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JEE Mathematics 2025 Question with Solution

A box contains 1010 pens of which 33 are defective. A sample of 22 pens is drawn at random and let XX denote the number of defective pens. Then the variance of XX is

  • A

    1115\frac{11}{15}

  • B

    2875\frac{28}{75}

  • C

    215\frac{2}{15}

  • D

    35\frac{3}{5}

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: There are 1010 pens, of which 33 are defective and 77 are non-defective. A sample of 22 pens is drawn without replacement, and XX denotes the number of defective pens.

Find: The variance of XX.

Using the probability distribution of XX:

P(X=0)=7C210C2=2145=715,P(X=1)=7C13C110C2=2145=715,P(X=2)=3C210C2=345=115P(X=0)=\frac{{}^7C_2}{{}^{10}C_2}=\frac{21}{45}=\frac{7}{15}, \qquad P(X=1)=\frac{{}^7C_1 \cdot {}^3C_1}{{}^{10}C_2}=\frac{21}{45}=\frac{7}{15}, \qquad P(X=2)=\frac{{}^3C_2}{{}^{10}C_2}=\frac{3}{45}=\frac{1}{15}

Hypergeometric Formula

Since sampling is without replacement, XX follows a hypergeometric distribution with N=10N=10, K=3K=3, and n=2n=2.

Therefore,

E(X)=nKN=2310=35E(X)=n\frac{K}{N}=2\cdot\frac{3}{10}=\frac{3}{5}

and

Var(X)=nKN(1KN)NnN1\operatorname{Var}(X)=n\frac{K}{N}\left(1-\frac{K}{N}\right)\frac{N-n}{N-1}

Substituting the values,

Var(X)=231071089=336900=2875\operatorname{Var}(X)=2\cdot\frac{3}{10}\cdot\frac{7}{10}\cdot\frac{8}{9}=\frac{336}{900}=\frac{28}{75}

Therefore, the correct option is B.

Common mistakes

  • Using the binomial variance formula as if the draws were independent is incorrect because the pens are drawn without replacement. Use the hypergeometric model or compute variance from the exact distribution.

  • Confusing the mean E(X)=35E(X)=\frac{3}{5} with the variance is wrong. The question asks for variance, not expected value.

  • Computing probabilities for X=0,1,2X=0,1,2 incorrectly by ignoring combinations can lead to a wrong distribution. Count selections using combinations such as (3x)(72x)\binom{3}{x}\binom{7}{2-x}.

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