বিষয়সমূহ

PrepBank · বিষয়ভিত্তিক প্রশ্ন

Probability, Permutation and Combination

মোট প্রশ্ন৯৬৯এই পাতা১০০প্রতি পাতা১০০
ঘনত্ব
উত্তর
উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

Probability, Permutation and Combination

PrepBank · পাতা / ১০ · ১০০ / ৯৬৯

.
7Pr = 210 and 7Cr = 35 then what is the value of r?
  1. 3
  2. 4
  3. 5
  4. 6
ব্যাখ্যা

Question: 7Pr = 210 and 7Cr = 35 then what is the value of r?

Solution:
Given that,
7Pr = 210 and 7Cr = 35

We know that,
nPr = r! × nCr
⇒ 210 = r! × 35
⇒ r! = 210/35
⇒ r! = 6
⇒ r! = 3!
∴ r = 3

.
All possible three digit numbers are formed by 1, 3, 5. If one number is chosen randomly, the probability that it would be divisible by 5 is
  1. 0
  2. 2/9
  3. 1/3
  4. 1/4
ব্যাখ্যা
Question: All possible three digit numbers are formed by 1, 3, 5. If one number is chosen randomly, the probability that it would be divisible by 5 is

Solution: 
1, 3, 5 এই তিনটি অংক দ্বারা 3! = 6 উপায়ে সংখ্যা গঠন করা যায়
5 দ্বারা বিভাজ্য হতে হলে শেষের অংক 5 রেখে সংখ্যার প্রথম দুটি স্থান বাকি দুইটি অংক দিয়ে 2! = 2 উপায়ে গঠন করা যায়।
∴ সংখ্যাটি 5 দ্বারা বিভাজ্য হবার সম্ভাবনা = 2/6
= 1/3
.
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 women. In how many different ways can it be done?
  1. 931
  2. 360
  3. 1050
  4. 720
ব্যাখ্যা
Question: 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 women. In how many different ways can it be done?

Solution:
The required number of ways =  8C3 × 6C1 + 8C2 × 6C2 + 8C1 × 6C3 + 6C4
= 56 × 6 + 28 × 15 + 8 × 20 + 15
= 336 + 420 + 160 + 15
= 931
.
Everyone present at a party shakes hands with each other. If the total number of handshakes is 66, how many people were present at the party?
  1. 10
  2. 11
  3. 12
  4. 13
ব্যাখ্যা

Question: Everyone present at a party shakes hands with each other. If the total number of handshakes is 66, how many people were present at the party?

Solution:
ধরি, পার্টিতে মোট x জন লোক উপস্থিত ছিল।

 যেহেতু করমর্দন করতে দুইজন লোকের প্রয়োজন হয়, তাই মোট করমর্দন সংখ্যা = xC2
= x!/{2!(x - 2)!}
= {x(x - 1)(x - 2)!}/{2!(x - 2)!}
= x(x - 1)/2
= (x2 - x)/2

 প্রশ্নমতে,
(x2 - x)/2 = 66
⇒ x2 - x - 132 = 0
⇒ (x - 12)(x + 11) = 0
∴ x = 12 or x = - 11

কিন্তু, x = - 11 হতে পারে না।
∴ x = 12

.
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. 1/6
  2. 1/7
  3. 2/15
  4. 2/5
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.

.
I forgot the last digit of a 7 digit telephone number. If one randomly dial the final three digits after correctly dialling the four, then what is the chance of dialling the correct number?
  1. 1/1000
  2. 1/1001
  3. 1/999
  4. 1/990
ব্যাখ্যা
Question: I forgot the last digit of a 7 digit telephone number. If one randomly dial the final three digits after correctly dialling the four, then what is the chance of dialling the correct number?

Solution:
It is given that last three digits are randomly dialled. Then each of the digit can be selected out of 10 digits in 10 ways.

Hence required probability
= 1/10 × 1/10 × 1/10
= 1/1000
.
In how many different ways can a committee of 3 members be selected from 5 people if a particular person must always be included in the committee?
  1. 4
  2. 5
  3. 6
  4. 7
ব্যাখ্যা

Question: In how many different ways can a committee of 3 members be selected from 5 people if a particular person must always be included in the committee?

Solution: 
Since one person must always be in the committee, we need to select the other two members from the remaining 4 people.
∴ Number of ways to choose the other two members = 4C2
= (4 × 3)/(1 × 2) 
= 6  

.
In how may different ways can the letters of the word JUDGE be arranged in such a way that the vowels always come together? 
  1. ক) 32
  2. খ) 36
  3. গ) 42
  4. ঘ) 48
ব্যাখ্যা
The word 'JUDGE' contains 5 different letters.
When the vowels UE are always together, they can be supposed to form one letter.
Then, we have to arrange the letters JDG (UE).
Now, 5 letters can be arranged in 4! ways 
                                                   = 24 ways.
The vowels (OIA) can be arranged among themselves in 2! = 2 ways.

∴ Required number of ways = (24 x 2) = 48
.
Find the number of ways of selecting 4 girls and 4 boys out of 7 girls and 6 boys.
  1. 125
  2. 145
  3. 525
  4. 575
ব্যাখ্যা
Question: Find the number of ways of selecting 4 girls and 4 boys out of 7 girls and 6 boys.

Solution:
The number of ways of selecting 4 girls and 4 boys out of 7 girls and 6 boys is
7C4 × 6C4
= {7!/(4! × 3!)} × {6!/(4! × 2!)}
= (35 × 15)
= 525 ways
১০.
There are 8 true-false questions in an examination, these questions can be answered in-
  1. 1024
  2. 820
  3. 256
  4. 128
ব্যাখ্যা
Question: There are 8 true-false questions in an examination, these questions can be answered in-

Solution:
Total number of question = 8
Each question has 2 answer.

These question can be answered in 28 ways = 256 ways
১১.
In how many ways can 10 examination papers be arranged so that the best and the worst papers never come together?
  1. 2 × 9!
  2. 2 × 7!
  3. 7!
  4. 8 × 9!
ব্যাখ্যা
Question: In how many ways can 10 examination papers be arranged so that the best and the worst papers never come together?

Solution:
No. of ways in which 10 paper can arranged is 10! Ways.
When the best and the worst papers come together, regarding the two as one paper, we have only 9 papers.
These 9 papers can be arranged in 9! Ways.
And two papers can be arranged themselves in 2! Ways.
No. of arrangement when best and worst paper do not come together,
= 10! - 9! × 2!
= 9!(10 - 2)
= 8 × 9!
১২.
In a bag, there are 5 red, 3 green, and 2 blue marbles. If two marbles are drawn one after the other without replacement, what is the probability that the first one is red and the second one is green?
  1. 1/5
  2. 1/3
  3. 3/10
  4. 1/6
  5. 3/8
ব্যাখ্যা

Question: In a bag, there are 5 red, 3 green, and 2 blue marbles. If two marbles are drawn one after the other without replacement, what is the probability that the first one is red and the second one is green?

Solution:
মোট মার্বেলের সংখ্যা = 5 (লাল) + 3 (সবুজ) + 2 (নীল) = 10টি
প্রথম মার্বেলটি লাল হওয়ার সম্ভাবনা = 5/10 = 1/2
প্রথম মার্বেলটি তোলার পর থলেতে মোট মার্বেলের সংখ্যা = 10 - 1 = 9টি
দ্বিতীয় মার্বেলটি সবুজ হওয়ার সম্ভাবনা = 3/9 = 1/3

∴ প্রথমটি লাল এবং দ্বিতীয়টি সবুজ হওয়ার সম্ভাবনা = (প্রথমটি লাল হওয়ার সম্ভাবনা) × (দ্বিতীয়টি সবুজ হওয়ার সম্ভাবনা)
= 1/2 × 1/3
= 1/6

১৩.
In how many ways can the letters of the word ''LEADER'' be arranged?
  1. 360
  2. 500
  3. 720
  4. 800
ব্যাখ্যা
Question: In how many ways can the letters of the word ''LEADER'' be arranged?

