বিষয়সমূহ

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Probability, Permutation and Combination

মোট প্রশ্ন৯৬৯এই পাতা১০০প্রতি পাতা১০০
ঘনত্ব
উত্তর
উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

Probability, Permutation and Combination

PrepBank · পাতা / ১০ · ৩০১৪০০ / ৯৬৯

৩০১.
How many ways can the letters in "TRIANGLE" be arranged if vowels must occupy odd positions?
  1. 720
  2. 1440
  3. 2880
  4. 5760
সঠিক উত্তর:
2880
উত্তর
সঠিক উত্তর:
2880
ব্যাখ্যা
Question: How many ways can the letters in "TRIANGLE" be arranged if vowels must occupy odd positions?

Solution: 
Letters in "TRIANGLE" = 8 (T, R, I, A, N, G, L, E)
Vowels = I, A, E = total 3 vowels
Consonants = 8 − 3 = 5 consonants
Total odd positions: 1, 3, 5, 7 = 4

Number of ways to place 3 vowels in 4 odd positions = 4C3 = 4
Arrange 3 vowels in chosen positions = 3! = 6
Arrange 5 consonants in the remaining 5 positions = 5! = 120

Total arrangements = 4 × 6 × 120 = 2880
৩০২.
How many words can be formed by re-arranging the letters of the word ASCENT such that A and T occupy the first and last position respectively?
  1. 6! × 2!
  2. 6! - 2!
  3. 5!
  4. 4!
সঠিক উত্তর:
4!
উত্তর
সঠিক উত্তর:
4!
ব্যাখ্যা
Question: How many words can be formed by re-arranging the letters of the word ASCENT such that A and T occupy the first and last position respectively?

Solution:
As S and N should occupy the first and last position, the first and last position can be filled in only one following way.
S _ _ _ _ N.
The remaining 4 positions can be filled in 4! Ways by the remaining words (A, C, E,  T).
Hence by rearranging the letters of the word ASCENT we can form,
1 × 4! = 4!
৩০৩.
A bag contains 4 white, 5 red and 6 blue balls. Three balls are drawn at random from the bag. The probability that all of them are red, is-
  1. 1/22
  2. 3/22
  3. 2/77
  4. 2/91
  5. None of these
সঠিক উত্তর:
2/91
উত্তর
সঠিক উত্তর:
2/91
ব্যাখ্যা
Question: A bag contains 4 white, 5 red and 6 blue balls. Three balls are drawn at random from the bag. The probability that all of them are red, is-

Solution:
Let S be the sample space.
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 = 10

∴ P(E) = n(E)/n(S) = 10/455 = 2/91
৩০৪.
In how many ways can 5 examination papers be arranged so that the best and the worst papers never come together?
  1. ক) 120 ways
  2. খ) 72 ways
  3. গ) 48 ways
  4. ঘ) 20 ways
সঠিক উত্তর:
খ) 72 ways
উত্তর
সঠিক উত্তর:
খ) 72 ways
ব্যাখ্যা
Question: In how many ways can 5 examination papers be arranged so that the best and the worst papers never come together?

Solution:
Total ways = 5!
= 120 ways

if two papers come together, we can consider them one.
ways that they will come together = 4! × 2!
= 24 × 2
= 48 ways

∴ ways the best and the worst papers never come together = 120 - 48 ways
= 72 ways
৩০৫.
In how many ways can a group of 5 men and 2 women be made out of a total of 7 men and 3 women?
  1. 45
  2. 63
  3. 90
  4. 126
  5. 135
সঠিক উত্তর:
63
উত্তর
সঠিক উত্তর:
63
ব্যাখ্যা
Question: In how many ways can a group of 5 men and 2 women be made out of a total of 7 men and 3 women?

Solution:
Required number of ways = (7C5 × 3C2)
= 21 × 3
= 63
৩০৬.
There are 5 doors to a cinema hall. In how many ways can a person enter the hall through a door and leave the hall by a different door?
  1. 15
  2. 18
  3. 20
  4. 25
সঠিক উত্তর:
20
উত্তর
সঠিক উত্তর:
20
ব্যাখ্যা
Question: There are 5 doors to a cinema hall. In how many ways can a person enter the hall through a door and leave the hall by a different door?

Solution: 
প্রবেশের সময় যে কোন দরজা বাছাই করার উপায় = 5C1
= 5

বের হবার সময় অন্য ৪ টি দরজা থেকে একটি বাছাই করার উপায় = 4C1
= 4

∴ মোট উপায় = 5 × 4 
= 20
৩০৭.
A company offers a bonus to employees who complete certain training modules. The probability that Emma will complete the "Leadership Skills" module is 0.8, and the probability that John will complete the "Time Management" module is 0.5. What is the probability that both Emma and John will complete their respective modules?
  1. 0.4
  2. 0.75
  3. 0.3
  4. 0.6
সঠিক উত্তর:
0.4
উত্তর
সঠিক উত্তর:
0.4
ব্যাখ্যা

Question: A company offers a bonus to employees who complete certain training modules. The probability that Emma will complete the "Leadership Skills" module is 0.8, and the probability that John will complete the "Time Management" module is 0.5. What is the probability that both Emma and John will complete their respective modules?

Solution:
Let,
Probability that Emma completes the "Leadership Skills" module P(E) = 0.8
P(J) = Probability that John completes the "Time Management" module P(J) = 0.5

Since the events are independent, the probability that both Emma and John will complete their respective modules,
P (E ∩ J) = P(E) × P (J)
= 0.8 × 0.5
= 0.4

৩০৮.
A fair coin is tossed 5 times. What is the probability of getting exactly 3 heads?
  1. 5/16
  2. 4/15
  3. 3/8
  4. 1/4
সঠিক উত্তর:
5/16
উত্তর
সঠিক উত্তর:
5/16
ব্যাখ্যা
Question: A fair coin is tossed 5 times. What is the probability of getting exactly 3 heads?

Solution: 
For 5 tosses, the total number of possible outcomes is = 25 = 32
The number of ways to choose 3 Heads out of 5 tosses is = 5C3 = 10 

∴ Probability of getting exactly 3 heads = 10/32 = 5/16
৩০৯.
A bag contains 5 black and 6 white balls; two balls are drawn at random. What is the probability that the balls drawn are white?
  1. 7/8
  2. 3/11
  3. 5/12
  4. 9/19
সঠিক উত্তর:
3/11
উত্তর
সঠিক উত্তর:
3/11
ব্যাখ্যা

Question: A bag contains 5 black and 6 white balls; two balls are drawn at random. What is the probability that the balls drawn are white?

​​​Solution:
​Given that,
​Number of black balls = 5
​Number of white balls = 6

​Now, 
​Favorable event = 6C2 = 15
​Total possible events = 11C2 = 55

​∴ Probability = 15/55 = 3/11

৩১০.
There are 2 bags. One has 5 white and 3 black napkins. The other one has 4 white and 2 black napkins. Find the probability of picking up a white napkin.
  1. 9/14
  2. 31/48
  3. 1/2
  4. 1
সঠিক উত্তর:
31/48
উত্তর
সঠিক উত্তর:
31/48
ব্যাখ্যা

Here, one probability is to find which bag is selected AND the other is for a white napkin from the selected bag.
Probability of selecting 1 bag out of 2 bags = 1/2

Say it has 4 white and 2 black napkins.

So, white napkins probability = 4/(4 + 2) = 4/6
So Probability 1 = (1/2) × (4/6) = 4/12

Similarly, Probability 2 = (1/2) × {5/(5 + 3)} = 5/16

Total probability of white napkin = (4/12) + (5/16) = 31/48

৩১১.
How many 8 letter words can be formed by rearranging the letters of the word TRENDING such that T and G occupy the first and last positions respectively?
  1. 6!
  2. 6!/2!
  3. 8! × 2!
  4. 8!
  5. None
সঠিক উত্তর:
6!/2!
উত্তর
সঠিক উত্তর:
6!/2!
ব্যাখ্যা
Question: How many 8 letter words can be formed by rearranging the letters of the word TRENDING such that T and G occupy the first and last positions respectively?

Solution:
As T and G should occupy the first and last position, the first and last position can be filled in only one following way.
T _ _ _ _ _ _ G.

The remaining 6 positions can be filled in the remaining words (R, E, N, D, I, N) where "N" comes twice.

Total permutations of these 6 letters with one letter repeating = 6!/2! ways
৩১২.
Four dice (six-faced) are rolled. The number of possible outcomes in which at least one die shows 2 is
  1. 621
  2. 631
  3. 641
  4. 671
সঠিক উত্তর:
671
উত্তর
সঠিক উত্তর:
671
ব্যাখ্যা
Question: Four dice (six-faced) are rolled. The number of possible outcomes in which at least one die shows 2 is

Solution: 
Total possible outcomes = 6 × 6 × 6 × 6 
= 1296 

Total possible outcomes without 2 = 5 × 5 × 5 × 5
= 625

The number of possible outcomes in which at least one die shows 2 is = 1296 - 625
= 671
৩১৩.
An integer n between 1 and 100, inclusive, is to be chosen at random. What is the probability that n(n+1) will be divisible by 5?
  1. 1/5
  2. 3/5
  3. 2/5
  4. 4/5
সঠিক উত্তর:
2/5
উত্তর
সঠিক উত্তর:
2/5
ব্যাখ্যা
Question: An integer n between 1 and 100, inclusive, is to be chosen at random. What is the probability that n(n+1) will be divisible by 5?

