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Bank Math

মোট প্রশ্ন১৬,১২৪এই পাতা১০০প্রতি পাতা১০০
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উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

Bank Math

PrepBank · পাতা ২৫ / ১৬১ · ২,৪০১২,৫০০ / ১৬,১২৪

২,৪০১.
The LCM of two numbers is 495 and their HCF is 5. If the sum of the numbers is 100, then their difference is = ?
  1. 90
  2. 10
  3. 70
  4. 46
ব্যাখ্যা

Question: The LCM of two numbers is 495 and their HCF is 5. If the sum of the numbers is 100, then their difference is = ?

Solution: 
Given that, 
LCM = 495, HCF = 5
And,
The sum of the numbers is, a + b = 100
The product of two numbers is equal to the product of their LCM and HCF. 
Product(a × b) = LCM × HCF = 495 × 5 = 2475

We know, 
(a - b)2 = (a + b)2 - 4ab
⇒ (a - b)2 = 1002 - 4 × 2475 ; [where, a + b = 100 and  ab = 2475 ]
⇒ (a - b)2 = 10000 - 9900
⇒ (a - b)2 = 100
⇒ a - b = √100 = 10
∴ a - b = 10 

So the difference between the numbers is  10.

২,৪০২.
A company pays rent of Tk. 20000 per month for office space to its owner. But if the company pays the annual rent at the beginning of the year the owner gives a discount of 5% on the total annual rent. What is the annual amount the company pays to the owner after the discount?
  1. ক) Tk. 226000
  2. খ) Tk. 225000
  3. গ) Tk. 228000
  4. ঘ) Tk. 227000
ব্যাখ্যা
Question: A company pays rent of Tk. 20000 per month for office space to its owner. But if the company pays the annual rent at the beginning of the year the owner gives a discount of 5% on the total annual rent. What is the annual amount the company pays to the owner after the discount?

Solution:
Total annual rent = Tk. (20000 × 12) = Tk. 240000
Discount = 5% of tk. 240000
= Tk. 12000
∴ Annual rent paid after discount = Tk. (240000 - 12000)
= Tk. 228000
২,৪০৩.
A shopkeeper sells goods at 25% profit. If he had sold for Tk. 200 more, the profit would have been 30%. What is the cost of that goods?
  1.  Tk. 2,800
  2.  Tk. 3,200
  3.  Tk. 3,600
  4.  Tk. 4,000
ব্যাখ্যা

Question: A shopkeeper sells goods at 25% profit. If he had sold for Tk. 200 more, the profit would have been 30%. What is the cost of that goods?

Solution:
Let the cost price = C Tk.

Selling price at 25% profit:
SP1 = C + 25% of C = C × 1.25

Selling price at 30% profit:
SP2 = C + 30% of C = C × 1.30

Difference:
SP2 - SP1 = 200
⇒ 1.30C - 1.25C = 200
⇒ 0.05C = 200
⇒ C = 200/0.05
⇒ C = 4,000 Tk.

∴ Cost Price = 4,000 Tk.

২,৪০৪.
If secθ + tanθ = 4/3, then secθ - tanθ = ?
  1. 4/3
  2. 3/4
  3. 1/3
  4. 1/4
ব্যাখ্যা
We know,
sec2θ - tan2θ = 1
⇒ (secθ + tanθ)(secθ - tanθ) = 1
⇒ 4/3(secθ + tanθ) = 1
⇒ (secθ - tanθ) = 3/4
২,৪০৫.
Parimal wants to purchase a cylindrical can with a radius equivalent to 5 inches. The can contains 1 gallon of oil. Find the height of the cylinder.
  1. 2.54 inches
  2. 3.64 inches
  3. 3.44 inches
  4. 2.94 inches
ব্যাখ্যা
Question: Parimal wants to purchase a cylindrical can with a radius equivalent to 5 inches. The can contains 1 gallon of oil. Find the height of the cylinder. 

Solution:
Volume V is given by= 1 gallon
1 gallon= 231 cubic inches
Radius r = 5 inches

Volume of the cylinder is given by, 
V = πr2h
⇒ 231 = (22/7) × (5)2 × h
⇒ (231 × 7)/(22 × 25) = h
∴ h = 2.94 inches.