Solution: 
The word,'LEADER'' contains 6 letters, 1L, 2E, 1A, 1D and 1R.
∴ Required number of ways = 6!/2!
= 360
১৪.
What is the probability of getting a sum 7 from two throws of a dice?
  1. 1/6
  2. 1/12
  3. 1/9
  4. 1/8
ব্যাখ্যা

Question: What is the probability of getting a sum 7 from two throws of a dice?

Solution:
দুটি ছক্কা নিক্ষেপ করলে মোট সম্ভাব্য ফলাফল (Sample Space), n(S) = 6 × 6 = 36

ধরি, E হলো প্রাপ্ত সংখ্যাদ্বয়ের যোগফল 7 হওয়ার ঘটনা।
∴ অনুকূল ফলাফলগুলো হলো, E = {(1, 6), (2, 5), (3, 4), (4, 3), (5, 2), (6, 1)}

এখানে, n(E) = 6

আমরা জানি,সম্ভাবনা P(E) = n(E)/n(S)
= 6/36
= 1/6

১৫.
What is the probability of getting a sum 5 from two throws of a dice?
  1. 1/9
  2. 1/8
  3. 1/7
  4. 1/6
ব্যাখ্যা
Question: What is the probability of getting a sum 5 from two throws of a dice?

Solution:
In two throws a dice, n(S) = 6 × 6 = 36
Let E is the event of getting a sum of five.
E = (1, 4), (4, 1), (2, 3), (3, 2)
So, n(E) = 4

∴ P(E) = n(E)/n(S) = 4/36 = 1/9
১৬.
6Px = 360, 6Cx = 15, what is the value of x?
  1. ক) 3
  2. খ) 4
  3. গ) 5
  4. ঘ) 6
ব্যাখ্যা
Question: 6Px = 360, 6Cx = 15, what is the value of x?

Solution:
6Px = 360
⇒ 6!/(6 - x)! = 360........(1)

6Cx = 15
⇒ 6!/x! (6 - x)! = 15..........(2)

(1) ÷ (2) ,
{6!/(6 - x)!} / {6!/x! (6 - x)! } = 360/15
⇒ x! = 24
= 4 × 3 × 2 × 1

∴ x = 4
১৭.
In how many ways can 5 examination papers be arranged so that the best and the worst papers never come together?
  1. 24
  2. 36
  3. 48
  4. 72
  5. None
ব্যাখ্যা

Question: In how many ways can 5 examination papers be arranged so that the best and the worst papers never come together?

Solution:
The number of ways in which 5 papers can be arranged is 5! ways.
When the best and the worst papers come together, regarding the two as one paper, we have only 4 papers.
These 4 papers can be arranged in 4! ways.
And two papers can be arranged themselves in 2! ways.

∴ Number of arrangements when the best and worst papers do not come together,
= 5! - (4! × 2!)
= (5 × 4 × 3 × 2 × 1) - (4 × 3 × 2 × 1 × 2)
= 120 - 48
= 72

১৮.
In a box, there are 8 red, 7 blue and 6 green balls. One ball is picked up randomly. What is the probability that it is neither red nor green?
  1. ক) 1/3
  2. খ) 3/4
  3. গ) 7/19
  4. ঘ) 8/21
  5. ঙ) 9
ব্যাখ্যা
Question: In a box, there are 8 red, 7 blue and 6 green balls. One ball is picked up randomly. What is the probability that it is neither red nor green?

Solution:
Total number of balls, n(S) = (8 + 7 + 6) = 21
Let,
E = event that the ball drawn in neither red nor green = even that the ball drawn in blue.
∴ n(E)=7

∴P(E) = n(E)​/n(S) = 7/21 ​= 1/3​
১৯.
A box contains 10 red marbles and 15 blue marbles. If 5 marbles are drawn without replacement, what is the probability of getting exactly 2 red marbles?
  1. 0.42
  2. 0.45
  3. 0.35
  4. 0.39
ব্যাখ্যা
Question: A box contains 10 red marbles and 15 blue marbles. If 5 marbles are drawn without replacement, what is the probability of getting exactly 2 red marbles?

Solution: 
Total marbles = 10 (red) + 15 (blue) = 25.
Number of draws = 5.
Desired number of red marbles = 2.

Number of ways to choose 2 red marbles = 10C2 = 45
Number of ways to choose 3 blue marbles = 15C3 = 455

Favorable outcomes = 45 × 455 = 20475
Total possible outcomes = 25C5 = 53130

Probability = 20475/53130 = 0.3853 = 0.39
২০.
Two fair dice are thrown together. What is the probability that the product of the two numbers that appear is 20?
  1. 3/4
  2. 1/18
  3. 2/9
  4. 1/2
ব্যাখ্যা

Question: Two fair dice are thrown together. What is the probability that the product of the two numbers that appear is 20?

Solution:
Total number of possible outcomes when throwing two dice = 6 × 6 = 36
Favorable outcomes where the product is 20.
The possible pairs (first die, second die) are, (4, 5) and (5, 4)
∴ favorable outcomes = 2
∴ Probability = Number of favorable outcomes/Total outcomes
= 2/36
= 1/18

∴ The probability is 1/18.

২১.
Galib buys 5 dolls for his 5 nieces. The gifts include two identical Sun-and-Fun beach dolls, one Elegant Eddie dress-up doll, one G.I. Josie army doll, and one Tulip Troll doll. If the youngest niece doesn't want the G.I. Josie doll, in how many different ways can he give the gifts?
  1. 96
  2. 60
  3. 48
  4. 12
ব্যাখ্যা
Question: Galib buys 5 dolls for his 5 nieces. The gifts include two identical Sun-and-Fun beach dolls, one Elegant Eddie dress-up doll, one G.I. Josie army doll, and one Tulip Troll doll. If the youngest niece doesn't want the G.I. Josie doll, in how many different ways can he give the gifts?

Solution: 
total ways = 5!/2! = 60 

if the the youngest niece wants the G.I. Josie doll = 4!/2! = 12 

 the youngest niece doesn't want the G.I. Josie doll, different ways = 60 - 12
= 48
২২.
How many different six digit numbers can be formed using all of the following digits 3, 3, 4, 4, 4, 5?
  1. ক) 50
  2. খ) 40
  3. গ) 60
  4. ঘ) 30
ব্যাখ্যা
Question: How many different six digit numbers can be formed using all of the following digits 3, 3, 4, 4, 4, 5?

Solution:
প্রদত্ত অঙ্ক মোট 6টি যার মধ্যে 2টি 3 এবং 3টি 4 আছে।

∴ নির্ণেয় ছয় অঙ্কবিশিষ্ট মোট গঠিত সংখ্যা = 6!/(2! × 3!) টি
= 60 টি 
২৩.
A license plate begins with three letters. If the possible letters are P, Q, R, S, how many different permutations of these letters can be made if no letter is used more than once?
  1. ক) 20
  2. খ) 22
  3. গ) 24
  4. ঘ) 26
ব্যাখ্যা
Question: A license plate begins with three letters. If the possible letters are P, Q, R, S, how many different permutations of these letters can be made if no letter is used more than once?

Solution: 
For the first letter, there are 4 possible choices. After that letter is chosen, there are 3 possible choices. Finally, there are 2 possible choices.
∴ Total permutations = 4 × 3 × 2
= 24
২৪.
According to meteorological records, it rained on 21 days in the month of June last year. What is the probability that it will rain on fourth of June this year?
  1. ক) 1/21
  2. খ) 21/31
  3. গ) 7/10
  4. ঘ) 1/2
ব্যাখ্যা
Question: According to meteorological records, it rained on 21 days in the month of June last year. What is the probability that it will rain on fourth of June this year?

