Rs Aggarwal 2021 2022 for Class 10 Maths Chapter 19 - Probability

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Rs Aggarwal 2021 2022 Solutions for Class 10 Maths Chapter 19 Probability are provided here with simple step-by-step explanations. These solutions for Probability are extremely popular among Class 10 students for Maths Probability Solutions come handy for quickly completing your homework and preparing for exams. All questions and answers from the Rs Aggarwal 2021 2022 Book of Class 10 Maths Chapter 19 are provided here for you for free. You will also love the ad-free experience on Meritnation’s Rs Aggarwal 2021 2022 Solutions. All Rs Aggarwal 2021 2022 Solutions for class Class 10 Maths are prepared by experts and are 100% accurate.

Page No 927:

Answer:

(i) 0
(ii) 1
(iii) 1
(iv) 0, 1
(v) 1

Page No 927:

Answer:

When a coin is tossed once, the possible outcomes are H and T.
Total number of possible outcomes = 2
Favourable outcome = 1
∴ Probability of getting a tail = P (T) = $\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{1}{2}$

Page No 927:

Answer:

When two coins are tossed simultaneously, all possible outcomes are HH, HT, TH and TT.
Total number of possible outcomes = 4

(i) Let E be the event of getting exactly one head.

Then, the favourable outcomes are HT and TH.
Number of favourable outcomes = 2

∴ P(getting exactly 1 head) =

\frac{Number of favourable outcomes}{Total number of possible outcomes} = \frac{2}{4} = \frac{1}{2}

(ii) Let E be the event of getting at most one head.

Then, the favourable outcomes are HT, TH and TT.
Number of favourable outcomes = 3

∴ P (getting at most 1 head) =

\frac{Number of favourable outcomes}{Total number of possible outcomes} = \frac{3}{4}

(iii) Let E be the event of getting at least one head.

Then, the favourable outcomes are HT, TH and HH
Number of favourable outcomes = 3

∴ P (getting at least 1 head) =

\frac{Number of favourable outcomes}{Total number of possible outcomes} = \frac{3}{4}

Page No 928:

Answer:

In a single throw of a die, the possible outcomes are 1, 2, 3, 4, 5 and 6.
Total number of possible outcomes = 6

(i)
Let E be the event of getting an even number.
Then, the favourable outcomes are 2, 4 and 6.
Number of favourable outcomes = 3
∴ Probability of getting an even number = P (E) = $\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{3}{6} = \frac{1}{2}$
(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
∴ Probability of getting a number less than 5 = P (E) = $\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{4}{6} = \frac{2}{3}$

(iii)
Let E be the event of getting a number greater than 2.
Then, the favourable outcomes are 3, 4, 5 and 6.
Number of favourable outcomes = 4
∴ Probability of getting a number greater than 2 = P (E) = $\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{4}{6} = \frac{2}{3}$
(iv)
Let E be the event of getting a number between 3 and 6.

Then, the favourable outcomes are 4, 5

Number of favourable outcomes = 2
∴ Probability of getting a number between 3 and 6 = P (E) =

\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{2}{6} = \frac{1}{3}

(v)
Let E be the event of getting a number other than 3.

Then, the favourable outcomes are 1, 2, 4, 5 and 6.

Number of favourable outcomes = 5
∴ Probability of getting a number other than 3 = P (E) =

\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{5}{6}

(vi)
Let E be the event of getting the number 5.

Then, the favourable outcome is 5.

Number of favourable outcomes = 1
∴ Probability of getting the number 5 = P (E) =

\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{1}{6}

Page No 928:

Answer:

Let E be the event of getting a consonant.

Out of 26 letters of English alphabets, there are 21 consonants.

∴ P(getting a consonant) = P(E) = $\frac{Number of outcomes favourable to E}{Number of all possible outcomes}$
= $\frac{21}{26}$

Thus, the probability of getting a consonant is $\frac{21}{26}$ .

Page No 928:

Answer:

When the die is thrown once, then any one of the six faces can show up.

∴ Total number of outcomes = 6

(i) There are 3 faces on the die showing the letter A.

Favourable number of outcomes = 3

∴ P(Getting the letter A) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{3}{6} = \frac{1}{2}$

(ii) There are 2 faces on the die showing the letter B.

Favourable number of outcomes = 2

∴ P(Getting the letter B) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{2}{6} = \frac{1}{3}$

Page No 928:

Answer:

Number of defective pens in the lot = 12

Number of good pens in the lot = 132

Total number of pens in the lot = 12 + 132 = 144

∴ Total number of outcomes = 144

(i) There are 132 good pens in the lot. Out of these pens, one good pen can be taken out in 132 ways.

Favourable number of outcomes = 132

∴ P(Pen taken out is good one) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{132}{144} = \frac{11}{12}$

(ii) There are 12 defective pens in the lot. Out of these pens, one defective pen can be taken out in 12 ways.

Favourable number of outcomes = 12

∴ P(Pen taken out is defective) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{12}{144} = \frac{1}{12}$

Page No 928:

Answer:

Total number of lottery tickets = 10 + 25 = 35
Number of prizes = 10

Let E be the event of getting a prize.

∴ P(getting a prize) = P(E) = $\frac{Number of outcomes favourable to E}{Number of all possible outcomes}$
= $\frac{10}{35} = \frac{2}{7}$

Thus, the probability of getting a prize is $\frac{2}{7}$ .

Page No 928:

Answer:

Total number of tickets = 250
Kunal wins a prize if he gets a ticket that assures a prize.
Number of tickets on which prizes are assured = 5
∴ P (Kunal wins a prize) = $\frac{5}{250} = \frac{1}{50}$

Page No 928:

Answer:

For any event E, P(E) + P(not E) = 1

Let probability of winning a game = P(E) = 0.7

∴ P(winning a game) + P(losing a game) = 1
⇒ P(losing a game) = 1 − 0.7
= 0.3

Thus, the probability of losing a game is 0.3.

Page No 928:

Answer:

The arrow can come to rest at any one of the numbers 1, 2, 3, 4,..., 12.

∴ Total number of outcomes = 12

(i) There is only one 6 in the figure. So, there is only one way when the arrow will come to rest pointing to the number 6.