Therefore, the height is equivalent to 2.94 inches.
২,৪০৬.
A leading library charges c cents for the first week that a book is loaned and f cents for each day over one week. What is the cost for taking out a book for d days, where d is greater than 7.
  1. ক) c + fd
  2. খ) cd
  3. গ) c + f(d - 7)
  4. ঘ) cd + f
ব্যাখ্যা

As, d days is greater than 7 days
So, charge for first week is c cents
∴ For (d - 7) days the charge is = f(d - 7) cents
So, total cost = c + f(d - 7)

২,৪০৭.
In a 200m race, Joy defeats Bishal by 5 seconds. If the speed of Joy is 18 kmph, then the speed of Bishal is- 
  1. 16 kmph
  2. 15 kmph
  3. 14.45 kmph
  4. 15.56 kmph
ব্যাখ্যা
Question: In a 200m race, Joy defeats Bishal by 5 seconds. If the speed of Joy is 18 kmph, then the speed of Bishal is- 

Solution: 
speed of Joy = 18 kmph = 18/3.6 = 5 mph
time taken by Joy = 200/5 = 40 sec

time taken by Bishal = 40 + 5
= 45 sec
speed of Bishal = 200/45 mph
= 4.44 mph
= 16 kmph
২,৪০৮.
Hasan can paint 54 walls in 27 minutes. Rafiq can paint 25 walls in 10 minutes. Working together, how many walls can they paint in 20 minutes?
  1. 60 walls
  2. 70 walls
  3. 90 walls
  4. 100 walls
ব্যাখ্যা

Question: Hasan can paint 54 walls in 27 minutes. Rafiq can paint 25 walls in 10 minutes. Working together, how many walls can they paint in 20 minutes?

Solution:
Hasan can paint in 1 minute = 54 ÷ 27 = 2 walls

Rafiq can paint in 1 minute = 25 ÷ 10 = 25/10 = 5/2 walls

∴ Together they can paint in 1 minute = 2 + (5/2) walls
= (4 + 5)/2 = 9/2 walls

∴ In 20 minutes, they can paint = (9/2) × 20 walls
= (9 × 20)/2
= 90 walls

২,৪০৯.
A man spends 35% of his income on food, 25% on children's education and 80% of the remaining on house rent. What percent of his income he is left with?
  1. ক) 6%
  2. খ) 8%
  3. গ) 10%
  4. ঘ) 12%
  5. ঙ) 15%
ব্যাখ্যা

Let, total income = 100
Total expense food and education = 35 + 25
= 60
Remaining = (100 - 60) = 40
Expense on house rent = 40 × (80/100) = 32
Remaining after all expense = 40 - 32 = 8

২,৪১০.
A triangular piece of land has sides measuring 25 meters, 20 meters, and 15 meters respectively. If it costs 3.50 Taka per square meter to plant grass on the land, how much will it cost to plant grass on the entire land?
  1. Tk. 450 
  2. Tk. 480 
  3. Tk. 510 
  4. Tk. 525 
  5. None
ব্যাখ্যা
Question: A triangular piece of land has sides measuring 25 meters, 20 meters, and 15 meters respectively. If it costs 3.50 Taka per square meter to plant grass on the land, how much will it cost to plant grass on the entire land?

Solution:
Given,
a=25 m, b=20 m and c=15 m

Let
the semi-perimeter of the triangle = s
∴ s = (a + b + c)/2
= (25 + 20 + 15)/2
= 30 m

∴ The area of the triangle = √{s(s - a)(s - b)(s - c)}
= √{30 × (30 - 25) × (30 - 20) × (30 - 15)​}
= √(30 × 5 × 10 × 15​)
= √22500
= 150 square meters

Cost to plant grass per square meter = 3.50 Taka
∴ Cost to plant grass in 150 square meter = (3.50 × 150) Taka
= Tk. 525
২,৪১১.
Rafiq is shorter than Sajid, but taller than Farah. Lina is shorter than Rafiq. Nasir is shorter than Sajid but taller than Rafiq. Who is the tallest in terms of height?
  1. Sajid
  2. Nasir
  3. Rafiq
  4. Lina
ব্যাখ্যা
Question: Rafiq is shorter than Sajid, but taller than Farah. Lina is shorter than Rafiq. Nasir is shorter than Sajid but taller than Rafiq. Who is the tallest in terms of height?

Solution:
Rafiq is shorter than Sajid, but taller than Farah.
∴ Sajid > Rafiq > Farah

Lina is shorter than Rafiq
∴ Rafiq > Lina

Nasir is shorter than Sajid but taller than Rafiq
∴ Sajid > Nasir > Rafiq
From all of these relational statement we can say that, Sajid is the tallest in terms of height.
২,৪১২.
In a box of 5 eggs, 2 are rotten. What is the probability that two eggs chosen at random from the box are rotten?
  1. 2/5
  2. 1/16
  3. 1/10
  4. 1/5
  5. 13/20
ব্যাখ্যা

Question: In a box of 5 eggs, 2 are rotten. What is the probability that two eggs chosen at random from the box are rotten?

