Distance covered by B in 9 sec. = | ❨ | 100 | x 9 | ❩m | = 20 m. |
45 |
∴ A beats B by 20 metres.
A : C = 100 : 72.
∴ | B | = | ❨ | B | x | A | ❩ | = | ❨ | 80 | x | 100 | ❩ | = | 10 | = | 100 | = 100 : 90. |
C | A | C | 100 | 72 | 9 | 90 |
∴ B can give C 10 points.
Ratio of the speeds of A and B = | 5 | : 1 = 5 : 3. |
3 |
Thus, in race of 5 m, A gains 2 m over B.
2 m are gained by A in a race of 5 m.
80 m will be gained by A in race of | ❨ | 5 | x 80 | ❩m | = 200 m. |
2 |
∴ Winning post is 200 m away from the starting point.
A : C = 100 : 87.
B | = | B | x | A | = | 90 | x | 100 | = | 30 | . |
C | A | C | 100 | 87 | 29 |
When B runs 30 m, C runs 29 m.
When B runs 180 m, C runs | ❨ | 29 | x 180 | ❩m | = 174 m. |
30 |
∴ B beats C by (180 - 174) m = 6 m.
A : C = 60 : 40.
∴ | B | = | ❨ | B | x | A | ❩ | = | ❨ | 45 | x | 60 | ❩ | = | 45 | = | 90 | = 90 : 80. |
C | A | C | 60 | 40 | 40 | 80 |
∴ B can give C 10 points in a game of 90.
A's speed = | ❨ | 5 x | 5 | ❩m/sec | = | 25 | m/sec. |
18 | 18 |
Time taken by A to cover 100 m = | ❨ | 100 x | 18 | ❩sec | = 72 sec. |
25 |
∴ Time taken by B to cover 92 m = (72 + 8) = 80 sec.
∴ B's speed = | ❨ | 92 | x | 18 | ❩kmph | = 4.14 kmph. |
80 | 5 |
1 |
22 |
3 |
22 |
2 |
91 |
2 |
77 |
2 |
91 |
Then, n(S) | = number of ways of drawing 3 balls out of 15 | |||
= 15C3 | ||||
|
||||
= 455. |
Let E = event of getting all the 3 red balls.
∴ n(E) = 5C3 = 5C2 = | (5 x 4) | = 10. |
(2 x 1) |
∴ P(E) = | n(E) | = | 10 | = | 2 | . |
n(S) | 455 | 91 |
1 |
2 |
2 |
5 |
8 |
15 |
9 |
20 |
9 |
20 |
Let E = event of getting a multiple of 3 or 5 = {3, 6 , 9, 12, 15, 18, 5, 10, 20}.
∴ P(E) = | n(E) | = | 9 | . |
n(S) | 20 |
1 |
6 |
5 |
12 |
1 |
2 |
7 |
9 |
5 |
12 |
Let E = Event that the sum is a prime number.
Then E | = { (1, 1), (1, 2), (1, 4), (1, 6), (2, 1), (2, 3), (2, 5), (3, 2), (3, 4), (4, 1), (4, 3), (5, 2), (5, 6), (6, 1), (6, 5) } |
∴ n(E) = 15.
∴ P(E) = | n(E) | = | 15 | = | 5 | . |
n(S) | 36 | 12 |
1 |
13 |
3 |
13 |
1 |
4 |
9 |
52 |
3 |
13 |
∴ P (getting a face card) = | 12 | = | 3 | . |
52 | 13 |
3 |
20 |
29 |
34 |
47 |
100 |
13 |
102 |
13 |
102 |
Then, n(S) = 52C2 = | (52 x 51) | = 1326. |
(2 x 1) |
Let E = event of getting 1 spade and 1 heart.
∴ n(E) | = number of ways of choosing 1 spade out of 13 and 1 heart out of 13 |
= (13C1 x 13C1) | |
= (13 x 13) | |
= 169. |
∴ P(E) = | n(E) | = | 169 | = | 13 | . |
n(S) | 1326 | 102 |
Comments
There are no comments.Copyright ©CuriousTab. All rights reserved.