Favourable number of outcomes = 1

∴ P(Arrow will point to 6) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{1}{12}$

(ii) There are six even numbers in the figure. These are 2, 4, 6, 8, 10 and 12. So, there are 6 ways when the arrow will come to rest pointing to an even number.

Favourable number of outcomes = 6

∴ P(Arrow will point to an even number) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{6}{12} = \frac{1}{2}$

(iii) There are five prime numbers in the figure. These are 2, 3, 5, 7 and 11. So, there are 5 ways when the arrow will come to rest pointing to a prime number.

Favourable number of outcomes = 5

∴ P(Arrow will point to a prime number) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{5}{12}$

(iv) There are two multiples of 5 in the figure. These are 5 and 10. So, there are 2 ways when the arrow will come to rest pointing to a number which is a multiple of 5.

Favourable number of outcomes = 2

∴ P(Arrow will point to a number which is a multiple of 5) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{2}{12} = \frac{1}{6}$

(v) There are four factors of 8 in the figure. These are 1, 2, 4 and 8. So, there are 4 ways when the arrow will come to rest pointing to a number which is a factor of 8.

Favourable number of outcomes = 4

∴ P(Arrow will point to a number which is a factor of 8) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{4}{12} = \frac{1}{3}$

Page No 928:

Answer:

Total number of cards = 17

(i) Let E₁ be the event of choosing an odd number.

These numbers are 1, 3, 5, 7, 9, 11, 13, 15 and 17.

∴ P(getting an odd number) = P(E₁) = $\frac{Number of outcomes favourable to E_{1}}{Number of all possible outcomes}$
= $\frac{9}{17}$

Thus, the probability that the card drawn bears an odd number is $\frac{9}{17}$ .

(i) Let E₂ be the event of choosing a number divisible by 5.

These numbers are 5, 10 and 15.
∴ P(getting a number divisible by 5) = P(E₂) = $\frac{Number of outcomes favourable to E_{2}}{Number of all possible outcomes}$
= $\frac{3}{17}$

Thus, the probability that the card drawn bears a number divisible by 5 is $\frac{3}{17}$ .

Page No 929:

Answer:

Total number of balls = 15

(i) Number of black balls = 2

∴  P(getting a black ball) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{2}{15}$

Thus, the probability of getting a black ball is $\frac{2}{15}$ .

(ii) Number of balls which are not green = 4 + 5 + 2 = 11

∴  P(getting a ball which is not green) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{11}{15}$

Thus, the probability of getting a ball which is not green is $\frac{11}{15}$ .

(iii) Number of balls which are either red or white = 4 + 5 = 9

∴  P(getting a ball which is red or white) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{9}{15} = \frac{3}{5}$

Thus, the probability of getting a ball which is red or white is $\frac{3}{5}$ .

(iv) Number of balls which are neither red nor green = 4 + 2 = 6

∴  P(getting a ball which is neither red nor green) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{6}{15} = \frac{2}{5}$

Thus, the probability of getting a ball which is neither red nor green is $\frac{2}{5}$ .

Page No 929:

Answer:

Number of white balls in the bag = 5

Number of red balls in the bag = 7

Number of black balls in the bag = 4

Number of blue balls in the bag = 2

Total number of balls in the bag = 5 + 7 + 4 + 2 = 18

∴ Total number of outcomes = 18

(i) There are 7 balls (5 white and 2 blue) in the bag which are either white or blue. So, there are 7 ways to draw a ball from the bag which is white or blue.

Favourable number of outcomes = 7

∴ P(Drawn ball is white or blue) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{7}{18}$

(ii) There are 9 balls (7 red and 2 blue) in the bag which are neither white nor black. So, there are 9 ways to draw a ball from the bag which is neither white nor black.

Favourable number of outcomes = 9

∴ P(Drawn ball is neither white nor black) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{9}{18} = \frac{1}{2}$

Page No 929:

Answer:

Total number of marbles = 24.
Let the number of blue marbles be x.
Then, the number of green marbles = 24 − x

∴ P(getting a green marble) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{24 - x}{24}$

But, P(getting a green marble) = $\frac{2}{3}$ (given)

$∴ \frac{24 - x}{24} = \frac{2}{3} \Rightarrow 3 (24 - x) = 48 \Rightarrow 72 - 3 x = 48 \Rightarrow 3 x = 72 - 48 \Rightarrow 3 x = 24 \Rightarrow x = 8$

Thus, the number of blue marbles in the jar is 8.

Page No 929:

Answer:

Total number of marbles = 54.

It is given that, P(getting a blue marble) = $\frac{1}{3}$ and P(getting a green marble) = $\frac{4}{9}$

Let P(getting a white marble) be x.

Since, there are only 3 types of marbles in the jar, the sum of probabilities of all three marbles must be 1.

$∴ \frac{1}{3} + \frac{4}{9} + x = 1 \Rightarrow \frac{3 + 4}{9} + x = 1 \Rightarrow x = 1 - \frac{7}{9} \Rightarrow x = \frac{2}{9}$
∴ P(getting a white marble) = $\frac{2}{9}$ ...(1)

Let the number of white marbles be n.

Then, P(getting a white marble) = $\frac{n}{54}$ ... (2)

From (1) and (2),
$\frac{n}{54} = \frac{2}{9} \Rightarrow n = \frac{2 \times 54}{9} \Rightarrow n = 12$

Thus, there are 12 white marbles in the jar.

Page No 929:

Answer:

It is given that,

P(getting a red ball) = $\frac{1}{4}$ and P(getting a blue ball) = $\frac{1}{3}$

Let P(getting an orange ball) be x.

Since, there are only 3 types of balls in the jar, the sum of probabilities of all the three balls must be 1.

$∴ \frac{1}{4} + \frac{1}{3} + x = 1 \Rightarrow x = 1 - \frac{1}{4} - \frac{1}{3} \Rightarrow x = \frac{12 - 3 - 4}{12} \Rightarrow x = \frac{5}{12}$ \
∴ P(getting an orange ball) = $\frac{5}{12}$

Let the total number of balls in the jar be n.

