The radius of the orbit of is . The expected radius of the orbit of is:
- A
- B
- C
- D
The radius of the orbit of is . The expected radius of the orbit of is:
Correct answer:D
Standard Method
Given: The radius of the orbit of is .
Find: The radius of the orbit of .
Use the formula for hydrogen-like species:
For , and :
Since this radius is given as , we have .
For , and :
Now take the ratio:
So,
Therefore, the radius of the orbit of is . The solution states that the correct option is D, but the computed value matches option C.
Ratio Approach
Given: Two hydrogen-like ions, and .
Find: The orbit radius of in terms of .
For hydrogen-like species, radius is proportional to:
Hence,
Since , it follows that
Therefore, the correct value is , which corresponds to option C.
Using the radius relation as directly proportional to instead of . This is wrong because for hydrogen-like species the Bohr radius varies as . Always square the principal quantum number before comparing radii.
Ignoring the nuclear charge of the ion. This is wrong because a larger pulls the electron closer and reduces the orbit radius. Always include both and in the formula .
Accepting the listed option label from the source without checking the computed value. This is wrong because the solution working gives , which matches option C, not D. Always verify the numerical expression against the options.
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