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Probability Distribution

Class 12th Mathematics RS Aggarwal Solution
Exercise 31
  1. Find the mean (𝓊), variance (σ2) and standard deviation (σ) for each of the…
  2. Find the mean and variance of the number of heads when two coins are tossed…
  3. Find the mean and variance of the number of tails when three coins are tossed…
  4. A die is tossed twice. ‘Getting an odd number on a toss’ is considered a…
  5. A die is tossed twice. ‘Getting a number greater than 4’ is considered a…
  6. A pair of dice is thrown 4 times. If getting a doublet is considered a success,…
  7. A coin is tossed 4 times. Let X denote the number of heads. Find the…
  8. Let X denote the number of times ‘a total of 9’ appears in two throws of a pair…
  9. There are 5 cards, numbers 1 to 5, one number on each card. Two cards are drawn…
  10. Two cards are drawn from a well-shuffled pack of 52 cards. Find the…
  11. A box contains 16 bulbs, out of which 4 bulbs are defective. Three bulbs are…
  12. 20% of the bulbs produced by a machine are defective. Find the probability…
  13. Four bad eggs are mixed with 10 good ones. Three eggs are drawn one by one…
  14. Four rotten oranges are accidentally mixed with 16 good ones. Three oranges…
  15. Three balls are drawn simultaneously from a bag containing 5 white and 4 red…
  16. Two cards are drawn without replacement from a well-shuffled deck of 52 cards.…
  17. Two cards are drawn one by one with replacement from a well-shuffled deck of…
  18. Three cards are drawn successively with replacement from a well – shuffled…
  19. Five defective bulbs are accidently mixed with 20 good ones. It is not…

Exercise 31
Question 1.

Find the mean (𝓊), variance (σ2) and standard deviation (σ) for each of the following probability distributions:

(i)


(ii)


(iii)


(iv)



Answer:

(i) Given :



To find : mean (𝓊), variance (σ2) and standard deviation (σ)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Standard deviation =


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4)


Mean = E(X) = 0() + 1() +2() +3() = 0 + + + = = =


Mean = E(X) = = 1.2


= = 1.44


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4)


E(X2) = () + () + () + () = 0 + + + = =


E(X2) = 2


Variance = E(X2) - = 2 – 1.44 = 0.56


Variance = E(X2) - = 0.56


Standard deviation = = = 0.74


Mean = 1.2


Variance = 0.56


Standard deviation = 0.74


(ii) Given :



To find : mean (𝓊), variance (σ2) and standard deviation (σ)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Standard deviation =


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4)


Mean = E(X) = 1(0.4) + 2(0.3) +3(0.2) +4(0.1) = 0.4 + 0.6 + 0.6 + 0.4 = 2


Mean = E(X) = 2


= = 4


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4)


E(X2) = (0.4) + (0.3) + (0.2) + (0.1) = 0.4 + 1.2 + 1.8 + 1.6 = 5


E(X2) = 5


Variance = E(X2) - = 5 – 4 = 1


Variance = E(X2) - = 1


Standard deviation = = = 1


Mean = 2


Variance = 1


Standard deviation = 1


(iii) Given :



To find : mean (𝓊), variance (σ2) and standard deviation (σ)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Standard deviation =


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4)


Mean = E(X) = -3(0.2) + (-1)(0.4) + 0(0.3) + 2(0.1)= -0.6 - 0.4 + 0 + 0.2 = -0.8


Mean = E(X) = -0.8


= = 0.64


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4)


E(X2)= (0.2) + (0.4) + (0.3) + (0.1) = 1.8 + 0.4 + 0+ 0.4 = 2.6


E(X2) = 2.6


Variance = E(X2) - = 2.6 – 0.64 = 1.96


Variance = E(X2) - = 1.96


Standard deviation = = = 1.4


Mean = -0.8


Variance = 1.96


Standard deviation = 1.4


(iv) Given :