Solution:
June month has 30 days
favorable events = 21 days

∴ the probability that it will rain on fourth of June this year = 21/30
= 7/10
২৫.
A dice is thrown randomly. What is the probability that the number shown on the dice is not divisible by 3?
  1. 1/3
  2. 1/2
  3. 3/4
  4. 2/3
ব্যাখ্যা
Question: A dice is thrown randomly. What is the probability that the number shown on the dice is not divisible by 3?

Solution:
Numbers on dice are {1, 2, 3, 4, 5, 6}
Numbers on dice not divisible by 3 are {1, 2, 4, 5}
Number of favorable outcomes = 4
Total possible outcomes = 6

∴ The probability that the number shown on the dice is not divisible by 3 is 4/6 = 2/3
২৬.
A small company employs 3 men and 5 women. If a team of 4 employees is to be randomly selected to organize the company retreat, what is the probability that the team will have exactly 3 women?
  1. 3/5 
  2. 3/8 
  3. 1/7 
  4. 3/7 
ব্যাখ্যা
Question: A small company employs 3 men and 5 women. If a team of 4 employees is to be randomly selected to organize the company retreat, what is the probability that the team will have exactly 3 women?

Solution:
A small company employs 3 men and 5 women.
Total people = 8

ways of selecting 4 people from 8 = 8C4
= 70

ways of selecting 3 women from 5 = 5C3
ways of selecting 1 men from 3 = 3C1

∴ probability = (5C3 × 3C1)/ 70
= (10 × 3)/70
= 3/7 
২৭.
In a simultaneous throw of a pair of dice, what is the probability of getting a total more than 9?
  1. 1/6
  2. 2/9
  3. 5/18
  4. 1/36
ব্যাখ্যা

Question: In a simultaneous throw of a pair of dice, what is the probability of getting a total more than 9?

Solution:
When two fair six-sided dice are thrown together. Then we get,
Total outcomes = 6 × 6 = 36

And, Count outcomes with sum > 9

We want sum > 9 ⇒ sums = 10, 11, 12
Sum 10 = (4, 6), (5, 5), (6, 4) ⇒ 3 outcomes
Sum 11 = (5, 6), (6, 5) ⇒ 2 outcomes
Sum 12 = (6, 6) ⇒ 1 outcome

∴ Total favorable outcomes = 3 + 2 + 1 = 6

∴ Probability(sum > 9) = favorable outcomes/total outcomes
= 6/36
= 1/6

So the probability of getting a total more than 9 is 1/6.

২৮.
Two dice are tossed at once. What is the probability that their combined total is no less than 10? 
  1. 1/6
  2. 1/2
  3. 1/4
  4. 1/12
  5. 1/3
ব্যাখ্যা

Question: Two dice are tossed at once. What is the probability that their combined total is no less than 10?

solution:
When two fair six-sided dice are tossed, the total number of possible outcomes = 6 × 6 = 36.
We want the probability that the sum is ≥ 10 (i.e., 10, 11, or 12).

List all favorable outcomes,
Sum = 10: (4, 6), (5, 5), (6, 4) = 3 ways
Sum = 11: (5, 6), (6, 5) = 2 ways
And Sum = 12: (6,6) = 1 way

∴ Total favorable outcomes = 3 + 2 + 1 = 6

∴ Probability = favorable outcomes/total outcomes
= 6/36
= 1/6

So the probability is 1/6.

২৯.
A letter is taken out at random from ASSISTANT and another is taken out from STATISTICS. The probability that they are the same letters is:
  1. 19/96
  2. 35/96
  3. 31/96
  4. 19/90
ব্যাখ্যা
Question: A letter is taken out at random from ASSISTANT and another is taken out from STATISTICS. The probability that they are the same letters is:

Solution:
The letters of ASSISTANT are A A S S S T T I N
The letters of STATISTICS are A S S S T T T I I C
Common letters are A, S, T, I
The probability of choosing an A from ASSISTANT & an A from STATISTICS is:
(2C1/9C1) × (1C1/10C1)
= (2/9) × (1/10)
= 1/45

The probability of choosing an I from ASSISTANT & an I from STATISTICS is:
(1C1/9C1) × (2C1/10C1)
= (1/9) × (2/10)
= 1/45

The probability of choosing a S from ASSISTANT & a S from STATISTICS is:
(3C1/9C1) × (3C1/10C1)
= (3/9) × (3/10)
= 1/10

The probability of choosing a T from ASSISTANT & a T from STATISTICS is:
(2C1/9C1) × (3C1/10C1)
= (2/9) × (3/10)
= 1/15

∴ The probability that the chosen letters are the same letters is:
1/45 + 1/45 + 1/10 + 1/15
= (2 + 2 + 9 + 6)/90
= 19/90
৩০.
In how many ways can 5 people from a group of 8 people be seated around a circular table?
  1. 1224
  2. 1344
  3. 1564
  4. 1600
ব্যাখ্যা

Question: In how many ways can 5 people from a group of 8 people be seated around a circular table?

Solution:
5 people out of 8 = 8C5
= 8!/5!(8 - 5)!
= 8!/(3! × 5!)
​= (8 × 7 × 6 × 5!)/(6  × 5!)
= 56

And 5 people around a circular table = (5 - 1)! = 4! = 24

∴ Total ways = 24 × 56 = 1344

৩১.
In a simultaneous throw of two dice, what is the probability of getting a total of 8?
  1. ক) 1/6
  2. খ) 1/9
  3. গ) 1/12
  4. ঘ) 5/36
ব্যাখ্যা
Question: In a simultaneous throw of two dice, what is the probability of getting a total of 8?

Solution:

The total number of events ⇒ 36.
The number of events of getting total 8 ⇒ 5.

∴ The probability of getting a total of 8 is 5/36.
৩২.
Two unbiased coins are tossed. What is the probability of getting at most one head?
  1. 1/2
  2. 1/4
  3. 3/4
  4. 3/8
ব্যাখ্যা

Question: Two unbiased coins are tossed. What is the probability of getting at most one head?

Solution:
Total cases = {HH, HT, TH, TT} = 4
Favorable cases = {TT, HT, TH} = 3

∴ Required Probability = 3/4

৩৩.
Find the total number of distinct vehicle numbers that can be formed using two letters followed by two numbers. Letters need to be distinct.
  1. 60000
  2. 65000
  3. 70000
  4. 58500
ব্যাখ্যা
Question: Find the total number of distinct vehicle numbers that can be formed using two letters followed by two numbers. Letters need to be distinct.

Solution: 
There are 26 letters in the English alphabet.
First letter: 26 choices
Second letter: 25 choices (must be different from the first)

So, total ways to choose two distinct letters in order = 26 × 25
Total number combinations = 10 × 10 = 100 (since digits can repeat)

Total number of vehicle numbers = 26 × 25 × 100 = 65000
৩৪.
In how many ways can five different rings be worn on three fingers of one hand?
  1. 243 ways
  2. 320 ways
  3. 480 ways
  4. 720 ways
ব্যাখ্যা
Question: In how many ways can five different rings be worn on three fingers of one hand?

Solution:
Number of fingers  = 3
Number of rings = 5

∴ 5 rings may be worn in = 35 ways.
= 243 ways
৩৫.
Arrange the letters of the word ''DARKER'' so that the three vowels do not appear together. In how many ways can this be done?
  1. ক) 240
  2. খ) 360
  3. গ) 500
  4. ঘ) 720
ব্যাখ্যা

'DARKER' has 6 letters.

