NVAEasyJEE 2023Radioactive Decay & Half-Life

JEE Physics 2023 Question with Solution

A radioactive element 92242X^{242}_{92}X emits two α\alpha-particles, one electron, and two positrons. The product nucleus is represented by P234Y^{234}_{P}Y. The value of PP is _____.

Answer

Correct answer:87

Step-by-step solution

Standard Method

Given: The nucleus is 92242X^{242}_{92}X. It emits two α\alpha-particles, one electron (β)\left(\beta^-\right), and two positrons (β+)\left(\beta^+\right).

Find: The atomic number PP in P234Y^{234}_{P}Y.

For radioactive decay:

  • Emission of an α\alpha-particle decreases mass number by 44 and atomic number by 22.
  • Emission of an electron (β)\left(\beta^-\right) increases atomic number by 11.
  • Emission of a positron (β+)\left(\beta^+\right) decreases atomic number by 11.

After two α\alpha-particles:

Atomic number=922×2=88,Mass number=2422×4=234\text{Atomic number} = 92 - 2 \times 2 = 88, \quad \text{Mass number} = 242 - 2 \times 4 = 234

After one electron (β)\left(\beta^-\right):

Atomic number=88+1=89\text{Atomic number} = 88 + 1 = 89

After two positrons (2β+)\left(2\beta^+\right):

Atomic number=892=87\text{Atomic number} = 89 - 2 = 87

Therefore, the value of PP is 8787.

Common mistakes

  • Treating β\beta^- emission as decreasing atomic number. This is wrong because an electron emission converts a neutron into a proton, so the atomic number increases by 11. Increase ZZ by 11 for each β\beta^- emission.

  • Forgetting that two α\alpha-particles are emitted. This is wrong because each α\alpha emission changes mass number by 4-4 and atomic number by 2-2. Apply the change twice: mass number decreases by 88 and atomic number by 44.

  • Changing the mass number during β\beta^- or β+\beta^+ emission. This is wrong because beta decay changes only the atomic number, not the mass number. Keep the mass number fixed at 234234 after the two α\alpha emissions.

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