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V(x) കാണുക.

X

1

2

3

4

5

P(X)

K

2K

3K

2K

K

A1/3

B2/3

C5/3

D4/3

Answer:

D. 4/3

Read Explanation:

V(X)=E(X2)[E(X)]2V(X)=E(X^2)-[E(X)]^2

ΣP(X)=1ΣP(X)=1

k+2k+3k+2k+k=1k+2k+3k+2k+k=1

9k=19k=1

k=19k=\frac{1}{9}

E(X)=ΣxP(x)=(1×k)+(2×2k)+(3×3k)+(4×2k)+(5×k)E(X)=ΣxP(x) = (1 \times k )+(2 \times 2k)+(3 \times 3k)+(4 \times 2k)+(5 \times k)

=k+4k+9k+8k+5k=27k=27×19=3= k+4k+9k+8k+5k = 27k = 27 \times \frac{1}{9} = 3

E(X2)=(1×k)+(4×2k)+(9×3k)+(16×2k)+(25×k)E(X^2)= (1 \times k)+(4 \times 2k)+(9 \times 3k)+(16 \times 2k)+(25 \times k)

=k+8k+27k+32k+25k=93k=93×19=939=k+8k+27k+32k+25k=93k = 93 \times \frac{1}{9} = \frac{93}{9}

ΣP(X)=1ΣP(X)=1

k+2k+3k+2k+k=1k+2k+3k+2k+k=1

9k=19k=1

k=19k=\frac{1}{9}

V(X)=939(3)2=9399=129=43V(X)= \frac{93}{9} - (3)^2 = \frac{93}{9}-9 = \frac{12}{9}= \frac{4}{3}

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