Thus, we can arrange 6 letters in 6! ways.
But R gets repeated. There are 2R's. So divide by 2!

∴ Total ways = 6!/2! = 360
Vowels not together = Total ways - Vowels together

Consider the 2 vowels (A and E) as one group.
We have 4 letters and 1 group = 5
We can arrange them in 5! Ways.

But again here R comes twice. So we will have 5!/2!
Also, the 2 vowels can be arranged in 2! Ways.
SO the number of ways with vowels together = 2! × (5!/2!) = 120

∴ Number of ways with vowels not together = 360 - 120 = 240.

৩৬.
Three unbiased coins are tossed. What is the probability of getting at least 2 tails?
  1. 3/8
  2. 2/3
  3. 1/3
  4. 1/2
  5. None
ব্যাখ্যা
Question: Three unbiased coins are tossed. What is the probability of getting at least 2 tails?

Solution:
Total outcomes = {TTT, TTH,THT, HTT, THH, HTH, HHT, HHH} = 8
Favorable outcomes = {TTT, TTH, THT, HTT} = 4

So, the probability of getting at least 2 tails = Favorable outcomes/Total outcomes
= 4/8
= 1/2
৩৭.
Two cards are drawn at random and without replacement from a standard deck of 52 cards. What is the probability that both cards are face cards?
  1. 1/26
  2. 1/13
  3. 5/52
  4. 11/221
ব্যাখ্যা

Question: Two cards are drawn at random and without replacement from a standard deck of 52 cards. What is the probability that both cards are face cards?

Solution:
Total card = 52
Total face card = 3 × 4 = 12

Total ways to choose 2 cards from 52 = 52C2 = (52 × 51)/2 = 1326

Total ways to choose 2 face cards from 12 = 12C2 = (12 × 11)/2 = 66

∴ So, the probability that both cards are face cards = 66/1326
= (2 × 3 × 11)/(2 × 3 × 221)
= 11/221

৩৮.
A card is drawn from a deck of 52 cards, then replaced, and another card is drawn. What is the probability that both are aces?
  1. 1/169
  2. 2/221
  3. 1/221
  4. 4/663
ব্যাখ্যা
Question: A card is drawn from a deck of 52 cards, then replaced, and another card is drawn. What is the probability that both are aces?

Solution: 
Since the card is replaced, the events are independent. 

P(Ace on 1st draw) × P(Ace on 2nd draw) = (4/52) × (4/52) = (1/13)2 = 1/169

৩৯.
I forgot the last digit of a 7 digit telephone number. If one randomly dial the final three digits after correctly dialling the four, then what is the chance of dialling the correct number?
  1. 1/10
  2. 1/1000
  3. 1/500
  4. 1/900
ব্যাখ্যা
Question: I forgot the last digit of a 7 digit telephone number. If one randomly dial the final three digits after correctly dialling the four, then what is the chance of dialling the correct number?

Solution:
It is given that last three digits are randomly dialled. Then each of the digit can be selected out of 10 digits in 10 ways.

Hence required probability
= 1/10 × 1/10 × 1/10
= 1/1000
৪০.
In how many ways 2 books can be chosen from the class of 20 books?
  1. 170
  2. 180
  3. 190
  4. 200
ব্যাখ্যা
Question: In how many ways 2 books can be chosen from the class of 20 books?

Solution:

Here,
n = 20
r = 2

The number of ways
= nC
= n!/r!(n - r)!
= 20!/2!(20 - 2)!
= 20!/2! × 18!
= 20 × 19 × 18!/2! × 18!
= 20 × 19/2 × 1
= 190

∴ 2 books can be chosen from the class of 20 books in 190 ways.
৪১.
A box contains three white balls, four black balls and three red balls. The number of ways in which three balls can be drawn from the box so that at least one of the balls is black is-
  1. 200
  2. 150
  3. 100
  4. 50
  5. None of these
ব্যাখ্যা
Question: A box contains three white balls, four black balls and three red balls. The number of ways in which three balls can be drawn from the box so that at least one of the balls is black is-

Solution:
The required number of ways
(a) 1 black and 2 others = 4C1 × 6C2 = 4 × 15 = 60

(b) 2 black and 1 other = 4C2 × 6C1 = 6 × 6 = 36

(c) All the three black = 4C3 = 4

∴ Total = 60 + 36 + 4 = 100
৪২.
Given a box containing three red, two blue, and four white balls, what is the probability that we will select two red and one white ball when we have to pick three balls from it?
  1. 1/3
  2. 1/7
  3. 1/12
  4. 1/24
ব্যাখ্যা
Question: Given a box containing three red, two blue, and four white balls, what is the probability that we will select two red and one white ball when we have to pick three balls from it?

Solution : 
Total balls in box = 3 + 2 + 4
= 9

From this 9 balls, the number ways we can choose 3 balls = 9C3
= 9!/[ 3! × (9 - 3)! ]
= 9!/(3! × 6!)
= (9 × 8 × 7)/(1 × 2 ×3)
= 84

From 3 red, 2 blue, and 4 white balls, the number ways we can choose 2 red and 1 white ball = 3C2 × 4C1
= (3 × 4)
= 12 

The probability that we will select two red and one white ball = favourable event / total event
= 12/84 
= 1/7
৪৩.
A fair coin is flipped three times. What is the probability that the coin lands head each time?
  1. ক) 1/2
  2. খ) 1/3
  3. গ) 1/4
  4. ঘ) 1/8
ব্যাখ্যা

All possible outcome = {HHH, HHT, HTT, HTH, THH, TTH, THT, TTT} =  8
It will be head every time, this occurs 1 time
∴ Probability =  1/8

৪৪.
A prize of 2000 tk is given to anyone who solves a hacker puzzle independently. The probability that Rafi will win the prize is 0.6, and the probability that kamol will win the prize is 0.7. What is the probability that both will win the prize?
  1. ক) 0.39
  2. খ) 0.48
  3. গ) 0.42
  4. ঘ) 0.52
ব্যাখ্যা
Question: A prize of 2000 tk is given to anyone who solves a hacker puzzle independently. The probability that Rafi will win the prize is 0.6, and the probability that kamol will win the prize is 0.7. What is the probability that both will win the prize?

Solution:
probability that Rafi will win the prize is, P(A) = 0.6
probability that kamol will win the prize is, P(B) = 0.7
As events are independent,
P (A ∩ B) = P(A) × P (B)
= 0.6 × 0.7
= 0.42
৪৫.
If you roll a six-sided die, what is the probability of getting a 3 or a 4?
  1. 1/2
  2. 1/6
  3. 1/3
  4. 1/4
ব্যাখ্যা
Question: If you roll a six-sided die, what is the probability of getting a 3 or a 4?

Solution:
On a six-sided die, the probability of throwing any number is 1 in 6.
The probability of throwing a 3 = 1/6
The probability of throwing a 4 = 1/6

Therefore, the probability of throwing either a 3 or 4 is 1/6 + 1/6 = (1+1)/6 = 2/6 = 1/3
৪৬.
What is the probability of getting a sum 9 from two throws of a dice?
  1. ক) 1/2
  2. খ) 3/5
  3. গ) 1/9
  4. ঘ) 1/3
ব্যাখ্যা

In two throws of a dice, n(S) = (6 x 6) = 36
Let E = event of getting a sum
         = {(3, 6), (4, 5), (5, 4), (6, 3)}
∴P(E) = n(E)/n(S)
           =4/36
           =1/9
৪৭.
A 4-digit number is formed using the digits 1 to 7 without repetition. What is the probability that the number is even?
  1. 3/7
  2. 3/8
  3. 4/9
  4. 5/8
ব্যাখ্যা
Question: A 4-digit number is formed using the digits 1 to 7 without repetition. What is the probability that the number is even?