To find : mean (𝓊), variance (σ2) and standard deviation (σ)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Standard deviation =


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4) + x5P(x5)


Mean = E(X) = -2(0.1) + (-1)(0.2) + 0(0.4) + 1(0.2) + 2(0.1)


Mean = E(X) = -0.2 - 0.2 + 0 + 0.2 + 0.2 = 0


Mean = E(X) = 0


= = 0


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4) + P(x5)


E(X2) = (0.1) + (0.2) + (0.4) + (0.2) + (0.1)


E(X2) = 0.4 + 0.2 + 0 + 0.2 +0.4 = 1.2


E(X2) = 1.2


Variance = E(X2) - = 1.2 – 0 = 1.2


Variance = E(X2) - = 1.2


Standard deviation = = = 1.095


Mean = 0


Variance = 1.2


Standard deviation = 1.095



Question 2.

Find the mean and variance of the number of heads when two coins are tossed simultaneously.


Answer:

Given : Two coins are tossed simultaneously


To find : mean (𝓊), variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


When two coins are tossed simultaneously,


Total possible outcomes = TT , TH , HT , HH where H denotes head and T denotes tail.


P(0) = (zero heads = 1 [TT] )


P(1) = (one heads = 2 [HT , TH] )


P(2) = (two heads = 1 [HH] )


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() +2() = 0 + + = = 1


Mean = E(X) = 1


= = 1


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + = = = 1.5


E(X2) = 1.5


Variance = E(X2) - = 1.5 – 1 = 0.5


Variance = E(X2) - = 0.5


Mean = 1


Variance = 0.5



Question 3.

Find the mean and variance of the number of tails when three coins are tossed simultaneously.


Answer:

Given : Three coins are tossed simultaneously


To find : mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


When three coins are tossed simultaneously,


Total possible outcomes = TTT , TTH , THT , HTT , THH , HTH , HHT , HHH where H denotes head and T denotes tail.


P(0) = (zero tails = 1 [HHH] )


P(1) = (one tail = 3 [HTH , THH , HHT ] )


P(2) = (two tail = 3 [HTT , THT , TTH ] )


P(3) = (three tails = 1 [TTT] )


The probability distribution table is as follows,



Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4)


Mean = E(X) = 0() + 1() +2() +3() = 0 + + + = = =


Mean = E(X) = = 1.5


= = 2.25


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4)


E(X2) = () + () + () + () = 0 + + + = = = 3


E(X2) = 3


Variance = E(X2) - = 3 – 2.25 = 0.75


Variance = E(X2) - = 0.75


Mean = 1.5


Variance = 0.75



Question 4.

A die is tossed twice. ‘Getting an odd number on a toss’ is considered a success. Find the probability distribution of a number of successes. Also, find the mean and variance of the number of successes.


Answer:

Given : A die is tossed twice and ‘Getting an odd number on a toss’ is considered a success.


To find : probability distribution of the number of successes and mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


When a die is tossed twice,


Total possible outcomes =


{(1,1) , (1,2) , (1,3) , (1,4) , (1,5) , (1,6)


(2,1) , (2,2) , (2,3) , (2,4) , (2,5) , (2,6)


(3,1) , (3,2) , (3,3) , (3,4) , (3,5) , (3,6)


(4,1) , (4,2) , (4,3) , (4,4) , (4,5) , (4,6)


(5,1) , (5,2) , (5,3) , (5,4) , (5,5) , (5,6)


(6,1) , (6,2) , (6,3) , (6,4) , (6,5) , (6,6)}


‘Getting an odd number on a toss’ is considered a success.


P(0) = = (zero odd numbers = 9 )


P(1) = = (one odd number = 18 )


P(2) = = (two odd numbers = 9 )


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() +2() = 0 + + = = 1


Mean = E(X) = 1


= = 1


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + = = = 1.5


E(X2) = 1.5


Variance = E(X2) - = 1.5 – 1 = 0.5


Variance = E(X2) - = 0.5


The probability distribution table is as follows,



Mean = 1


Variance = 0.5



Question 5.