Solution: 
total number = 100
n(n+1) will be divisible by 5 if n or n + 1 is divisible by 5

when n is divisible by 5, there are 20 such number (5, 10, 15, 20, 25,.....,100)
when n + 1 is divisible by 5, there are 20 such number (4, 9, 14,.....,99)

∴ proability = (20 + 20)/100
= 40/100
= 2/5
৩১৪.
The equation x2 + ax - b = 0 has equal roots, and one of the roots of the equation x2 + ax + 15 = 0 is 3. What is the value of b?
  1. - 12
  2. - 15
  3. - 1/64
  4. - 16
  5. - 1/32
সঠিক উত্তর:
- 16
উত্তর
সঠিক উত্তর:
- 16
ব্যাখ্যা
Question: The equation x2 + ax - b = 0 has equal roots, and one of the roots of the equation x2 + ax + 15 = 0 is 3. What is the value of b?

Solution:
Since one of the roots of the equation x2 + ax + 15 = 0 is 3, then substituting we'll get:
32 + 3a + 15 = 0
⇒ 3a = - 15 - 9
⇒ a = - 24/3
∴ a = - 8

Substitute a = - 8 in the first equation: x2 - 8x - b = 0
Now, we know that it has equal roots thus its discriminant must equal to zero:
d = (- 8)2 + 4b = 0
⇒ 64 + 4b = 0
⇒ 4b = - 64
∴ b = - 16
৩১৫.
What is the probability of impossible events?
  1. ক) 1
  2. খ) 0
  3. গ) >1
  4. ঘ) <1
সঠিক উত্তর:
খ) 0
উত্তর
সঠিক উত্তর:
খ) 0
ব্যাখ্যা
Impossible events can't occur.
The probability of an impossible event is 0.
৩১৬.
In a box, there are 6 red, 8 blue and 10 green balls. One ball is picked up randomly. What is the probability that it is neither blue nor green?
  1. 1/4
  2. 1/3
  3. 5/12
  4. 3/4
সঠিক উত্তর:
1/4
উত্তর
সঠিক উত্তর:
1/4
ব্যাখ্যা
Question: In a box, there are 6 red, 8 blue and 10 green balls. One ball is picked up randomly. What is the probability that it is neither blue nor green?

Solution:
Number of total balls = (6 + 8 + 10) = 24

Since the ball is neithere Blue nor Green so the ball must be Red.

∴ Probability = 6/24 = 1/4
৩১৭.
If 9Pr = 504, then what is the value of r?
  1. 3
  2. 5
  3. 2
  4. 4
সঠিক উত্তর:
3
উত্তর
সঠিক উত্তর:
3
ব্যাখ্যা
Question: If 9Pr = 504, then what is the value of r?

Solution:
Given that,
9Pr = 504
⇒ 9!/(9 - r)! = 504
⇒ (9 - r)! × 504 = 9!
⇒ (9 - r)! = (9 × 8 × 7 × 6!)/504
⇒ (9 - r)! = 6!
⇒ (9 - r) = 6
⇒ r = 9 - 6
∴ r = 3
৩১৮.
How many 3 digit numbers can be formed from the digits 2, 3, 5, 6, 7 and 9, which are divisible by 5 and none of the digits is repeated?
  1. 9
  2. 10
  3. 20
  4. 25
সঠিক উত্তর:
20
উত্তর
সঠিক উত্তর:
20
ব্যাখ্যা
Question: How many 3 digit numbers can be formed from the digits 2, 3, 5, 6, 7 and 9, which are divisible by 5 and none of the digits is repeated?

Solution: 
শেষ অঙ্কটি 5 হলে, সংখ্যাটি 5 দ্বারা নি:শেষে বিভাজ্য হবে। 

১ম অঙ্কটি 2, 3, 6, 7, 9 এর যে কোন একটি হতে পারে।
১ম অঙ্কটি বাছাই করার উপায় = 5C1 = 5

২য় অঙ্ক বাছাই করতে হবে অবশিষ্ট 4 টি অঙ্ক থেকে। 
২য় অঙ্ক বাছাই করার উপায় = 4C1
= 4 

∴ মোট বাছাই করার উপায় = 5 × 4
= 20
৩১৯.
A bag contains 5 black and 6 white balls; two balls are drawn at random. What is the probability that the balls drawn are black?
  1. ক) 5/11
  2. খ) 6/11
  3. গ) 3/11
  4. ঘ) 2/11
সঠিক উত্তর:
ঘ) 2/11
উত্তর
সঠিক উত্তর:
ঘ) 2/11
ব্যাখ্যা
Question: A bag contains 5 black and 6 white balls; two balls are drawn at random. What is the probability that the balls drawn are  black?

Solution: 
Given that 
Number of black balls = 5
Number of white balls = 6
Favorable event = 5C2
Total possible events = 11C2
∴ Probability = 5C2/11C2
= 10/55
= 2/11
৩২০.
Two brother X and Y appeared for an exam. The probability of selection of X is 1/7 and that of B is 2/9. Find the probability that both of them are selected.
  1. 2/63
  2. 9/14
  3. 7/9
  4. 7/18
সঠিক উত্তর:
2/63
উত্তর
সঠিক উত্তর:
2/63
ব্যাখ্যা
Question: Two brother X and Y appeared for an exam. The probability of selection of X is 1/7 and that of B is 2/9. Find the probability that both of them are selected.

Solution:
Let A be the event that X is selected and B is the event that Y is selected.
P(A) = 1/7,
P(B) = 2/9.

Let C be the event that both are selected.
P(C) = P(A) × P(B) as A and B are independent events:
= (1/7) × (2/9)
= 2/63
৩২১.
In a simultaneous throw of two dice, what is the probability of getting a total of 10 or 11?
  1. ক) 1/4
  2. খ) 1/6
  3. গ) 7/12
  4. ঘ) 5/36
সঠিক উত্তর:
ঘ) 5/36
উত্তর
সঠিক উত্তর:
ঘ) 5/36
ব্যাখ্যা

In a simultaneous throw of two dice, we have n (S) = (6 × 6) = 36
Let E = event of getting a total of 10 or 11
= [(4, 6), (5, 5), (6, 4), (5, 6), (6, 5)]
∴P(E) = n(E)/n(S) = 5/36

৩২২.
In a lottery, there are 10 prizes and 25 blanks. A lottery is drawn at random. What is the probability of getting a prize?
  1. 2/3
  2. 3/8
  3. 2/7
  4. 3/5
সঠিক উত্তর:
2/7
উত্তর
সঠিক উত্তর:
2/7
ব্যাখ্যা
Question: In a lottery, there are 10 prizes and 25 blanks. A lottery is drawn at random. What is the probability of getting a prize?

Solution:
probability of getting a prize = 10/(10 + 25)
= 10/35
= 2/7
৩২৩.
What is the probability of getting a sum 9 from two throws of a dice?
  1. 1/6
  2. 1/8
  3. 1/9
  4. 1/12
সঠিক উত্তর:
1/9
উত্তর
সঠিক উত্তর:
1/9
ব্যাখ্যা
Question: What is the probability of getting a sum 9 from two throws of a dice?

Solution:
In two throws of a dice, n(S) = (6 × 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
৩২৪.
How many distinct arrangements can be made using all the letters of the word "BANANA" such that no two N’s appear together?
  1. 60
  2. 40
  3. 35
  4. 30
  5. None
সঠিক উত্তর:
40
উত্তর
সঠিক উত্তর:
40
ব্যাখ্যা
Question: How many distinct arrangements can be made using all the letters of the word "BANANA" such that no two N’s appear together?

Solution:
BANANA has 6 letters, where A = 3 times, N = 2 times and B = 1 time

∴ Total arrangements = 6!/(3! × 2!) = 720/(6 × 2)) = 60

Arrangements where the two N's are together = 5!/3! = (5 × 4 × 3!)/3! = 20

∴ N’s not together = Total arrangements − N’s together
= 60 - 20
= 40​
৩২৫.
A team of 6 members is to be selected from 9 people, with Mr. Z as the team leader (so he is always included). In how many ways can the team be formed?
  1. 56 ways
  2. 72 ways
  3. 126 ways
  4. 84 ways
সঠিক উত্তর:
56 ways
উত্তর
সঠিক উত্তর:
56 ways
ব্যাখ্যা
Question: A team of 6 members is to be selected from 9 people, with Mr. Z as the team leader (so he is always included). In how many ways can the team be formed?

solution:
Total people = 9
Mr. Z must be included, so we are selecting the remaining 5 members from the remaining 8 people.