Solution: 
Total available digits = 7 (1, 2, 3, 4, 5, 6, 7)
So, total 4-digit numbers = 7P4 = 840 

The last digit must be even (2, 4, 6) = 3 choices.
Choosing 3 digits from 6 digits = 6P3 = 120 

So, Number of even 4-digit numbers = 3 × 120 = 360

∴ Probability = 360/840 = 3/7 
৪৮.
There are 2 shirts, 3 jeans, 3 socks and 2 skirts. In how many ways shopkeeper can arrange these things so that all the socks come together and all the skirts come together? 
  1. ক) 4690
  2. খ) 3260
  3. গ) 2520
  4. ঘ) 5040
ব্যাখ্যা
৩টি মোজাকে ১টি এবং ২টি স্কার্টকে ১টি ধরে মোট = 1 + 1 + 2 + 3 = 7টি পণ্য পাওয়া যাবে।
দোকানদার সকল মোজা এবং সকল স্কার্টগুলো একত্রে রেখে 7টি পণ্যকে সাজাতে পারেন = 7! ভাবে ।
                                                                                                                                      = 5040
৪৯.
A man throws two dice simultaneously on the floor. What is the probability of getting two numbers whose product is even?
  1. 2/3
  2. 4/5
  3. 1/2
  4. 3/4
ব্যাখ্যা
Question: A man throws two dice simultaneously on the floor. What is the probability of getting two numbers whose product is even?

Solution:
In a simultaneous throw of the two dice, the sample space, S = 6 × 6 = 36
So, n (S) = 36

The event "E" = {(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)}

So, n (E) = 27

∴ Probability = 27/36 = 3/4
৫০.
What is the probability of rolling a number less than or equal to 4 on a six-sided die?
  1. 2/3
  2. 1/2
  3. 3/4
  4. None of these
ব্যাখ্যা
Question: What is the probability of rolling a number less than or equal to 4 on a six-sided die?

Solution:
A standard six-sided die has the numbers,
1, 2, 3, 4, 5, 6
Numbers less than or equal to 4 are- 1, 2, 3, and 4.
Number of favorable outcomes = 4.
And total possible outcomes = 6

∴ Probability = Favorable outcomes/Total outcomes ​
= 4/6 ​
= 2/3

∴ The probability of rolling a number less than or equal to 4 on a six-sided die is 2/3.
৫১.
Two unbiased coins are tossed. What is the probability of getting at most one tail?
  1. 3/4
  2. 1/6
  3. 1/2
  4. 1/3
ব্যাখ্যা
Question: Two unbiased coins are tossed. What is the probability of getting at most one tail?

Solution: 
Total outcomes = (HH, HT, TH, TT)
Favorable outcomes = (HH, HT, TH)
At most one head refers to a maximum one tail,

Therefore, Probability = Favorable outcomes/​Total outcomes = 3/4
৫২.
Using the digits 9, 8, 2, 5 exactly once, how many numbers greater than 5000 can be formed?
  1. 10
  2. 12
  3. 18
  4. 24
ব্যাখ্যা
Question: Using the digits 9, 8, 2, 5 exactly once, how many numbers greater than 5000 can be formed?

Solution:
To form a number greater than 5000, the first digit must be one of 5, 8, or 9.
If the first digit is 5, the remaining 3 digits can be arranged in 3P3 = 6 ways.
If the first digit is 8, the remaining 3 digits can be arranged in 3P3 = 6 ways.
If the first digit is 9, the remaining 3 digits can be arranged in 3P3 = 6 ways.

Therefore, the total number of ways to form such numbers is: 6 + 6 + 6 = 18
18 numbers greater than 5000 can be formed.
৫৩.
In a box, there are 8 red, 7 blue and 6 green balls. One ball is picked up randomly. What is the probability that it is neither red nor green?
  1. ক) 1/2
  2. খ) 1/3
  3. গ) 2/3
  4. ঘ) 3/5
ব্যাখ্যা
Total number of balls
= (8 + 7 + 6)
= 21
Let E = event that the ball drawn is neither red nor green
= event that the ball drawn is blue
∴n(E)=7
∴P(E) = n(E)/n(S)
          = 7/21
          = 1/3
৫৪.
Two cards are drawn at random and without replacement from a standard deck of 52 cards. What is the probability that both cards are face cards?
  1. 11/221
  2. 13/321
  3. 7/158
  4. 5/109
  5. None of these
ব্যাখ্যা
Question: Two cards are drawn at random and without replacement from a standard deck of 52 cards. What is the probability that both cards are face cards?

Solution:
Total card = 52
Total face card = 3 × 4 = 12

Total ways to choose 2 cards from 52 = 52C2 = (52 × 51)/2 = 1326

Total ways to choose 2 face cards from 12 = 12C2 = (12 × 11)/2 = 66

∴ So, the probability that both cards are face cards = 66/1326
= (2 × 3 × 11)/(2 × 3 × 221)
= 11/221
৫৫.
Find the value of  0!/√4.
  1. 0
  2. 1/2
  3. 1/√2
  4. Undefined
ব্যাখ্যা

Question: Find the value of  0!/√4.

Solution:
According to the factorial law,
n! = n × (n - 1)!

If n = 1, then
1! = 1 × (1 - 1)!
⇒ 1! = 1 × 0!
⇒ 1 = 0!
∴ 0! = 1

Now,
0!/√4 = 1/√(22)
= 1/2

৫৬.
There are 15 balls in a box : 8 balls are green, 4 are blue and 3 are white, Then 1 green and 1 blue balls are taken from the box and put away. What is the probability that a blue ball is selected at random from the box?
  1. ক) 3/15
  2. খ) 4/15
  3. গ) 3/13
  4. ঘ) 4/13
ব্যাখ্যা
Question: There are 15 balls in a box: 8 balls are green, 4 are blue and 3 are white, then 1 green and 1 blue ball are taken from the box and put away. What is the probability that a blue ball is selected at random from the box?

Solution: 
মোট বল আছে = ১৫ টি
যেখানে নীল বল আছে = ৪ টি

১ টি সবুজ, ১ টি নীল বল সড়িয়ে নিলে মোট বল = ১৫ - ২ = ১৩ টি
নীল বল থাকে = ৪ - ১ = ৩ টি

তাহলে, বক্স থেকে একটি বল তুললে এটি নীল হওয়ার সম্ভাবনা = ৩/১৩
৫৭.
If 20 person shake their hands with each other, then the total number of handshakes is -
  1. 100
  2. 190
  3. 150
  4. 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
20C2= 20!/2!(20 - 2)!
= 20!/2!18!
= (20 × 19)/2
= 10 × 19
= 190

৫৮.
Out of 6 black, 4 red, 2 white and 3 blue marbles in a box, find the probability of choosing at least 1 red marble when 4 marbles are randomly picked.
  1. ক) 24/455
  2. খ) 69/91
  3. গ) 22/91
  4. ঘ) 4/15
ব্যাখ্যা

Choosing 4 marbles means 1st marble AND then 2nd AND then 3rd AND then 4th marble
At least 1 red marble means there can be 1, 2, 3, or 4 red marbles.
So, Probability of choosing red = 1 - Probability of not choosing red
If we remove red marbles, then 15 - 4 red marbles = 11 marbles remain.
We have to choose 4 out of these 11.

So Probability of choosing 4 marbles that are not red = 11/15 × 10/14 × 9/13 × 8/12 = 22/91.

∴ Probability of picking at least 1 red marble = 1 - 22/91 = 69/91.
[Here we reduce the denominator i.e. the total number of marbles because once we remove a marble from the box we do not put it back in the box.
So while removing the 2nd marble, there are only 15 - 1 = 14 marbles in the box. The same is for the 3rd and 4th marbles.]