A die is tossed twice. ‘Getting a number greater than 4’ is considered a success. Find the probability distribution of a number of successes. Also, find the mean and variance of the number of successes.


Answer:

Given : A die is tossed twice and ‘Getting a number greater than 4 ’ is considered a success.


To find : probability distribution of the number of successes and mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


When a die is tossed twice,


Total possible outcomes =


{(1,1) , (1,2) , (1,3) , (1,4) , (1,5) , (1,6)


(2,1) , (2,2) , (2,3) , (2,4) , (2,5) , (2,6)


(3,1) , (3,2) , (3,3) , (3,4) , (3,5) , (3,6)


(4,1) , (4,2) , (4,3) , (4,4) , (4,5) , (4,6)


(5,1) , (5,2) , (5,3) , (5,4) , (5,5) , (5,6)


(6,1) , (6,2) , (6,3) , (6,4) , (6,5) , (6,6)}


‘Getting a number greater than 4’ is considered a success.


P(0) = = (zero numbers greater than 4 = 16 )


P(1) = = (one number greater than 4= 16 )


P(2) = = (two numbers greater than 4= 4 )


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() +2() = 0 + + = = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + =


E(X2) =


Variance = E(X2) - = =


Variance = E(X2) - =


The probability distribution table is as follows,



Mean =


Variance =



Question 6.

A pair of dice is thrown 4 times. If getting a doublet is considered a success, find the probability distribution of a number of successes, find the probability distribution of the number of successes. Also, find the mean and variance of a number of successes. [CBSE 2008]


Answer:

Given : A die is tossed twice and ‘Getting a number greater than 4 ’ is considered a success.


To find : probability distribution of the number of successes and mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


When a die is tossed 4 times,


Total possible outcomes = 62 = 36


Getting a doublet is considered as a success


The possible doublets are (1,1) , (2,2) , (3,3) , (4,4) , (5,5) , (6,6)


Let p be the probability of success,


p = =


q = 1 – p = 1 - =


q =


since the die is thrown 4 times, n = 4


x can take the values of 1,2,3,4


P(x) = nCx


P(0) = 4C0 =


P(1) = 4C1 = =


P(2) = 4C2 = =


P(3) = 4C3 = =


P(4) = 4C4 =


The probability distribution table is as follows,



Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4) + x5P(x5)


Mean = E(X) = 0() + 1() + 2() + 3() + 4()


Mean = E(X) = 0 + + + + = = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4) + P(x5)


E(X2) = () + () + () + () + ()


E(X2) = 0 + + + + = =


E(X2) = 1


Variance = E(X2) - = 1 – =


Variance = E(X2) - =


The probability distribution table is as follows,



Mean =


Variance =



Question 7.

A coin is tossed 4 times. Let X denote the number of heads. Find the probability distribution of X. also, find the mean and variance of X.


Answer:

Given : A coin is tossed 4 times


To find : probability distribution of X and mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


A coin is tossed 4 times,


Total possible outcomes = 24 = 16


X denotes the number of heads


Let p be the probability of getting a head,


p =


q = 1 – p = 1 - =


q =


since the coin is tossed 4 times, n = 4


X can take the values of 1,2,3,4


P(x) = nCx


P(0) = 4C0 =


P(1) = 4C1 = =


P(2) = 4C2 = =


P(3) = 4C3 = =


P(4) = 4C4 =


The probability distribution table is as follows,



Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4) + x5P(x5)


Mean = E(X) = 0() + 1() + 2() + 3() + 4()


Mean = E(X) = 0 + + + + = = = 2


Mean = E(X) = 2


= = 4


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4) + P(x5)


E(X2) = () + () + () + () + ()


E(X2) = 0 + + + + = = = 5


E(X2) = 5


Variance = E(X2) - = 5 – 4 = 1


Variance = E(X2) - = 1


The probability distribution table is as follows,



Mean = 2


Variance = 1



Question 8.