Solution: 
Given,
Total number of eggs = 5
Number of rotten eggs = 2
Number of non-rotten (good) eggs = 3
Number of eggs to be chosen = 2

We can think of this as picking one egg and then picking another without replacing the first one.
The probability that the first egg picked is rotten = 2/5
  
Now, if the first egg was rotten, there is now 1 rotten egg left and 4 total eggs left.
The probability that the second egg picked is also rotten = 1/4
  
Hence, the probability of selecting 2 rotten eggs in a row = (2/5) × (1/4)
= 1/10

২,৪১৩.
In a box, the ratio of red marbles to blue marbles is 7 : 4. Which of the following could be the total number of marbles in the box?
  1. 18
  2. 19
  3. 20
  4. 22
ব্যাখ্যা

Question: In a box, the ratio of red marbles to blue marbles is 7 : 4. Which of the following could be the total number of marbles in the box?

Solution: 
18, 19, 21 কোনটিই 7 + 4 বা 11 দ্বারা নি:শেষে বিভাজ্য নয়। 
অতএব, সঠিক উত্তর 22

২,৪১৪.
Two unbiased coins are tossed. What is the probability of getting at least 1 tail?
  1. 1/2
  2. 1/3
  3. 2/3
  4. 3/4
  5. None of the above
ব্যাখ্যা

Question: Two unbiased coins are tossed. What is the probability of getting at least 1 tail?

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

So, the probability of getting at least 1 tail = Favorable outcomes/Total outcomes
= 3/4

২,৪১৫.
a(x - y)(x + y) × a(z - x)(z + x) × a(y - z)(y + z) = ?
  1. 0
  2. 1
  3. a
  4. 1/2
ব্যাখ্যা
Question: a(x - y)(x + y) × a(z - x)(z + x) × a(y - z)(y + z) = ?

Solution:
২,৪১৬.
A container is 2/3 full of oil. After removing 10 liters, it becomes 1/3 full. What is the capacity of the container?
  1. 20 liters
  2. 50 liters
  3. 45 liters
  4. 30 liters
ব্যাখ্যা
Question: A container is 2/3 full of oil. After removing 10 liters, it becomes 1/3 full. What is the capacity of the container?

Solution:
Given that,
The container is initially 2/3 full
After removing 10 liters, it becomes 1/3 full

Let the total capacity be x liters
Then,
According to the question,
⇒ (2x/3) - 10 = x/3
⇒ (2x/3) - (x/3) = 10
⇒ (2x - x)/3 = 10
∴ x = 30

So the capacity of the container is 30 liters.
২,৪১৭.
Four years ago a man was 6 times as old as his son. After 16 years he will be twice as old as his son. What is the present age of man?
  1. 36
  2. 35
  3. 34
  4. 33
ব্যাখ্যা
Question: Four years ago a man was 6 times as old as his son. After 16 years he will be twice as old as his son. What is the present age of man?

Solution:
Let age of son 4 years ago be = X
So, age of man 4 years ago would be = 6X

As per question after 16 years;
2 × age of son = age of man
∴ 2(X + 4 +16) = (6X + 4 + 16)
⇒ 2X + 40 = 6X + 20
⇒ 2X - 6X = 20 - 40
⇒ - 4X = - 20
∴ X = 5

∴ Present age of man = 6X + 4 = 6 × 5 + 4 = 30 + 4 = 34 years
২,৪১৮.
The flowers in a basket double every minute and the basket gets full in 1 hr. How much time does it take to fill the basket half?
  1. ক) 30 minutes
  2. খ) 45 minutes
  3. গ) 58 minutes
  4. ঘ) 59 minutes
ব্যাখ্যা
Question: The flowers in a basket double every minute and the basket gets full in 1 hr. How much time does it take to fill the basket half?

Solution:
In 60 minutes the basket will be full 1 part
So, in 59 minutes the basket will be full 1/2 part [Because, every minute it gets double]
২,৪১৯.
The difference between the length and breadth of a rectangle is 23m . If its perimeter is 206m, then its area is:
  1. ক) 2,520m2
  2. খ) 1,520m2
  3. গ) 2,420m2
  4. ঘ) 2,480m2
ব্যাখ্যা
We have: (l - b) = 23 and 2(l + b) = 206 or (l + b) = 103
Solving the two equations, we get: l = 63 and b = 40
∴ Area = (l x b) = (63 x 40) m² = 2520 m²
২,৪২০.
By selling a property for Tk. 45000 a person incurs a loss of 10%. Find the selling price to gain the profit of 15%?
  1. 58000
  2. 57500
  3. 60000
  4. 55000
ব্যাখ্যা
Question: By selling a property for Tk. 45000 a person incurs a loss of 10%. Find the selling price to gain the profit of 15%?

