The de-Broglie wavelength associated with a particle of mass and energy is:
The dimensional formula for Planck’s constant is:
- A
- B
- C
- D
The de-Broglie wavelength associated with a particle of mass and energy is:
The dimensional formula for Planck’s constant is:
Correct answer:B
Standard Method
Given:
Find: The dimensional formula of Planck’s constant .
Rearrange the given equation:
Now write dimensions of each quantity:
So,
Therefore,
Hence, the dimensional formula of Planck’s constant is . The correct option is B.
The solution also states that the correct answer is Option (2), which matches B.
Dimensional Analysis Expansion
Starting from
we isolate as
The constant is dimensionless, so it does not affect dimensions. Therefore,
Substitute the known dimensions:
Taking the square root gives
Hence,
Therefore, Planck’s constant has dimensional formula , so the correct option is B.
Using the dimensional formula of momentum instead of Planck’s constant is incorrect. The relation must first be rearranged to solve for . Start from , not from a guessed standard formula.
Forgetting that energy has dimensions leads to a wrong final power of or . Always substitute the full energy dimension before simplifying.
Treating the square root incorrectly is a common error. Since , each exponent must be halved inside the square root.
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