পরীক্ষা আর্কাইভ

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

.
A bag contains 6 white and 4 black balls. 2 balls are drawn at random. Find the probability that they are of same color.
  1. ক) 1/2
  2. খ) 7/15
  3. গ) 8/15
  4. ঘ) 1/9
  5. ঙ) None of the above
ব্যাখ্যা

Let S be the sample space.
Then n(S) = no of ways of drawing 2 balls out of (6 + 4) = 10C2
= (10 × 9)/(2 × 1) = 45
Let E = event of getting both balls of same colour
Then,
n(E) = no of ways (2 balls out of six) or (2 balls out of 4)
= 6C2 + 4C2
= (6 × 5)/(2 × 1) + (4 × 3)/(2 × 1)
= 15 + 6
= 21
Therefore,
P(E) = n(E)/n(S)
= 21/45
= 7/15

.
From a pack of 52 cards, two cards are drawn together at random. What is the probability of both the cards being kings?
  1. ক) 1/15
  2. খ) 1/221
  3. গ) 25/57
  4. ঘ) 35/256
  5. ঙ) None of the above
ব্যাখ্যা

Let S be the sample space
Then,
n(S) = 52C2
= 52 × 51/2 × 1
= 1326
Let E = event of getting 2 kings out of 4.
n(E) = 4C2
=> 4 × 3/2 × 1
P(E) = n(E)/n(S)
= 6/1326
= 1/221

.
If two letters are taken at random from the word HOME, what is the probability that none of the letters would be vowels?
  1. ক) 1/6
  2. খ) 1/2
  3. গ) 1/3
  4. ঘ) 1/4
  5. ঙ) None of the above
ব্যাখ্যা

P(first letter is not vowel) = 2/4
P(second letter is not vowel) = 1/3
So, probability that none of letters would be vowels is = 2/4 × 1/3
= 1/6

.
An unbiased die is tossed.Find the probability of getting a multiple of 3.
  1. ক) 1/3
  2. খ) 1/2
  3. গ) 3/4
  4. ঘ) 3/2
  5. ঙ) None of the Above
ব্যাখ্যা

Here S = {1, 2, 3, 4, 5, 6}
Let E be the event of getting the multiple of 3
Then,
E = {3,6}
P(E) = n(E)/n(S)
= 2/6
= 1/3

.
In a throw of a coin, find the probability of getting a head?
  1. ক) 1/3
  2. খ) 1/6
  3. গ) 1/2
  4. ঘ) 1/4
  5. ঙ) None of the above
ব্যাখ্যা
No explanation added.
.
In a party there are 5 couples. Out of them 5 people are chosen at random. Find the probability that there are at the least two couples?
  1. ক) 6/7
  2. খ) 19/21
  3. গ) 7/31
  4. ঘ) 5/21
  5. ঙ) None of the above
ব্যাখ্যা

Number of ways of (selecting at least two couples among five people selected) = (5C2 × 6C1)
As remaining person can be any one among three couples left.
Required probability = (5C2 × 6C1)/10C5
= (10 x 6)/252
= 5/21

.
A box contains 5 detective and 15 non-detective bulbs. Two bulbs are chosen at random. Find the probability that both the bulbs are non-defective.
  1. ক) 5/19
  2. খ) 3/20
  3. গ) 21/38
  4. ঘ) 25/38
  5. ঙ) None of these
ব্যাখ্যা

n(S) = 20C2 = 190
n(E) = 15C2 = 105
Therefore,
P(E) = 105/190
= 21/38

.
Out of 7 consonants and 4 vowels, how many words of 3 consonants and 2 vowels can be formed?
  1. ক) 25200
  2. খ) 52000
  3. গ) 120
  4. ঘ) 24400
  5. ঙ) None of the above
ব্যাখ্যা

Number of ways of selecting (3 consonants out of 7) and (2 vowels out of 4) = (7C3 × 4C2)
= 210.
Number of groups, each having 3 consonants and 2 vowels = 210.
Each group contains 5 letters.
Number of ways of arranging 5 letters among themselves = 5! = 120
Required number of ways = (210 x 120)
= 25200.

.
In how many different ways can the letters of the word 'LEADING' be arranged in such a way that the vowels always come together?
  1. ক) 720
  2. খ) 520
  3. গ) 700
  4. ঘ) 750
  5. ঙ) None of these
ব্যাখ্যা

The word 'LEADING' has 7 different letters.
When the vowels EAI are always together, they can be supposed to form one letter.
Then, we have to arrange the letters LNDG (EAI).
Now, 5 (4 + 1) letters can be arranged in 5! = 120 ways.
The vowels (EAI) can be arranged among themselves in 3! = 6 ways.
Required number of ways = (120 x 6)
= 720.

১০.
A committee of 5 persons is to be formed from 6 men and 4 women. In how many ways can this be done when at least 2 women are included?
  1. ক) 196
  2. খ) 186
  3. গ) 190
  4. ঘ) 200
  5. ঙ) None of these
ব্যাখ্যা

When at least 2 women are included.
The committee may consist of 3 women, 2 men : It can be done in 4C3 × 6C2 ways
or, 4 women, 1 man : It can be done in 4C4 × 6C1 ways
or, 2 women, 3 men : It can be done in 4C2 × 6C3 ways.
Total number of ways of forming the committees
= 4C2 × 6C3 + 4C3 × 6C2 + 4C4 × 6C1
= 6 x 20 + 4 x 15 + 1 x 6
= 120 + 60 + 6
= 186

১১.
A college has 10 basketball players. A 5-member team and a captain will be selected out of these 10 players. How many different selections can be made?
  1. ক) 1260
  2. খ) 1400
  3. গ) 1250
  4. ঘ) 1600
  5. ঙ) None of these
ব্যাখ্যা

