Probability
Class 10th Mathematics RS Aggarwal Solution
- Fill in the blanks: (i) The probability of an impossible event is... (ii) The…
- A coin is tossed once. What is the probability of getting a tail?…
- Two coins are tossed simultaneously. Find the probability of getting (i)…
- A die is thrown once. Find the probability of getting (i) An even number (ii) A…
- A letter of English alphabet is chosen at random. Determine the probability…
- A child has a die whose 6 faces show the letter given below: The die is thrown…
- It is known that a box of 200 electric bulbs contains 16 defective bulbs. One…
- If the probability of winning a game is 0.7, what is the probability of losing…
- There are 35 students in a class of whom 20 are boys and 15 are girls. From…
- In a lottery there are 10 prizes and 25 blanks. What is the probability of…
- 250 lottery tickets were sold and there are 5 prizes on these tickets. If…
- 17 cards numbered 1, 2, 3, 4, ....., 17 are put in a box and mixed thoroughly.…
- A game of chance consist of spinning an arrow, which comes to rest pointing at…
- In a family of 3 children, find the probability of having at least one boy.…
- A bag contains 5 red balls, 4 white balls, 2 black balls and 4 green balls. A…
- A card is drawn at random from a well-shuffled pack of 52 cards. Find the…
- A card is drawn at random from a well-shuffled pack of 52 cards. Find the…
- A card is drawn from a well-shuffled pack of 2 cards. Find the probability of…
- Two different dice are tossed together. Find the probability that (i) the…
- Two difference dice are rolled simultaneously. Find the probability that the…
- When two dice are tossed together, find the probability that the sum of…
- Two dice are rolled together. Find the probability of getting such numbers on…
- Two dice are rolled together. Find the probability of getting such numbers on…
- Cards marked with numbers 5 to 50 are placed in a box and mixed thoroughly. A…
- A game of chance consists of spinning an arrow which is equally likely to come…
- 12 defective pens are accidently mixed 132 good ones. It is not possible to…
- A lot consists of 144 ballpoint pens of which 20 are defective and others…
- A box contains 90 discs which are numbered from 1 to 90. If one disc is drawn…
- A lot of 20 bulbs contain 4 defective ones. One bulb is drawn at random from…
- Suppose the bulb drawn in (i) is not defective and not replaced. Now, bulb is…
- A bag contains lemon-flavoured candies only. Hema takes out one candy without…
- There are 40 students in a class of whom 25 are girls and 15 are boys. The…
- One card is drawn from a well-shuffled deck of 52 cards. Find the probability…
- A card is drawn at random from a well-shuffled deck of 52 cards. Find the…
- One card is drawn from well-shuffled deck of 52 cards. Find the probability of…
- A card is drawn at random from a well-shuffled deck of playing cards. Find the…
- A box contains 25 cards numbered from 1 to 25. A card is drawn at random from…
- A box contains cards numbered 3, 5, 7, 9, ...., 35, 37. A card is drawn at…
- Cards numbered 1 to 30 are put in a bag. Find the probability that the number…
- Cards bearing numbers 1, 3, 5, ....., 35 are kept in a bag. A card is drawn at…
- A box contains cards bearing numbers 6 to 70. If one card is drawn at random…
- Cards marked with numbers 1, 3, 5, ....., 101 are placed in a bag and mixed…
- Tickets numbered 2, 3, 4, 5, ..... 100, 101 are placed in a box and mixed…
- A box contains 80 discs, which are numbered from 1 to 80. If one disc is drawn…
- A piggy bank contains hundred 50-p coins, seventy RS. 1 coin, fifty RS. 2 coins…
- The probability of selecting a red ball at random from a jar that contains…
- A bag contains 18 balls out of which x balls are red. (i) If one ball is drawn…
- A jar contains 24 marbles. Some of these are green and others are blue. If a…
- A jar contains 54 marbles, each of which some are blue, some are green and…
- A carton consists of 100 shirts of which 88 are good are 8 have minor defects.…
- A group consists of 12 person, of which 3 are extremely patient, other 6are…
- A die is rolled twice. Find the probability that (i) 5 will not come up either…
- Two dice are rolled once. Find the probability of getting such numbers on two…
- A letter is chosen at random from the letters of the word ‘ASSOCIATION’. Find…
- Five cards-the ten, jack, queen, king and ace of diamonds are well shuffled…
- A card is drawn at random a well shuffled pack of 2 cards. Find the…
- What is the probability that an ordinary year has 53 Mondays?
- All red face cards are removed from a pack of playing cards. The remaining…
- All kings, queens and aces are removed from a pack of 52 cards. The remaining…
- A game consists of tossing a one-rupee coin three times, and nothing its…
- Find the probability that a leap year selected at random will contain 53…
- If P(E) denotes the probability of an event E thenA. P(E) 0 B. P(E) 1 C. 0 ≤ P(E) ≤ 1…
- If the probability of occurrence of an event is P then the probability of non-happening…
- What is the probability of an impossible event?A. 1/2 B. 0 C. 1 D. more than 1…
- What is the probability of a sure event?A. 0 B. 1/2 C. 1 D. less than 1…
- Which of the following cannot be the probability of an event?A. 1.5 B. 3/5 C. 25% D.…
- A number is selected at random from the numbers 1 to 30. What is the probability that…
- The probability that a number selected at random from the number 1, 2, 3, ....., 15 is…
- A box contains cards numbered 6 to 50. A card is drawn at random from the box. The…
- A box contains 90 discs, numbered from 1 to 90. If one disc is drawn at random from the…
- Cards bearing numbers 2, 3, 4, ....., 11 are kept in a bag. The probability of getting…
- One ticket is drawn at random from a big containing tickets numbered 1 to 40. The…
- Which of the following cannot be the probability of an event?A. 1/3 B. 0.3 C. 33% D.…
- If the probability of winning a game is 0.4 then the probability of losing it, isA.…
- If an event cannot occur then its probability isA. 1 B. 1/2 C. 3/4 D. 0…
- There are 20 tickets numbered as 1, 2, 3, ...., 20 respectively. One ticket is drawn…
- There are 25 tickets numbered as 1, 2, 3, 4, ....., 25 respectively. One ticket is…
- Cards, each marked with one of he numbers 6, 7, 8, ...., 15, are placed in a box and…
- A die is thrown once. The probability of getting an even number isA. 1/2 B. 1/3 C. 1/6…
- The probability of throwing a number greater than 2 with a fair die isA. 2/5 B. 5/6 C.…
- A die is thrown once. The probability of getting an odd number greater than 3 isA. 1/3…
- A die thrown once. The probability of getting a prime number isA. 2/3 B. 1/3 C. 1/2 D.…
- Two dice are thrown together. The probability of getting the same number on both dice…
- The probability of getting 2 heads, when two coins are tossed, isA. 1 B. 3/4 C. 1/2 D.…
- Two dice are thrown together. The probability of getting a doublet isA. 1/3 B. 1/6 C.…
- Two coins are tossed simultaneously. What is the probability of getting at most one…
- Three coins are tossed simultaneously. What is the probability of getting exactly two…
- In a lottery, there are 8 prizes and 16 blanks. What is the probability of getting a…
- In a lottery, there are 6 prizes and 24 blanks. What is the probability of not getting…
- A box contains 3 blue, 2 white and 4 red marbles. If a marbles is drawn at random from…
- A bag contains 4 red and 6 black balls. A ball is taken out of the bag at random. What…
- A bag contains 8 red, 2 black and 5 white balls. One ball is drawn at random. What is…
- A bag contains 3 white, 4 red and 5 black balls. One ball is drawn at random. What is…
- A card is drawn at random from a well-shuffled deck of 52 cards. What is the…
- From a well- shuffled deck of 52 cards, one card is drawn at random. What is the…
- One card is drawn at random from a well-shuffled deck of 52 cards. What is the…
- One card is drawn at random from a well-shuffled deck of 52 cards. What is the…
- One card is drawn at random from a well-shuffled deck of 52 cards. What is the…
Exercise 15a
Question 1.Fill in the blanks:
(i) The probability of an impossible event is...
(ii) The probability of a sure event is ..... .
(iii) For any event E, P(E) + P(not E) = .....
(iv) The probability of a possible but not a sure event lies between and ..... .
(v) The sum of probabilities of the outcomes of an experiment is..... .
Answer:
(i) 0
The probability of an impossible event is zero because probability is likelihood of a given event's occurrence, which is expressed as a number between 0 and 1.
(ii) 1
The probability of a sure event is always 1 as the event may occur or may not occur and if its sure to occur there is only 1 probability for same.
(iii) 1
P(E) = 1/2 and P(not E) = 1/2 adding the two gives 1 because P(not E) is complement of event E.
