might have a moderate stability, allowing it to be synthesized and characterized. Predict what the condensed electron configuration of this element might be.

In the television series Star Trek, the transporter beam is a device used to "beam down" people from the Starship Enterprise to another location, such as the surface of a planet. The writers of the show put a "Heisenberg compensator" into the transporter beam mechanism. Explain why such a compensator (which is entirely fictional) would be necessary to get around Heisenberg's uncertainty principle.

State where in the periodic table these elements appear: (a) elements with the valence-shell electron configuration \(n s^{2} n p^{5}\) (b) elements that have three unpaired \(p\) electrons (c) an element whose valence electrons are \(4 s^{2} 4 p^{1}\) (d) the \(d\) -block elements
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