So, the number of ways to choose the remaining 5 members from 8,
8C5 = 8!/5!(8 - 5)!
= (8 × 7 × 6​)/(3 × 2 × 1)
= 56 ways
৩২৬.
Two coins are tossed. What is the probability of getting at most one head?
  1. 1/2
  2. 1/4
  3. 3/4
  4. 1/6
সঠিক উত্তর:
3/4
উত্তর
সঠিক উত্তর:
3/4
ব্যাখ্যা
Question: Two 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
৩২৭.
Four unbiased coins are tossed. What is the probability of getting at most two heads?
  1. ক) 1/2
  2. খ) 5/8
  3. গ) 11/16
  4. ঘ) 5/16
সঠিক উত্তর:
গ) 11/16
উত্তর
সঠিক উত্তর:
গ) 11/16
ব্যাখ্যা
Question: Four unbiased coins are tossed. What is the probability of getting at most two heads?

Solution:

The total number of events = 16
The numbers of event with at most two heads = 11
∴ The probability of getting at most two heads = 11/16 
৩২৮.
In how many different ways can the letters of the word 'BINARY' be arranged so that the vowels always come together?
  1. 120 ways
  2. 240 ways
  3. 660 ways
  4. 720 ways
সঠিক উত্তর:
240 ways
উত্তর
সঠিক উত্তর:
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
৩২৯.
In how many different ways can the letters of the word BANANA be arranged where all A will be together?
  1. 12
  2. 16
  3. 20
  4. 24
সঠিক উত্তর:
12
উত্তর
সঠিক উত্তর:
12
ব্যাখ্যা
Question: In how many different ways can the letters of the word BANANA be arranged where all A will be together?

Solution:
If all the A remain together than we count them as 1 letter.
Three A can be arranged in 3!/3! = 1 way
∴ Number of letter in the word where three A's are counted as 1,
So, total letters will be = 4
Repeated letters N = 2

∴ The number of arrangement = 4!/2! = 12
৩৩০.
A bag contains 4 white, 5 red and 6 blue balls. Three balls are drawn at random from the bag. The probability that all of them are red, is
  1. ক) 1/22
  2. খ) 2/91
  3. গ) 3/22
  4. ঘ) 2/77
সঠিক উত্তর:
খ) 2/91
উত্তর
সঠিক উত্তর:
খ) 2/91
ব্যাখ্যা
Let S be the sample space
⇒n(S) = number of ways of drawing 3 balls out of 15
= 15C3​ ​
= 455

Let E be the event of getting all of the 3 red balls.
∴n(E) = 5C3​​
=10

∴P(E) = n(E)​/n(S)
=10/455​
=2/91
৩৩১.
In a class, there are 12 boys and 10 girls. Three students are selected at random. The probability that 1 girl and 2 boys are selected is-
  1. 1/7
  2. 2/5
  3. 3/7
  4. 1/5
  5. None of these
সঠিক উত্তর:
3/7
উত্তর
সঠিক উত্তর:
3/7
ব্যাখ্যা

Question: In a class, there are 12 boys and 10 girls. Three students are selected at random. The probability that 1 girl and 2 boys are selected is-

Solution: 

Let S be the sample space and E be the event of selecting 1 girl and 2 boys.

Then, n(S) = Number ways of selecting 3 students out of 22
= 22C3 
= (22 x 21 x 20)/(3 x 2 x 1)
= 1540

n(E) = 10C1 x 12C2
= (10 x 12 x 11)/(2 x 1)
= 660

∴ P(E) = n(E)/n(S)
= 660/1540
= 3/7   

৩৩২.
In how many ways 6 students can be chosen from the class of 10 students?
  1. 170 ways
  2. 200 ways
  3. 210 ways
  4. 218 ways
সঠিক উত্তর:
210 ways
উত্তর
সঠিক উত্তর:
210 ways
ব্যাখ্যা
Question: In how many ways 6 students can be chosen from the class of 10 students?

Solution:
ways 6 students can be chosen from the class of 10 students is = 10C6
= 10!/(6! 4!)
= 210 ways
৩৩৩.
A box contains 20 electric bulbs, out of which 4 are defective. Two balls are chosen at random from this box. The probability that at least one of them is defective, is
  1. 7/19
  2. 12/19
  3. 4/19
  4. 21/95
সঠিক উত্তর:
7/19
উত্তর
সঠিক উত্তর:
7/19
ব্যাখ্যা

Question: A box contains 20 electric bulbs, out of which 4 are defective. Two balls are chosen at random from this box. The probability that at least one of them is defective, is

Solution:
Given that,
Total bulbs = 20
Defective bulbs = 4
Non-defective bulbs = 20 - 4 = 16
Two bulbs are chosen at random (without replacement)

Now,
P(both non-defective) = (16/20) × (15/19) = 240/380 = 12/19

And,
∴ P(at least one defective) = 1 - P(both non-defective)
= 1 - (12/19)
= (19 - 12)/19
= 7/19
∴ The probability that at least one of them is defective is 7/19

৩৩৪.
How many permutations of 12 different letters may be made?
  1. 1
  2. 12!
  3. 12!/12
  4. None of these
সঠিক উত্তর:
12!
উত্তর
সঠিক উত্তর:
12!
ব্যাখ্যা
There are 12 different letters. No letter can be repeated.
So, number of permutations = 12!
৩৩৫.
Tickets numbered 1 to 30 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 4 or 5?
  1. 11/30
  2. 2/5 
  3. 7/15
  4. 1/2
সঠিক উত্তর:
2/5 
উত্তর
সঠিক উত্তর:
2/5 
ব্যাখ্যা

Question: Tickets numbered 1 to 30 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 4 or 5?

Solution:
Here, S = {1, 2, 3, 4, ...., 29, 30}
n(S) = 30

Let E = event of getting a multiple of 4 or 5
∴ n(E) = {4, 5, 8, 10, 12, 15, 16, 20, 24, 25, 28, 30}

∴ P(E) = n(E)/n(S)
= 12/30
= 2/5

৩৩৬.
What is the probability of getting a sum 9 from two throws of a dice?
  1. 1/9
  2. 13/36
  3. 4/38
  4. 1/12
  5. None of the above
সঠিক উত্তর:
1/9
উত্তর
সঠিক উত্তর:
1/9
ব্যাখ্যা
Question: What is the probability of getting a sum 9 from two throws of a dice?

Solution: 
total event for two dice = 6 × 6 = 36
total event of getting 9 is = {(6, 3),(5, 4),(4, 5),(3, 6)} = 4

probability = 4/36 = 1/9
৩৩৭.
In a badminton tournament, every player plays against every other player exactly once. If there were 66 matches played in total, how many players participated in the tournament?
  1. 11
  2. 12
  3. 13
  4. 15
সঠিক উত্তর:
12
উত্তর
সঠিক উত্তর:
12
ব্যাখ্যা

Question: In a badminton tournament, every player plays against every other player exactly once. If there were 66 matches played in total, how many players participated in the tournament?

Solution:
ধরি, টুর্নামেন্টে মোট খেলোয়াড়ের সংখ্যা = x

যেহেতু প্রতিটি খেলোয়াড় অন্য সকল খেলোয়াড়ের সাথে একবার করে ম্যাচ খেলে, তাই মোট ম্যাচের সংখ্যা হবে:
xC2 = 66
⇒ x!/{2!(x - 2)!} = 66
⇒ x(x - 1)/2 = 66
⇒ x(x - 1) = 132
⇒ x² - x - 132 = 0
⇒ x² - 12x + 11x - 132 = 0
⇒ x(x - 12) + 11(x - 12) = 0
⇒ (x - 12)(x + 11) = 0
⇒ x = 12 অথবা x = -11

যেহেতু খেলোয়াড়ের সংখ্যা ঋণাত্মক হতে পারে না, তাই x = 12

∴ টুর্নামেন্টে মোট খেলোয়াড়ের সংখ্যা = 12 জন।

৩৩৮.
If 56Pr + 6 : 54Pr + 3 = 30800 : 1 then the value of r is?
  1. 36
  2. 41
  3. 47
  4. None
সঠিক উত্তর:
41
উত্তর
সঠিক উত্তর:
41
ব্যাখ্যা
Question: If 56Pr + 6 : 54Pr + 3 = 30800 : 1 then the value of r is?

Solution:
56Pr + 6 : 54Pr + 3 = 30800 : 1
⇒ 56!/(50 - r)! = (30800 × 54!)/(51 - r!)
⇒ 56 × 55 = 30800/(51 - r)
⇒ 51 - r = 10
∴ r = 41
৩৩৯.
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.

৩৪০.
An art box contains 3 blue pens, 4 green pens, and 5 red pens. In how many ways can a student choose 3 pens such that at least one blue pen is included in the selection?
  1. 112 ways
  2. 124 ways
  3. 136 ways
  4. 152 ways
  5. None
সঠিক উত্তর:
136 ways
উত্তর
সঠিক উত্তর:
136 ways
ব্যাখ্যা
Question: An art box contains 3 blue pens, 4 green pens, and 5 red pens. In how many ways can a student choose 3 pens such that at least one blue pen is included in the selection?