(iv) 0, 1
The probability of a possible but not a sure event lies between 0 and 1 as an event is possible but not sure to occur. It may occur and may not occur.
(v) 1
The probability of the outcome of an experiment is one because an experiment may succeed or fail. P (E) + P(not E) = 1
Question 2.
A coin is tossed once. What is the probability of getting a tail?
Answer:
P(E) = number of favourable outcome /total number of outcome.
When a coin is tossed, the possible outcomes are:
P(E) = { H, T}
So, P(T), the probability of getting tail is 1/2.
Question 3.
Two coins are tossed simultaneously. Find the probability of getting
(i) Exactly 1 head
(ii) At most 1 head
(iii) At least 1 head
Answer:
When two coins are tossed simultaneously, all possible outcomes are HH, HT, TH, TT.
Total number of outcomes = 4
(i) Let E be the event for getting exactly 1 head
Then, the favourable outcomes are: HT, TH
Number of favourable outcomes = 2
∴ P(getting exactly one head) = P(E) = 2/4 = 1/2 or 50%
(ii) Let E be the event for getting atmost one head
Then, the favourable outcomes are: HT, TH, HH
Number of favourable outcomes = 3
∴ P(getting atmost one head) = P(E) = 3/4 or 75%
Note: Atmost one means maximum one head can come. So, we will also consider the outcome in which no head is obtained.
Atleast one means minimum one head will come. So, the outcome with two heads will also be counted.
(iii) Let E be the event for getting atleast one head
Then, the favourable outcomes are: HT, TH, HH
Number of favourable outcomes = 3
∴ P(getting atleast one head) = P(E) = 3/4 or 75%
Question 4.
A die is thrown once. Find the probability of getting
(i) An even number
(ii) A number less than 5
(iii) A number greater than 2
(iv) A number between 3 and 6
(v) A number other than 3
(vi) The number 5.
Answer:
When a die is thrown, all the possible outcomes are: 1, 2, 3, 4, 5, 6
Total number of outcomes = 6
(i) Let E be the event of getting an even number
Then, the favourable outcomes are: 2, 4, 6
Number of favourable outcomes = 3
∴ P (getting exactly one head) = P(E) = 3/6 = 1/2 or 50%
(ii) Let E be the event of getting a number less than 5
Then, the favourable outcomes are: 1, 2, 3, 4
Number of favourable outcomes =4
∴ P (getting number less than 5) =P (E) =4/6=2/3 or about 66.67%
(iii) Let E be the event of getting a number greater than 2
Then, the favourable outcomes are: 3, 4, 5, 6
Number of favourable outcomes are =4
∴ P (getting number greater than 2) = P (E) =4/6= 2/3 or 66.67%
(iv) Let E be the event of getting number between 3 and 6
Then, the favourable outcomes are: 4, 5,
Number of outcomes are = 2
∴ P (getting number between 3 and 6) = P (E) = 2/6 =1/3 or 33%
(v) Let A be the event of getting number other than 3
Then, the favourable outcomes are: 1, 2, 4, 5, 6
Number of outcomes are = 5
∴ P (getting number other than 3) = P (E) =5/6 or 83.33%
(vi) Let E be the event of getting number 5
Then, the favourable outcome is: 1
∴ P (getting exactly number 5) = P (E) = 1/6 or 16.67%
Question 5.
A letter of English alphabet is chosen at random. Determine the probability that the chosen letter is a consonant.
Answer:
Let E be the event of choosing an alphabet
Total numbers of alphabets are 26
Then, the favourable outcomes are: B, C, D, F, G, H, J, K, L, M, N, P, Q, R, S, T, V, W, X, Y, Z
The number of outcomes are =21
∴ P (choosing a consonant) =P (E) = 21/26
Question 6.
A child has a die whose 6 faces show the letter given below:
The die is thrown once. What is the probability of getting (i) A, (ii) D?
Answer:
(i) Total letter on the dice are: 6
Let E be the event of getting letter ‘A’
Then, the numbers of favourable outcomes are = 3
∴ P (getting letter ‘A’) = P (E) = 3/6 = 1/2 or 50%
(ii) Total letter on the dice are: 6
Let E be the event of getting letter ‘D’
Then, the number of favourable outcomes is= 1
∴ P (getting letter ‘D’) = P (E) = 1/6 or 16. 67%
Question 7.
It is known that a box of 200 electric bulbs contains 16 defective bulbs. One bulb is taken out at random from the box. What is probability that the bulb drawn is (i) defective, (ii) non-defective?
Answer:
(i) Total numbers of bulbs are: 200
Let E be the event of drawing defective bulb
Then, the numbers of favourable outcomes are= 16
P (drawing defective bulb) = P (E) = 16/200= 2/25
(ii) Total numbers of bulbs are: 200
Let E be the event of drawing non defective bulb
Then, the numbers of favourable outcomes are: 200 -16 =184 non defective bulbs out of which one can be chosen in 184 ways
P (drawing non defective bulb) = P (E) = 184/200 = 23/25 or 92%
Question 8.
If the probability of winning a game is 0.7, what is the probability of losing it?
Answer:
Let E be the event of winning the game
P(E) + P(not E)= 1 where P(E) denotes probability of occurrence E and P(not E) denotes probability of non-occurrence of E
∴ Then, P (losing the game) = P (not E) = 1- 0.7 = 0.3
Question 9.
There are 35 students in a class of whom 20 are boys and 15 are girls. From these students one is chosen at random. What is the probability that the chosen student is a (i) boy, (ii) girl?
Answer:
Total numbers of students are: 35
(i) Let E be the event of choosing a boy at random
Then, the numbers of favourable outcome are: 20
∴ P (choosing a boy) = P (E) = 20/35 = 4/7 or 57%
(ii) Let E be the event of choosing a girl at random
Then, the numbers of favourable outcome are= 15
∴ P (choosing a girl) = P (E) = 15/35 =3/7 or 43%
Question 10.
In a lottery there are 10 prizes and 25 blanks. What is the probability of getting a prize?
Answer:
Total numbers of outcome in a draw of lottery are: 10 + 25= 35 being lottery Draw a prize or a blank
Let E be the event of getting a prize at draw
Then, the numbers of favourable events are= 10
∴ P (getting a prize) = P (E) = 10/35 = 2/7
Question 11.
250 lottery tickets were sold and there are 5 prizes on these tickets. If Kunal has purchased one lottery ticket, what is the probability that he wins a prize?
Answer:
Total numbers of elementary events are: 250
Let E be the event of winning a prize
Then, the numbers of favourable event are= 5 being number of prizes
∴ P (winning a prize) = P (E) = 5/250 = 1/50
Question 12.
17 cards numbered 1, 2, 3, 4, ....., 17 are put in a box and mixed thoroughly. A card is drawn bears (i) an old numbers (ii) a number divisible by 5.
Answer:
Total numbers of elementary events are: 17
(i) Let E be the event of getting an old number
The favourable odd numbers are: 1, 3, 5, 7, 9, 11, 13, 15, 17
Then, the numbers of favourable odd numbers are= 9
∴ P (getting an old number) = P (E) = 9/17
(ii) Let E be the event of getting a number divisible by 5
The favourable outcomes are: 5, 10, 15
Then, the number of favourable outcome are= 3
∴ P (getting a number divisible by 5) = 3/17
Question 13.
A game of chance consist of spinning an arrow, which comes to rest pointing at one of the numbers 1, 2, 3, 4, 5, 6, 7, 8 and these are equally likely outcomes. Find the probability that the arrow will point at any factor of 8.
Answer:
Total numbers of elementary events are: 8
Let E be the event of getting the arrow pointing at any factor of 8
The favourable outcomes are: 1, 2, 4,
Then, the number of favourable events are = 3
∴ P (getting a factor of 8) = P (E) = 3/8
Question 14.
In a family of 3 children, find the probability of having at least one boy.
Answer:
Let E be the event of having at least one boy
The probability that each child will be a boy is 1/2.
The probability that each child will be a girl is 1/2.
The probability of no boys = 1/2 × 1/2 × 1/2 = 1/8
Then, the number of favourable outcome is P(E) –P(not E)=1 where P(E) is probability of having at least one boy and P(not E) means the probability of having no boy at all.
∴ Probability (at least 1 boy) = 1 - probability (no boys)= 1 - 1/8 = 7/8
Question 15.
A bag contains 5 red balls, 4 white balls, 2 black balls and 4 green balls. A ball is drawn at random from the big. Find the probability that it is (i) black, (ii) not green, (iii) red or white, (iv) neither red nor green.
