If X is a Random-variable Probability Distribution as Given Below: X = Xi :0 1 2 3 P (X = Xi) : K 3 K 3 K K Value of K and Its Variance Are (A) 1/8, 22/27 (B) 1/8, 23/27 (C) 1/8, 24/27 (D) 1/8, 3/4 - Mathematics

प्रश्न

If X is a random-variable with probability distribution as given below:

X = x_i :	0	1	2	3
P (X = x_i) :	k	3 k	3 k	k

The value of k and its variance are

विकल्प

1/8, 22/27
1/8, 23/27
1/8, 24/27
1/8, 3/4

MCQ

उत्तर

1/8, 3/4

We know that the sum of probabilities in a probability distribution is always 1.

∴ P (X = 0) + P (X = 1) + P (X = 2) + P (X = 3) = 1

\[\Rightarrow k + 3k + 3k + k = 1\]
\[ \Rightarrow 8k = 1\]
\[ \Rightarrow k = \frac{1}{8}\]

Now,

x_i	p_i	p_ix_i	p_ix_i_²
0	k = \[\frac{1}{8}\]	0	0
1	3k =\[\frac{3}{8}\]	\[\frac{3}{8}\]	\[\frac{3}{8}\]
2	3k = \[\frac{3}{8}\]	\[\frac{6}{8}\]	\[\frac{12}{8}\]
3	k = \[\frac{1}{8}\]	\[\frac{3}{8}\]	\[\frac{9}{8}\]
		\[\sum\nolimits_{}^{}\]p_ix_i = \[\frac{12}{8} =\frac{3}{2}\]	\[\sum\nolimits_{}^{}\] p_ix_i_² = \[\frac{24}{8}\]

\[\text{ Mean } = \sum p_i x_i = \frac{3}{2}\]
\[\text{ Variance } = \sum p_i {x_i}2^{}_{} - \left( \text{ Mean } \right)^2 = \frac{24}{8} - \left( \frac{3}{2} \right)^2 = \frac{24}{8} - \frac{9}{4} = \frac{24 - 18}{8} = \frac{6}{8} = \frac{3}{4}\]

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Random Variables and Its Probability Distributions

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Q 5 Q 4 Q 6

अध्याय 32: Mean and Variance of a Random Variable - MCQ [पृष्ठ ४७]

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आरडी शर्मा Mathematics [English] Class 12

अध्याय 32 Mean and Variance of a Random Variable
MCQ | Q 5 | पृष्ठ ४७

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