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ব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্স

পরীক্ষাব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্সতারিখতারিখ অনির্ধারিতসময়45 minutes
মোট প্রশ্ন২১
সিলেবাস
Math - 06 - Probability, Permutation and Combination
ঘনত্ব
উত্তর
উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

ব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্স

ব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্স · তারিখ অনির্ধারিত · ২১ প্রশ্ন

.
Three unbiased coins are tossed. What is the probability of getting at least 2 heads?
  1. ক) 1/4
  2. খ) 1/2
  3. গ) 1/3
  4. ঘ) 1/8
সঠিক উত্তর:
খ) 1/2
উত্তর
সঠিক উত্তর:
খ) 1/2
ব্যাখ্যা

Here S = {TTT, TTH,THT, HTT, THH, HTH, HHT, HHH}.
Let,
E = event of getting at least two heads
= {THH, HTH, HHT, HHH}.
∴ P(E) = n(E)/n(S)
= 4/8
= 1/2.

.
A box contains 4 red, 5 green and 6 white balls. A ball is drawn at random from the box. What is the probability that the ball drawn is either red or green?
  1. ক) 2/5
  2. খ) 3/5
  3. গ) 1/7
  4. ঘ) 7/15
সঠিক উত্তর:
খ) 3/5
উত্তর
সঠিক উত্তর:
খ) 3/5
ব্যাখ্যা

Total number of balls = (4 + 5 + 6)
= 15.
P(drawing a red ball or a green ball)
= P(red) + P(green)
= (4/15 + 5/15)
= 9/15
= 3/5.

.
An urn contains 6 red, 4 blue, 2 green and 3 yellow marbles. If two marbles are drawn at random from the urn, what is the probability that both are red?
  1. ক) 1/6
  2. খ) 1/7
  3. গ) 2/15
  4. ঘ) 2/5
সঠিক উত্তর:
খ) 1/7
উত্তর
সঠিক উত্তর:
খ) 1/7
ব্যাখ্যা

Total number of balls = (6 + 4 + 2 + 3)
= 15.
Let,
E be the event of drawing 2 red balls.
Then,
n(E) = 6C2
= (6 × 5)/(2 × 1)
= 15.
Also, n(S) = 15C2
= (15 × 14)/(2 × 1)
= 105.
∴ P(E) = n(E)/n(S)
= 15/105
= 1/7.

.
In a class, there are 15 boys and 10 girls. Three students are selected at random. The probability that the selected students are 2 boys and 1 girl, is -
  1. ক) 21/46
  2. খ) 25/117
  3. গ) 1/50
  4. ঘ) 3/25
সঠিক উত্তর:
ক) 21/46
উত্তর
সঠিক উত্তর:
ক) 21/46
ব্যাখ্যা

Let,
S be the sample space and
E be the event of select.
Then,
n(S) = number of ways of selecting 3 students out of 25
= 25C3
= (25 × 24 × 23)/(3 × 2 × 1)
= 2300.
And,
n(E) = (15C2 × 10C1)
= {(15 × 14)/(2 × 1)} × 10
= 1050.
∴ P(E) = n(E)/n(S)
= 1050/2300
= 21/46.

.
A bag contains 4 red, 5 yellow and 6 pink balls. Two balls are drawn at random. What is the probability that none of the balls drawn is yellow in colour?
  1. ক) 1/7
  2. খ) 3/7
  3. গ) 2/7
  4. ঘ) 5/14
সঠিক উত্তর:
খ) 3/7
উত্তর
সঠিক উত্তর:
খ) 3/7
ব্যাখ্যা

Number of red balls = 4
Number of yellow ball = 5
Number of pink ball = 6
Total number of balls = 4 + 5 + 6 = 15
Total possible outcomes = selection of 2 balls out of 15 balls = 15C2
= 15!/2!(15 - 2)!
= 15!/(2! × 13!)
= (15 × 14)/(1 × 2)
= 105.
Total favourable outcomes = selection of 2 balls out of 4 orange and 6 pink balls.
10C2
= 10!/2!(10 - 2)!
= 10!/2!8!
= (10 × 9)/(1 × 2)
= 45.
∴ Required Probability = 45/105
= 3/7