Answer:
Total numbers of elementary events are: 5 + 4 + 2 + 4 = 15
(i) Let E be the event of getting a black ball at the random draw
Then, numbers of favourable outcomes are: 2
∴ P (getting a black ball) = P (E) = 2/15
(ii) Let E be the event of getting non green ball at the random draw
Then, the numbers of unfavourable outcomes are: 4
Probability of getting a green ball = P (green ball) = 4/15
Then, the number of favourable outcome P (not green ball) = 1- P (green ball)
∴ (P non green ball)= P (E) = 1- 4/15 =11/15
(iii) Let E be the event of getting a red or white ball
Let A be the event of getting a red ball
Then, favourable outcomes are: 5
Probability (getting a red ball) = P (A) = 5/15
Let B be the event of getting a white ball
Then, the numbers of favourable outcomes are: 4
Probability (getting white ball) = P (B) = 4/15
P (E) = P (A) + P (B)
∴ P(red ball or white ball) = P (E) = 5/15 + 4/15 = 9/15 = 3/5
(iv) Let E be the event of getting neither red nor green
Let A be the probability of getting a red ball
Then, the favourable outcomes are: 5
∴ P (getting red ball) =P (A) = 5/15
Let B be the event of getting a green ball
Then, the favourable outcomes are: 4
P (getting green ball) = 4/15
Let C be the getting red or green ball
P (getting red or green ball) = P(C) = 5/15 + 4/15 = 9/15 = 3/5
P (getting neither Red nor green ball) = P (E) = 1- P (C) = 1-3/5 = 2/5
Question 16.
A card is drawn at random from a well-shuffled pack of 52 cards. Find the probability of getting (i) a red king, (ii) a queen or a jack.
Answer:
Total numbers of elementary events are: 52
(i) Let E be the event of drawing a card from pack of 52 card
Then, numbers of favourable outcomes are: 2 being hearts card or diamond cards being king in red colour.
∴ P (a red king) =P (E) = 2/52 = 1/26
(ii) Let E be the event of getting a queen or a jack
Let A be the event of getting a queen
Then, numbers of favourable events are: 4
P (queen) = P (A) = 4/52
Let B be the event of getting a jack
Then, the numbers of favourable event are: 4
P (jack) = P (B) = 4/52
∴ P (queen or jack) = P (E) = 4/52 + 4/52 = 8/52 = 2/13
Question 17.
A card is drawn at random from a well-shuffled pack of 52 cards. Find the probability that the drawn card is neither a king nor a queen.
Answer:
Total numbers of elementary events are: 52
Let E be the event of drawing neither a king or a queen
Let A be the event of drawing a king
Then, the numbers of favourable outcomes are: 4
P (king) = P (A) = 4/52
Let B be the event of drawing a queen
Then, the numbers of favourable outcomes are: 4
P (queen) = P (B) = 4/52
Let C be the event of getting either a king or a queen
Then, the numbers of favourable events are: 4 + 4 = 8
P (either king or queen) = P (C) = 4/52 + 4/52 = 8/52 = 2/13
∴ P (neither king or queen) = P (E) = 1- P (C) = 1- 2/13 = 11/ 13
Question 18.
A card is drawn from a well-shuffled pack of 2 cards. Find the probability of getting (i) a red face card, (ii) a black king.
Answer:
Total numbers of elementary events are: 52
(i) Let E be the event of getting a red face card
Then, the numbers of favourable outcomes are: 6
Being 2 red cards of jack, 2 red cards of queen and 2 red cards of King
∴ P (red card) = P (E) = 6/52 = 3/26
(ii) Let E be the event of getting a black king
Then, the numbers of favourable outcomes are: 2
Being only 2 card of king are of black colour in pack of 52
∴ P (black king) = P (E) = 2/52 = 1/26
Question 19.
Two different dice are tossed together. Find the probability that (i) the number on each die is even, (ii) the sum of the numbers appearing on two dice is 5.
Answer:
Total numbers of elementary events are: 6 x 6 = 36
(i) Let E be the event of getting an even number on each die
The favourable combinations are: (2, 2), (2, 4), (2, 6), (4, 2), (4, 4), (4, 6), (6, 2), (6, 4), (6, 6)
Then, the number of favourable outcomes are = 9
∴ P (getting even number on both dice) =P (E) = 9/36 = 1/4
(ii) Let E be the event of getting the sum of the numbers appearing on two dice is 5
The favourable combinations for event are: (1, 4), (2, 3), (3, 2), (4, 1)
Then, the numbers of favourable combinations = 4
∴ P (sum of numbers appearing on two dice is 5) =P (E) = 4/36 = 1/9
Question 20.
Two difference dice are rolled simultaneously. Find the probability that the sum of the numbers on the two dice is 10.
Answer:
Total numbers of elementary events are: 6 x6 = 36
Let E be the event of getting the sum of the numbers on the two dice is 10
The favourable combination is: (5, 5), (4, 6), (6, 4)
The numbers of favourable combinations are: 3
∴ P (getting sum of numbers on the dice is 10) = P (E) = 3/36 = 1/12
Question 21.
When two dice are tossed together, find the probability that the sum of numbers on their tops is less than 7.
Answer:
Total numbers of elementary events are: 6x6 = 36
Let E be the event of getting the sum of numbers on top is less than 7
The favourable combinations are: (1, 1), (1, 2), (1, 3), (1, 4), (1, 5), (2, 1), (2, 3), (2, 2),
(2, 4), (3, 1), (3, 2), (3, 3), (4, 1), (4, 2), (5, 1)
Then, the number of favourable events = 15
∴ P (sum of numbers on top is less than 7) = P (E) = 15/36 = 5/12
Question 22.
Two dice are rolled together. Find the probability of getting such numbers on the two dice whose product is a perfect square.
Answer:
Total numbers of elementary events are: 6 x 6 = 36
Let E be the event of getting such number on the two dice whose product is a perfect square
The favourable combinations are: (1, 1), (2, 2), (3, 3), (4, 4), (5, 5), (6, 6), (1, 4), (4, 1)
Then, the numbers of favourable combinations = 8
∴ P (getting such number on the two dice whose product is a perfect square)
= P (E) = 8/36 = 2/9
Question 23.
Two dice are rolled together. Find the probability of getting such numbers on the two dice whose product is 12.
Answer:
Total numbers of elementary events are: 6x6 = 36
Let E be the elementary event of getting numbers on the two dice whose product is 12
The favourable outcomes are: (2, 6), (3, 4), (4, 3), (6, 2)
Then, the numbers of favourable outcomes = 4
∴ P (numbers on the two dice whose product is 12) = P (E) = 4/36 = 1/9
Question 24.
Cards marked with numbers 5 to 50 are placed in a box and mixed thoroughly. A card is drawn from the box at random. Find the probability that the number on the taken out card is (i) a prime number less than 10, (ii) a number which is a perfect square.
Answer:
Total numbers of elementary events are: 46
(i) Let E be the event of getting a prime number less than 10
The favourable numbers are: 5, 7
Then, numbers of favourable outcomes = 2
∴ P (getting a prime number less than 10) = P (E) = 2/46 = 1/23
(ii) Let E be the event of getting a perfect square number
The favourable numbers are: 9, 16, 25, 36, 49
Then, the numbers of favourable outcomes = 5
∴ P (getting a perfect square number) = P (E) = 5/46
Question 25.
A game of chance consists of spinning an arrow which is equally likely to come to rest pointing to one of the numbers 1, 2, 3, ...., 12 as shown in the figure. What is the probability that it will point to
(i) 6?, (ii) an even number, (iii) a prime number, (iv) a number which is a multiple of 5 ?
Answer:
Total numbers of elementary events are: 12
(i) Let E be the event of getting arrow pointed to 6
Then, the favourable outcome is: 1
∴ P (getting 6) =P (E) = 1/12
(ii) Let E be the event of getting an even number
The favourable numbers are: 2, 4, 6, 8, 10, 12
Then, the number of favourable outcomes are = 6
∴ P (an even number) = P (E) = 6/12 = 1/2
(iii) Let E be the elementary event of getting a prime number
The favourable numbers are: 2, 3, 5, 7, 11
Then, the number of favourable outcomes = 5
∴ P (prime number) = P (E) = 5/12
(iv) Let E be the event of getting a number which is perfect square
The favourable numbers are: 4, 9
Then, the favourable outcomes = 2
∴ P (perfect square number) = P (E) = 2/12 = 1/6
Question 26.
12 defective pens are accidently mixed 132 good ones. It is not possible to just look at pen and tell whether or not it is defective. One pen is taken out at random from this lot. Find the probability that the pen taken out is good one.
Answer:
Total numbers of elementary events are: good pen + defective pens = 132 + 12 =144
Let E be the event of taking out a good pen
The numbers favourable events are: 132 being the good pens
∴ P (good pen) =P (E) = 132 /144 = 11/12
Question 27.