Solution:
Total number of pens = 3 + 4 + 5
= 12 pens

Total ways to choose any 3 pens from 12 = 12C3
= 220 ways

Ways to choose 3 pens with no blue pen (only green and red pens) = 9C3
= 84 ways 

∴ So, ways to choose 3 pens with at least one blue pen = (220 - 84) ways
= 136 ways
৩৪১.
In how many ways a President, VP and Water-boy can be selected from a group of 10 people.
  1. ক) 7C3
  2. খ) 10C3
  3. গ) 7P3
  4. ঘ) 10P3
সঠিক উত্তর:
ঘ) 10P3
উত্তর
সঠিক উত্তর:
ঘ) 10P3
ব্যাখ্যা
We are selecting three different posts here, so order matters.
Thus, total ways of selecting a President, VP and Water-boy from a group of 10 people would be 10P3
------------------------------------------------------------------------------------
Alternative way:

৩৪২.
Two dice are tossed. The probability that the total score is a prime number is:
  1. ক) 5/18
  2. খ) 1/4
  3. গ) 1/2
  4. ঘ) 5/12
সঠিক উত্তর:
ঘ) 5/12
উত্তর
সঠিক উত্তর:
ঘ) 5/12
ব্যাখ্যা
Question: Two dice are tossed. The probability that the total score is a prime number is:

Solution: 
Clearly, n(S) = (6 × 6) = 36.
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)/n(S) = 15/36 = 5/12
৩৪৩.
A salesman receives daily wage of Tk. 250 and earns a commission of 15% on all sales he makes. How much taka worth of sales does he need to make in order to bring his total daily income of Tk. 1,000?
  1. ক) Tk. 6,000
  2. খ) Tk. 5,500
  3. গ) Tk. 5,000
  4. ঘ) Tk. 4,500
সঠিক উত্তর:
গ) Tk. 5,000
উত্তর
সঠিক উত্তর:
গ) Tk. 5,000
ব্যাখ্যা
Question: A salesman receives daily wage of Tk. 250 and earns a commission of 15% on all sales he makes. How much taka worth of sales does he need to make in order to bring his total daily income of Tk. 1,000?

Solution: 
1000 টাকার মজুরি পেতে কমিশন লাগবে = 1000 - 250 = 750 টাকা 

15 টাকা কমিশন হলে মোট বিক্রয় = 100 টাকা 
1 টাকা কমিশন হলে মোট বিক্রয় = 100/15 টাকা 
750 টাকা কমিশন হলে মোট বিক্রয় = (100 × 750)/15 টাকা 
= 5000 টাকা
৩৪৪.
A bag contains 6 black and 8 white balls. One ball is drawn at random. What is the probability that the ball drawn is white?
  1. 3/4
  2. 4/7
  3. 1/8
  4. 3/7
  5. None of these
সঠিক উত্তর:
4/7
উত্তর
সঠিক উত্তর:
4/7
ব্যাখ্যা
Question: A bag contains 6 black and 8 white balls. One ball is drawn at random. What is the probability that the ball drawn is white?

Solution:
Let number of balls = (6 + 8) = 14.
Number of white balls = 8.

∴ P (drawing a white ball) = 8/14 = 4/7
৩৪৫.
In an exam, there are 3 multiple choice questions, and each question has 4 choices. Only one answer per question is correct. How many ways can a student fail to get all answers correct?
  1. 63
  2. 64
  3. 65
  4. 66
  5. None of the above
সঠিক উত্তর:
63
উত্তর
সঠিক উত্তর:
63
ব্যাখ্যা

Question: In an exam, there are 3 multiple choice questions, and each question has 4 choices. Only one answer per question is correct. How many ways can a student fail to get all answers correct?

Solution:
Each question has 4 options, so the total number of ways to answer all 3 questions is = 43
= 4 × 4 × 4
= 64

Number of ways, getting correct answers = 13 = 1

∴ Number of ways of not getting all answers correct = 64 - 1 = 63

৩৪৬.
Eight points are situated on a plane, 4 of them in a straight line, the other 4 elsewhere. How many triangles can be formed by joining 3 points at a time?
  1. 42​ ways
  2. 38​ ways
  3. 56​ ways
  4. 72​ ways
  5. 52​ ways
সঠিক উত্তর:
52​ ways
উত্তর
সঠিক উত্তর:
52​ ways
ব্যাখ্যা

Question: Eight points are situated on a plane, 4 of them in a straight line, the other 4 elsewhere. How many triangles can be formed by joining 3 points at a time?

Solution: 
Total combinations of 3 points from 8 = 8C3
= 56 ways

Given,
there are 4 collinear points

From the 4 collinear points, no triangle can be formed using any 3 of them (since they lie on the same line).
Total combinations of 3 points from the 4 collinear points = 4C3 = 4 ways

So the valid triangles = 56 − 4 = 52​ ways

৩৪৭.
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. 2/3
  3. 1/4
  4. 1/2
সঠিক উত্তর:
2/3
উত্তর
সঠিক উত্তর:
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
৩৪৮.
How many 4-digit numbers can be formed from the digits 1, 3, 4, 6, 9, which are divisible by 2 and have no digit repeated?
  1. 24 ways
  2. 36 ways
  3. 48 ways
  4. 60 ways
  5. None of the above
সঠিক উত্তর:
48 ways
উত্তর
সঠিক উত্তর:
48 ways
ব্যাখ্যা

Question: How many 4-digit numbers can be formed from the digits 1, 3, 4, 6, 9, which are divisible by 2 and have no digit repeated?

Solution:
We know,
A number is divisible by 2 if its last digit is even.
The available digits are: 1, 3, 4, 6, 9
Even digits here are: 4, 6
So, the last digit must be one of these 2 digits.

So, last digit can be chosen in 2 ways.

As the digit is not repeated,
First digit (thousands place) can be chosen in = 4 ways

As the digit is not repeated,
Second digit (hundreds place) can be chosen in = 3 ways

As the digit is not repeated,
Third digit (tens place) can be chosen in = 2 ways

∴ Total ways = 2 × 4 × 3 × 2 ways
= 48 ways

৩৪৯.
A regular deck of cards has 52 cards. Assuming that you do not replace the card you had drawn before the next draw, what is the probability of drawing three aces in a row?
  1. 1/132600
  2. 1/5525
  3. 1/2000
  4. 1/156
সঠিক উত্তর:
1/5525
উত্তর
সঠিক উত্তর:
1/5525
ব্যাখ্যা
Question: A regular deck of cards has 52 cards. Assuming that you do not replace the card you had drawn before the next draw, what is the probability of drawing three aces in a row?

Solution:
The probability of getting three aces in a row is the product of the probabilities for each draw.
For the first ace, that is 4/52 = 1/13;
for the second, it is 3/51 = 1/17;
and for the third, it is 2/50 = 1/25.

So the overall probability = (1/13) × (1/17) × (1/25) = 1/5525
৩৫০.
In an election contested by two parties, Party D secured 12% of the total votes more than party R. If party R got 132,000 votes, by how many votes did it lose the election?
  1. ক) 36,000
  2. খ) 240,000
  3. গ) 300,000
  4. ঘ) 24,000
সঠিক উত্তর:
ক) 36,000
উত্তর
সঠিক উত্তর:
ক) 36,000
ব্যাখ্যা
Question: In an election contested by two parties, Party D secured 12% of the total votes more than party R. If party R got 132,000 votes, by how many votes did it lose the election?

Solution: 
ধরি 
মোট ভোটার  সংখ্যা 100 জন 

প্রশ্নমতে,
D + R = 100............(1)
D - R = 12...............(2)

(1) + (2) ⇒
2D = 112
D = 112/2
D = 56% 

(1) ⇒
D + R = 100
56 + R = 100
R = 100 - 56 
R = 44%

44% ভোট  = 132000
1% ভোট  = 132000/44
100 % ভোট  =(132000 × 100)/44
                     = 300,000
মোট ভোটার = 300,000 টি  
D দল ভোট পায় = (300000 - 132000) টি  
= 168000 টি 

ব্যবধান  = (168000 - 132000) টি  = 36000টি
৩৫১.
In how many ways can the letters of the word 'MISSISSIPPI' be arranged such that the first letter is always 'M'?
  1. 2050
  2. 3150
  3. 3600
  4. 4260
সঠিক উত্তর:
3150
উত্তর
সঠিক উত্তর:
3150
ব্যাখ্যা

Question: In how many ways can the letters of the word 'MISSISSIPPI' be arranged such that the first letter is always 'M'?