.
The ratio of the number of the red balls, to yellow balls, to green balls in an urn is 2:3:4. What is the probability that a ball chosen at random from the urn is a red ball?
  1. ক) 2/7
  2. খ) 5/0
  3. গ) 5/9
  4. ঘ) 2/9
সঠিক উত্তর:
ঘ) 2/9
উত্তর
সঠিক উত্তর:
ঘ) 2/9
ব্যাখ্যা

Total results = 2x + 3x + 4x = 9x,
Favourable result is (red ball) = 2x
∴ Probability = 2x/9x
= 2/9
Answer: 2/9

.
Tickets numbered 1 to 20 are mixed up and a ticket is drawn at random. What is the probability that the ticket drawn has a number which is a multiple of 3 or 5?
  1. ক) 0.45
  2. খ) 0.40
  3. গ) 0.25
  4. ঘ) 0.50
সঠিক উত্তর:
ক) 0.45
উত্তর
সঠিক উত্তর:
ক) 0.45
ব্যাখ্যা

Here,
Total results S = {1, 2, 3, 4, .....19, 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)/n(S)
= 9/20
= 4.5/10
= 0.45
Answer: 0.45

.
There are 4 women and 4 men sitting in a waiting room for a job interview. If two of the applicants are selected at random, what is the probability that both will be women?
  1. ক) 1/2
  2. খ) 3/7
  3. গ) 3/4
  4. ঘ) 3/14
সঠিক উত্তর:
ঘ) 3/14
উত্তর
সঠিক উত্তর:
ঘ) 3/14
ব্যাখ্যা

৮ জনের মধ্যে ৪ জন মহিলা ও ৪ জন পুরুষ।
দুইজনকে দৈবভাবে নিলে মহিলা আসার সম্ভাবনা বের করতে হবে।
প্রথম ১ জন নিলে মহিলা আসার সম্ভাবনা = মোট মহিলা/মোট সংখ্যা
= ৪/৮
= ১/২
তখন মোট সংখ্যা থাকবে ৭ জন ও মহিলা থাকবে ৩ জন।
তারপর ১ জন নিলে মহিলা আসার সম্ভাবনা = ৩/৭।
তাহলে দুইজন নিলে একত্রে সম্ভাবনা হবে = ১/২ × ৩/৭
= ৩/১৪।

.
In a class, there are 12 boys and 16 girls. One of them is called out by an enrollment number, what is the probability that the one called is a girl?
  1. ক) 1/4
  2. খ) 2/5
  3. গ) 5/12
  4. ঘ) 4/7
সঠিক উত্তর:
ঘ) 4/7
উত্তর
সঠিক উত্তর:
ঘ) 4/7
ব্যাখ্যা

Let S be the sample space.
Total number of students in the class=12 boys + 16 girls = 28
Then, n(S) = 28
Let E be the event of calling one of them by enrollment number.
Given that, the number of girls = 16.
Then, n(E) = 16.
The probability that the one called is a girl = n(S)/n(E) = 16/28 = 4/7.

১০.
A box contains 6 bottles of variety 1 drink, 3 bottles of variety 2 drink, and 4 bottles of variety 3 drink. Three bottles of them are drawn at random, what is the probability that the three are not of the same variety?
  1. ক) 833/858
  2. খ) 752/833
  3. গ) 632/713
  4. ঘ) none of these
সঠিক উত্তর:
ক) 833/858
উত্তর
সঠিক উত্তর:
ক) 833/858
ব্যাখ্যা

Total number of drink bottles = 6 + 3 + 4 = 13.
Let S be the sample space
Then, n(S) = number of ways of taking 3 drink bottles out of 13.
Therefore, n(S) = 13C3
= (13 x 12 x 11)/(1 x 2 x 3)
= 66 x 13
= 858.
Let E be the event of taking 3 bottles of the same variety
Then, E = event of taking (3 bottles out of 6) or (3 bottles out of 3) or (3 bottles out of 4)
n(E) = 6C3 + 3C3 + 4C3
= (6 x 5 x 4 )/ (1 x 2 x 3) + 1 + (4 x 3 x 2) / (1 x 2 x 3)
= 20 + 1 + 4
= 25
The probability of taking 3 bottles of the same variety = n(E)/n(S)
= 25/858.
Then, the probability of taking 3 bottles are not of the same variety = 1 - 25/858
= 833/858.

