Two Dice Are Thrown Simultaneously. If X Denotes the Number of Sixes, Find the Expectation of X. - Mathematics and Statistics

प्रश्न

Two dice are thrown simultaneously. If X denotes the number of sixes, find the expectation of X.

बेरीज

उत्तर

Here, X represents the number of sixes obtained when two dice are thrown simultaneously. Therefore, X can take the value of 0, 1, or 2.

∴ P (X = 0) = P (not getting six on any of the dice)

= `(5 xx 5)/(6 xx 6)`

= `25/36`

P (X = 1) = P (six on first die and no six on second die) + P (no six on first die and six on second die)

= `2(1/6xx5/6)`

= `10/36`

P (X = 2) = P (six on both the dice) =`1/36`

∴ The required probability distribution is as follows.

X	0	1	2
P(X)	`25/36`	`10/36`	`1/36`

Expectation of X = E(X) = `sum X_iP(X_i)`

= `0 xx 25/36 + 1 xx10/36 + 2xx 1/36`

= `1/3`

shaalaa.com

Random Variables and Its Probability Distributions

या प्रश्नात किंवा उत्तरात काही त्रुटी आहे का?

Q 11 Q 9.Q 12

पाठ 13: Probability - Exercise 13.4 [पृष्ठ ५७१]

APPEARS IN

एनसीईआरटी Mathematics [English] Class 12

पाठ 13 Probability
Exercise 13.4 | Q 11 | पृष्ठ ५७१

बालभारती Mathematics and Statistics 2 (Arts and Science) [English] 12 Standard HSC Maharashtra State Board

पाठ 7 Probability Distributions
Exercise 7.1 | Q 12 | पृष्ठ २३३

2021-2022 (March) Set 1 (with solutions)

Q 25 | 3 marks

व्हिडिओ ट्यूटोरियलVIEW ALL [3]

view
व्हिडिओ ट्यूटोरियल For All Subjects
Random Variables and Its Probability Distributions

video tutorial01:49:27
Random Variables and Its Probability Distributions

video tutorial00:14:20
Random Variables and Its Probability Distributions

video tutorial00:44:00

संबंधित प्रश्‍न

From a lot of 15 bulbs which include 5 defectives, a sample of 4 bulbs is drawn one by one with replacement. Find the probability distribution of number of defective bulbs. Hence find the mean of the distribution.

Probability distribution of X is given by

X = x	1	2	3	4
P(X = x)	0.1	0.3	0.4	0.2

Find P(X ≥ 2) and obtain cumulative distribution function of X

State the following are not the probability distributions of a random variable. Give reasons for your answer.

X	0	1	2
P (X)	0.4	0.4	0.2

State the following are not the probability distributions of a random variable. Give reasons for your answer.

Y	-1	0	1
P(Y)	0.6	0.1	0.2

State the following are not the probability distributions of a random variable. Give reasons for your answer.

Z	3	2	1	0	-1
P(Z)	0.3	0.2	0.4	0.1	0.05

Find the probability distribution of number of heads in two tosses of a coin.

Find the probability distribution of the number of successes in two tosses of a die, where a success is defined as

(i) number greater than 4

(ii) six appears on at least one die

An urn contains 25 balls of which 10 balls bear a mark ‘X’ and the remaining 15 bear a mark ‘Y’. A ball is drawn at random from the urn, its mark is noted down and it is replaced. If 6 balls are drawn in this way, find the probability that

(i) all will bear ‘X’ mark.

(ii) not more than 2 will bear ‘Y’ mark.

(iii) at least one ball will bear ‘Y’ mark

(iv) the number of balls with ‘X’ mark and ‘Y’ mark will be equal.

Assume that the chances of the patient having a heart attack are 40%. It is also assumed that a meditation and yoga course reduce the risk of heart attack by 30% and prescription of certain drug reduces its chances by 25%. At a time a patient can choose any one of the two options with equal probabilities. It is given that after going through one of the two options the patient selected at random suffers a heart attack. Find the probability that the patient followed a course of meditation and yoga?