∴ P(getting an orange ball) = $\frac{10}{n}$
$\Rightarrow \frac{10}{n} = \frac{5}{12} \Rightarrow n = 24$

Thus, the total number of balls in the jar is 24.

Page No 929:

Answer:

Total number of balls = 18.
Number of red balls = x.

(i) Number of balls which are not red = 18 − x

∴ P(getting a ball which is not red) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{18 - x}{18}$

Thus, the probability of drawing a ball which is not red is $\frac{18 - x}{18}$ .

(ii) Now, total number of balls = 18 + 2 = 20.
Number of red balls now = x + 2.

P(getting a red ball now) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{x + 2}{20}$

and P(getting a red ball in first case) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{x}{18}$

Since, it is given that probability of drawing a red ball now will be $\frac{9}{8}$ times the probability of drawing a red ball in the first case.

Thus, $\frac{x + 2}{20} = \frac{9}{8} \times \frac{x}{18}$
$\Rightarrow 144 (x + 2) = 180 x \Rightarrow 144 x + 288 = 180 x \Rightarrow 36 x = 288 \Rightarrow x = \frac{288}{36} = 8$

Thus, the value of x is 8.

Page No 929:

Answer:

The number of white balls in a bag = 15.
Let the number of black balls in that bag be x.
Then, the total number of balls in bag = 15+x.

Now, P(black ball)= $\frac{x}{15 + x}$ and P(white ball)= $\frac{15}{15 + x}$ .
According to question, P(black ball) = 3 P(white ball)
$\Rightarrow \frac{x}{15 + x} = 3 \times \frac{15}{15 + x} \Rightarrow \frac{x}{15 + x} = \frac{45}{15 + x} \Rightarrow x = 45 .$
Hence, number of black balls in bag = x = 45.

Page No 929:

Answer:

Ans

Page No 929:

Answer:

Number of white balls in the bag = x

Number of black balls in the bag = 2x

Number of red balls in the bag = 3x

Total number of balls in the bag = x + 2x + 3x = 6x

∴ Total number of outcomes = 6x

(i) There are 3x non-red balls (x white balls and 2x black balls) in the bag. So, there are 3x ways to draw a ball from the bag which is not red.

Favourable number of outcomes = 3x

∴ P(Selected ball is not red) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{3 x}{6 x} = \frac{1}{2}$

(ii) There are x white balls in the bag. So, there are x ways to draw a ball from the bag which is white.

Favourable number of outcomes = x

∴ P(Selected ball is white) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{x}{6 x} = \frac{1}{6}$

Page No 930:

Answer:

All possible outcomes are 5, 6, 7, 8...................50.

Number of all possible outcomes = 46

(i) Out of the given numbers, the prime numbers less than 10 are 5 and 7.
Let E₁ be the event of getting a prime number less than 10.
Then, number of favourable outcomes = 2
∴ P (getting a prime number less than 10) =

\frac{2}{46} = \frac{1}{23}

(ii) Out of the given numbers, the perfect squares are 9, 16, 25, 36 and 49.
   Let E₂ be the event of getting a perfect square.
Then, number of favourable outcomes = 5
∴ P (getting a perfect square) =

\frac{5}{46}

Page No 930:

Answer:

There are 20 cards in the box. One card can drawn at random from the box in 20 ways.

∴ Total number of outcomes = 20

(i) The prime number cards in the box are 2, 3, 5, 7, 11, 13, 17 and 19. There are 8 prime number cards in the box. So, there are 8 ways to draw a card from the box which is a prime number card.

Favourable number of outcomes = 8

∴ P(Number on the drawn card is a prime number) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{8}{20} = \frac{2}{5}$

(ii) The composite number cards in the box are 4, 6, 8, 9, 10, 12, 14, 15, 16, 18 and 20. There are 11 composite number cards in the box. So, there are 11 ways to draw a card from the box which is a composite number card.

Favourable number of outcomes = 11

∴ P(Number on the drawn card is a composite number) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{11}{20}$

(iii) The cards with number divisible by 3 on them in the box are 3, 6, 9, 12, 15 and 18. There are 6 cards with number divisible by 3 on them in the box. So, there are 6 ways to draw a card from the box with number divisible by 3 on them.

Favourable number of outcomes = 6

∴ P(Number on the drawn card is a number divisible by 3) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{6}{20} = \frac{3}{10}$

Page No 930:

Answer:

Given number 6, 7, 8, .... , 70 form an AP with a = 6 and d = 1.
Let T_n = 70. Then,
6 + (n − 1)1 = 70
⇒ 6 + n  − 1 = 70
⇒ n = 65

Thus, total number of outcomes = 65.

(i) Let E₁ be the event of getting a one-digit number.

Out of these numbers, one-digit numbers are 6, 7, 8 and 9.

Number of favourable outcomes = 4.

∴ P(getting a one-digit number) = P(E₁) = $\frac{Number of outcomes favourable to E_{1}}{Number of all possible outcomes}$
= $\frac{4}{65}$

Thus, the probability that the card bears a one-digit number is $\frac{4}{65}$ .

(ii) Let E₂ be the event of getting a number divisible by 5.

Out of these numbers, numbers divisible by 5 are 10, 15, 20, ... , 70.
Given number 10, 15, 20, .... , 70 form an AP with a = 10 and d = 5.
Let T_n = 70. Then,
10 + (n − 1)5 = 70
⇒ 10 + 5n  − 5 = 70
⇒ 5n = 65
⇒ n = 13

Thus, number of favourable outcomes = 13.

∴ P(getting a number divisible by 5) = P(E₂) = $\frac{Number of outcomes favourable to E_{2}}{Number of all possible outcomes}$
= $\frac{13}{65} = \frac{1}{5}$

Thus, the probability that the card bears a number divisible by 5 is $\frac{1}{5}$ .

(iii) Let E₃ be the event of getting an odd number less than 30.

Out of these numbers, odd numbers less than 30 are 7, 9, 11, ... , 29.
Given number 7, 9, 11, .... , 29 form an AP with a = 7 and d = 2.
Let T_n = 29. Then,
7 + (n − 1)2 = 29
⇒ 7 + 2n  − 2 = 29
⇒ 2n = 24
⇒ n = 12

Thus, number of favourable outcomes = 12.