৫৯.
A seven-digit number is formed using the digit 3, 3, 4, 4, 4, 5, 5. The probability, that number so formed is divisible by 2, is:
  1. 1/7
  2. 3/7
  3. 5/7
  4. 6/7
ব্যাখ্যা
Question: A seven-digit number is formed using the digit 3, 3, 4, 4, 4, 5, 5. The probability, that number so formed is divisible by 2, is:

Solution: 
শেষের অঙ্ক ৪ রেখে বিন্যাস = 6!/(2!2!2!)
= 90 

মোট বিন্যাস = 7!/2!3!2! = 210

সম্ভাব্যতা = 90/210
= 3/7
৬০.
What is the probability of getting a sum of 8 when two dice are thrown?
  1. 1/6
  2. 5/36 
  3. 1/9
  4. 7/36 
ব্যাখ্যা
Question: What is the probability of getting a sum of 8 when two dice are thrown?

Solution:
Total number of ways = 6 × 6 = 36 ways.
Favorable cases = (2, 6), (6, 2), (3, 5), (5, 3), (4, 4) = 5 ways.

∴ Probability = 5/36 
৬১.
A bag contains 5 green, 3 yellow, and 2 black balls. If one ball is drawn at random, what is the probability that it will not be a yellow ball? 
  1. 2/5
  2. 7/10
  3. 9/10
  4. 3/10
ব্যাখ্যা

Question: A bag contains 5 green, 3 yellow, and 2 black balls. If one ball is drawn at random, what is the probability that it will not be a yellow ball?

Solution:
Given that,
Green balls = 5
Yellow balls = 3
Black balls = 2

∴ Total balls = 5 + 3 + 2 = 10
∴ Number of non-yellow balls = Green + Black = 5 + 2 = 7

We know,
Probability(not yellow) = favorable outcomes/total outcomes
= 7/10

∴ The probability that the ball drawn is not yellow is 7/10.

৬২.
There are 28 people in a group. If all shake hands with one another  person exactly once, how many handshakes are possible?
  1. 378
  2. 350
  3. 420
  4. 340
  5. 368
ব্যাখ্যা
Question: There are 28 people in a group. If all shake hands with one another  person exactly once, how many handshakes are possible?


Solution:
Total Handshakes = 28C2 = 378
৬৩.
In a certain office, the human resources department reports that 60% of the employees in the office commute over an hour on average each day, and that and that 25% of those employees, who commute over an hour on average each day commute by train. If an employee at the office is selected at random, what is the probability that the employee commutes over an hour on average by train?
  1. ক) 0.10
  2. খ) 0.15
  3. গ) 0.20
  4. ঘ) 0.25
ব্যাখ্যা
ধরি,
মোট চাকরিজীবী 100 জন
∴ ট্রেনে ভ্রমণ করেন = 60 এর 25%
= 15
∴ সম্ভাব্যতা = 15/100
= 0.15
৬৪.
Tickets numbered 1 to 50 are mixed and one ticket is drawn at random. Find the probability that the ticket drawn has a number which is a multiple of 4 or 7?
  1. 9/25
  2. 9/50
  3. 18/25
  4. 13/25
ব্যাখ্যা

S = {1, 2, 3,............, 49, 50}
E = {4, 8, 12, 16, 20, 24, 28, 32, 36, 40, 44, 48, 7, 14, 21, 35, 42, 49}
n(S) = 50
n(E) = 18

P(E) = n(E)/n(S)
= 18/50
= 9/25.

৬৫.
In how many ways can the letters of the word 'LEADER' be arranged?
  1. 360
  2. 420
  3. 540
  4. 620
ব্যাখ্যা
Question: In how many ways can the letters of the word 'LEADER' be arranged?

Solution:
The word 'LEADER' has total 6 letters among them letter L = 1, E = 2, A = 1, R = 1, D = 1

Ways = 6!/2! = 720/2 = 360
৬৬.
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
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

৬৭.
How many different selections of 4 books can be made from 10 different books, if 2 particular books are never selected?
  1. 40 ways
  2. 50 ways
  3. 60 ways
  4. 70 ways
ব্যাখ্যা
Question: How many different selections of 4 books can be made from 10 different books, if 2 particular books are never selected?

Solution:
Number of different books =10
Number of books to be formed = 4

If two particular books are never selected,
∴ Number of ways = 8C4
=8!​/4!(8 -4)!
= 8 × 6 × 7 × 5 × 4!/4! × 4 × 3 × 2
= 70 ways
৬৮.
The probability that an integer in the set 1, 2, 3, ....86 is divisible by 2 and not divisible by 3 is __________.
  1. ক) 17/86
  2. খ) 29/86
  3. গ) 21/86
  4. ঘ) 23/86
ব্যাখ্যা
প্রশ্ন : The probability that an integer in the set 1, 2, 3, ....86 is divisible by 2 and not divisible by 3 is __________.
সমাধান : 
The set is (1, 2, 3, ....86)

Number divided by 2 = 86/2 = 43
So, 43 numbers are divisible by 2

The number which is divisible by 2 and 3
Both i.e, divisible by 6 → (6, 12, 18, ....86) = 14

So, only divisible by 2 not 3 = 43 - 14 = 29

Required probability = 29/86
∴ The required answer is 29/86
৬৯.
In how many ways can 5 books be selected from 12 books, with 2 particular books always left out?
  1. 192
  2. 235
  3. 252
  4. 280
ব্যাখ্যা

Question: In how many ways can 5 books be selected from 12 books, with 2 particular books always left out?

Solution:
মোট বস্তু, n = 12
সর্বদা বাদ বা বর্জন থাকবে, m = 2
এবং প্রতিবার নিতে হবে, r = 5

∴ সমাবেশ = (n - m)Cr = (12 - 2)C5
= 10C5
= 10!/[5!(10 - 5)!]
= (10 × 9 × 8 × 7 × 6)/(5 × 4 × 3 × 2 × 1) 
= 252

৭০.
A problem is given to three students whose chances of solving it are 1/3, 1/4 and 1/5 respectively. What is the probability that the problem will be solved?
  1. 1
  2. 1/2
  3. 5/4
  4. 3/5
  5. None of these
ব্যাখ্যা
Question: A problem is given to three students whose chances of solving it are 1/3, 1/4 and 1/5 respectively. What is the probability that the problem will be solved?

Solution:
Probability of 1st student solving the problem = 1/3
Probability of 1st student not solving the problem = 1 - (1/3) = 2/3

Probability of 2nd student solving the problem = 1/4
Probability of 2nd student not solving the problem = 1 - (1/4) = 3/4

Probability of 3rd student solving the problem = 1/5
Probability of 3rd student not solving the problem = 1 - (1/5) = 4/5

Probability that none of the students solve the problem = (2/3) × (3/4) × (4/5)
= 2/5

∴ Probability that the problem will be solved = 1 - (2/5)
= 3/5

∴ The probability that the problem will be solved is 3/5
৭১.
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
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.

৭২.
A football team has 15 players. In how many ways can a team of 11 players be chosen if the goalkeeper must always be included?
  1. 455
  2. 1001
  3. 1365
  4. 3003
ব্যাখ্যা

Question: A football team has 15 players. In how many ways can a team of 11 players be chosen if the goalkeeper must always be included?