There are 4 cards numbered 1 to 4, one number on one card. Two cards are drawn at random without replacement. Let X denote the sum of the numbers on the two drawn cards. Find the mean and variance of X.

Let, X denote the number of colleges where you will apply after your results and P(X = x) denotes your probability of getting admission in x number of colleges. It is given that

\[P\left( X = x \right) = \begin{cases}kx & , & if x = 0 or 1 \\ 2 kx & , & if x = 2 \\ k\left( 5 - x \right) & , & if x = 3 or 4 \\ 0 & , & if x > 4\end{cases}\]

where k is a positive constant. Find the value of k. Also find the probability that you will get admission in (i) exactly one college (ii) at most 2 colleges (iii) at least 2 colleges.

Two numbers are selected at random (without replacement) from positive integers 2, 3, 4, 5, 6 and 7. Let X denote the larger of the two numbers obtained. Find the mean and variance of the probability distribution of X.

A random variable X has the following probability distribution:

Values of X :	−2	−1	0	1	2	3
P (X) :	0.1	k	0.2	2k	0.3	k

Find the value of k.

A random variable X has the following probability distribution:

Values of X :	0	1	2	3	4	5	6	7	8
P (X) :	a	3a	5a	7a	9a	11a	13a	15a	17a

Determine:
(i) The value of a
(ii) P (X < 3), P (X ≥ 3), P (0 < X < 5).

The probability distribution function of a random variable X is given by

x_i :	0	1	2
p_i :	3c³	4c − 10c²	5c-1

where c > 0 Find: P (1 < X ≤ 2)

Two cards are drawn from a well shuffled pack of 52 cards. Find the probability distribution of the number of aces.

Find the probability distribution of the number of heads, when three coins are tossed.

A bag contains 4 red and 6 black balls. Three balls are drawn at random. Find the probability distribution of the number of red balls.

A class has 15 students whose ages are 14, 17, 15, 14, 21, 19, 20, 16, 18, 17, 20, 17, 16, 19 and 20 years respectively. One student is selected in such a manner that each has the same chance of being selected and the age X of the selected student is recorded. What is the probability distribution of the random variable X?

Two cards are drawn successively with replacement from well shuffled pack of 52 cards. Find the probability distribution of the number of aces.

Two cards are drawn successively with replacement from a well shuffled pack of 52 cards. Find the probability distribution of the number of kings.

From a lot containing 25 items, 5 of which are defective, 4 are chosen at random. Let X be the number of defectives found. Obtain the probability distribution of X if the items are chosen without replacement .

Let X represent the difference between the number of heads and the number of tails when a coin is tossed 6 times. What are the possible values of X?

From a lot of 10 bulbs, which includes 3 defectives, a sample of 2 bulbs is drawn at random. Find the probability distribution of the number of defective bulbs.

The probability distribution of a random variable X is given below:

x	0	1	2	3
P(X)	k	\[\frac{k}{2}\]	\[\frac{k}{4}\]	\[\frac{k}{8}\]

Determine the value of k .

The probability distribution of a random variable X is given below:

x	0	1	2	3
P(X)	k	\[\frac{k}{2}\]	\[\frac{k}{4}\]	\[\frac{k}{8}\]

Determine P(X ≤ 2) and P(X > 2) .

Find the mean and standard deviation of each of the following probability distributions:

x_i :	2	3	4
p_i :	0.2	0.5	0.3

Find the mean and standard deviation of each of the following probability distribution:

xi :	1	3	4	5
pi:	0.4	0.1	0.2	0.3

Find the mean and standard deviation of each of the following probability distribution:

x_i :	−1	0	1	2	3
p_i :	0.3	0.1	0.1	0.3	0.2

A discrete random variable X has the probability distribution given below:

X:	0.5	1	1.5	2
P(X):	k	k²	2k²	k

Determine the mean of the distribution.

Find the mean variance and standard deviation of the following probability distribution

x_i:	a	b
p_i :	p	q

where p + q = 1 .

Two cards are drawn simultaneously from a pack of 52 cards. Compute the mean and standard deviation of the number of kings.

A fair die is tossed. Let X denote 1 or 3 according as an odd or an even number appears. Find the probability distribution, mean and variance of X.