∴ P(getting an odd number less than 30) = P(E₃) = $\frac{Number of outcomes favourable to E_{3}}{Number of all possible outcomes}$
= $\frac{12}{65}$

Thus, the probability that the card bears an odd number less than 30 is $\frac{12}{65}$ .

(iv) Let E₄ be the event of getting a composite number between 50 and 70.

Out of these numbers, composite numbers between 50 and 70 are 51, 52, 54, 55, 56, 57, 58, 60, 62, 63, 64, 65, 66, 68 and 69.

Number of favourable outcomes = 15.

∴ P(getting a composite number between 50 and 70) = P(E₄) = $\frac{Number of outcomes favourable to E_{4}}{Number of all possible outcomes}$
= $\frac{15}{65} = \frac{3}{13}$

Thus, the probability that the card bears a composite number between 50 and 70 is $\frac{3}{13}$ .

Page No 930:

Answer:

Given number 1, 3, 5, ..., 101 form an AP with a = 1 and d = 2.
Let T_n = 101. Then,
1 + (n − 1)2 = 101
⇒ 1 + 2n − 2 = 101
⇒ 2n = 102
⇒ n = 51

Thus, total number of outcomes = 51.

(i) Let E₁ be the event of getting a number less than 19.

Out of these numbers, numbers less than 19 are 1, 3, 5, ... , 17.
Given number 1, 3, 5, .... , 17 form an AP with a = 1 and d = 2.
Let T_n = 17. Then,
1 + (n − 1)2 = 17
⇒ 1 + 2n − 2 = 17
⇒ 2n = 18
⇒ n = 9

Thus, number of favourable outcomes = 9.

∴ P(getting a number less than 19) = P(E₁) = $\frac{Number of outcomes favourable to E_{1}}{Number of all possible outcomes}$
= $\frac{9}{51} = \frac{3}{17}$

Thus, the probability that the number on the drawn card is less than 19 is $\frac{3}{17}$ .

(ii) Let E₂ be the event of getting a prime number less than 20.

Out of these numbers, prime numbers less than 20 are 3, 5, 7, 11, 13, 17 and 19.

Thus, number of favourable outcomes = 7.

∴ P(getting a prime number less than 20) = P(E₂) = $\frac{Number of outcomes favourable to E_{2}}{Number of all possible outcomes}$
= $\frac{7}{51}$

Thus, the probability that the number on the drawn card is a prime number less than 20 is $\frac{7}{51}$ .

Page No 930:

Answer:

Given number 1, 3, 5, .... , 35 form an AP with a = 1 and d = 2.
Let T_n = 35. Then,
1 + (n − 1)2 = 35
⇒ 1 + 2n − 2 = 35
⇒ 2n = 36
⇒ n = 18

Thus, total number of outcomes = 18.

(i) Let E₁ be the event of getting a prime number less than 15.

Out of these numbers, prime numbers less than 15 are 3, 5, 7, 11 and 13.

Number of favourable outcomes = 5.

∴ P(getting a prime number less than 15) = P(E₁) = $\frac{Number of outcomes favourable to E_{1}}{Number of all possible outcomes}$
= $\frac{5}{18}$

Thus, the probability of getting a card bearing a prime number less than 15 is $\frac{5}{18}$ .

(ii) Let E₂ be the event of getting a number divisible by 3 and 5.

Out of these numbers, number divisible by 3 and 5 means number divisible by 15 is 15.

Number of favourable outcomes = 1.

∴ P(getting a number divisible by 3 and 5) = P(E₂) = $\frac{Number of outcomes favourable to E_{2}}{Number of all possible outcomes}$
= $\frac{1}{18}$

Thus, the probability of getting a card bearing a number divisible by 3 and 5 is $\frac{1}{18}$ .

Page No 930:

Answer:

Given numbers 3, 5, 7, 9, .... , 35, 37 form an AP with a = 3 and d = 2.
Let T_n= 37. Then,
3 + (n − 1)2 = 37
⇒ 3 + 2n − 2 = 37
⇒ 2n = 36
⇒ n = 18

Thus, total number of outcomes = 18.

Let E be the event of getting a prime number.

Out of these numbers, the prime numbers are 3, 5, 7, 11, 13, 17, 19, 23, 29, 31 and 37.

Number of favourable outcomes = 11.

∴ P(getting a prime number) = P(E) = $\frac{Number of outcomes favourable to E}{Number of all possible outcomes}$
= $\frac{11}{18}$

Thus, the probability that the number on the card is a prime number is $\frac{11}{18}$ .

Page No 930:

Answer:

Total number of outcomes = 30.

(i) Let E₁ be the event of getting a number not divisible by 3.

Out of these numbers, numbers divisible by 3 are 3, 6, 9, 12, 15, 18, 21, 24, 27 and 30.

Number of favourable outcomes = 30 − 10 = 20

∴ P(getting a number not divisible by 3) = P(E₁) = $\frac{Number of outcomes favourable to E_{1}}{Number of all possible outcomes}$
= $\frac{20}{30} = \frac{2}{3}$

Thus, the probability that the number on the card is not divisible by 3 is $\frac{2}{3}$ .

(ii) Let E₂ be the event of getting a prime number greater than 7.

Out of these numbers, prime numbers greater than 7 are 11, 13, 17, 19, 23 and 29.

Number of favourable outcomes = 6

∴ P(getting a prime number greater than 7) = P(E₂) = $\frac{Number of outcomes favourable to E_{2}}{Number of all possible outcomes}$
= $\frac{6}{30} = \frac{1}{5}$

Thus, the probability that the number on the card is a prime number greater than 7 is $\frac{1}{5}$ .

(iii) Let E₃ be the event of getting a number which is not a perfect square number.

Out of these numbers, perfect square numbers are 1, 4, 9, 16 and 25.

