Question

For the given sets of energy levels of nuclei X and Y whose mass numbers are odd and even, respectively, choose the best suited interpretation. 

• A. Set I: Rotational band of X Set II: Vibrational band of Y
• B. Set I: Rotational band of Y Set II: Vibrational band of X
• C. Set I: Vibrational band of X Set II: Rotational band of Y
• D. Set I: Vibrational band of Y Set II: Rotational band of X

Hint:

In nuclear physics, even-even nuclei typically show vibrational bands, while odd-even nuclei show rotational bands. The energy level spacing can help identify the type of band.

Answer 1

The Correct Option is D

The energy level diagrams presented show the energy states of two different nuclei, X and Y, where the mass numbers of X and Y are odd and even, respectively. The interpretation of these energy levels in terms of rotational and vibrational bands is important to understand.
- Vibrational bands typically appear in even-even nuclei (nuclei with even mass numbers). These bands have relatively small energy differences between successive levels, often seen in the set of levels where the energy increase is relatively smooth and the spacing between levels is nearly constant. This is characteristic of vibrational motion in the nucleus.
- Rotational bands typically appear in odd-even nuclei (nuclei with odd mass numbers), where the energy levels follow a pattern where the spacing between levels increases. This corresponds to rotational motion in the nucleus, where higher energy states have larger spacings. This is especially true for nuclei with odd mass numbers.
In this problem:
- Set I shows relatively consistent energy levels with small energy differences, which is characteristic of a vibrational band. Given that Y has an even mass number, Set I represents the vibrational band of Y.
- Set II shows increasing energy gaps between successive levels, which corresponds to a rotational band. Since X has an odd mass number, Set II represents the rotational band of X.
Therefore, the correct interpretation is option (D), where Set I represents the vibrational band of Y, and Set II represents the rotational band of X.