Solution:
'MISSISSIPPI' শব্দটিতে মোট 11টি বর্ণ রয়েছে।

শর্ত: প্রথম স্থানে 'M' স্থির। এখন বাকি 11 - 1 = 10টি স্থানে বাকি বর্ণগুলোকে সাজাতে হবে।

বাকি 10টি বর্ণের মধ্যে পুনরাবৃত্ত অক্ষর: I (4 বার), S (4 বার), P (2 বার)।

∴ বাকি 10টি বর্ণের বিন্যাস সংখ্যা = 10!/(4! × 4! × 2!)
= 3,628,800/(24 × 24 × 2)
= 3,628,800/1,152
= 3,150

৩৫২.
In how many ways 4 boys and 3 girls can be seated in a row so that they are alternate.
  1. 256
  2. 12
  3. 288
  4. 144
সঠিক উত্তর:
144
উত্তর
সঠিক উত্তর:
144
ব্যাখ্যা

Question: In how many ways 4 boys and 3 girls can be seated in a row so that they are alternate.

Solution: 
Let the Arrangement be,
B G B G B G B
4 boys can be seated in 4! Ways
Girl can be seated in 3! Ways

∴ Required number of ways = 4! × 3!
= 24 × 6
= 144

৩৫৩.
There is a point in a circle. What is the probability that this point is closer to its circumference than to the center?
  1. ক) 3/4
  2. খ) 1/2
  3. গ) 2/3
  4. ঘ) 2/5
সঠিক উত্তর:
ক) 3/4
উত্তর
সঠিক উত্তর:
ক) 3/4
ব্যাখ্যা
The probability that this point is closer to the center is the proportion of area of a circle with radius r/2 to the circle with radius r.
So 0.25
The required probability = 1 - 0.25 = 0.75 = 3/4
-----------------------------------------------------
Alternative way:
Say this circle has a radius = R.
A point located halfway between its centre and circumference would lie on an on the circumference of another circle with radius R/2,
whose circumference lies halfway between the centre of both circles and the circumference of the larger circle with radius R.
Consider the larger circle to have an infinity of points with uniform density of spread over its area.
Area of the larger circle = πR².
Area of the smaller circle with radius R/2 is = πR²/4.
Area between large and small circles = 3πR²/4.
Thus, the simple minded answer is that the probability as requested
= 3/4
৩৫৪.
A jar contains 5 blue, 8 green, and 6 orange marbles. If a marble is picked at random, what is the probability that the marble drawn will be either blue or green?
  1. 8/19
  2. 13/19
  3. 5/19
  4. 18/19
সঠিক উত্তর:
13/19
উত্তর
সঠিক উত্তর:
13/19
ব্যাখ্যা

Question: A jar contains 5 blue, 8 green, and 6 orange marbles. If a marble is picked at random, what is the probability that the marble drawn will be either blue or green?

Solution:
Total number of marbels = 5 + 8 + 6 = 19

If one marbel is picked at random.

P(blue) = 5/19
P(green) = 8/19

P(blue or green) = 5/19 + 8/19
= (5 + 8)/19
= 13/19

৩৫৫.
There are 5 non-collinear points. How many triangles can be drawn by joining these points?
  1. 10
  2. 12
  3. 14
  4. 15
সঠিক উত্তর:
10
উত্তর
সঠিক উত্তর:
10
ব্যাখ্যা
Question: There are 5 non-collinear points. How many triangles can be drawn by joining these points?

Solution: 
triangles can be drawn by joining these points = 5C3
= 10 ways
৩৫৬.
From a group of 10 people, how many ways can a president, vice-president, and secretary be chosen?
  1. 720
  2. 1000
  3. 120
  4. 880
সঠিক উত্তর:
720
উত্তর
সঠিক উত্তর:
720
ব্যাখ্যা
Question: From a group of 10 people, how many ways can a president, vice-president, and secretary be chosen?

Solution: 
For selecting 3 different positions from 10 people,
Number of ways = 10P3
=
10 × 9 × 8 = 720
৩৫৭.
In how many ways can the letters of the word 'TRIANGLE' be arranged, if the vowels always stay together?
  1. 4320
  2. 2340
  3. 3420
  4. 1440
সঠিক উত্তর:
4320
উত্তর
সঠিক উত্তর:
4320
ব্যাখ্যা

Question: In how many ways can the letters of the word 'TRIANGLE' be arranged, if the vowels always stay together?

Solution: 
Triangle শব্দটিতে মোট বর্ণ  8 টি (সবই ভিন্ন) এবং স্বরবর্ণ 3 টি।
যেহেতু, স্বরবর্ণ 3 টি একত্রে থাকবে, সেহেতু স্বরবর্ণ তিনটিকে একটি বর্ণ ধরে মোট বর্ণ সংখ্যা 6 টি। 
এই 6 টি বর্ণকে নিজেদের মধ্যে সাজানো যায় = 6! উপায়ে
আবার, স্বরবর্ণ  3 টিকে নিজেদের মধ্যে সাজানো যায় = 3! উপায়ে

∴ সর্বমোট বিন্যাস = 6! × 3!
= 4320

৩৫৮.
How many ways can the word `MOTHER' be arranged with 2 letters each time?
  1. ক) 15
  2. খ) 30
  3. গ) 40
  4. ঘ) 60
সঠিক উত্তর:
খ) 30
উত্তর
সঠিক উত্তর:
খ) 30
ব্যাখ্যা
Question: How many ways can the word `MOTHER' be arranged with 2 letters each time?

Solution:
Total number of words, n = 6 and r = 2

∴ Arrangement = nPr
= 6P2
= 30
৩৫৯.
A bag contains 2 red, 3 green and 2 blue balls. Two balls are drawn at random. What is the probability that none of the balls drawn is blue?
  1. 5/7
  2. 2/7
  3. 10/ 21
  4. 3/5
সঠিক উত্তর:
10/ 21
উত্তর
সঠিক উত্তর:
10/ 21
ব্যাখ্যা
Question: A bag contains 2 red, 3 green and 2 blue balls. Two balls are drawn at random. What is the probability that none of the balls drawn is blue?

Solution:
Total number of balls = (2 + 3 + 2) = 7.
Let S be the sample space.
Then, n(S) = Number of ways of drawing 2 balls out of 7 =7C2 = 21
Let E = Event of drawing 2 balls, none of which is blue.
n(E) = Number of ways of drawing 2 balls out of (2 + 3) balls = 5C2 = 10
Therefore, P(E) = n(E)/n(S)
= 10/ 21
৩৬০.
Tickets numbered 1 to 20 are mixed up and then a ticket is drawn at random. What is the probability that the ticket drawn bears a number which is a multiple of 4 ?
  1. ক) 2/5
  2. খ) 3/10
  3. গ) 1/5
  4. ঘ) 1/4
সঠিক উত্তর:
ঘ) 1/4
উত্তর
সঠিক উত্তর:
ঘ) 1/4
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 bears a number which is a multiple of 4 ?

Solution: 
Here, S = {1, 2, 3, 4,........, 19, 20}
Let E = even of getting a multiple of 4 = {4, 8, 12, 16, 20}
∴P(E) = n(E)/n(S)
          = 5/20
           = 1/4 
৩৬১.
A fair die is thrown once. What is the probability of getting a prime number?
  1. 1/6
  2. 2/3
  3. 1/3
  4. 1/2
সঠিক উত্তর:
1/2
উত্তর
সঠিক উত্তর:
1/2
ব্যাখ্যা

Question: A fair die is thrown once. What is the probability of getting a prime number?

Solution:
A standard fair die has 6 faces numbered: 1, 2, 3, 4, 5, 6.
The prime numbers from 1 to 6 are: 2, 3, and 5.

Probability = (Number of favorable outcomes)/(Total number of outcomes)
= 3/6
= 1/2

৩৬২.
Find the probability that a leap year has 52 Sundays.
  1. 2/7
  2. 5/7
  3. 2/9
  4. 4/7
  5. None of these
সঠিক উত্তর:
5/7
উত্তর
সঠিক উত্তর:
5/7
ব্যাখ্যা
Question: Find the probability that a leap year has 52 Sundays.

Solution:
A leap year can have 52 Sundays or 53 Sundays.
In a leap year, there are 366 days out of which there are 52 complete weeks & remaining 2 days.

Now, these two days can be (Sat, Sun) (Sun, Mon) (Mon, Tue) (Tue, Wed) (Wed, Thur) (Thur, Friday) (Friday, Sat).
So there are total 7 cases out of which (Sat, Sun) (Sun, Mon) are two favorable cases.
So, P(53 Sundays) = 2/7

Now,
P(52 Sundays) + P(53 Sundays) = 1
So, P(52 Sundays) = 1 - P(53 Sundays) = 1 - (2/7) = 5/7
৩৬৩.
Labib wants to arrange four out of his five saplings in a row on a shelf. If each sapling is in a pot of a different color, in how many different ways can he arrange the four saplings?
  1. 24
  2. 60
  3. 78
  4. 120
সঠিক উত্তর:
120
উত্তর
সঠিক উত্তর:
120
ব্যাখ্যা

Question: Labib wants to arrange four out of his five saplings in a row on a shelf. If each sapling is in a pot of a different color, in how many different ways can he arrange the four saplings?