Number of favourable outcomes = 30 − 5 = 25

∴ P(getting non-perfect square number) = P(E₃) = $\frac{Number of outcomes favourable to E_{3}}{Number of all possible outcomes}$
= $\frac{25}{30} = \frac{5}{6}$

Thus, the probability that the number on the card is not a perfect square number is $\frac{5}{6}$ .

Page No 930:

Answer:

Total number of outcomes = 25

(i) Let E₁ be the event of getting a card divisible by 2 or 3.

Out of the given numbers, numbers divisible by 2 are 2, 4, 6, 8, 10, 12, 14, 16, 18, 20, 22 and 24.
Out of the given numbers, numbers divisible by 3 are 3, 6, 9, 12, 15, 18, 21 and 24.
Out of the given numbers, numbers divisible by both 2 and 3 are 6, 12, 18 and 24.

Number of favourable outcomes = 16

∴ P(getting a card divisible by 2 or 3) = P(E₁) = $\frac{Number of outcomes favourable to E_{1}}{Number of all possible outcomes}$
= $\frac{16}{25}$

Thus, the probability that the number on the drawn card is divisible by 2 or 3 is $\frac{16}{25}$ .

(ii) Let E₂ be the event of getting a prime number.

Out of the given numbers, prime numbers are 2, 3, 5, 7, 11, 13, 17, 19 and 23.

Number of favourable outcomes = 9

∴ P(getting a prime number) = P(E₂) = $\frac{Number of outcomes favourable to E_{2}}{Number of all possible outcomes}$
= $\frac{9}{25}$

Thus, the probability that the number on the drawn card is a prime number is $\frac{9}{25}$ .

Page No 930:

Answer:

All possible outcomes are 2, 3, 4, 5................101.
Number of all possible outcomes = 100

(i) Out of these the numbers that are even = 2, 4, 6, 8...................100
Let E₁ be the event of getting an even number.
Then, number of favourable outcomes = 50    $[T_{n} = 100 \Rightarrow 2 + (n - 1) \times 2 = 100, \Rightarrow n = 50]$
∴ P (getting an even number) = $\frac{50}{100} = \frac{1}{2}$

(ii) Out of these, the numbers that are less than 16 = 2,3,4,5,..................15.
Let E₂ be the event of getting a number less than 16.
Then, number of favourable outcomes = 14
    ∴ P (getting a number less than 16) = $\frac{14}{100} = \frac{7}{50}$

(iii) Out of these, the numbers that are perfect squares = 4, 9,16,25, 36, 49, 64, 81 and 100
  Let E₃ be the event of getting a number that is a perfect square.

Then, number of favourable outcomes = 9
∴ P (getting a number that is a perfect square) =

\frac{9}{100}

(iv) Out of these, prime numbers less than 40 = 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37
Let E₄ be the event of getting a prime number less than 40.
Then, number of favourable outcomes = 12
∴ P (getting a prime number less than 40) =

\frac{12}{100} = \frac{3}{25}

Page No 931:

Answer:

All possible outcomes are BBB, BBG, BGB, GBB, BGG, GBG, GGB and GGG.

Number of all possible outcomes = 8

Let E be the event of having at least one boy.

Then the outcomes are BBB, BBG, BGB, GBB, BGG, GBG and GGB.

Number of possible outcomes = 7
∴ P(Having at least one boy) = P(E) = $\frac{Number of outcomes favourable to E}{Number of all possible outcomes}$
= $\frac{7}{8}$

Thus, the probability of having at least one boy is $\frac{7}{8}$ .

Page No 931:

Answer:

Total number of possible outcomes is 36.
(i) The favorable outcomes are (1,1), (1,3), (1,5), (2,2), (2,4), (2,6), (3,1), (3,3), (3,5), (4,2), (4,4), (4,6), (5,1), (5,3), (5,5), (6,2), (6,4), (6,6).
P(the sum is even)= $\frac{18}{36} = \frac{1}{2} .$

(ii) The favorable outcomes are (1,2), (1,4), (1,6), (2,1), (2,2), (2,3), (2,4), (2,5), (2,6), (3,2), (3,4), (3,6), (4,1), (4,2), (4,3), (4,4), (4,5), (4,6), (5,2), (5,4), (5,6), (6,1), (6,2), (6,3), (6,4), (6,5), (6,6).
P(the product is even)= $\frac{27}{36} = \frac{3}{4} .$

Page No 931:

Answer:

Total number of possible outcomes is 36.
(i) The favorable outcomes for sum of numbers on dices less than 7 are (1,1), (1,2), (1,3), (1,4), (1,5), (2,1), (2,2), (2,3), (2,4), (3,1), (3,2), (3,3), (4,1), (4,2), (5,1).
P(the sum of numbers appeared is less than 7)= $\frac{15}{36} = \frac{5}{12} .$

(ii) The favorable outcomes for product of numbers on dices less than 16 are (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), (4,1), (4,2), (4,3), (5,1), (5,2), (5,3), (6,1), (6,2).
P(the product of numbers appeared is less than 16)= $\frac{25}{36} .$

(iii) The favorable outcomes are (1,1), (3,3), (5,5).
P(the doublet of odd numbers)= $\frac{3}{36} = \frac{1}{12} .$

Page No 931:

Answer:

Total number of possible outcomes for Peter = 36.
Possible outcomes for Peter to get product 25 is (5,5).
Total number of possible outcomes for Rina = 6.
Possible outcomes for Rina to get the number whose square is 25 is 5.

Now, P(Peter will get 25)= $\frac{1}{36} .$
And, P(Rina will get 25)= $\frac{1}{6} .$
Since $\frac{1}{36} < \frac{1}{6}$ , So Rina has better chances of getting 25.

Page No 931:

Answer:

Favorable outcomes for sum of numbers on dice less than 3 or more than 11 are (1,1), (6,6).
Required probability = P(sum is less than 3 or more than 11) = $\frac{2}{36} = \frac{1}{18} .$

Page No 931:

Answer:

Total number of apples = 900.
P(a rotten apple) = 0.18
$\Rightarrow \frac{number of rotten apples}{total number of apples} = 0.18 \Rightarrow \frac{number of rotten apples}{900} = 0.18 \Rightarrow The number of rotten apples = 0.18 \times 900 = 162 apples .$

Page No 931:

Answer:

An ordinary year has 365 days consisting of 52 weeks and 1 day.

