NVAEasyJEE 2025Bohr Model & Hydrogen Spectrum

JEE Chemistry 2025 Question with Solution

The energy of an electron in first Bohr orbit of H-atom is 13.6eV-13.6 \, \text{eV}. The magnitude of energy value of electron in the first excited state of Be3+^{3+} is _____ eV\text{eV} (nearest integer value)

Answer

Correct answer:54

Step-by-step solution

Standard Method

Given: The energy of an electron in first Bohr orbit of H-atom is 13.6eV-13.6 \, \text{eV}. For hydrogen-like species, the total energy is

En=13.6Z2n2eVE_n = -13.6 \frac{Z^2}{n^2} \, \text{eV}

Find: The magnitude of energy of electron in the first excited state of Be3+^{3+}.

For Be3+^{3+}, Z=4Z = 4 and the first excited state means n=2n = 2.

Substitute these values:

E2=13.64222eVE_2 = -13.6 \frac{4^2}{2^2} \, \text{eV} E2=13.6×164eVE_2 = -13.6 \times \frac{16}{4} \, \text{eV} E2=13.6×4=54.4eVE_2 = -13.6 \times 4 = -54.4 \, \text{eV}

The magnitude is

E2=54.4eV|E_2| = 54.4 \, \text{eV}

Nearest integer value is 5454. Therefore, the answer is 5454.

Using proportionality

Given: For hydrogen-like ions, EnZ2n2E_n \propto \dfrac{Z^2}{n^2}. For H-atom in the first orbit, Z=1Z=1 and n=1n=1, so energy is 13.6eV-13.6 \, \text{eV}.

Find: The magnitude of energy in the first excited state of Be3+^{3+}.

For Be3+^{3+}, Z=4Z=4 and first excited state means n=2n=2. Hence,

EBe3+EH=(4222)(1212)=16/41=4\frac{E_{\text{Be}^{3+}}}{E_H} = \frac{\left(\dfrac{4^2}{2^2}\right)}{\left(\dfrac{1^2}{1^2}\right)} = \frac{16/4}{1} = 4

So,

EBe3+=4(13.6)=54.4eVE_{\text{Be}^{3+}} = 4(-13.6) = -54.4 \, \text{eV}

Therefore, the magnitude of the energy is 54.4eV54.4 \, \text{eV}, which gives 5454 as the nearest integer.

Common mistakes

  • Taking the first excited state as n=1n=1 is incorrect because n=1n=1 is the ground state. Use n=2n=2 for the first excited state.

  • Using Z=2Z=2 or treating Be3+^{3+} as a multi-electron atom is wrong. Be3+^{3+} is a hydrogen-like ion with only one electron, so use nuclear charge Z=4Z=4.

  • Reporting 54.4-54.4 as the final answer is incomplete because the question asks for the magnitude of energy value. Therefore take the positive value and then round to the nearest integer.

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