A team of 6 members has to be selected from the 10 players.
This can be done in 10C6 or 210 ways.
Now, the captain can be selected from these 6 players in 6 ways.
Therefore,
total ways the selection can be made is = 210 × 6
= 1260

১২.
The Indian Cricket team consists of 16 players. It includes 2 wicket keepers and 5 bowlers. In how many ways can a cricket eleven be selected if we have to select 1 wicket keeper and atleast 4 bowlers?
  1. ক) 1024
  2. খ) 1900
  3. গ) 2000
  4. ঘ) 1092
  5. ঙ) None of these
ব্যাখ্যা

We are to choose 11 players including 1 wicket keeper and 4 bowlers or 1 wicket keeper and 5 bowlers.
Number of ways of selecting 1 wicket keeper, 4 bowlers and 6 other players in 2C1 × 5C4 × 9C6 = 840
Number of ways of selecting 1 wicket keeper, 5 bowlers and 5 other players in 2C1 × 5C5 × 9C5 = 252
Total number of ways of selecting the team = 840 + 252 = 1092

১৩.
How many 7 digit numbers can be formed using the digits 1, 2, 0, 2, 4, 2, 4?
  1. ক) 120
  2. খ) 360
  3. গ) 240
  4. ঘ) 424
  5. ঙ) None of these
ব্যাখ্যা

There are 7 digits 1, 2, 0, 2, 4, 2, 4 in which 2 occurs 3 times, 4 occurs 2 times.
Number of 7 digit numbers = 7!3! × 2! = 420
But out of these 420 numbers,
there are some numbers which begin with '0' and they are not 7-digit numbers. The number of such numbers beginning with '0'.
= 6!3! × 2! = 60
Hence the required number of 7 digits numbers = 420 - 60 = 360

১৪.
If there are 15 dots on a circle,how many triangles can be formed?
  1. ক) 455
  2. খ) 450
  3. গ) 469
  4. ঘ) 500
  5. ঙ) None of these
ব্যাখ্যা

There are 15 dots in total,and to make a triangle we need to select any three of those dots.
So, 15C3 = 455

১৫.
How many parallelograms will be formed if 7 parallel horizontal lines intersect 6 parallel vertical lines?
  1. ক) 215
  2. খ) 315
  3. গ) 415
  4. ঘ) 115
  5. ঙ) None of these
ব্যাখ্যা

Parallelograms are formed when any two pairs of parallel lines (where each pair is not parallel to the other pair) intersect.
Hence, the given problem can be considered as selecting pairs of lines from the given 2 sets of parallel lines.
Therefore, the total number of parallelograms formed = 7C2 x 6C2 = 315

১৬.
In a box, there are 5 black pens, 3 white pens and 4 red pens. In how many ways can 2 black pens, 2 white pens and 2 red pens can be chosen?
  1. ক) 180
  2. খ) 220
  3. গ) 240
  4. ঘ) 160
  5. ঙ) None of these
ব্যাখ্যা

Number of ways of choosing 2 black pens from 5 black pens in 5C2 ways.
Number of ways of choosing 2 white pens from 3 white pens in 3C2 ways.
Number of ways of choosing 2 red pens from 4 red pens in 4C2 ways.
By the Counting Principle, 2 black pens, 2 white pens, and 2 red pens can be chosen in 10 x 3 x 6 = 180 ways

১৭.
Find the number of subsets of the set {1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11} having 4 elements.
  1. ক) 340
  2. খ) 370
  3. গ) 320
  4. ঘ) 330
  5. ঙ) None of these
ব্যাখ্যা

Here the order of choosing the elements doesn’t matter and this is a problem in combinations.
We have to find the number of ways of choosing 4 elements of this set which has 11 elements.
This can be done in 11C4 ways = 330 ways

১৮.
In how many ways can 5 letters be posted in 4 letter boxes?
  1. ক) 512
  2. খ) 1024
  3. গ) 625
  4. ঘ) 20
  5. ঙ) None of these
ব্যাখ্যা

First letter can be posted in 4 letter boxes in 4 ways.
Similarly the second letter can be posted in 4 letter boxes in 4 ways and so on.
Hence all the 5 letters can be posted in = 4 x 4 x 4 x 4 x 4 = 1024

১৯.
The number of ways in which 8 distinct toys can be distributed among 5 children?
  1. ক) 5P8
  2. খ) 58
  3. গ) 8P5
  4. ঘ) 85
  5. ঙ) None of these
ব্যাখ্যা

As the toys are distinct and not identical,
For each of the 8 toys, we have three choices as to which child will receive the toy.
Therefore, there are 58 ways to distribute the toys.
Hence, it is 58 and not 85.

২০.
How many arrangements can be made out of the letters of the word DRAUGHT, the vowels never being separated?
  1. ক) 1440
  2. খ) 720
  3. গ) 360
  4. ঘ) 640
  5. ঙ) None of these
ব্যাখ্যা

There are 7 letters in the word DRAUGHT, the two vowels are A and U.
Since, the vowels are not to be separated; AU can be considered as one entity.
Therefore, the number of letters will be 6 instead of 7.
The permutations will be P(6,6) = 6! ways.
But the two vowels A and U can be arranged in two ways, i.e. AU and UA.
The required number of arrangements = 2!.6! = 1440 ways.

২১.
There are three rooms in a Hotel: one single, one double and one for four persons. How many ways are there to house seven persons in these rooms?
  1. ক) 105
  2. খ) 7! x 6!
  3. গ) 7!/5!
  4. ঘ) 420
  5. ঙ) None of these
ব্যাখ্যা

Choose 1 person for the single room & from the remaining choose 2 for the double room & from the remaining choose 4 people for the four person room,
Then, 7C1 x 6C2 x 4C4
= 7 x 15 x 1
= 105