This day can be any day of the week.

∴ P(of this day to be Monday) = $\frac{1}{7}$

Thus, the probability that an ordinary year has 53 Mondays is $\frac{1}{7}$ .

Page No 931:

Answer:

A leap year has 366 days with 52 weeks and 2 days.

Now, 52 weeks conatins 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

Out of these 7 cases, there are two cases favouring it to be Sunday.

∴ P(a leap year having 53 Sundays) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{2}{7}$

Thus, the probability that a leap year selected at random will contain 53 Sundays is $\frac{2}{7}$ .

Page No 931:

Answer:

Total numbers of letters in the given word ASSOCIATION = 11
(i) Number of vowels ( A, O, I, A, I, O) in the given word = 6
∴ P (getting a vowel) = $\frac{6}{11}$

(ii) Number of consonants in the given word ( S, S, C, T, N) = 5
∴ P (getting a consonant) = $\frac{5}{11}$

(iii) Number of S in the given word = 2
∴ P (getting an S) = $\frac{2}{11}$

Page No 931:

Answer:

When a coin is tossed three times, the possible outcomes are

HHH, HHT, HTH, THH, HTT, THT, TTH, TTT

Total number of outcomes = 8

A game can be lost if the if all the tosses do not give the same result. The outcomes where tosses do not give the same result are

HHT, HTH, THH, HTT, THT, TTH

Favourable number of outcomes for losing the game = 6

∴ P(Game is lost) = $\frac{Favourable number of outcomes for losing the game}{Total number of outcomes} = \frac{6}{8} = \frac{3}{4}$

Thus, the probability of losing the game is $\frac{3}{4}$ .

Page No 931:

Answer:

Total number of cards in a deck is 52.
The number of cards left after loosing the King, the Jack and the 10 of spade = 52 $-$ 3 = 49.
(i) Red card left after loosing King, the Jack and the 10 of spade will be 13 hearts + 13 diamond = 26 cards
P(red card)= $\frac{26}{49} .$
(ii) Black jack left after loosing King, the Jack and the 10 of spade will be one only of club.
P(black jack)= $\frac{1}{49} .$
(iii) Red king left after loosing King, the Jack and the 10 of spade will be red of diamond and red of hearts i.e two cards.
P(red king)= $\frac{2}{49} .$
(iv) 10 of hearts will be one only after loosing King, the Jack and the 10 of spade
P(10 of hearts)= $\frac{1}{49} .$

Page No 931:

Answer:

There are 6 red face cards. These are removed.

Thus, remaining number of cards = 52 − 6 = 46.

(i) Number of red cards now = 26 − 6 = 20.

∴ P(getting a red card) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{20}{46} = \frac{10}{23}$

Thus, the probability that the drawn card is a red card is $\frac{10}{23}$ .

(ii) Number of face cards now = 12 − 6 = 6.

∴ P(getting a face card) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{6}{46} = \frac{3}{23}$

Thus, the probability that the drawn card is a face card is $\frac{3}{23}$ .

(iii) Number of card of clubs = 12.

∴ P(getting a card of clubs) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{12}{46} = \frac{6}{23}$

Thus, the probability that the drawn card is a card of clubs is $\frac{6}{23}$ .

Page No 932:

Answer:

There are 4 kings, 4 queens and 4 aces. These are removed.

Thus, remaining number of cards = 52 − 4 − 4 − 4 = 40.

(i) Number of black face cards now = 2 (only black jacks).

∴ P(getting a black face card) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{2}{40} = \frac{1}{20}$

Thus, the probability that the drawn card is a black face card is $\frac{1}{20}$ .

(ii) Number of red cards now = 26 − 6 = 20.

∴ P(getting a red card) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{20}{40} = \frac{1}{2}$

Thus, the probability that the drawn card is a red card is $\frac{1}{2}$ .

Page No 932:

Answer:

Total number of all possible outcomes= 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) = $\frac{24}{52} = \frac{6}{13}$

Page No 932:

Answer:

Total number of cards = 5.

(a) Number of queens = 1.

∴ P(getting a queen) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{1}{5}$

Thus, the probability that the drawn card is the queen is $\frac{1}{5}$ .

(b) When the queen is put aside, number of remaining cards = 4.

(i) Number of aces = 1.

∴ P(getting an ace) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{1}{4}$

Thus, the probability that the drawn card is an ace is $\frac{1}{4}$ .

(ii) Number of queens = 0.

∴ P(getting a queen now) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{0}{4} = 0$

Thus, the probability that the drawn card is a queen is 0.

Page No 932:

Answer:

Total number of all possible outcomes= 52
(i) Number of spade cards = 13
Number of aces = 4 (including 1 of spade)

Therefore, number of spade cards and aces = (13 + 4 − 1) = 16

∴ P( getting a spade or an ace card) =

\frac{16}{52} = \frac{4}{13}

(ii) Number of red kings = 2
∴ P( getting a red king) =

\frac{2}{52} = \frac{1}{26}

(iii) Total number of kings = 4
Total number of queens = 4
Let E be the event of getting either a king or a queen.
Then, the favourable outcomes = 4 + 4 = 8
∴ P( getting a king or a queen) = P (E) =

\frac{8}{52} = \frac{2}{13}

(iv) Let E be the event of getting either a king or a queen. Then, ( not E) is the event that drawn card is neither a king nor a

queen.

Then, P(getting a king or a queen ) =

\frac{2}{13}

Now, P (E) + P (not E) = 1
∴ P(getting neither a king nor a queen ) =

1 - (\frac{2}{13}) = \frac{11}{13}

Page No 932:

Answer:

The number are 3, 4, 4, 4, 5, 5, 6, 6, 6, 7. One number can be selected at random from the given 10 numbers in 10 ways.

Total number of outcomes = 10

Mean of the given numbers = $\frac{3 + 4 + 4 + 4 + 5 + 5 + 6 + 6 + 6 + 7}{10} = \frac{50}{10} = 5$

Now, there are two 5's among the given numbers. So, there are 2 ways to select the number 5 i.e. the mean of the given numbers.