A lot consists of 144 ballpoint pens of which 20 are defective and others good. Tanvy will buy a pen if it is good, but will not buy it if it is defective. The shopkeeper draws one pen at random and gives it to her. What is the probability that (i) she will buy it, (ii) she will not buy it?
Answer:
Total numbers of elementary events are: 144
Defective pens = 20
Good pens = 144 – 20 = 124
(i) Let E be the event of Tanvy buying the pen
The numbers of favourable outcome are: 124 being only good pens worth buying
∴ P (buy pen) = P (E) = 124/ 144 = 31/ 36
(ii) Let E be the event of Tanvy not buying the pen
The favourable outcomes are: 20
∴ P (not buying a pen) = P (E)= 20/144 = 10/72 = 5/ 36
Question 28.
A box contains 90 discs which are numbered from 1 to 90. If one disc is drawn at random from the box, find the probability that it bears (i) a two-digit number, (ii) a perfect square number, (iii) a number divisible by 5.
Answer:
Total numbers of elementary events are: 90
(i) Let E be the event of getting two digit number at a draw
The favourable numbers are: 10, 11, 12, 13, 14 ……… 90
Since the common difference between the consecutive number is same
It forms an A.P.
First number = a = 10
d = common difference = 11- 10 = 1
Last number = an = 90
an = a + (n-1) d
90 = 10 + (n-1) 1
90-10 = (n-1)
80 + 1 = n
81 = n, being number of terms
Then, the favourable numbers of outcome = 81
∴ P (two digit number) = P (E) = 81/90 = 9/10
(ii) Let E be the event of getting a perfect square number
The favourable numbers are: 1, 4, 9, 16, 25, 36, 49, 64, 81
Then, the number of favourable outcomes = 9
∴ P (perfect square number) = P (E) = 9/90 = 1/10
(iii) Let E be the event of getting a number divisible by 5
The favourable numbers are: 5, 10, 15, 20, 25, 30, 35, 40, 45, 50, 55, 60, 65, 70, 75, 80, 85, 90
Then, the number of favourable outcomes = 18
∴ P (number divisible by 5) = P (E) = 18/90 = 1/5
Question 29.
A lot of 20 bulbs contain 4 defective ones. One bulb is drawn at random from a lot. What is the probability that this bulb is defective?
Answer:
Total numbers of elementary events are: 20
Let E be the event of drawing defective bulb
The number of defective bulbs in a lot = 4
Then, the favourable outcome =4
∴ P (defective bulb) = P (E) = 4/20 = 1/5
Question 30.
Suppose the bulb drawn in (i) is not defective and not replaced. Now, bulb is drawn at random from the rest. What is the probability that this bulb is not defective?
Answer:
Total numbers of elementary events are: 20 – 1 = 19
Let E be the event of getting not defective bulb and not replacing the bulb already drawn
The favourable outcomes = 19 - 4 = 15
∴ P (not defective bulb drawn after not replacing the already drawn bulb) = P (E) = 15/19
Question 31.
A bag contains lemon-flavoured candies only. Hema takes out one candy without looking into the bag. What is the probability that she takes out (i) an orange-flavoured candy? (ii) a lemon-flavoured candy?
Answer:
Total number of elementary events is: 1
(i) Let E be the event of taking orange –flavoured candy
The favourable number of outcomes = 0
Because bag has lemon flavoured candies only
∴ P (E) = 0/1 =0
(ii) Let E be the event of getting a lemon flavoured candy
The favourable number of outcomes = 1
Probability of sure event is: 1
∴ P (lemon-flavoured candy) = P (E) = 1/1 = 1
Question 32.
There are 40 students in a class of whom 25 are girls and 15 are boys. The class teacher has to select one student as a class representative. He writes the name of each student on a separate card, the cards being identical. Then, she puts cards in a bag and sites them thoroughly. She then draws one card from the bag. What is the probability that the name written on the card is the name of (i) a girl? (ii) a boy?
Answer:
Total numbers of elementary events are: 40
(i) Let E be the event of drawing a card with girl`s name written on it
The numbers of favourable outcomes are: 25
∴ P (girl`s name) = P (E)= 25/40 = 5/8
(ii) Let E be the event of drawing a card with boy`s name written on it
The numbers of favourable outcomes are: 15
∴ P (boy`s name) = P (E) = 15/40 = 3/8
Question 33.
One card is drawn from a well-shuffled deck of 52 cards. Find the probability of drawing (i) an ace, (ii) a ‘4’ of a spades, (iii) a’9’ of a black suit, (iv) a red king.
Answer:
Total numbers of elementary events are: 52
(i) Let E be the event of drawing an ace
The favourable outcomes are: 4
∴ P (an ace) = P (E) = 4/52 = 1/13
(ii) Let E be the event of drawing ‘4’ of a spade
The number of favourable outcomes is: 1
∴ P (‘4’ of spade) = P (E) = 1/52
(iii) Let E be the event of drawing ‘9’ of a black suit
The numbers of favourable outcomes are: 2
∴ P (‘9’ of a black suit) = P (E) = 2/52 =1/26
(iv) Let E be the event of drawing a red king
The numbers of favourable outcome are: 2
∴ P (red king) = P (E) = 2/52 = 1/26
Question 34.
A card is drawn at random from a well-shuffled deck of 52 cards. Find the probability of getting (i) a queen, (ii) a diamond, (iii) a king or an ace, (iv) a red ace.
Answer:
Total numbers of elementary events are: 52
(i) Let E be the event of drawing a queen
The numbers of favourable outcomes are: 4
∴ P (queen) = P (E) = 4/52 = 1/13
(ii) Let E be the event of drawing a diamond card
The numbers of favourable outcomes are: 13
∴ P (diamond card) = P (E) = 13/52 = 1/4
(iii) Let E be the event of getting a king or an ace
Let A be the event of drawing a king
The numbers of favourable outcomes are: 4
P (king) = P (A) = 4/52 = 1/13
Let B be the event of drawing an ace
The numbers of favourable outcomes are: 4
P (an ace) = P (E) = 4/52 = 1/13
∴ P (king or an ace) = P (E) = P (A) + P (B) =1/13 + 1/13 = 2/13
(iv) Let E be the event of drawing a red ace
The numbers of favourable events are: 2
∴ P (red ace) = P (E) = 2/52 = 1/26
Question 35.
One card is drawn from well-shuffled deck of 52 cards. Find the probability of getting (i) a king of red suit, (ii) a face card, (iii) a red face card, (iv) a queen of black suit, (v) a jack of hearts, (vi) a spade.
Answer:
Total numbers of elementary events are: 52
(i) Let E be the event of getting a king of red suit
Then, the favourable numbers of outcomes are: 2
∴ P (king of red suit) = P (E) = 2/52 = 1/26
(ii) Let E be the event of drawing a face card
The favourable outcomes are: 4 cards of jack, 4 cards of queen and 4 cards of king
Then, the numbers of favourable outcomes are = 12
∴ P (face card) = P (E) = 12/52 = 6/26 = 3/13
(iii) Let E be the event of drawing a red face card
The favourable outcomes are: 2 red cards of jack, 2 red cards of queen and 2 red cards of king
The number of favourable outcomes = 6
∴ P (red face card) = P (E) = 6/52 = 3/26
(iv) Let E be the favourable event of drawing a queen of black suit
The numbers of favourable outcomes are: 2
∴ P (black suit queen) = P (E) = 2/52 = 1/26
(v) Let E be the event of drawing a jack of heart
The number of favourable outcome is: 1
∴ P (jack of heart) = P (E) = 1/52
(vi) Let E be the event of drawing a spade
The numbers of favourable outcomes are: 13
∴ P (spade) = P (E) = 13/52 = 1/4
Question 36.
A card is drawn at random from a well-shuffled deck of playing cards. Find the probability that the card drawn is (i) a card of spades or an ace, (ii) a red king, (iii) either a king a queen, (iv) neither a king nor a queen.