১১.
There are 12 boys and 8 girls in a tuition centre. If three of them scored first marks, then what is the probability that one of the three is a girl and the other two are boys?
  1. ক) 14/75
  2. খ) 22/55
  3. গ) 44/95
  4. ঘ) none of these
সঠিক উত্তর:
গ) 44/95
উত্তর
সঠিক উত্তর:
গ) 44/95
ব্যাখ্যা

Total number of students = 20.
Let S be the sample space.
Then, n(S) = number of ways of three scored first mark
n(S) = 20C3
= 20 x 19 x 18 / 2 x 3
= 20 x 19 x 3

Let,
E be the event of 1 girl and 2 boys.
Therefore, n(E) = number of possible of 1 girl out of 8 and 2 boys out of 12.
n(E) = 8C1 x 12C2
= 8 x 12 x 11 / 1 x 2
= 8 x 6 x 11.

Now, the required probability = n(E)/n(S)
= (8 x 6 x 11)/(20 x 19 x 3)
= 44/95.

১২.
Two groups, A and B wrote an exam. The probability of A's pass is 2/7 and the probability of B's pass is 2/5. What is the probability that only one of them is passed out?
  1. ক) 5/6
  2. খ) 1/3
  3. গ) 18/35
  4. ঘ) 16/35
সঠিক উত্তর:
ঘ) 16/35
উত্তর
সঠিক উত্তর:
ঘ) 16/35
ব্যাখ্যা

Let, A be the event of the group A pass
Let, B be the event of the group B pass

Then,
A'= Event of the group A's fail and B'= event of the group B's fail.
Therefore, p(A) = 2/7 and p(B) = 2/5,
P(A') = 1 - P(A) = 1- 2/7 = 5/7 and P(B') = 1- P(B) = 1- 2/5 = 3/5

Required probability = P[( A And B') Or (B And A')]
= P[( A And B') Or (B And A')]
= P[( A And B') + (B And A')]
= P[( A And B')] + P[(B And A')]
= p(A) x P(B') + P(A') x P(B)
= (2/7 x 3/5) + (2/5 x 5/7)
= (6/35 + 10/35)
= 16/35

১৩.
In how many different ways can the letters of the word ‘DAUGHTER’ be arranged so that the vowels always come together?
  1. ক) 3400
  2. খ) 4320
  3. গ) 5670
  4. ঘ) 6800
সঠিক উত্তর:
খ) 4320
উত্তর
সঠিক উত্তর:
খ) 4320
ব্যাখ্যা

The given word contains 8 different letters.
When the vowels AUE are taken together, we may treat them as 1 letter.
Then,
The letters to be arranged are DGHTR (AUE)
The letters can be arranged in 6P6 = 6!
= 720 ways.
The vowels AUE may be arranged in 3! = 6 ways.
Required number of ways = (720 × 6)
= 4320 ways.

১৪.
A select group of 4 is to be formed from 8 men and 6 women in such a way that the group must have at least 1 woman. In how many different ways can it be done?
  1. ক) 364
  2. খ) 728
  3. গ) 931
  4. ঘ) 1001
সঠিক উত্তর:
গ) 931
উত্তর
সঠিক উত্তর:
গ) 931
ব্যাখ্যা

Required number of ways = 6C1× 8C3 + 6C2× 8C2 + 6C3× 8C1+ 6C4× 8C0
= {6 × (8 × 7 × 6)/3!} + {(6 × 5)/(2 × 1) × (8 × 7)/(2 × 1)} + {(6 × 5 × 4)/3! × 8} + {(6 × 5)/(2 × 1) × 1}
= (336 + 420 + 160 + 15)
= 931.