Favourable number of outcomes = 2

∴ P(Selected number is the mean of the given number) = P(Selecting the number 5) = $\frac{Favourable number of outcomes}{Total number of outcomes} = \frac{2}{10} = \frac{1}{5}$

Thus, the probability that a number selected at random from the given numbers will be their mean is $\frac{1}{5}$ .

Page No 944:

Answer:

Since, number of elements in the set of favourable cases is less than or equal to the number of elements in the set of whole number of cases,
their ratio always end up being 1 or less than 1.
Also, their ratio can never be negative.

Thus, probability of an event always lies between 0 and 1.
i.e. 0 ≤ P(E) ≤ 1

Hence, the correct answer is option (c).

Page No 944:

Answer:

P(occurence of an event) = p
P(non-occurence of this event) = 1 − p

Hence, the correct answer is option (b).

Page No 944:

Answer:

(b) 0

The probability of an impossible event is 0.

Page No 944:

Answer:

Page No 944:

Answer:

The probability of an event cannot be greater than 1.
Thus, the probability of an event cannot be 1.5.

Hence, the correct answer is option (a).

Page No 944:

Answer:

Total number of outcomes = 30.

Prime numbers in 1 to 30 are 2, 3, 5, 7, 11, 13, 17, 19, 23 and 29.

Number of favourable outcomes = 10.

∴ P(getting a prime number) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{10}{30} = \frac{1}{3}$

Thus, the probability that the selected number is a prime number is $\frac{1}{3}$ .

Hence, the correct answer is option (c).

Page No 944:

Answer:

Total number of outcomes = 15.

Out of the given numbers, multiples of 4 are 4, 8 and 12.

Numbers of favourable outcomes = 3.

∴ P(getting a multiple of 4) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{3}{15} = \frac{1}{5}$

Thus, the probability that a number selected is a multiple of 4 is $\frac{1}{5}$ .

Hence, the correct answer is option (c).

Page No 944:

Answer:

Total number of outcomes = 45.

Out of the given numbers, perfect square numbers are 9, 16, 25, 36 and 49.

Numbers of favourable outcomes = 5.

∴ P(getting a number which is a perfect square) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{5}{45} = \frac{1}{9}$

Thus, the probability that the drawn card has a number which is a perfect square is $\frac{1}{9}$ .

Hence, the correct answer is option (d).

Page No 945:

Answer:

Total number of discs = 90.

Out of the given numbers, prime numbers less than 23 are 2, 3, 5, 7, 11, 13, 17 and 19.

Numbers of favourable outcomes = 8.

∴ P(getting a prime number which is less than 23) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{8}{90} = \frac{4}{45}$

Thus, the probability that the disc bears prime number less than 23 is $\frac{4}{45}$ .

Disclaimer: There is a misprinting in the question. If they ask for the probability of all prime numbers less than 90, then we get $\frac{4}{15}$ .

Hence, the correct answer is option (c).

Page No 945:

Answer:

Total number of cards = 10.

Out of the given numbers, prime numbers are 2, 3, 5, 7 and 11.

Numbers of favourable outcomes = 5.

∴ P(getting a prime number) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{5}{10} = \frac{1}{2}$

Thus, the probability of getting a card with a prime number is $\frac{1}{2}$ .

Hence, the correct answer is option (a).

Page No 945:

Answer:

Total number of tickets = 40.

Out of the given numbers, multiples of 7 are 7, 14, 21, 28 and 35.

Numbers of favourable outcomes = 5.

∴ P(getting a number which is a multiple of 7) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{5}{40} = \frac{1}{8}$

Thus, the probability that the selected ticket has a number, which is a multiple of 7, is $\frac{1}{8}$ .

Hence, the correct answer is option (b).

Page No 945:

Answer:

(d) $\frac{7}{6}$

Explanation:
Probability of an event can't be more than 1.

Page No 945:

Answer:

(c) 0.6

Explanation:
Let E be the event of winning a game.
Then, ( not E) is the event of not winning the game or of losing the game.
Then, P(E) = 0.4
Now, P(E) + P(not E) = 1
⇒ 0.4 + P(not E) = 1
⇒ P(not E) = 1− 0.4 = 0.6
∴ P(losing the game) = P(not E) = 0.6

Page No 945:

Answer:

(d) 0

If an event cannot occur, its probability is 0.

Page No 945:

Answer:

(b) $\frac{1}{5}$

Explanation:
Total number of tickets = 20
Out of the given ticket numbers, multiples of 5 are 5, 10, 15 and 20.
Number of favourable outcomes = 4
∴ P(getting a multiple of 5) = $\frac{4}{20} = \frac{1}{5}$

Page No 945:

Answer:

(c) $\frac{12}{25}$

Explanation:
Total number of tickets = 25
Let E be the event of getting a multiple of 3 or 5.
Then,
Multiples of 3 are 3, 6, 9, 12, 15, 18, 21 and 24.
Multiples of 5 are 5, 10, 15, 20 and 25.

Number of favourable outcomes = ( 8 + 5 − 1) = 12
∴ P (getting a multiple of 3 or 5 ) = P (E) = $\frac{12}{25}$

Page No 945:

Answer:

(d) $\frac{2}{5}$

Explanation:
All possible outcomes are 6, 7, 8................15.
Number of all possible outcomes = 10

Out of these, the numbers that are less than 10 are 6, 7, 8 and 9.
Number of favourable outcomes = 4
∴ P(getting a number that is less than 10) =

\frac{4}{10} = \frac{2}{5}

Page No 946:

Answer:

Total number of outcomes = 6.

Out of the given numbers, even numbers are 2, 4 and 6.

Numbers of favourable outcomes = 3.

∴ P(getting an even number) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{3}{6} = \frac{1}{2}$

Thus, the probability of getting an even number is $\frac{1}{2}$ .

Hence, the correct answer is option (a).

Page No 946:

Answer:

Total number of outcomes = 6.

Out of the given numbers, numbers greater than 2 are 3, 4, 5 and 6.

Numbers of favourable outcomes = 4.