Solution:
যেহেতু প্রতিটি চারাগাছ ভিন্ন ভিন্ন রঙের পাত্রে আছে এবং সেগুলোকে একটি সারিতে সাজাতে হবে, তাই এটি একটি বিন্যাসের (Permutation) সমস্যা।

∴ পাঁচটি চারাগাছ হতে চারটি নিয়ে সাজানো যায় = 5P4 উপায়ে
= 5!/(5 - 4)! উপায়ে
= 5! উপায়ে
= 5 × 4 × 3 × 2 × 1 উপায়ে
= 120 উপায়ে

∴ লাবিব মোট 120টি ভিন্ন উপায়ে চারাগাছগুলো সাজাতে পারবে।

৩৬৪.
How many different numbers of two digits can be formed with the digits 1, 2, 3, 4, 5, 6; no digit being repeated?
  1. 36
  2. 30
  3. 25
  4. 24
সঠিক উত্তর:
30
উত্তর
সঠিক উত্তর:
30
ব্যাখ্যা
Question:  How many different numbers of two digits can be formed with the digits 1, 2, 3, 4, 5, 6; no digit being repeated? 

Solution: 
different numbers of two digits can be formed = 6 × 5
= 30
৩৬৫.
In a lottery, there are 20 prizes and 25 blanks. A lottery is drawn at random. What is the probability of getting a prize?
  1. 2/5
  2. 1/5
  3. 3/5
  4. 4/9
সঠিক উত্তর:
4/9
উত্তর
সঠিক উত্তর:
4/9
ব্যাখ্যা
Question: In a lottery, there are 20 prizes and 25 blanks. A lottery is drawn at random. What is the probability of getting a prize?

Solution:
In a lottery, there are 20 prizes and 25 blanks,
that means (20 + 25) or 45 positions exist 20 prizes and 25 blanks.

∴ The probability of getting a prize,
= 20/45
= 4/9
৩৬৬.
A bag contains 2 red, 3 green and 2 blue balls. If two balls are drawn at random, what is the probability that none of the balls drawn is blue?
  1. ক) 10/21
  2. খ) 11/21
  3. গ) 2/7
  4. ঘ) 5/7
সঠিক উত্তর:
ক) 10/21
উত্তর
সঠিক উত্তর:
ক) 10/21
ব্যাখ্যা

মোট বল রয়েছে = 2 + 3 + 2 = 7 টি
নীল বাদে বল আছে = 7 - 2 = 5 টি
∴ বলটি নীল না হবার সম্ভাবনা = 5c2 / 7c2 = 10/21

৩৬৭.
You need to put your reindeer, Ezekiel, Lancer, Rudy, and Jebediah, in a single-file line to pull your sleigh. However, Jebediah and Rudy are best friends, so you have to put them next to each other, or they won't fly. How many ways can you arrange your reindeer so that they can fly?
  1. 24
  2. 6
  3. 12
  4. 4
সঠিক উত্তর:
12
উত্তর
সঠিক উত্তর:
12
ব্যাখ্যা
Question: You need to put your reindeer, Ezekiel, Lancer, Rudy, and Jebediah, in a single-file line to pull your sleigh. However, Jebediah and Rudy are best friends, so you have to put them next to each other, or they won't fly. How many ways can you arrange your reindeer so that they can fly?

Solution:
We can count the number of arrangements where Jebediah and Rudy are together by treating them as one. 
So, All of the reindeer where Jebediah and Rudy are together can be arranged in 3! ways = 6 ways
And, Jebediah and Rudy can be arranged in 2! ways = 2 ways 

∴ Total number of ways of arrangements is = 6 × 2 = 12 ways 


৩৬৮.
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.

৩৬৯.
If 7Pr = 840 and 7Cr = 35, find r.
  1. ক) 5
  2. খ) 3
  3. গ) 2
  4. ঘ) 4
সঠিক উত্তর:
ঘ) 4
উত্তর
সঠিক উত্তর:
ঘ) 4
ব্যাখ্যা
Question: If 7Pr = 840 and 7Cr = 35, find r. 

Solution: 
nPr = nCr × r!
7Pr = 7Cr × r!
840 = 35 × r!
r! = 840/35
r! = 24
r! = 4 × 3 × 2 × 1
r! = 4!

therefore, r = 4
৩৭০.
In how many ways can 3 students be selected from a group of 8 students?
  1. 48 ways
  2. 56 ways
  3. 62 ways
  4. 42 ways
সঠিক উত্তর:
56 ways
উত্তর
সঠিক উত্তর:
56 ways
ব্যাখ্যা
Question: In how many ways can 3 students be selected from a group of 8 students?

Solution:
Here,
Total number of students, n = 8
Chosen students, r = 3

∴ The number of ways 3 students can be chosen is
= nCr
= n! / r!(n - r)!
= 8! / 3!(8 - 3)!
= 8! / 3! × 5!
= (8 × 7 × 6 × 5!) / (3! × 5!)
= (8 × 7 × 6) / (3 × 2 × 1)
= 336 / 6
= 56

∴ 3 students can be selected from a group of 8 students in 56 ways.
৩৭১.
Three unbiased coins are tossed. What is the probability of getting at least two heads?
  1. 3/5
  2. 2/3
  3. 1/4
  4. 1/2
  5. 2/5
সঠিক উত্তর:
1/2
উত্তর
সঠিক উত্তর:
1/2
ব্যাখ্যা

Question: Three unbiased coins are tossed. What is the probability of getting at least two heads?

Solution:
The events when three unbiased coins are tossed = {HHH, HHT, HTH, HTT, THH, THT, TTH, TTT}
Total number of events 8

The events of getting at least two heads {HHH, HHT, HTH, THH}

Number of expected events = 4

∴ The probability of getting at least two heads is = 4/8 = 1/2

৩৭২.
How many 4 letter words with or without meaning, can be formed out of the letters of the word, ‘LOGARITHMS’, if repetition of letters is not allowed ?
  1. ক) 40
  2. খ) 400
  3. গ) 5040
  4. ঘ) 2520
সঠিক উত্তর:
গ) 5040
উত্তর
সঠিক উত্তর:
গ) 5040
ব্যাখ্যা

‘LOGARITHM’ contains 10 different letters.

Required number of word
= Number of arrangements of 10 letters, taking 4 at a time
= 10P4 = (10 × 9 × 8 × 7) = 5040.

৩৭৩.
Twelve distinct points are randomly placed on the circumference of a circle. At most how many triangles can be formed using these points?
  1. 144
  2. 210
  3. 220
  4. 260
সঠিক উত্তর:
220
উত্তর
সঠিক উত্তর:
220
ব্যাখ্যা

Question: Twelve distinct points are randomly placed on the circumference of a circle. At most how many triangles can be formed using these points?

Solution:
Given that,
Number of distinct points, n = 12
To form a triangle, we need to select 3 points out of n points.

Maximum number of triangles = 12C3
= 12!/{3!(12 - 3)!}
= (12 × 11 × 10 × 9!)/(3 × 2 × 1 × 9!)
= (12 × 11 × 10)/6
= 220

৩৭৪.
А bоx contains 3 blue, 2 white, and 4 red marbles. If one marble is drawn at random, what is the probability that it will not be a white marble?
  1. 2/9
  2. 7/9
  3. 1/3
  4. 2/3
সঠিক উত্তর:
7/9
উত্তর
সঠিক উত্তর:
7/9
ব্যাখ্যা

Question: А bоx contains 3 blue, 2 white, and 4 red marbles. If one marble is drawn at random, what is the probability that it will not be a white marble?

Solution:
Given that,
Blue marbles = 3
White marbles = 2
Red marbles = 4

∴ Total marbles = 3 + 2 + 4 = 9
And, number of non-white marbles = Blue + Red = 3 + 4 = 7

We know,
P(not white) = favorable outcomes​/total outcomes
= 7/9​ 

৩৭৫.
In how many different ways can the letters of the word 'LIVEMCQ' be arranged in such a way that the vowels always come together?
  1. 720
  2. 1320
  3. 1440
  4. 2160
সঠিক উত্তর:
1440
উত্তর
সঠিক উত্তর:
1440
ব্যাখ্যা
Question: In how many different ways can the letters of the word 'LIVEMCQ' be arranged in such a way that the vowels always come together?

Solution: 
There are 2 vowels I and E.
if the vowels always comes together, these 2 letters can be considered as 1.
so, total letter is = 6 ( LVMCQ ( IE ) )
these letters can be arranged in 6! = 720
the vowels themselves can be arranged in 2! = 2 ways

∴ total number of arrangement is = 720 × 2 = 1440
৩৭৬.
If a certain coin is flipped, the probability that the coin will land heads is 1/2. If the coin is flipped 4 times, what is the probability that it will land heads up on the first 3 flips and not on the last flip?
  1. ক) 1/16
  2. খ) 3/16
  3. গ) 1/32
  4. ঘ) 5/16
সঠিক উত্তর:
ক) 1/16
উত্তর
সঠিক উত্তর:
ক) 1/16
ব্যাখ্যা
Question: If a certain coin is flipped, the probability that the coin will land heads is 1/2. If the coin is flipped 4 times, what is the probability that it will land heads up on the first 3 flips and not on the last flip?