Answer:
Total numbers of elementary events are: 52
(i) Let E be the event of drawing a card of spade or an ace
Let A be the event of drawing a card of spade
The favourable numbers of drawing a card of spade are: 13
P (spade) = P (E) = 13/52
Let B be the event of drawing an ace
The numbers of favourable outcomes are: 3 one ace being spade card already been counted
P (ace) = P (B) = 3/52
∴ P (spade or ace) = P (E) = P (A) + P(B) = 13/52 + 3/52 = 16/52 = 8/26 =4/13
(ii) Let E be the event of drawing a red king
The numbers of favourable outcomes are: 2
∴ P (red king) = P (E) = 2/52 = 1/26
(iii) Let E be the event of drawing either a king or a queen
Let A be the event of drawing a king
Then, the numbers of favourable outcome are: 4
P (king) = P (A) = 4/52
Let B be the event of drawing a queen
Then, the numbers of favourable outcome are: 4
P (queen) = P (B) = 4/52
∴ P (king or queen) = 4/52 + 4/52 = 8/52 = 2/13 [email protected]
(iv) Let E be the event of drawing neither a king nor a queen
P (getting either king or a queen) = 2/13 (part c above [email protected])
∴ P (neither king nor queen) = P (E) = 1 – P (either king or queen) = 1 – 2/13 = 11/13
Exercise 15b
Question 1.A box contains 25 cards numbered from 1 to 25. A card is drawn at random from the bag. Find the probability that the number on the drawn card is (i) divisible by 2 or 3, (ii) a prime number.
Answer:
Total numbers of elementary events are 25
(i) Let E be the event of drawing number divisible by 2 or 3
Let A be the event of drawing number divisible by 2
The favourable numbers are: 2, 4, 6, 8, 10, 12, 14, 16, 18, 20, 22, 24
Then, numbers of favourable outcomes are: 12
P (number divisible by 2) = P (A) = 12/25
Let B be the event of drawing a number divisible by 3
The favourable numbers are: 3, 6, 9, 12, 15, 18, 21, 24
Then, numbers of favourable outcomes are: 8
P (getting number divisible by 3) = P (B) = 8/25
∴ P (number divisible by 2 or 3) = P (A) + P (B) = 12/25 + 8/25 = 20/25 = 4/5
(ii) Let E be the event of drawing a prime number
The favourable numbers are: 2, 3, 5, 7, 11, 13, 17, 19, 23
Then, numbers are favourable outcome are: 9
∴ P (prime number) = P (E) = 9/25
Question 2.
A box contains cards numbered 3, 5, 7, 9, ...., 35, 37. A card is drawn at random from the box. Find the probability that the number on the card is a prime number.
Answer:
Total numbers of elementary events are: 18
(3, 5, 7, 9, 11, 13, 15, 17, 19, 21, 23, 25, , 27, 29, 31, 33, 35, 37)
The favourable prime number cards in the box are: 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37
The numbers of favourable outcomes = 11
∴ P (prime number) = P (E) = 11/18
Question 3.
Cards numbered 1 to 30 are put in a bag. Find the probability that the number on the drawn card is (i) not divisible by 3, (ii) a prime number greater than 7, (iii) not a perfect square number.
Answer:
Total numbers of elementary events are: 30
(i) Let E be the event of drawing a number not divisible by 3
The favourable numbers are: 1, 2, 4, 5, 7, 8, 10, 11, 13, 14, 16, 17, 19, 20, 22, 23, 26, 28, 29
Then, the numbers of favourable events = 19
∴ P (not divisible by 3) = P (E) = 19/30
(ii) Let E be the event of getting a prime number greater than 7
The favourable numbers are: 11, 13, 17, 19, 23, 29
Then, the number of favourable outcome = 6
∴ P (prime number greater than 7) = P (E) = 6/30 = 1/5
(iii) Let E be the event of drawing not a perfect square number
Let A be the event of getting a perfect square number
The favourable numbers are: 1, 4, 9, 16, 25
Then, the number of favourable = 5
P (perfect square) = P (A) = 5/30 = 1/6
∴ P (not perfect square number) = 1 – P (A) = 1- 1/6 = 5/6
Question 4.
Cards bearing numbers 1, 3, 5, ....., 35 are kept in a bag. A card is drawn at random from the bag. Find the probability of getting a card bearing (i) a prime number less than 15, (ii) a number divisible by 3 and 5.
Answer:
Total numbers of elementary events are: 35
(i) Let E be the event of getting a prime number less than 15
The favorable numbers are: 3, 5, 7, 11, 13
Total numbers = 18 [odd numbers between 1 and 36]Then, the numbers of favorable events = 5
∴ P (prime number less than 15) = P (E) = 5/18
(ii) Let E be the event of drawing a number divisible by 3 and 5
Numbers divisible by 3 and 5 is: 15, 30 but 30 is not odd, hence only 15 is in the bag
∴ P (getting a prime number divisible by 3 and 5) = P (E) = 1/18
Question 5.
A box contains cards bearing numbers 6 to 70. If one card is drawn at random from the box, find the probability that it bears (i) a one-digit number, (ii) a number divisible by 5, (iii) an odd number less than 30, (iv) a composite number between 50 and 70.
Answer:
Total numbers of elementary events are: 75
(i) Let E be the event of drawing one-digit number
The favourable numbers are: 6, 7, 8, 9
Then, the favourable number of outcomes are = 4
∴ P (one-digit number) = P (E) = 4/75
(ii) Let E be the event of drawing number divisible by 5
The favourable numbers are: 10, 15, 20, 25, 30, 35, 40, 45, 50, 55, 60, 65, 70
The number of favourable events are = 13
∴ P (number divisible by 5) = P (E) = 13/75
(iii) Let E be the event of getting an odd number less than 30
The favourable numbers are: 3, 5, 7, 11, 13, 17, 19, 23, and 29
Then, the number of favourable outcomes = 9
∴ P (odd number less than 30) = P (E) = 9/75 = 3/25
(iv) Let E be the event of drawing composite number between 50 and 70
The favourable number are: 50, 51, 52, 54, 55, 56, 57, 58, 60, 62, 63, 64, 65, 66, 68, 69, 70
The number of favourable outcomes = 17
∴ P (composite number between 50 and 70) = P (E) = 17/75
Question 6.
Cards marked with numbers 1, 3, 5, ....., 101 are placed in a bag and mixed thoroughly. A card is drawn at random from the bag. Find the probability that the number on the drawn card is (i) less than 19, (ii) a prime number less than 20.
Answer:
Total numbers of elementary events are: 51
Since the common difference between the consecutive number is same: 2
It forms an A.P.
First number = a = 1
d = common difference = 3 -1 = 2
Last number = an = 90
an = a + (n-1) d
101 = 1 + (n-1)2
101 -1 = (n-1)2
100/2 = n-1
50 + 1 = n
51 = n, being number of terms
(i) Let E be the event of drawing a number less than 19
The favourable numbers are: 1, 3, 5, 7, 9, 11, 13, 15, 17,
The numbers of favourable outcomes = 9
∴ P (number less than 19) = P (E) = 9/51
(ii) Let E be the event of getting a prime number less than 20
The favourable numbers are: 2, 3, 5, 7, 11, 13, 17, 19
Then, the numbers of favourable outcomes = 8
∴ P (prime number less than 20) = P (E)= 8/51
Question 7.
Tickets numbered 2, 3, 4, 5, ..... 100, 101 are placed in a box and mixed thoroughly. One ticket is drawn at random from the box. Find the probability that the number on the ticket is
(i) an even number
(ii) a number less than 16
(iii) a number which is a perfect square
(iv) a prime number less than 40.
Answer:
Total numbers of elementary events are: 100
(i) Let E be the event of drawing even number ticket
The favourable numbers are: 2, 4, 6, 8, 10, 12, 14, 16, 18, 20, …..100
This forms an A.P where a= 2, d= 2 and an = 100
an= a + (n -1) d
100 = 2 + (n -1) 2
98/2 = n -1
49 + 1 = n
n = 50, being number of term
Then, the numbers of favourable outcomes = 50
∴ P (even number) = P (E) = 50/100 =1/2
(ii) Let E be the event of drawing number less than 16
The favourable numbers are: 2, 3, 4, 5, 6, …… 15
Then, the number of favourable outcomes = 14
∴ P (number > 6) = P (E)= 14/100 = 7/50
(iii) let E be the event of drawing a perfect square number
The favourable numbers are: 1, 4, 9, 16, 25, 36, 49, 64, 81, 100
The numbers of favourable outcomes = 10
∴ P (perfect square number) = P (E) = 10/ 100 = 1/10
(iv) let E be the event of drawing prime number less than 40
The favourable numbers are: 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37
Then, the numbers of favourable outcomes = 12
∴ P (prime number less than 40) = P (E) = 12/100 = 3/25
Question 8.
A box contains 80 discs, which are numbered from 1 to 80. If one disc is drawn at random from the box, find the probability that it bears a perfect square number.
Answer:
Total numbers of elementary events are: 80
The favourable numbers are: 1, 4, 9, 16, 25, 36, 49, 64
Then, the numbers of favourable outcomes = 8
∴ P (perfect square number) = P (E) = 8/80 = 1/10
Question 9.
