MCQEasyJEE 2026Bohr's Model & Hydrogen Spectrum

JEE Physics 2026 Question with Solution

The energy of an electron in an orbit of the Bohr's atom is 0.04Eg-0.04 E_g where EgE_g is the ground state energy. If LL is the angular momentum of the electron in this orbit and hh is the Planck's constant, then 2πLh\frac{2 \pi L}{h} is _____ :

  • A

    44

  • B

    66

  • C

    55

  • D

    22

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: The energy of the electron is En=0.04EgE_n = -0.04 E_g.

Find: The value of 2πLh\frac{2 \pi L}{h}.

According to the Bohr model, the energy in the nthn^{\text{th}} orbit varies as 1n2\frac{1}{n^2} and the angular momentum is quantized as

L=nh2πL = \frac{n h}{2 \pi}

Using the given energy,

En=0.04Eg=125EgE_n = -0.04 E_g = -\frac{1}{25} E_g

Comparing with the Bohr energy relation,

En=Egn2E_n = \frac{E_g}{n^2}

we get

1n2=125\frac{1}{n^2} = \frac{1}{25}

Hence,

n=5n = 5

Now from

L=nh2πL = \frac{n h}{2 \pi}

we obtain

2πLh=n=5\frac{2 \pi L}{h} = n = 5

Therefore, the value of 2πLh\frac{2 \pi L}{h} is 55. The correct option is C.

Common mistakes

  • Using the energy relation incorrectly as proportional to 1n\frac{1}{n} instead of 1n2\frac{1}{n^2}. This gives a wrong value of nn. Always use the Bohr relation that orbital energy varies as 1n2\frac{1}{n^2}.

  • Ignoring the sign and fractional form of 0.04Eg-0.04 E_g. Here 0.04=1250.04 = \frac{1}{25}, so the comparison must be made carefully. Convert the decimal to a fraction before solving for nn.

  • Not recognizing that 2πLh=n\frac{2 \pi L}{h} = n directly from Bohr quantization. After finding nn, substitute it into L=nh2πL = \frac{n h}{2 \pi} instead of trying an unrelated formula for angular momentum.

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