Solution: 
The probability of landing heads and not landing on heads is same = 1/2
The probability of first three heads =(1/2) × (1/2) × (1/2)
The probability of last  landing not on heads = 1/2
The total probability =(1/2) × (1/2) × (1/2) × (1/2)
= 1/ 24
= 1/16
৩৭৭.
6Pm = 120, 6Cm = 20, what is the value of m?
  1. 1
  2. 2
  3. 3
  4. 4
  5. 5
সঠিক উত্তর:
3
উত্তর
সঠিক উত্তর:
3
ব্যাখ্যা

Question: 6Pm = 120, 6Cm = 20, what is the value of m?

Solution:
Given,
6Pm = 120
⇒ 6!/(6 - m)! = 120 ..........(1)

6Cm = 20
⇒ 6!/{m!(6 - m)!} = 20 ..........(2)

(1) ÷ (2),
{6!/(6 - m)!} / [{6!/{m!(6 - m)!}] = 120/20
⇒ m! = 6

We know,
3! = 3 × 2 × 1 = 6
∴ m = 3

৩৭৮.
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. ক) 364
  2. খ) 931
  3. গ) 1001
  4. ঘ) 1120
সঠিক উত্তর:
খ) 931
উত্তর
সঠিক উত্তর:
খ) 931
ব্যাখ্যা
The different combination of men and women to form the group
3 men and 1 woman + 2 men and 2 women + 3 women and 1 man + 4 women
The selection of required man and women from 8 men and 6 women
8C3 × 6C1 + 8C2 × 6C2 + 8C1 × 6C3 + 6C4
⇒ 56 × 6 + 28 × 15 + 8 × 20 + 15
⇒ 336 + 420 + 160 + 15 
⇒ 931
৩৭৯.
There are five women and six men in a group. From this group, a committee of 4 is to be chosen. How many different ways can a committee be formed that contains three women and one man?
  1. 10
  2. 30
  3. 60
  4. 120
সঠিক উত্তর:
60
উত্তর
সঠিক উত্তর:
60
ব্যাখ্যা
Question: There are five women and six men in a group. From this group, a committee of 4 is to be chosen. How many different ways can a committee be formed that contains three women and one man?

Solution: 
there are five women and six men in the group.
a committee of 4 that contains 3 women and 1 man can be formed in
= (5C3) × (6C1)
= 60
৩৮০.
If 12 equally priced melons cost a total of $9.60, then what is the cost of 11 of these melons?
  1. ক) $8.04
  2. খ) $7.20
  3. গ) $8.37
  4. ঘ) $8.80
সঠিক উত্তর:
ঘ) $8.80
উত্তর
সঠিক উত্তর:
ঘ) $8.80
ব্যাখ্যা
Question: If 12 equally priced melons cost a total of $9.60, then what is the cost of 11 of these melons?

Solution: 
প্রতিটি তরমুজের মূল্য = 9.6/12 = .8
সুতরাং, ১১টি তরমুজের মূল্য = .8 × 11 = 8.8
৩৮১.
A box contains 400 marbles, of which 40% are blue. You pick some marbles of which 25% are blue. Of the remaining marbles, 50% are blue marbles. How many marbles did you pick?
  1. 130
  2. 140
  3. 150
  4. 160
  5. None
সঠিক উত্তর:
160
উত্তর
সঠিক উত্তর:
160
ব্যাখ্যা

Question: A box contains 400 marbles, of which 40% are blue. You pick some marbles of which 25% are blue. Of the remaining marbles, 50% are blue marbles. How many marbles did you pick?

Solution:
Given that, 
Total marbles = 400
Blue marbles initially = 40% of 400 = (40/100) × 400 = 160
Non-blue marbles = 400 - 160 = 240

Let the number picked be x.
∴ Blue picked = 25% of x = 0.25x
and non-blue picked = 0.75x

And, 
Remaining marbles = 400 - x
∴ Remaining blue marbles = 160 - 0.25x

ATQ, Of the remaining marbles, 50% are blue then we get, 
160 - 0.25x = 0.5(400 - x)
⇒ 160 - 0.25x = 200 - 0.5x
⇒ 0.5x - 0.25x = 200 - 160
⇒ 0.25x = 40
⇒ x = 40/0.25
∴ x = 160

So the number of marbles you picked is 160.

৩৮২.
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. 756
  2. 735
  3. 645
  4. 1287
সঠিক উত্তর:
756
উত্তর
সঠিক উত্তর:
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                    Women                  Ways
-------------------------------------------------------
3                          2                            7C3 × 6C2 = 35 × 15 = 525
4                          1                            7C4 × 6C1 = 35 × 6 = 210 
5                          0                            7C5 × 6C0 = 21 × 1 = 21

∴ Total number of ways = 525 + 210 + 21 = 756
৩৮৩.
In a simultaneous throw of a pair of dice, what is the probability of getting a total more than 8?
  1. 5/18
  2. 12/18
  3. 1/4
  4. 7/18
সঠিক উত্তর:
5/18
উত্তর
সঠিক উত্তর:
5/18
ব্যাখ্যা

Question: In a simultaneous throw of a pair of dice, what is the probability of getting a total more than 8?

Solution: 
The total number of possible outcomes for the pair of dice is the product of the outcomes for each die is-
= 6 × 6 = 36

And,
The favorable outcomes are the combinations where the sum of the two dice is more than 8. These sums can be 9, 10, 11, or 12. The combinations for each sum are-
Sum of 9: (3, 6), (4, 5), (5, 4), (6, 3) - 4 outcomes
Sum of 10: (4, 6), (5, 5), (6, 4) - 3 outcomes
Sum of 11: (5, 6), (6, 5) - 2 outcomes
Sum of 12: (6, 6) - 1 outcome

∴ The total number of favorable outcomes is the sum of these outcomes = 4 + 3 + 2 + 1 = 10

∴ P(sum > 8) = Favorable Outcomes/Total Outcomes = 10/36 = 5/18

৩৮৪.
When two dice are rolled, what is the probability that the sum of the numbers appeared on them is 11?
  1. 1/15
  2. 2/13
  3. 1/6
  4. 1/18
সঠিক উত্তর:
1/18
উত্তর
সঠিক উত্তর:
1/18
ব্যাখ্যা
Question: When two dice are rolled, what is the probability that the sum of the numbers appeared on them is 11?

Solution:
n(S) = 62
= 36
n(E) = {(5, 6), (6, 5)} = 2

∴ p(E) = n(E)/n(S)
= 2/36
= 1/18
৩৮৫.
When six fair coins are tossed simultaneously, in how many of the outcomes will at most three of the coins turn up as heads?
  1. 42
  2. 32
  3. 64
  4. 40
সঠিক উত্তর:
42
উত্তর
সঠিক উত্তর:
42
ব্যাখ্যা
Question: When six fair coins are tossed simultaneously, in how many of the outcomes will at most three of the coins turn up as heads?

Solution: 
outcomes in which 0 coins turn heads are,
6C0 = 1 outcome.
outcomes in which 1 coin turn head are,
6C1 = 6 outcomes.
outcomes in which 2 coins turn heads are,
6C2 = 15 outcomes.
outcomes in which 3 coins turn heads are,
6C3 = 20 outcomes.
Therefore, the total number of outcomes
= 1 + 6 + 15 + 20
= 42 outcomes.
৩৮৬.
If nC10 = nC, what is the value of nC2 = ?
  1. 81
  2. 136
  3. 153
  4. 180
সঠিক উত্তর:
153
উত্তর
সঠিক উত্তর:
153
ব্যাখ্যা

Question: If nC10 = nC, what is the value of nC2 = ?

Solution:
আমরা জানি,
যদি nCa = nCb হয়, তবে হয় a = b অথবা a + b = n হবে।

এখানে,
nC10 = nC8
⇒ 10 + 8 = n
⇒ n = 18

∴ nC2 = 18C2
= 18!/(2!(18 - 2)!)
= 18!/(2! × 16!)
= (18 × 17 × 16!)/(2 × 1 × 16!)
= (18 × 17)/2
= 9 × 17
= 153

৩৮৭.
Mr X will be the Chairman of the committee . In how many ways can a committee of 5 members be chosen from a total of 8 people given that Mr. X must be one them?
  1. ক) 35
  2. খ) 70
  3. গ) 120
  4. ঘ) 56
সঠিক উত্তর:
ক) 35
উত্তর
সঠিক উত্তর:
ক) 35
ব্যাখ্যা

As, Mr. x is always chosen, then to form a committee of 5 members from the pool of 8, we now have to choose 4 members from 7 people

So, the committee can be formed in 7c4 = 35 ways

৩৮৮.
A committee of 5 members is to be selected from 7 men and 4 women. In how many ways can this be done if exactly 3 men must be selected?
  1. 210
  2. 360
  3. 420
  4. 280
সঠিক উত্তর:
210
উত্তর
সঠিক উত্তর:
210
ব্যাখ্যা

Question: A committee of 5 members is to be selected from 7 men and 4 women. In how many ways can this be done if exactly 3 men must be selected?