A fair coin is tossed four times. Let X denote the longest string of heads occurring. Find the probability distribution, mean and variance of X.

Two cards are selected at random from a box which contains five cards numbered 1, 1, 2, 2, and 3. Let X denote the sum and Y the maximum of the two numbers drawn. Find the probability distribution, mean and variance of X and Y.

A box contains 13 bulbs, out of which 5 are defective. 3 bulbs are randomly drawn, one by one without replacement, from the box. Find the probability distribution of the number of defective bulbs.

In roulette, Figure, the wheel has 13 numbers 0, 1, 2, ...., 12 marked on equally spaced slots. A player sets Rs 10 on a given number. He receives Rs 100 from the organiser of the game if the ball comes to rest in this slot; otherwise he gets nothing. If X denotes the player's net gain/loss, find E (X).

Three cards are drawn at random (without replacement) from a well shuffled pack of 52 cards. Find the probability distribution of number of red cards. Hence, find the mean of the distribution .

In a game, a man wins Rs 5 for getting a number greater than 4 and loses Rs 1 otherwise, when a fair die is thrown. The man decided to thrown a die thrice but to quit as and when he gets a number greater than 4. Find the expected value of the amount he wins/loses.

For what value of k the following distribution is a probability distribution?

X = x_i :	0	1	2	3
P (X = x_i) :	2k⁴	3k² − 5k³	2k − 3k²	3k − 1

If a random variable X has the following probability distribution:

X :	0	1	2	3	4	5	6	7	8
P (X) :	a	3a	5a	7a	9a	11a	13a	15a	17a

then the value of a is

A random variable X has the following probability distribution:

X :	1	2	3	4	5	6	7	8
P (X) :	0.15	0.23	0.12	0.10	0.20	0.08	0.07	0.05

For the events E = {X : X is a prime number}, F = {X : X < 4}, the probability P (E ∪ F) is

Mark the correct alternative in the following question:
For the following probability distribution:

X:	−4	−3	−2	−1	0
P(X):	0.1	0.2	0.3	0.2	0.2

The value of E(X) is

A pair of dice is thrown 4 times. If getting a doublet is considered a success, find the probability distribution of the number of successes and, hence, find its mean.

Find the probability distribution of the number of doublets in three throws of a pair of dice and find its mean.

A die is tossed twice. A 'success' is getting an even number on a toss. Find the variance of number of successes.

Three cards are drawn successively with replacement from a well shuffled pack of 52 cards. Find the probability distribution of the number of spades. Hence, find the mean of the distribtution.

An urn contains 3 white and 6 red balls. Four balls are drawn one by one with replacement from the urn. Find the probability distribution of the number of red balls drawn. Also find mean and variance of the distribution.

Three fair coins are tossed simultaneously. If X denotes the number of heads, find the probability distribution of X.

For the following probability density function (p. d. f) of X, find P(X < 1) and P(|x| < 1)

`f(x) = x^2/18, -3 < x < 3`

= 0, otherwise

Two fair coins are tossed simultaneously. If X denotes the number of heads, find the probability distribution of X. Also find E(X).

Demand function x, for a certain commodity is given as x = 200 - 4p where p is the unit price. Find :
(a) elasticity of demand as function of p.
(b) elasticity of demand when p = 10 , interpret your result.

If the demand function is D = 150 - p² - 3p, find marginal revenue, average revenue and elasticity of demand for price p = 3.

Find mean and standard deviation of the continuous random variable X whose p.d.f. is given by f(x) = 6x(1 - x);= (0); 0 < x < 1(otherwise)

John and Mathew started a business with their capitals in the ratio 8 : 5. After 8 months, john added 25% of his earlier capital as further investment. At the same time, Mathew withdrew 20% of bis earlier capital. At the end of the year, they earned ₹ 52000 as profit. How should they divide the profit between them?

A random variable X has the following probability distribution :

X = x	-2	-1	0	1	2	3
P(x)	0.1	k	0.2	2k	0.3	k

Find the value of k and calculate mean.