A piggy bank contains hundred 50-p coins, seventy RS. 1 coin, fifty RS. 2 coins thirty RS. 5 coins. If it is equally likely that one of the coins will fall out when the bank is turned upside down, what is the probability that the coin (i) will be a RS. 1 coin? (ii) will not be a RS. 5 coin (iii) will be 50-p or a RS. 2 coin?
Answer:
Total numbers of elementary events are: 100 + 70 + 50 + 30 = 250 being number of coins of each denomination added to find total number of coins
(i) let E be the event of getting Rs. 1 coin
Then, numbers of favourable events = 70
∴ P (Rs 1 coin) = P (E) = 70/250 = 7/25
(ii) Let E be the event of not getting Rs 5 coin
Let A be the event of getting Rs 5 coin
Then, the numbers of favourable events = 30
P (Rs 5 coin) = P (A) = 30/250 = 3/25
∴ P (not Rs 5 coin) = P (E) = 1 – P (A) = 1 – 3/25 = 22/25
(iii) Let E be the event of getting 50-p or Rs2 coin
Let A be the event of getting 50-p coin
Then numbers of favourable outcomes = 100
P (50-p coin) = P (A) = 100/250 = 1/25
Let B be the event of getting Rs2 coin
Then numbers of favourable outcomes = 50
P (Rs2 coin) = P (B) = 50/250 = 5/25
∴ P (50-p coin or Rs2 coin) = P (E) = P (A) + P (B) = 1/25 + 5/25= 6/25
Question 10.
The probability of selecting a red ball at random from a jar that contains only red, blue and orange ball is 
.The probability of selecting a blue ball at random from the same jar is 
. If the jar contains 10 orange balls, find the total number of balls in the jar.
Answer:
Let the total number of elementary events that is total number of balls in the jar be x
Then, 1/4 x + 1/3 x + 10 = x
120 + 7x = 12 x
120 = 5x
X = 24, being total number of balls in jar
Question 11.
A bag contains 18 balls out of which x balls are red.
(i) If one ball is drawn at random from the bag, what is the probability that it is not red?
(ii) IF two more red balls are put in the bag, the probability of drawing a red ball will be 
times the probability of drawing a red ball in the first case. Find the value of x.
Answer:
(i) Total numbers of elementary events are 18
Let E be the event of getting not red ball
Let A be the event of getting a red ball
The number of favourable events are x
P (red ball) =P (A) = x/18
∴ P (not red ball) = P (E) = 1 – x/18
(ii) Two ball are added to the existing 18 balls
Total numbers of elementary events are: 18 + 2 = 20
Let E be the event of getting a red ball
P (red ball) = P (E) = (x + 2) /20
According to the given condition
(X + 2) /20 = 9/8 x (x/18)
(x + 2) /20 = x/16
4x + 8 = 5x
X = 8 being the initial numbers of red ball.
Question 12.
A jar contains 24 marbles. Some of these are green and others are blue. If a marble is drawn at random from the jar, the probability that it is green is 
. Find the number of blue marbles in the jar.
Answer:
Total numbers of elementary events are 24
Let E be the event of getting a green ball
Let number of green ball be x
P (green ball) = P (E) = 2/3 (given)
But 2/3 = x/24
X = 16
Hence number of blue ball = 24 – 16 = 8
Question 13.
A jar contains 54 marbles, each of which some are blue, some are green and some are white. The probability of selecting a blue marble at random is and the probability of selecting a green marble at random is 
. How many white marble does the jar contain?
Answer:
Total numbers of elementary events are: 54
Probability of drawing a blue marble = 1/3
Number of blue marbles = 54 x 1/3 = 18
Probability of drawing a green marble = 4/9
Number of green marbles = 54 x 4/9 = 24
Number of white marbles = 54 - (18 + 24) = 54 - 42 = 12.
Question 14.
A carton consists of 100 shirts of which 88 are good are 8 have minor defects. Rohit, a trader, will only accept that shirts which are good. But kamal, an another trader, will only reject the shirts which have major defects. One shirt is drawn at random from the carton. What is the probability that it is acceptable to (i) Rohit, (ii) Kamal?
Answer:
Total numbers of elementary events are: 100
The number of good shirts = 88.
The number of shirts with minor defects = 8.
Number of shirts with major defects = 100 – 88 – 8 = 4.
(i) Let E be the event of shirt getting accepting by Rohit
The numbers of favourable outcomes = 88
∴ P (the drawn shirt is acceptable to Rohit) = P (E) = 88/ 100 = 22/25
(ii) Let E be the event of shirts getting accepted by kamal
The number of favourable outcomes = 88 + 8 = 96
∴ P (the drawn shirt is acceptable to Kamal) = P (E) = 96/100 = 24/25
Question 15.
A group consists of 12 person, of which 3 are extremely patient, other 6are extremely honest and rest extremely kind. A person from the group is selected at random. Assuming that each person who is (i) extremely patient, (ii) extremely kind or honest. Which of the above values you prefer more?
Answer:
The total number of persons = 12.
The number of persons who are extremely patient = 3.
The number of persons who are extremely honest = 6.
Number of persons who are extremely kind = 12 – 3 – 6 = 3.
(i) Let E be the event of selecting extremely patient person
Numbers of favourable outcomes = 3
∴ P (selecting a person who is extremely patient) = P (E) = 3/12 =1/4
(ii) Let E be the event of selecting extremely kind or honest
Let A be the event of selecting extremely kind person
The numbers of favourable event are 3
P (extremely kind) =P (A)= 3/12
Let B be the event of selecting extremely honest person
The numbers of favourable outcomes = 6
P (extremely honest) = P (B) = 6/12
∴ P (selecting extremely kind and honest) = P (E)= P (A) + P(B) = 9/12 = 3/4
From the three given values, we prefer honesty more.
Question 16.
A die is rolled twice. Find the probability that
(i) 5 will not come up either time,
(ii) 5 will come up exactly one time,
(iii) Let E be the event of getting 5 on both the dice
Answer:
Total numbers of elementary events are: 6 x 6 = 36
(i) Let E be the event of getting number other than 5 on both dices
The Cases where 5 comes up on at least one time are (1, 5), (2, 5), (3, 5), (4, 5), (5, 1), (5, 2), (5, 3), (5, 4), (5, 5), (5, 6) and (6, 5).
The number of cases = 11 being combinations with 5 on at least one dice
The number of favourable cases where 5 will not come up either time = 36 – 11 = 25.
∴ P (5 will not come up either time) = P (E) = 25/36
(ii) Let E be the event of getting one number as 5 on either of dice
The favourale outcomes where 5 comes up on exactly one time are: (1, 5), (2, 5), (3, 5), (4, 5), (5, 1), (5, 2), (5, 3), (5, 4), (5, 6) and (6, 5).
The number of favourable such cases = 10.
∴ P (5 will come up exactly one time) = P (E) = 10/36 =5/18
(iii) Favourable event when 5 come up on exactly two times is (5, 5).
The number of such cases = 1.
∴ P (5 will come up both the times) = P (E) = 1/36
Question 17.
Two dice are rolled once. Find the probability of getting such numbers on two dice whose product is a perfect square.
Answer:
Total Number of elementary events are = 36
Let E be the event of getting two numbers whose product is a perfect square.
The favourable outcomes are (1, 1), (1, 4), (4, 1), (2, 2), (3, 3), (4, 4), (5, 5) and (6, 6).
The number of favourable outcomes = 8.
∴ P (getting numbers whose product is a perfect square) = P (E) = 8/36 = 2/9
Question 18.
A letter is chosen at random from the letters of the word ‘ASSOCIATION’. Find the probability that the chosen letter is a (i) vowel, (ii) consonant, (iii) an S.
Answer:
Total numbers of letters in the given word ASSOCIATION = 11
(i) Let E be the event of getting a vowel
The favourable outcomes are: (A, O, I, A, I, O)
Number of vowels in the given word = 6
∴ P (getting a vowel) = P (E) = 6/11
(ii) Let E be the event of getting a consonant
Favourable consonants in the given word = (S, S, C, T, N)
The numbers of favourable outcomes = 5
∴ P (getting a consonant) = P (E) = 5/11
(iii) Let E be the event of getting S
Number of S in the given word or number of favourable outcomes = 2
∴ P (getting an S) = P (E) = 2/11
Question 19.
Five cards-the ten, jack, queen, king and ace of diamonds are well shuffled with their faces downwards. One card is then picked up at random. (a) What is the probability that the drawn card is the queen? (b) If the queen is drawn and put aside and a second card is drawn, find the probability that he second card is (i) an ace, (ii) a queen.
Answer:
Total numbers elementary events are: 5.
(a) Number of favourable event = 1.