সমাধান:
15 জন খেলোয়াড় থেকে 1 জনকে (গোলরক্ষক) ঠিক রেখে বাকি 14 জন থেকে (11 - 1) = 10 জনের টিম গঠন করা যাবে।

∴ অবশিষ্ট 14 জন থেকে 10 জনকে নির্বাচন করার উপায় = 14C10
= 14!/(14 - 10)! × 10!
= (14 × 13 × 12 × 11 × 10!)/(4! × 10!)
= (14 × 13 × 12 × 11)/(4 × 3 × 2 × 1)
= 1001

∴ 1001 উপায়ে দল গঠন করা যাবে।

৭৩.
What is the probability that an integer selected at random from those between 10 and 100 inclusive is a multiple of 5 or 11?
  1. ক) 26/91
  2. খ) 27/91
  3. গ) 29/91
  4. ঘ) None of the above
ব্যাখ্যা
Question: What is the probability that an integer selected at random from those between 10 and 100 inclusive is a multiple of 5 or 11?

Solution: 
10 থেকে 100 এর মধ্যে 5 এর গুণিতক সংখ্যা গুলো হলো: 10, 15, 20, 25, 30, 35, 40, 45, 50, 55, 60, 65, 70, 75, 80, 85, 90, 95, 100 = 19টি 

10 থেকে 100 এর মধ্যে 11 এর গুণিতক সংখ্যা গুলো হলো: 11, 22, 33, 44, 55, 66, 77, 88, 99 = 9টি 
মোট গুণিতক = (19 + 9)টি  = 28

55 উভয়ের গুণিতক। 
মোট অনুকূল ফলাফল = 28 - 1 = 27

10 থেকে 100 এর মধ্যে মোট সংখ্যা = 91টি 

নির্ণেয় সম্ভাবনা = 27/91
৭৪.
According to meteorological records, it rained on 14 days in the month of september last year. What is the probability that it will rain on fourth of september this year?
  1. 7/15
  2. 6/17
  3. 5/13
  4. 8/15
ব্যাখ্যা
Question: According to meteorological records, it rained on 14 days in the month of september last year. What is the probability that it will rain on fourth of september this year?

Solution:
September month has 30 days
favorable events = 14 days

∴ the probability that it will rain on fourth of september this year = 14/30
= 7/15
৭৫.
A box contains 12 red balls, 5 black balls, and 8 white balls. One ball is drawn at random. What is the probability that the ball drawn is neither red nor white?
  1. 8/25
  2. 1/5
  3. 2/5
  4. 13/25
ব্যাখ্যা

Question: A box contains 12 red balls, 5 black balls, and 8 white balls. One ball is drawn at random. What is the probability that the ball drawn is neither red nor white?

Solution:
Number of red balls = 12
Number of black balls = 5
Number of white balls = 8

∴ Total balls = 12 + 5 + 8 = 25

Let event E = The ball drawn is neither red nor white, so it must be black.

∴ Number of favorable outcomes = 5
∴ P(E) = 5/25 = 1/5

৭৬.
A dice is thrown in the air. The probability of getting odd numbers is-
  1. 1/2
  2. 1/3
  3. 2/3
  4. 1/6
ব্যাখ্যা
Question: A dice is thrown in the air. The probability of getting odd numbers is-

Solution:
Numbers on dice are {1, 2, 3, 4, 5, 6}
Numbers on dice which is odd {1, 3, 5}
Number of favorable outcomes = 3
Total possible outcomes = 6

∴ The probability of getting odd numbers is = 3/6 = 1/2
৭৭.
Jennifer flipped a coin three times and got heads each time. What is the probability that she gets heads on the next flip?
  1. ক) 1
  2. খ) 1/16
  3. গ) 1/2
  4. ঘ) 0
ব্যাখ্যা
Every time a coin flips, its independent outcome has a 50-50 chance. So, the probability is 1/2
৭৮.
In how many ways can 5 people from a group of 6 people be seated around a circle table?
  1. 56
  2. 70
  3. 120
  4. 144
ব্যাখ্যা
Question: In how many ways can 5 people from a group of 6 people be seated around a circle table?

Solution:
5 people out of 6 = 6C5 = 6
And 5 people around a circular table = (5 - 1)! = 24

Total ways = 6 × 24 = 144
৭৯.
If the probability of rain on any given day in City Cumilla is 50%, what is the probability that it rains on exactly 2 days in a 5-day period?
  1. 7/20
  2. 5/16
  3. 2/5
  4. 4/9
ব্যাখ্যা
Question: If the probability of rain on any given day in City Cumilla is 50%, what is the probability that it rains on exactly 2 days in a 5-day period?

Solution:
If the probability of rain on any given day in City Cumilla is 50%
the probability of rain on any given day = 1/2
the probability of no rain on any given day = 1/2

selecting 2 days out of 5 = 5C2

∴the probability that it rains on exactly 2 days in a 5-day period is = 5C2 × (1/2) × (1/2) × (1/2) × (1/2) × (1/2)
= 10 × (1/32)
= 5/16
৮০.
In how many different ways can the letters of the word "BINARY" be arranged so that the vowels always come together?
  1. 540 ways
  2. 120 ways
  3. 340 ways
  4. 240 ways
ব্যাখ্যা
Question: In how many different ways can the letters of the word "BINARY" be arranged so that the vowels always come together?

Solution:
the given words contain 6 different letters.
When the vowels "ia" are taken together, we may treat them as 1 letter.

5 numbers can be arranged in = 5! ways
= 120 ways

two vowels can be arranged = 2! ways
= 2 ways

∴ Total number of arrangement = (120 × 2) ways
= 240 ways
৮১.
In how many ways can the letters of the word "EQUATION" be arranged such that the consonants occupy only the even positions?
  1. 1800
  2. 2450
  3. 2880
  4. 3000
ব্যাখ্যা

Question: In how many ways can the letters of the word "EQUATION" be arranged such that the consonants occupy only the even positions?

Solution:
এখানে "EQUATION" শব্দটিতে মোট বর্ণ আছে 8টি।
ব্যঞ্জনবর্ণ (Consonant) আছে 3টি: Q, T, N
স্বরবর্ণ (Vowel) আছে 5টি: E, U, A, I, O
8টি বর্ণের মধ্যে জোড় স্থান (Even positions) আছে 4টি (2nd, 4th, 6th এবং 8th)।

4টি জোড় স্থানের মধ্যে 3টি ব্যঞ্জনবর্ণ সাজানোর উপায় = 4P3 = 24
বাকি (8 - 3) = 5টি স্থানে 5টি স্বরবর্ণ সাজানোর উপায় = 5! = 120

∴ ব্যঞ্জনবর্ণগুলোকে কেবল জোড় স্থানে রেখে মোট বিন্যাস সংখ্যা = 24 × 120
= 2,880

অতএব, EQUATION শব্দটির ব্যঞ্জনবর্ণগুলোকে জোড় স্থানে রেখে মোট 2,880 উপায়ে সাজানো যাবে।

৮২.
In how many ways can a committee of 5 people be chosen out of 10 people?
  1. 170
  2. 252
  3. 72
  4. 320
ব্যাখ্যা
Question: In how many ways can a committee of 5 people be chosen out of 10 people?

Solution:
Total number of people, n = 10
Number of committee members, r = 5

The numbers of ways of chosen committee = nCr =
10C5 = 10!/5!(10 - 5)!
= (10 × 9 × 8 × 7 × 6 × 5!)/(5 × 4 × 3 × 2 × 1)5!
= 252
৮৩.
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
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

৮৪.
Tickets numbered 1 to 20 are mixed up and then a ticket is drawn at random. What is the probability that the ticket drawn has a number which is a multiple of 2 and 3?
  1. ক) 1/10
  2. খ) 13/20
  3. গ) 3/20
  4. ঘ) 1/5
ব্যাখ্যা
Question: Tickets numbered 1 to 20 are mixed up and then a ticket is drawn at random. What is the probability that the ticket drawn has a number which is a multiple of 2 and 3?