Write the negation of the following statements :

(a) Chetan has black hair and blue eyes.
(b) ∃ x ∈ R such that x² + 3 > 0.

If random variable X has probability distribution function.
f(x) = `c/x`, 1 < x < 3, c > 0, find c, E(x) and Var(X)

The expenditure E_c of a person with income I is given by E_c= (0.000035) I² + (0. 045) I. Find marginal propensity to consume (MPC) and average propensity to consume (APC) when I = 5000.

Alex spends 20% of his income on food items and 12% on conveyance. If for the month of June 2010, he spent ₹900 on conveyance, find his expenditure on food items during the same month.

Find the premium on a property worth ₹12,50,000 at 3% if the property is fully insured.

The following table gives the age of the husbands and of the wives :

Age of wives (in years)	Age of husbands (in years)
Age of wives (in years)	20-30	30- 40	40- 50	50- 60
15-25	5	9	3	-
25-35	-	10	25	2
35-45	-	1	12	2
45-55	-	-	4	16
55-65	-	-	-	4

Find the marginal frequency distribution of the age of husbands.

The p.m.f. of a random variable X is
`"P"(x) = 1/5` , for x = I, 2, 3, 4, 5
= 0 , otherwise.
Find E(X).

The defects on a plywood sheet occur at random with an average of the defect per 50 sq. ft. What Is the probability that such sheet will have-

(a) No defects
(b) At least one defect
[Use e^-1 = 0.3678]

From the following data, find the crude death rates (C.D.R.) for Town I and Town II, and comment on the results :

Age Group (in years)	Town I		Town II
Age Group (in years)	Population	No. of deaths	Population	No. of deaths
0-10	1500	45	6000	150
10-25	5000	30	6000	40
25 - 45	3000	15	5000	20
45 & above	500	22	3000	54

A random variable X has the following probability distribution :

X	0	1	2	3	4	5	6
P(X)	C	2C	2C	3C	C²	2C²	7C²+C

Find the value of C and also calculate the mean of this distribution.

An urn contains 5 red and 2 black balls. Two balls are drawn at random. X denotes number of black balls drawn. What are possible values of X?

Solve the following :

Identify the random variable as either discrete or continuous in each of the following. Write down the range of it.

20 white rats are available for an experiment. Twelve rats are male. Scientist randomly selects 5 rats number of female rats selected on a specific day

Solve the following:

Identify the random variable as either discrete or continuous in each of the following. Write down the range of it.

A highway safety group is interested in studying the speed (km/hrs) of a car at a check point.

A random variable X has the following probability distribution :

x = x	0	1	2	3				7
P(X=x)	0	k	2k	2k	3k	k²	2k²	7k² + k

Determine (i) k

(ii) P(X> 6)

(iii) P(0<X<3).

Determine whether each of the following is a probability distribution. Give reasons for your answer.

x	0	1	2
P(x)	0.4	0.4	0.2

Determine whether each of the following is a probability distribution. Give reasons for your answer.

x	0	1	2
P(x)	0.1	0.6	0.3

Determine whether each of the following is a probability distribution. Give reasons for your answer.

x	0	1	2
P(x)	0.3	0.4	0.2

Find the probability distribution of the number of successes in two tosses of a die if success is defined as getting a number greater than 4.

A class has 15 students whose ages are 14, 17, 15, 14, 21, 17, 19, 20, 16, 18, 20, 17, 16, 19 and 20 years. If X denotes the age of a randomly selected student, find the probability distribution of X. Find the mean and variance of X.

A die is thrown 4 times. If ‘getting an odd number’ is a success, find the probability of at most 2 successes.

A pair of dice is thrown 3 times. If getting a doublet is considered a success, find the probability of two successes

The probability that a bulb produced by a factory will fuse after 200 days of use is 0.2. Let X denote the number of bulbs (out of 5) that fuse after 200 days of use. Find the probability of X ≤ 1

The probability that a bulb produced by a factory will fuse after 200 days of use is 0.2. Let X denote the number of bulbs (out of 5) that fuse after 200 days of use. Find the probability of (i) X = 0, (ii) X ≤ 1, (iii) X > 1, (iv) X ≥ 1.