Mutually Exclusive Events
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A bag contains white and black balls. A ball is drawn times with replacement. The probability that at least of the balls drawn are white is
A bag contains white and black balls. Two balls are drawn at random. The probability that they are of the same colours, is
If A, B, C are three mutually exclusive and exhaustive events of an experiment such that 3P(A) = 2P(B) = P(C), then P(A) is equal to
611
111
211
511
A: 'the sum is even'.
B: 'the sum is a multiple of 3′.
C: 'the sum is less than 4′.
D: 'the sum is greater than 11′.
Which pairs of these events are mutually exclusive?
An event has odds in favor then the probability that occurs is
A pair of fair dice is rolled together till a sum of either or is obtained. Then the probability that comes before is
None of these
If S is the sample space and P(A) = 13 P(B) and S = A∪B, where A and B are two mutually exclusive events, then P(A) =
14
12
34
38
Given two mutually exclusive events A and B such that P(A)=12 and P(B)=13 find P(A or B).
A bag contains 3 red, 4 white and 5 blue balls. All balls are different. Two balls are drawn at random. The probability that they are of different colour is
1
4766
1033
13
A bag contains black, white and red balls. One by one, balls are drawn without replacement. The probability that the third ball is red, is
- 3255
- 3040
- 34
- 3250
Hannah finds purple, blue, and silver space rocks while exploring. of the rocks are purple and of the remainder are blue. If there are silver rocks, how many space rocks does Hannah have?
If and are independent events of a random experiment, such that , , then is equal to
- 4766
- 1033
- 522
- None
Bag A contains 4 green and 3 red balls and bag B contains 4 red and 3 green balls. One bag is taken at random and a ball is drawn and noted it is green. The probability that it comes from bag B is
2/3
2/7
1/3
3/7
A bag has four pair of balls of four distinct colours. If four balls are picked at random (without replacement), the probability that there is atleast one pair among them have the same colour is
The probability that x1+x2+x3 is odd, is
- 29105
- 53105
- 57105
- 12
If are the probabilities of three mutually exclusive events, then the set of values of is
The angle between the lines, Whose direction ratios are , is
- 920
- 1420
- 1320
- 1120
- 49192
- 39192
- 99192
- 89192
(a) If A and B be mutualy exclusive events associated with a random experiment such that P(A) = 0.4 and P(B) = 0.5, then find :
(i) P(A∪B) (ii) P(¯¯¯¯A∪¯¯¯¯B)
(iii) P(¯¯¯¯A∪B) (iv) P(A∪¯¯¯¯B)
(b) A and B are two events such that P(A)= 0.54, P(B) = 0.69 and P(A∪B) = 0.35. Find:
(i) P(A∪B) (ii) P(¯¯¯¯A∪¯¯¯¯B)
(iii) P(A∪¯¯¯¯B) (iv) P(B∪¯¯¯¯A)
(c) Fill in the blanks in the following table :
P(A) P(B)
P(A∩B) P(A∪B)
(i) 13 15 115
(ii) 0.35
(iii) 0.5 0.35
- 164
- 6364
- 12
- 125
A box contains 10 good articles and 6 with defects. One item is draqn at random. The Probability that it is either good of has a defect is
6464
4964
4064
2464
Two dice are thrown. The events A, B, C, D, E and F are described as follows :
A = Getting an even number on the first die.
B = Getting an odd number on the first die.
C = Getting at most 5 as sum of the numbers on the two dice.
D = Getting the sum of the numbers on the dice greater than 5 but less than 10.
E = Getting at least 10 as the sum of the numbers on the dice.
F = Getting an odd number on one of the dice.
(i) Describe the following events : A and B, B or C, B and C, A and E, A or F, A and F
(ii) State true or false :
(a) A and B are mutually exclusive.
(b) A and B are mutually exclusive and exhaustive events.
(c) A and C are mutually exclusive events.
(d) C and D are mutually exclusive and exhaustive events.
(e) C, D and E are mutually exclusive and exhaustive events.
(f) A' and B' are mutually exclusive events.
(g) A, B, F arc mutually exclusive and exhaustive events.
- 0.1
- 0.28
- 0.42
- 0.72
A: getting an even number on the first die.
B: getting an odd number on the first die.
C: getting the sum of the numbers on the dice ≤5
i. State true or false: (give reason for your answer)
A and B are mutually exclusive.
ii. State true or false: (give reason for your answer)
A and B are mutually exclusive and exhaustive.
iii. State true or false: (give reason for your answer)
A=B'.
iv. State true or false: (give reason for your answer)
A and C are mutually exclusive.
v. State true or false: (give reason for your answer)
A and B′ are mutually exclusive.
vi. State true or false: (give reason for your answer)
A', B', C are mutually exclusive and exhaustive.
Three coins are tossed. Describe
(i) two events A and B which are mutually exclusive.
(ii) three events A, B and C which are mutually exclusive and exhaustive.
(iii) two events A and B which am not mutually exclusive.
(iv) two events A and B which are mutually exclusive but not exhaustive.
In a swimming race 3 swimmers compete . The probability of A and B winning is same and twice that of C.What is the probability that B or C wins. Assuming no two finish the race at the same time.
3/5
8/10
2/10
1/5