Let X denote the number of times ‘a total of 9’ appears in two throws of a pair of dice. Find the probability distribution of X. Also, find the mean, variance and standard deviation of X.


Answer:

Given : Let X denote the number of times ‘a total of 9’ appears in two throws of a pair of dice


To find : probability distribution of X ,mean (𝓊) and variance (σ2) and standard deviation


Formula used :



Mean = E(X) =


Variance = E(X2) -


Standard deviation =


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


When a die is tossed twice,


Total possible outcomes =


{(1,1) , (1,2) , (1,3) , (1,4) , (1,5) , (1,6)


(2,1) , (2,2) , (2,3) , (2,4) , (2,5) , (2,6)


(3,1) , (3,2) , (3,3) , (3,4) , (3,5) , (3,6)


(4,1) , (4,2) , (4,3) , (4,4) , (4,5) , (4,6)


(5,1) , (5,2) , (5,3) , (5,4) , (5,5) , (5,6)


(6,1) , (6,2) , (6,3) , (6,4) , (6,5) , (6,6)}


Let X denote the number of times ‘a total of 9’ appears in two throws of a pair of dice


p = =


q = 1 - =


Two dice are tossed twice, hence n = 2


P(0) = 2C0 =


P(1) = 2C1 =


P(2) = 2C2 =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() +2() = 0 + + = = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + =


E(X2) =


Variance = E(X2) - = =


Variance = E(X2) - =


Standard deviation = = =


The probability distribution table is as follows,



Mean =


Variance =


Standard deviation =



Question 9.

There are 5 cards, numbers 1 to 5, one number on each card. Two cards are drawn at random without replacement. Let X denote the sum of the numbers on the two cards drawn. Find the mean and variance of X.


Answer:

Given : There are 5 cards, numbers 1 to 5, one number on each card. Two cards are drawn at random without replacement. Let X denote the sum of the numbers on the two cards drawn.


To find : mean (𝓊) and variance (σ2) of X


Formula used :



Mean = E(X) =


Variance = E(X2) -


There are 5 cards, numbers 1 to 5, one number on each card. Two cards are drawn at random without replacement.


X denote the sum of the numbers on two cards drawn


The minimum value of X will be 3 as the two cards drawn are 1 and 2


The maximum value of X will be 9 as the two cards drawn are 4 and 5


For X = 3 the two cards can be (1,2) and (2,1)


For X = 4 the two cards can be (1,3) and (3,1)


For X = 5 the two cards can be (1,4) , (4,1) , (2,3) and (3,2)


For X = 6 the two cards can be (1,5) , (5,1) , (2,4) and (4,2)


For X = 7 the two cards can be (3,4) , (4,3) , (2,5) and (5,2)


For X = 8 the two cards can be (5,3) and (3,5)


For X = 9 the two cards can be (4,5) and (4,5)


Total outcomes = 20


P(3) = =


P(4) = =


P(5) = =


P(6) = =


P(7) = =


P(8) = =


P(9) = =


The probability distribution table is as follows,



Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3) + x4P(x4) + x5P(x5) + x6P(x6) + x7P(x7)


Mean = E(X) = 3() + 4() + 5() + 6() + 7() + 8() + 9()


Mean = E(X) = + + + + + + = = = 6


Mean = E(X) = 6


= = 36


E(X2) = = P(x1) + P(x2) + P(x3) + P(x4) + P(x5) + P(x6) + P(x7)


E(X2) = () + () + () + () + () + () + ()


E(X2) = + + + + + + = = = 39


E(X2) = 39


Variance = E(X2) - = 39 – 36 = 3


Variance = E(X2) - = 3


Mean = 6


Variance = 3



Question 10.

Two cards are drawn from a well-shuffled pack of 52 cards. Find the probability distribution of a number of kings. Also, compute the variance for the number of kings. [CBSE 2007]


Answer:

Given : Two cards are drawn from a well-shuffled pack of 52 cards.


