Step 1: Recall the Formula for Magnetic Moment
The spin-only magnetic moment (\( \mu \)) is calculated using the formula:
$$ \mu = \sqrt{n(n+2)} $$
where \( n \) represents the number of unpaired electrons. The magnetic moment is exclusively determined by the count of unpaired electrons in an ion.
Step 2: Analyze the Given Ions
- Possesses 1 unpaired electron.
- Spin-only magnetic moment calculation:
$$ \mu = \sqrt{1(1+2)} = \sqrt{3} $$
- Possesses 4 unpaired electrons.
- Spin-only magnetic moment calculation:
$$ \mu = \sqrt{4(4+2)} = \sqrt{24} $$
- Possesses 5 unpaired electrons.
- Spin-only magnetic moment calculation:
$$ \mu = \sqrt{5(5+2)} = \sqrt{35} $$
- Possesses 4 unpaired electrons.
- Spin-only magnetic moment calculation:
$$ \mu = \sqrt{4(4+2)} = \sqrt{24} $$
- Possesses no unpaired electrons.
- Spin-only magnetic moment calculation:
$$ \mu = 0 $$
Step 3: Compare the Magnetic Moments
Step 4: Conclusion
The correct selection is: Option (1) - B and D only, due to their shared spin-only magnetic moment value.