১৫.
In how many different ways can the letters of the AUCTION be arranged in such a way that the vowels always come together?
  1. ক) 30
  2. খ) 48
  3. গ) 144
  4. ঘ) 576
সঠিক উত্তর:
ঘ) 576
উত্তর
সঠিক উত্তর:
ঘ) 576
ব্যাখ্যা

The given word contains 7 different letters.
Keeping the vowels (AUIO) together, we take them as 1 letter.
Then,
we have to arrange the letters CTN(AUIO).
Now, 4 letters can be arranged in 4! = 24 ways.
The vowels (AUIO) can be arranged themselves in 4! = 24 ways.
∴ Required number of ways = (24 × 24)
= 576.

১৬.
10 people shake their hands with each other. How many handshakes occurred?
  1. ক) 40
  2. খ) 22
  3. গ) 45
  4. ঘ) 20
সঠিক উত্তর:
গ) 45
উত্তর
সঠিক উত্তর:
গ) 45
ব্যাখ্যা

যে কোন করমর্দন অথবা কোলাকুলির অংকে শুধু কত জন করমর্দন (Handshake), বা কোলাকুলি করল তা দেয়া থাকবে।
এক্ষেত্রে মনে রাখতে হবে যে প্রত্যেক বার করমর্দন বা কোলাকুলি করার সময় মোট ২ জন লোকের প্রয়োজন।
তাই এক্ষেত্রে সূত্রটি হবে nC2 = মোট লোকC২ জন সব সময়
10C2 = 10!/2!(10 - 2)!
= 10!/2!8!
= (10 × 9)/2
= 5 × 9
= 45.

১৭.
How many number plates of 3 digit can be formed with four digits 1,2,3 and 4?
  1. ক) 18
  2. খ) 24
  3. গ) 28
  4. ঘ) 36
সঠিক উত্তর:
খ) 24
উত্তর
সঠিক উত্তর:
খ) 24
ব্যাখ্যা

Here, the order of arrangement of digits does matter.
nP= n!/(n-r)!
nP= 4!/(4-3)!
4P= 4!/1!
4P= 4!
4P= 24

১৮.
How many three-digit numbers can be formed by using the digits in 735621, if repetition is not allowed?
  1. ক) 90
  2. খ) 120
  3. গ) 150
  4. ঘ) 210
সঠিক উত্তর:
খ) 120
উত্তর
সঠিক উত্তর:
খ) 120
ব্যাখ্যা

nPr = n!/(n-r)!
6P3 = 6!/(6-3)!
6P3 = 6!/3!
6P3 = 120

১৯.
How many numbers of five digits can be formed with the digits 0, 1, 2, 4, 6 and 8?
  1. ক) 450
  2. খ) 530
  3. গ) 600
  4. ঘ) 750
সঠিক উত্তর:
গ) 600
উত্তর
সঠিক উত্তর:
গ) 600
ব্যাখ্যা

Required no. of numbers = 5 ×5P4
= 5 × 5!
= 5 ×120
= 600

২০.
Out of 7 consonants and 4 vowels, how many words of 3 consonants and 2 vowels can be formed -
  1. ক) 210
  2. খ) 1050
  3. গ) 25200
  4. ঘ) 21400
সঠিক উত্তর:
ক) 210
উত্তর
সঠিক উত্তর:
ক) 210
ব্যাখ্যা

Number of ways of selecting (3 consonants out of 7) and (2 vowels out of 4)
= 7C3× 4C2
= {(7 × 6 × 5)/(3 × 2 × 1)} × {(4 × 3)/(2 × 1)}
= 210.

২১.
Two dice are thrown together. What is the probability that the sum of the numbers on the two faces is divisible by 4 or 6?
  1. ক) 2/7
  2. খ) 7/18
  3. গ) 3/18
  4. ঘ) 5/7
সঠিক উত্তর:
খ) 7/18
উত্তর
সঠিক উত্তর:
খ) 7/18
ব্যাখ্যা

Clearly,
n(S) = 6 × 6
= 36.
Let,
E be the event that the sum of the numbers on the two faces is divisible by 4 or 6.
Then, E = {(1, 3), (1, 5), (2, 2), (2, 4), (2, 6), (3, 1), (3, 3), (3, 5), (4, 2), (4, 4), (5, 1), (5, 3), (6, 2), (6, 6)}
∴ n(E) = n(E)/n(S)
= 14/36
= 7/18.