To find : probability distribution of the number of kings and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Two cards are drawn from a well-shuffled pack of 52 cards.


Let X denote the number of kings in the two cards


There are 4 king cards present in a pack of well-shuffled pack of 52 cards.


P(0) = = =


P(1) = = =


P(2) = = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() +2() = 0 + + = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + =


E(X2) =


Variance = E(X2) - = = = =


Variance = E(X2) - =


The probability distribution table is as follows,



Variance =



Question 11.

A box contains 16 bulbs, out of which 4 bulbs are defective. Three bulbs are drawn at random from the box. Let X be the number of defective bulbs drawn. Find the mean and variance of X.


Answer:

Given : A box contains 16 bulbs, out of which 4 bulbs are defective. Three bulbs are drawn at random


To find : mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


A box contains 16 bulbs, out of which 4 bulbs are defective. Three bulbs are drawn at random


Let X denote the number of defective bulbs drawn


There are 4 defective bulbs present in 16 bulbs


P(0) = = =


P(1) = = =


P(2) = = =


P(3) = = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() + 3() = 0 + + + =


Mean = E(X) = =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () + () = 0 + + + =


E(X2) =


Variance = E(X2) - = = = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 12.

20% of the bulbs produced by a machine are defective. Find the probability distribution of the number of defective bulbs in a sample of 4 bulbs chosen at random. [CBSE 2004C]


Answer:

Given : 20% of the bulbs produced by a machine are defective.


To find probability distribution of a number of defective bulbs in a sample of 4 bulbs chosen at random.


Formula used :


The probability distribution table is given by ,



Where P(x) = nCx


Here p is the probability of getting a defective bulb.


q = 1 – p


Let the total number of bulbs produced by a machine be x


20% of the bulbs produced by a machine are defective.


Number of defective bulbs produced by a machine = =


X denotes the number of defective bulbs in a sample of 4 bulbs chosen at random.


Let p be the probability of getting a defective bulb,


p = =


p =


q = 1 – p = 1 - =


q =


since 4 bulbs are chosen at random, n = 4


X can take the values of 0,1,2,3,4


P(x) = nCx


P(0) = 4C0 =


P(1) = 4C1 =


P(2) = 4C2 =


P(3) = 4C3 =


P(4) = 4C4 =


The probability distribution table is as follows,




Question 13.

Four bad eggs are mixed with 10 good ones. Three eggs are drawn one by one without replacement. Let X be the number of bad eggs drawn. Find the mean and variance of X.


Answer:

Given : Four bad eggs are mixed with 10 good ones. Three eggs are drawn one by one without replacement.


To find : mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Four bad eggs are mixed with 10 good ones. Three eggs are drawn one by one without replacement.


Let X denote the number of bad eggs drawn


There are 4 bad eggs present in 14 eggs


P(0) = = =


P(1) = = =


P(2) = = =


P(3) = = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() + 3() = 0 + + + =


Mean = E(X) = =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () + () = 0 + + + =


E(X2) =


Variance = E(X2) - = = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 14.

Four rotten oranges are accidentally mixed with 16 good ones. Three oranges are drawn at random from the mixed lot. Let X be the number of rotten oranges drawn. Find the mean and variance of X.


Answer:

Given : Four rotten oranges are mixed with 16 good ones. Three oranges are drawn one by one without replacement.


To find : mean (𝓊) and variance (σ2)


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Four rotten oranges are mixed with 16 good ones. Three oranges are drawn one by one without replacement.


Let X denote the number of rotten oranges drawn


There are 4 rotten oranges present in 20 oranges


P(0) = = =


P(1) = = =


P(2) = = =


P(3) = = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() + 3() = 0 + + + =


Mean = E(X) = =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () + () = 0 + + + =


E(X2) = =


Variance = E(X2) - = = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 15.