∴ P (getting a queen) = P (E) = 1/5
(b) When the queen has put aside, number of remaining cards = 4.
(i) Let E be the event of getting an ace
The number of favourable outcome is = 1.
∴ P (getting an ace) = P (E) = 1/4
(ii) Let E be the event of getting queen
Number of favourable event is = 0 being queen card already withdrawn
∴ P (getting a queen now) = P (E) = 0
Question 20.
A card is drawn at random a well shuffled pack of 2 cards. Find the probability that the card drawn is neither a red card nor a queen.
Answer:
Total number of all elementary events = 52
There are 26 red cards (including 2 queens) and apart from these, there are 2 more queens.
Number of cards, each one of which is either a red card or a queen = 26 + 2 = 28
Let E be the event that the card drawn is neither a red card nor a queen.
Then, the number of favourable outcomes = (52 – 28) = 24
∴ P (getting neither a red card nor a queen) = P (E) = 24/52 = 6/13
Question 21.
What is the probability that an ordinary year has 53 Mondays?
Answer:
An ordinary year has 365 days consisting of 52 weeks and 1 day.
Let E be the event of that one day being Monday
This day can be any day of the week.
∴ P (of this day to be Monday) = P (E) = 1/7
Question 22.
All red face cards are removed from a pack of playing cards. The remaining cards are well shuffled and then a card is drawn at random from them. Find the probability that the drawn card is (i) a red card, (ii) a face card, (iii) a card of clubs.
Answer:
There are 6 red face cards which are removed.
Thus, remaining number of card = 52 – 6 = 46.
Total numbers of elementary events are: 46
(i) Let E be the event of getting a red card
Number of favourable outcomes now = 26 – 6 = 20.
∴ P (getting a red card) = P (E)= 20/46 = 10/23
(ii) Let E be the elementary event of getting a face card
Number of face cards now = 12 – 6 = 6.
Number of favourable events = 6
∴ P (getting a face card) = P (E) = 6/46 = 3/23.
(iii) Let E be the event of getting a card of clubs
The number of card of clubs = number of favourable event = 12.
∴ P (getting a card of clubs) = P (E) = 12/46 = 6/23
Question 23.
All kings, queens and aces are removed from a pack of 52 cards. The remaining cards are well-shuffled and then a card is drawn from it. Find the probability that the drawn card is (i) a black face card, (ii) a red card.
Answer:
The 4 kings, 4 queens, and 4 aces are removed.
Thus, remaining number of cards = 52 – 4 – 4 – 4 = Total number of elementary event = 40.
(i) Let E be the event of getting a black face card
Number of black face cards = 2 (only black jacks) = number of favourable event
∴ P (getting a black face card) = P (E) = 2/40 = 1/20
(ii) Let E be the event of getting a red card
Number of favourable events = Number of red cards now = 26 – 6 = 20 being total red cards 26 out of which 6 are withdrawn
∴ P (getting a red card) = P (E) = 20/ 40 = 1/2
Question 24.
A game consists of tossing a one-rupee coin three times, and nothing its outcome each time. Find the probability of getting (i) three heads, (ii) at least 2 tails.
Answer:
When a coin is tossed three times, all possible outcomes are
HHH, HHT, HTH, THH, HTT, THT, TTH and TTT.
The total number of elementary outcomes = 8.
(i) Let E be the event of getting three heads
The favourable outcome with three heads is HHH.
The number of outcomes with three heads = 1.
Therefore, P (getting three heads) = P (E) = 1/8
(ii) let E be the event of getting at least two tails
Favourable Outcomes with at least two tails are TTH, THT, HTT and TTT.
Note: - at least two tails means there could be two or more than two tail so we will not consider the outcome with all head or less than two tales.
The number of favourable outcomes = 4.
∴ P (getting at least two tails) = P (E) = 4/8 = 1/2
Question 25.
Find the probability that a leap year selected at random will contain 53 Sundays.
Answer:
A leap year has 366 days with 52 weeks and 2 days.
Now, 52 weeks contains 52 Sundays.
The remaining two days can be:(i) Sunday and Monday, (ii) Monday and Tuesday, (iii) Tuesday and Wednesday, (iv) Wednesday and Thursday, (v) Thursday and Friday, (vi) Friday and Saturday,(vii) Saturday and Sunday
Let E be the event of getting a leap year with 53 Sundays
Total cases = 7Number of favorable case, i.e. getting 53rd sunday = 2 [Sunday and Monday / Saturday and sunday]
∴ P (a leap year having 53 Sundays) = P (E) = 2/7
Multiple Choice Questions (mcq)
Question 1.If P(E) denotes the probability of an event E then
A. P(E) < 0
B. P(E) > 1
C. 0 ≤ P(E) ≤ 1
D. -1 ≤ P(E) ≤ 1
Answer:
The probability of any event is always positive. It could be at the least equal to zero but not less than that. The probability of sure event at the maximum could be equal to 1 so probability lies between 0 and 1 both included.
Question 2.
If the probability of occurrence of an event is P then the probability of non-happening of this event is
A. (P-1)
B. (1-P)
C. P
D. 
Answer:
Probability of event P + probability of event not P = 1
P (non –happening of event P) = (1-P)
Question 3.
What is the probability of an impossible event?
A. 1/2
B. 0
C. 1
D. more than 1
Answer:
The probability of impossible event is always zero because such event can never happen.
Question 4.
What is the probability of a sure event?
A. 0
B. 1/2
C. 1
D. less than 1
Answer:
The probability of sure event or event which is certain to happen is always 1.
Question 5.
Which of the following cannot be the probability of an event?
A. 1.5
B. 3/5
C. 25%
D. 0.3
Answer:
The probability of event is always less than or equal to 1. 1.5 being greater than 1 can never be the probability of an event.
Question 6.
A number is selected at random from the numbers 1 to 30. What is the probability that the selected number is a prime number?
A. 2/3
B. 1/6
C. 1/3
D. 11/30
Answer:
Let E be the event of selecting a prime number
Total numbers of elementary events are 30
Favourable numbers are: 2, 3, 5, 7, 11, 13, 17, 19, 23, 29
Number of favourable outcome = 10
P (E) = 10/30 =1/3
Question 7.
The probability that a number selected at random from the number 1, 2, 3, ....., 15 is a multiple of 4 is
A. 
B. 
C. 
D. 
Answer:
Total numbers of elementary event are 15
Let E be the event of selecting a multiple of 4
Favourable outcomes are: 4, 8, 12,
Numbers of favourable outcomes are 3
P (E) = 3/15 = 1/5
Question 8.
A box contains cards numbered 6 to 50. A card is drawn at random from the box. The probability that the drawn card has a number which is a perfect square is
A. 
B. 
C. 
D. 
Answer:
Total numbers of elementary events are: 50 – 5 = 45 number 6 is included
Let E be the event of drawing a perfect square
The favourable outcomes are: 9, 16, 25, 36, 49
Numbers of favourable outcomes = 5
P (E) = 5/45 = 1/9
Question 9.
A box contains 90 discs, numbered from 1 to 90. If one disc is drawn at random from the box, the probability that it bears prime number less than 23 is
A. 
B.
C.
D. 
Answer:
Total numbers of elementary events are: 90
Let E be the event of getting a prime number less than 23
Favourable numbers are: 2, 3, 5, 7, 11, 13, 17, 19
Numbers of favourable outcomes = 8
P (E) = 8/90 = 4/45
4/45
Question 10.
Cards bearing numbers 2, 3, 4, ....., 11 are kept in a bag. The probability of getting a card with a prime number is
A. 
B. 
C. 
D. 
Answer:
Total numbers of elementary events are 10
Let E be the event of getting a prime number
Favourable numbers are: 2, 3, 5, 7, 11
Numbers of favourable outcomes = 5
P (E) = 5/10 =1/2
Question 11.
One ticket is drawn at random from a big containing tickets numbered 1 to 40. The probability that the selected ticket has a number, which is a multiple of 7, is
A. 
B. 
C.
D. 
Answer:
Total numbers of elementary events are: 40
Let E be the event of getting multiple of 7
Favourable outcomes are: 7, 14, 21, 28, 35
Number of favourable outcome = 5
P(E) = 5/40 = 1/8
1/8
Question 12.
Which of the following cannot be the probability of an event?
A. 
B. 0.3
C. 33%
D. 
Answer:
On actual division 7/6 comes out to be 1.67 which is greater than 1. The probability can be less than or equal to 1.
Question 13.
If the probability of winning a game is 0.4 then the probability of losing it, is
A. 0.96
B. 
C. 0.6
D. none of these
Answer:
Probability of winning a game + probability of losing a game = 1
So probability of losing the game = 1- probability of winning = 1 – 0.4 = 0.6
Question 14.