Solution: 
Number which are multiple of 2 and 3 between 1 to 20  = {6, 12, 18} 

∴ The probability is =  3/20
৮৫.
A committee of 5 members is to be formed by selecting out of 7 men and 6 women. In how many different ways the committee can be formed if it should have at least 3 men? 
  1. 556
  2. 664
  3. 720
  4. 756
ব্যাখ্যা
Question: A committee of 5 members is to be formed by selecting out of 7 men and 6 women. In how many different ways the committee can be formed if it should have at least 3 men? 

Solution:
      Men (7)       Women (6)
1)    3                     2
2)    4                     1
3)    5                     0

From (1) Number of ways = 7C3 × 6C2 = 35 × 15 = 525
From (2) Number of ways = 7C4 × 6C1 = 35 × 6 = 210
From (3) Number of ways = 7C5 × 6C0 = 21 × 1 = 21

Total number of ways = 525 + 210 + 21 = 756
৮৬.
Probability of 3 students solving a question are 1/2, 1/3, and 1/4. Probability to solve the question is:
  1. 1/4
  2. 3/4
  3. 1/2
  4. 7/12
ব্যাখ্যা
Question: Probability of 3 students solving a question are 1/2, 1/3, and 1/4. Probability to solve the question is:

Solution:
Probability of 3 students,
P(A) = 1/2, ∴ P(A′) = 1/2
P(B) = 1/3, ∴ P(B′) = 2/3
P(C) = 1/4, ∴ P(C′) = 3/4

So, Probability of no one solve the question is = (1/2) × (2/3) × (3/4)
= 1/4
∴ P(None) = 1/4

Then, The probability to solve the question is = 1 - 1/4
= 3/4
Hence, the correct answer is 3/4.
৮৭.
In a box, there are 8 red, 7 blue and 6 green balls. One ball is picked up randomly. What is the probability that it is neither red nor green?
  1. 1/3
  2. 2/5
  3. 3/5
  4. 3/7
ব্যাখ্যা
Question: In a box, there are 8 red, 7 blue and 6 green balls. One ball is picked up randomly. What is the probability that it is neither red nor green?

Solution:
Total number of balls
= (8 + 7 + 6)
= 21

Let E = event that the ball drawn is neither red nor green
= event that the ball drawn is blue
= 7/21
= 1/3
৮৮.
Tickets numbered 1 to 25 are mixed up and then a ticket is drawn at random. What is the probability that the ticket drawn has a number which is a prime number or a multiple of 5?
  1. 11/20
  2. 13/20
  3. 17/25
  4. 13/25
ব্যাখ্যা
Question: Tickets numbered 1 to 25 are mixed up and then a ticket is drawn at random. What is the probability that the ticket drawn has a number which is a prime number or a multiple of 5?

Solution:
Given,
Total number = 25
Prime number between 1 to 25 = {2, 3, 5, 7, 11, 13, 17, 19, 23}
A multiple of 5 between 1 to 25 = {5,10, 15, 20, 25}

∴ Prime number or a multiple of 5 between 1 to 25 = {2, 3, 5, 7, 10, 11, 13, 15, 17, 19, 23, 20, 25} = 13 numbers

So, Probability = 13/25
৮৯.
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.
৯০.
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
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.

৯১.
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
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.

৯২.
In how many different ways can the letters of the word 'SOFTWARE' be arranged in such a way that the vowels always come together?
  1. 4320
  2. 1440
  3. 13440
  4. 360
ব্যাখ্যা

Question: In how many different ways can the letters of the word 'SOFTWARE' be arranged in such a way that the vowels always come together?

Solution:
The given word contains 8 different letters.
We keep the vowels (OAE) together and treat them as 1 letter.
Thus, we have to arrange the 6 letters SFTWR(OAE)
These can be arranged in 6! = 6 5 × 4 × 3 × 2 × 1 = 720 ways

And,
The vowels (OAE) can be arranged among themselves in 3! = 3 × 2 × 1 = 6 ways.

∴ Required number of ways = (720 × 6) = 4320

৯৩.
In how many ways can a person invite his 4 friends?
  1. ক) 4
  2. খ) 10
  3. গ) 12
  4. ঘ) 15
ব্যাখ্যা
Question: In how many ways can a person invite his 4 friends?

Solution:

Number of ways  = 4C1 +4C2 + 4C3 + 4C4  
                                 = 4 + 6 + 4 + 1
                                 = 15
৯৪.
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. 5/12
  2. 1/2
  3. 2/3
  4. 7/18
ব্যাখ্যা

Question: 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 ?

Solution:
Two fair dice are thrown together.
So total possible outcomes = 6 × 6 = 36

And, 
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) = 14.

Hence, P(E) = n(E)/n(S) = 14/36
= 7/18

So the probability that the sum is divisible by 4 or 6 is 7/18.

৯৫.
There are 3 doors to a lecture room. In how many ways can a lecturer enter the room from one door and leave from another door?
  1. 1
  2. 3
  3. 6
  4. 9
ব্যাখ্যা

Question: There are 3 doors to a lecture room. In how many ways can a lecturer enter the room from one door and leave from another door?

Solution: 
As the lecturer can't leave the hall by the door he/she enters.

So, number of ways can a student enter the hall through a door and leave the hall by a different door is = 3 × 2 = 6

৯৬.
What is the value of (10P1 × 5P3).
  1. 500
  2. 600
  3. 800
  4. 1200
ব্যাখ্যা

Question: What is the value of (10P1 × 5P3).

Solution:
10P1 = 10!/(10 - 1)!
= 10!/9!
= (10 × 9!)/9! 
= 10

5P3 = 5!/(5 - 3)! 
= 5!/2!
= (5 × 4 × 3 × 2!)/2!
= 60

10P1 × 5P3 = 10 × 60 
= 600  

৯৭.
How many diagonals can be drawn in a pentagon?
  1. 9
  2. 7
  3. 5
  4. 11
ব্যাখ্যা
Question: How many diagonals can be drawn in a pentagon?

Solution: 
A pentagon has 5 sides. We obtain the diagonals by joining the vertices in pairs.
Total number of sides and diagonals,
5C2
= 10
This includes its 5 sides also.

∴ Diagonals = 10 – 5 = 5
৯৮.
How many ways can 4 prizes be given away to 3 boys, if each boy is eligible for all the prizes?
  1. ক) 256
  2. খ) 24
  3. গ) 12
  4. ঘ) None of these
ব্যাখ্যা

Let the 3 boys be B1, B2, B3 and 4 prizes be P1, P2, P3 and P4
Now B1 is eligible to receive any of the 4 available prizes (so 4 ways)
B2 will receive prize from rest 3 available prizes(so 3 ways)
B3 will receive his prize from the rest 2 prizes available(so 2 ways)
So total ways would be: 4 × 3 × 2 × 1 = 24 Ways
Hence, the 4 prizes can be distributed in 24 ways

৯৯.
A dice is thrown. What is the probability that the number shown on the dice is not divisible by 3?
  1. 1/2
  2. 2/3
  3. 1/4
  4. 3/5
ব্যাখ্যা
Question: A dice is thrown. What is the probability that the number shown on the dice is not divisible by 3?

Solution:
S = {1, 2, 3, 4, 5, 6}
n(S) = 6

Then,
E(not divisible by 3) = {1, 2, 4, 5}
n(E) = 4

∴ P(not divisible by 3) = 4/6
= 2/3
১০০.
If three unbiased coins are tossed simultaneously, then the probability of exactly two heads is
  1. 4/8
  2. 2/8
  3. 1/8
  4. 3/8
ব্যাখ্যা
Question: If three unbiased coins are tossed simultaneously, then the probability of exactly two heads is

Solution: 
n(S) = 23 = 8 
Let E = Event of getting exactly two heads,
= {(H, H, T), (H, T, H), (T, H, H)}
= n(E)
= 3
Required probability = 3/8