Three balls are drawn simultaneously from a bag containing 5 white and 4 red balls. Let X be the number of red balls drawn. Find the mean and variance of X.


Answer:

Given : Three balls are drawn simultaneously from a bag containing 5 white and 4 red balls.


To find : mean (𝓊) and variance (σ2) of X


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Three balls are drawn simultaneously from a bag containing 5 white and 4 red balls.


Let X be the number of red balls drawn.


P(0) = = =


P(1) = = =


P(2) = = =


P(3) = = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() + 3() = 0 + + + =


Mean = E(X) = =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () + () = 0 + + + =


E(X2) = =


Variance = E(X2) - = = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 16.

Two cards are drawn without replacement from a well-shuffled deck of 52 cards. Let X be the number of face cards drawn. Find the mean and variance of X.


Answer:

Given : Two cards are drawn without replacement from a well-shuffled deck of 52 cards.


To find : mean (𝓊) and variance (σ2) of X


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Two cards are drawn without replacement from a well-shuffled deck of 52 cards.


Let X denote the number of face cards drawn


There are 12 face cards present in 52 cards


P(0) = = =


P(1) = = =


P(2) = = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() = 0 + + = = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + =


E(X2) =


Variance = E(X2) - = = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 17.

Two cards are drawn one by one with replacement from a well-shuffled deck of 52 cars. Find the mean and variance of the number of aces.


Answer:

Given : Two cards are drawn with replacement from a well-shuffled deck of 52 cards.


To find : mean (𝓊) and variance (σ2) of X


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Two cards are drawn with replacement from a well-shuffled deck of 52 cards.


Let X denote the number of ace cards drawn


There are 4 face cards present in 52 cards


X can take the value of 0,1,2.


P(0) = =


P(1) = = =


P(2) = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() = 0 + + = = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () = 0 + + =


E(X2) =


Variance = E(X2) - = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 18.

Three cards are drawn successively with replacement from a well – shuffled deck of 52 cards. A random variable X denotes the number of hearts in the three cards drawn. Find the mean and variance of X.


Answer:

Given : Three cards are drawn successively with replacement from a well – shuffled deck of 52 cards.


To find : mean (𝓊) and variance (σ2) of X


Formula used :



Mean = E(X) =


Variance = E(X2) -


Mean = E(X) = = x1P(x1) + x2P(x2) + x3P(x3)


Three cards are drawn successively with replacement from a well – shuffled deck of 52 cards.


Let X be the number of hearts drawn.


Number of hearts in 52 cards is 13


P(0) = =


P(1) = =


P(2) = =


P(3) = =


The probability distribution table is as follows,



Mean = E(X) = 0() + 1() + 2() + 3() = 0 + + + = =


Mean = E(X) =


= =


E(X2) = = P(x1) + P(x2) + P(x3)


E(X2) = () + () + () + () = 0 + + + = =


E(X2) =


Variance = E(X2) - = = =


Variance = E(X2) - =


Mean = E(X) =


Variance =



Question 19.

Five defective bulbs are accidently mixed with 20 good ones. It is not possible to just look at a bulb and tell whether or not it is defective. Find the probability distribution from this lot.


Answer:

Given : Five defective bulbs are accidently mixed with 20 good ones.


To find : probability distribution from this lot


Formula used :



Five defective bulbs are accidently mixed with 20 good ones.


Total number of bulbs = 25


X denote the number of defective bulbs drawn


X can draw the value 0 , 1 , 2 , 3 , 4.


since the number of bulbs drawn is 4, n = 4


P(0) = P(getting a no defective bulb) = = =


P(1) = P(getting 1 defective bulb and 3 good ones) = =


P(1) = =


P(2) = P(getting 2 defective bulbs and 2 good one) =


P(2) = = =


P(3) = P(getting 3 defective bulbs and 1 good one) =


P(3) = =


P(4) = P(getting all defective bulbs) = = =


P(4) =


The probability distribution table is as follows,