If an event cannot occur then its probability is
A. 1
B.
C. 
D. 0
Answer:
The probability of event which can not occur or impossible event is always zero
Question 15.
There are 20 tickets numbered as 1, 2, 3, ...., 20 respectively. One ticket is drawn at random. What is the probability that the number on the ticket drawn is a multiple of 5?
A. 
B.
C.
D.
Answer:
Total numbers of elementary events are: 20
Let E be the event of getting a multiple of 5
Favourable numbers are: 5, 10, 15, 20
Number of favourable events are= 4
P (E) = 4/20 = 1/5
Question 16.
There are 25 tickets numbered as 1, 2, 3, 4, ....., 25 respectively. One ticket is drawn at random. What is the probability that the number on the ticket is a multiple of 3 or 5?
A.
B.
C. 
D.
Answer:
Total numbers of elementary events are: 25
Let E be the event of getting a multiple of 3 or 5
The favourable numbers are: 3, 6, 9, 12, 15, 18, 21, 24, 5, 10, 15, 20, 25
Numbers of favourable events = 13
P (E) = 13/25
Question 17.
Cards, each marked with one of he numbers 6, 7, 8, ...., 15, are placed in a box and mixed thoroughly. One card is drawn at random from the box. What is the probability of getting a card with number less than 10?
A. 
B.
C.
D.
Answer:
Total numbers of elementary events are 15 – 5 = 10
Let E be the event of drawing card less than 10
Favourable numbers are: 6, 7, 8, 9
Numbers of favourable outcomes = 4
P (E = 4/10 =2/5
Question 18.
A die is thrown once. The probability of getting an even number is
A.
B.
C. 
D. 
Answer:
Total numbers of elementary events are: 6
Let E be the event of getting an even number
Favourable numbers are: 2, 4, 6
Number of favourable outcomes = 3
P (E) = 3/6 = 1/2
Question 19.
The probability of throwing a number greater than 2 with a fair die is
A.
B.
C.
D. 
Answer:
Total numbers of elementary events are: 6
Let E be the event of getting number greater than 2
Favourable numbers are: 3, 4, 5, 6
Numbers of favourable outcomes = 4
P (E) = 4/6 = 2/3
Question 20.
A die is thrown once. The probability of getting an odd number greater than 3 is
A.
B.
C.
D. 0
Answer:
Total numbers of elementary events are: 6
Let E be the event of getting an odd number greater than 3
Favourable number: 5
Number of favourable outcome =1
P (E) = 1/6
Question 21.
A die thrown once. The probability of getting a prime number is
A. 
B. 
C. 
D. 
Answer:
Total numbers of elementary events are: 6
Let E be the event of getting a prime number
Favourable numbers are: 2, 3, 5
Numbers of favourable outcomes are = 3
As we know,
P (E) = 3/6
= 1/2
Question 22.
Two dice are thrown together. The probability of getting the same number on both dice is
A.
B.
C.
D. 
Answer:
Total numbers of elementary events are: 6 x6 = 36
Let E be the event of getting the same number on both the dice
Favourable events are: (1, 1), (2, 2), (3, 3), (4, 4), (5, 5), (6, 6)
Numbers of favourable outcomes are: 6
P (E) = 6/36 = 1/6
Question 23.
The probability of getting 2 heads, when two coins are tossed, is
A. 1
B.
C.
D.
Answer:
Total numbers of elementary events are: 2 x 2 = 4
Let E be the event of getting 2 heads
Favourable event is HH
Number of favourable outcome = 1
P (E) = 1/4
Question 24.
Two dice are thrown together. The probability of getting a doublet is
A.
B.
C.
D.
Answer:
Total numbers of elementary events are: 6 x 6 = 36
Let E be the event of getting a doublet
Favourable outcomes are: (1, 1), (2, 2), (3, 3), (4, 4), (5, 5), (6, 6)
Number of favourable outcomes = 6
P (E) = 6/36
=1/6
Question 25.
Two coins are tossed simultaneously. What is the probability of getting at most one head?
A.
B.
C.
D.
Answer:
Total numbers of elementary events are: 2 x 2 = 4
Let E be the event of getting at most one head
Note: atmost one head means one head or no head at all, outcomes are considerable
Favourable events are: TT, HT, TH
Numbers of favourable outcomes = 3
P (E) = 3/4
Question 26.
Three coins are tossed simultaneously. What is the probability of getting exactly two heads?
A.
B.
C. 
D.
Answer:
Total numbers of elementary events are: 2 x 2 x 2 = 8
Let E be the event of getting exactly two head
Favourable outcomes are: HHT, THH, HTH
Numbers of favourable outcomes = 3
P (E) = 3/8
Question 27.
In a lottery, there are 8 prizes and 16 blanks. What is the probability of getting a prize?
A.
B.
C.
D. none of these
Answer:
Total numbers of elementary events are : 24
Let E be the event of getting a prize
Favourable outcomes = 8
P (E) = 8/24 = 1/3
Question 28.
In a lottery, there are 6 prizes and 24 blanks. What is the probability of not getting a prize?
A. 
B. 
C. 
D. none of these
Answer:
Total numbers of elementary events are: 30
Let E be the probability of not getting a prize
Numbers of Favourable outcomes= 24
P (E) = 24/30 = 12 /15 = 4/ 5
Question 29.
A box contains 3 blue, 2 white and 4 red marbles. If a marbles is drawn at random from the box, what is the probability that it will not be a white marble?
A.
B. 
C.
D. 
Answer:
Total numbers of elementary events are: 3 + 2 + 4 = 9
Let E be the event of not white ball drawn
Numbers of non-favourable outcomes = numbers of white ball drawn = 2
P (white ball) = 2/9
P (E) = 1- 2/9 = 7/9
Question 30.
A bag contains 4 red and 6 black balls. A ball is taken out of the bag at random. What is the probability of getting a black ball?
A.
B.
C. 
D.
Answer:
Total numbers of elementary events are: 4 + 6 = 10
Let E be the event of drawing black ball
Numbers of favourable events are: 6
P (E) = 6/10 = 3/5
Question 31.
A bag contains 8 red, 2 black and 5 white balls. One ball is drawn at random. What is the probability that the ball drawn is not black?
A. 
B.
C.
D.
Answer:
Total numbers of elementary events are: 8 + 2 + 5 = 15
Let E be the event of drawing not black ball
Number of non-favourable events = numbers of outcome with white ball drawn = 2/15
P(non- black drawn) = 1 – 2/15 = 13/15
Question 32.
A bag contains 3 white, 4 red and 5 black balls. One ball is drawn at random. What is the probability that the ball is neither black nor white?
A.
B.
C.
D.
Answer:
Total numbers of elementary events are: 3 + 4 + 5 = 12
Let E be the event of drawing neither black ball nor white ball
Number of outcomes of drawing a black ball or white ball = 5/ 12 + 3/12 = 8/12 = 2/3
Number of favourable outcomes are = 1-2/3 = 1/3
Question 33.
A card is drawn at random from a well-shuffled deck of 52 cards. What is the probability of getting a black king?
A. 
B.
C. 
D. none of these
Answer:
Total numbers of elementary events are: 52
Let E be the event of drawing black king
Favourable outcomes are: 2
P (E) = 2/52 = 1/26
Question 34.
From a well- shuffled deck of 52 cards, one card is drawn at random. What is the probability of getting a queen?
A.
B.
C.
D. none of these
Answer:
Total numbers of elementary events are: 52
Let E be the event of getting a queen
Numbers of Favourable outcomes are : 4
P (E) = 4/52 = 2/ 26 = 1/13
Question 35.
One card is drawn at random from a well-shuffled deck of 52 cards. What is the probability of getting a face card?
A.
B. 
C. 
D.
Answer:
Total numbers of elementary events are: 52
Let E be the event of drawing face card
Favourable events are: 4 cards of jack, 4 cards of queen and 4 cards of king
Number of favourable events = 12
P (E) = 12/ 52 = 6/26 = 3/13
Question 36.
One card is drawn at random from a well-shuffled deck of 52 cards. What is the probability of getting a black face card?
A.
B.
C.
D. 
Answer:
Total numbers of elementary events are: 52
Let E be the event of drawing black face card
Favourable events are: 2 black face cards of jack, 2 black face cards of queen and 2 black face cards of king = 6
P (E) = 6/52 = 3/ 26
Question 37.
One card is drawn at random from a well-shuffled deck of 52 cards. What is the probability of getting a 6?
A.
B. 
C. 
D. none of these
Answer:
Total numbers of elementary events are: 52
Let E be the event of getting a ‘6’ number card
Numbers of Favourable events are: 4
P (E) = 4/52 = 1/13