Solution:
এখানে, একটি কমিটি গঠন করতে হলে 3 জন পুরুষ এবং (5 - 3) = 2 জন মহিলা নির্বাচন করতে হবে।

7 জন পুরুষ থেকে 3 জন পুরুষ নির্বাচন করার উপায়:
7C3 = 7!/{3! (7 - 3)!}
= (7 × 6 × 5)/(3 × 2 × 1)
= 35 টি

4 জন মহিলা থেকে 2 জন মহিলা নির্বাচন করার উপায়:
4C2 = 4!/{2! (4 - 2)!}
= (4 × 3)/(2 × 1)
= 6 টি
সুতরাং, মোট সম্ভাব্য উপায় = 35 × 6 = 210 টি।

অতএব, কমিটি গঠনের মোট উপায় হলো 210 টি।

৩৮৯.
In how many ways can six different rings be worn on four fingers of one hand?
  1. ক) 64
  2. খ) 46
  3. গ) 6
  4. ঘ) 216
সঠিক উত্তর:
খ) 46
উত্তর
সঠিক উত্তর:
খ) 46
ব্যাখ্যা
Question: In how many ways can six different rings be worn on four fingers of one hand?

Solution: 
Number of fingers n = 4
Number of rings r = 6
∴ 6 rings may be worn in = 46  ways.
৩৯০.
In a class, there are 15 boys and 10 girls. Three students are selected at random. The probability that 1 girl and 2 boys are selected, is-
  1. 21/46
  2. 25/117
  3. 1/50
  4. 3/25
  5. None of these
সঠিক উত্তর:
21/46
উত্তর
সঠিক উত্তর:
21/46
ব্যাখ্যা
Question: In a class, there are 15 boys and 10 girls. Three students are selected at random. The probability that 1 girl and 2 boys are selected, is-

Solution:
Let S be the sample space and E be the event of selecting 1 girl and 2 boys.
Then,
n(S) = Number ways of selecting 3 students out of 25
= 25C3
= 2300

n(E) = (10C1 × 15C2) = 10 × 105
= 1050

∴ P(E) = n(E)/n(S) = 1050/2300 = 21/46
৩৯১.
If p and q are two positive integers and p + q = 5 and we need to find the probability that p equals 1.
  1. 1/4
  2. 2/3
  3. 1/5
  4. 3/2
সঠিক উত্তর:
1/4
উত্তর
সঠিক উত্তর:
1/4
ব্যাখ্যা
Question: If p and q are two positive integers and p + q = 5 and we need to find the probability that p equals 1.

Solution:
Let's start by writing all the possible outcomes for p + q = 5, given that both p and q are positive integers.
The possible outcomes are:

p = 1, q = 4
p = 2, q = 3
p = 3, q = 2
p = 4, q = 1

So, Total Number of Outcomes = 4
Number of Favorable outcomes in which p = 1 is 1 (p = 1, q = 4)

∴ The probability = 1/4
৩৯২.
In a bucket there are 5 purple, 15 grey and 25 green balls. If the ball is picked up randomly, find the probability that it is neither grey nor purple?
  1. 51/43
  2. 2/7
  3. 5/9
  4. 12/13
সঠিক উত্তর:
5/9
উত্তর
সঠিক উত্তর:
5/9
ব্যাখ্যা
Question: In a bucket there are 5 purple, 15 grey and 25 green balls. If the ball is picked up randomly, find the probability that it is neither grey nor purple?

Solution:
If the ball is neither grey nor purple then it must be green.
There are 45 balls in total of which 25 are green 
so the probability of picking a green ball is 25/45 = 5/9
৩৯৩.
A box contains 5 green, 3 yellow, and 4 black balls. If one ball is drawn at random, what is the probability that it will not be a green ball?
  1. 2/3
  2. 5/8
  3. 5/12
  4. 7/12
সঠিক উত্তর:
7/12
উত্তর
সঠিক উত্তর:
7/12
ব্যাখ্যা

Question: A box contains 5 green, 3 yellow, and 4 black balls. If one ball is drawn at random, what is the probability that it will not be a green ball?

Solution:
Given that,
Green balls = 5
Yellow balls = 3
Black balls = 4
∴ Total balls = 5 + 3 + 4 = 12

And, number of non-green balls = Yellow + Black = 3 + 4 = 7

We know,
P(not green) = favorable outcomes/total outcomes
= 7/12

∴ The probability of drawing a non-green ball is 7/12

৩৯৪.
A hat contains a total of 30 cards, of which 12 are marked with a star and the remaining 18 are unmarked. If a card is drawn at random from the hat, what is the probability that it will be a card marked with a star?
  1. 1/3
  2. 2/3
  3. 3/5
  4. 2/5
সঠিক উত্তর:
2/5
উত্তর
সঠিক উত্তর:
2/5
ব্যাখ্যা

Question: A hat contains a total of 30 cards, of which 12 are marked with a star and the remaining 18 are unmarked. If a card is drawn at random from the hat, what is the probability that it will be a card marked with a star?

Solution:

Total number of cards = 12 (marked) + 18 (unmarked) = 30

Number of favorable outcomes (marked with a star) = 12

Probability = (Number of favorable outcomes)/(Total number of outcomes)
= 12/30
= 2/5

৩৯৫.
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 3 or 5?
  1. 2/5
  2. 1/2
  3. 3/10
  4. 9/20
সঠিক উত্তর:
9/20
উত্তর
সঠিক উত্তর:
9/20
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 3 or 5?

Solution:
Here, 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

৩৯৬.
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.

৩৯৭.
The ratio of red balls, to yellow balls, to green balls, to blue balls in a basket is 2 : 3 : 4 : 5. What is the probability that a ball chosen at random from the basket is a red ball?
  1. 1/7
  2. 2/7
  3. 3/14
  4. 3/7
সঠিক উত্তর:
1/7
উত্তর
সঠিক উত্তর:
1/7
ব্যাখ্যা
Question: The ratio of red balls, to yellow balls, to green balls, to blue balls in a basket is 2 : 3 : 4 : 5. What is the probability that a ball chosen at random from the basket is a red ball?

Solution:
The ratio of red balls, to yellow balls, to green balls in a basket is = 2 : 3 : 4 : 5
let, there are 2x red balls, 3x yellow balls, 4x green balls and 5x blue balls.

∴ Total balls = 2x + 3x + 4x + 5x
= 14x

∴ probability that a ball chosen at random from the basket is a red ball = 2x/14x
= 1/7
৩৯৮.
A dice is thrown. What is the probability that the number shown on the dice is odd number ?
  1. ক) 1/6
  2. খ) 1/3
  3. গ) 1/2
  4. ঘ) 1/4
সঠিক উত্তর:
গ) 1/2
উত্তর
সঠিক উত্তর:
গ) 1/2
ব্যাখ্যা
When a dice is thrown once.
The total number of outcomes is 6 (1, 2, 3, 4, 5, and 6)
Odd numbers = 3 (1, 3, 5)

Probability = No of Favorable Outcomes/Total no of Outcomes
P(Odd numbers) = 3/6
                           = 1/2

∴ The required probability is 1/2
৩৯৯.
Three unbiased coins are tossed simultaneously. What is the probability of getting at most one tail? 
  1. 1/3
  2. 1/4
  3. 1/2
  4. 1/5
সঠিক উত্তর:
1/2
উত্তর
সঠিক উত্তর:
1/2
ব্যাখ্যা

Question: Three unbiased coins are tossed simultaneously. What is the probability of getting at most one tail?

Solution: Total outcomes = 23 = 8 (HHH, HHT, HTH, THH, HTT, THT, TTH, TTT)

Favorable outcomes = cases with at most one tail (zero tails or exactly one tail) = (HHH, HHT, HTH, THH)

At most one tail refers to zero or one tail only.

Therefore, Probability = Favorable outcomes / Total outcomes = 4/8 = 1/2

৪০০.
If four fair coins are flipped, what is the probability that they all will come up heads?
  1. ক) 3/16
  2. খ) 1/4
  3. গ) 1/8
  4. ঘ) 1/16
সঠিক উত্তর:
ঘ) 1/16
উত্তর
সঠিক উত্তর:
ঘ) 1/16
ব্যাখ্যা
4টি নিরপেক্ষ মুদ্রা একবার নিক্ষেপ করলে মোট নমুনা বিন্দু হবে = {HHHH, HHTH, HTHH, HTTH, THHH, THTH, TTHH, TTTH,HHHT, HHTT, HTHT, HTTT, THHT, THTT, TTHT, TTTT} = 16টি 

4টিতেই Head পাওয়ার সম্ভাবনা = 1/16

বিকল্প 

১টি মুদ্রায় Head উঠার সম্ভাবনা = 1/2 
৪টিমুদ্রায় Head উঠার সম্ভাবনা = (1/2) × (1/2) × (1/2) × (1/2)
                                                = 1/16