∴ P(getting a number greater than 2) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{4}{6} = \frac{2}{3}$

Thus, the probability of getting a number greater than 2 is $\frac{2}{3}$ .

Hence, the correct answer is option (d).

Page No 946:

Answer:

Total number of outcomes = 6.

Out of the given numbers, odd number greater than 3 is 5.

Numbers of favourable outcomes = 1.

∴ P(getting an odd number greater than 3) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{1}{6}$

Thus, the probability of getting an odd number greater than 3 is $\frac{1}{6}$ .

Hence, the correct answer is option (b).

Page No 946:

Answer:

(c) $\frac{1}{2}$

Explanation:
In a single throw of a die, the possible outcomes are:
1, 2, 3, 4, 5, 6
Total number of possible outcomes = 6
Let E be the event of getting a prime number.
Then, the favourable outcomes are 2, 3 and 5.
Number of favourable outcomes = 3
∴ Probability of getting a prime number = P (E) = $\frac{Number of favorable outcomes}{Total number of possible outcomes} = \frac{3}{6} = \frac{1}{2}$

Page No 946:

Answer:

Total number of outcomes = 36.

Getting the same number on both the dice means (1, 1), (2, 2), (3, 3), (4, 4), (5, 5) and (6, 6).

Numbers of favourable outcomes = 6.

∴ P(getting the same number on both dice) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{6}{36} = \frac{1}{6}$

Thus, the probability of getting the same number on both dice is $\frac{1}{6}$ .

Hence, the correct answer is option (c).

Page No 946:

Answer:

All possible outcomes are HH, HT, TH and TT.

Total number of outcomes = 4.

Getting 2 heads means getting HH.

Numbers of favourable outcomes = 1.

∴ P(getting 2 heads) = $\frac{Number of favourable outcomes}{Number of all possible outcomes}$
= $\frac{1}{4}$

Thus, the probability of getting 2 heads is $\frac{1}{4}$ .

Hence, the correct answer is option (d).

Page No 946:

Answer:

(2) $\frac{1}{6}$

Explanation:
When two dice are thrown simultaneously, all possible outcomes are:
(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)
Number of all possible outcomes = 36

Let E be the event of getting a doublet.
Then the favourable outcomes are:
(1,1), (2,2) , (3,3) (4,4), (5,5), (6,6)
Number of favourable outcomes = 6
∴ P(getting a doublet) = P ( E) = $\frac{6}{36} = \frac{1}{6}$

Page No 946:

Answer:

(d) $\frac{3}{4}$

Explanation:
When two coins are tossed simultaneously, the possible outcomes are HH, HT, TH and TT.
Total number of possible outcomes = 4

Let E be the event of getting at most one head.

Then, the favourable outcomes are HT, TH and TT.
Number of favourable outcomes = 3

∴ P(getting at most 1head) =

\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{3}{4}

Page No 946:

Answer:

(c) $\frac{3}{8}$

Explanation:
When 3 coins are tossed simultaneously, the possible outcomes are HHH, HHT, HTH, THH, THT, HTT, TTH and TTT.
Total number of possible outcomes = 8

Let E be the event of getting exactly two heads.

Then, the favourable outcomes are HHT, THH, and HTH.
Number of favourable outcomes = 3

∴ Probability of getting exactly 2 heads = P(E) =

\frac{Number of favo u rable outcomes}{Total number of possible outcomes} = \frac{3}{8}

Page No 947:

Answer:

(b) $\frac{1}{3}$

Explanation:
Number of prizes = 8
Number of blanks = 16
Total number of tickets = 8 +16= 24
∴ P(getting a prize ) = $\frac{8}{24} = \frac{1}{3}$

Page No 947:

Answer:

(c) $\frac{4}{5}$

Explanation:
Number of prizes = 6
Number of blanks = 24
Total number of tickets = 6 + 24= 30
∴ P(not getting a prize ) = $\frac{24}{30} = \frac{4}{5}$

Page No 947:

Answer:

= ( 3 + 2 + 4) = 9

Let E be the event of not getting a white marble.
It means the marble can be either blue or red but not white.
Number of favourable outcomes = (3 + 4) = 7 marbles

∴ P(not getting a white marble ) =

\frac{7}{9}

Page No 947:

Answer:

(b) $\frac{3}{5}$

Explanation:
Total possible outcomes = Total number of balls = ( 4 + 6) = 10
Number of black balls = 6
∴ P (getting a black ball ) = $\frac{6}{10} = \frac{3}{5}$

Page No 947:

Answer:

= ( 8 + 2 + 5) = 15

Total number of non-black balls = (8 + 5) = 13
∴ P (getting a ball that is not black) =

\frac{13}{15}

Page No 947:

Answer:

= ( 3 + 4 + 5) = 12

Total number of balls that are non-black and non-white = 4
∴ P (getting a ball that is neither black nor white) =

\frac{4}{12} = \frac{1}{3}

Page No 947:

Answer:

(b) $\frac{1}{26}$

Explanation:
Total number of all possible outcomes = 52
Number of black kings = 2
∴ P( getting a black king) = $\frac{2}{52} = \frac{1}{26}$

Page No 947:

Answer:

(a) $\frac{1}{13}$

Explanation:
Total number of all possible outcomes= 52
Number of queens = 4
∴ P( getting a queen) = $\frac{4}{52} = \frac{1}{13}$

Page No 947:

Answer:

(c) $\frac{3}{13}$

Explanation:
Total number of all possible outcomes= 52
Number of face cards ( 4 kings + 4 queens + 4 jacks) = 12
∴ P( getting a face card) = $\frac{12}{52} = \frac{3}{13}$

Page No 948:

Answer:

(b) $\frac{3}{26}$

Explanation:
Total number of all possible outcomes= 52
Number of black face cards ( 2 kings + 2 queens + 2 jacks) = 6
∴ P( getting a black face card) = $\frac{6}{52} = \frac{3}{26}$

Page No 948:

Answer:

(c) $\frac{1}{13}$

Explanation:
Total number of all possible outcomes = 52
Number of 6 in a deck of 52 cards = 4
∴ P( getting a 6) = $\frac{4}{52} = \frac{1}{13}$

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