Solution:
S.P = 45000
Loss% = 10%

C.P = (100)/ (100- L %)) × S.P

C.P = (100/ (100-10))× 45000
C.P= (100/90) × 45000
C.P = 50000

Now, to gain the profit of 15%:

S.P = ((100+P %) /100) × C.P

S.P = ((100+15)/100) × 50000
S.P = (115/100)× 50000
S.P = 57500
২,৪২১.
In 10 years A will be twice old as B was 10 years ago. If A is now 9 years older than B. the present age of B?
  1. ক) 19
  2. খ) 39
  3. গ) 29
  4. ঘ) 49
ব্যাখ্যা
ধরি 
B এর বর্তমান বয়স = x বছর 
A এর বর্তমান বয়স = x + 9 বছর 

প্রশ্নমতে,
(x + 9) + 10 = 2(x - 10)
x + 19 = 2x - 20
2x - 20 = x + 19 
2x - x = 19  + 20 
x = 39 
B এর বর্তমান বয়স = 39 বছর
২,৪২২.
The width of a rectangle is equal to 3/4 of its length. What is the length of the rectangle if the length of the diagonal is 25 cm?
  1. ক) 15 cm
  2. খ) 18 cm
  3. গ) 20 cm
  4. ঘ) None of the above
ব্যাখ্যা
প্রশ্ন : The width of a rectangle is equal to 3/4 of its length. What is the length of the rectangle if the length of the diagonal is 25 cm?
 
সমাধান :
ধরি,
দৈর্ঘ্য = 4x সে.মি.
∴ প্রস্থ = 4x এর 3/4 সে.মি.
          = 3x সে.মি.

ΔBCD সমকোণী ত্রিভুজে,
(3x)2 + (4x)2 = (25)2
বা, 25x2= 625
বা, x2 = 25
বা, x = 5
∴ x = 5

∴ দৈর্ঘ্য = 4x সে.মি.
           = (4×5) সে.মি.
           = 20 সে.মি.
২,৪২৩.
A mixture contains acid and water in the ratio 4 : 3. If 5 liters of water is added to the mixture, the ratio becomes 4 : 5. Find the quantity of acid in the given mixture.
  1. 5 liters
  2. 7.5 liters
  3. 10 liters
  4. 12 liters
ব্যাখ্যা
Question: A mixture contains acid and water in the ratio 4 : 3. If 5 liters of water is added to the mixture, the ratio becomes 4 : 5. Find the quantity of acid in the given mixture.

Solution:
Let the quantity of acid and water be 4x liters and 3x liters respectively

ATQ,
4x/(3x + 5) = 4/5
⇒ 20x = 4(3x + 5)
⇒ 20x = 12x + 20
⇒ 8x = 20
∴ x = 2.5

Quantity of acid
= (4 × 2.5) liters
= 10 liters
২,৪২৪.
A dozen Bombay peppers are purchased for Tk. 37.50 and sold for Tk. 39.75. What is the profit percentage? 
  1. 8%
  2. 4%
  3. 6%
  4. 5%
ব্যাখ্যা

 Question: A dozen Bombay peppers are purchased for Tk. 37.50 and sold for Tk. 39.75. What is the profit percentage?

Solution:
∴ লাভ = ৩৯.৭৫ - ৩৭.৫০ = ২.২৫ টাকা

∴ ৩৭.৫০ টাকায় লাভ হয় = ২.২৫ টাকা
∴ ১ টাকায় লাভ হয় = ২.২৫/৩৭.৫০ টাকা
∴ ১০০ টাকায় লাভ হয় = (২.২৫ × ১০০)/৩৭.৫০ টাকা
= (২২৫ × ১০০)/৩৭৫০ টাকা 
= ৬ টাকা বা ৬% 

২,৪২৫.
A man distributes Tk. 16,000 among his daughter, wife, and son such that the daughter’s and wife’s shares are in the ratio 1 : 2, and the son receives half of the total amount. What is the daughter’s share? 
  1. 2066.66 Tk
  2. 1666.66 Tk
  3. 2666.66 Tk
  4. 2000.66 Tk
ব্যাখ্যা

Question: A man distributes Tk. 16,000 among his daughter, wife, and son such that the daughter’s and wife’s shares are in the ratio 1 : 2, and the son receives half of the total amount. What is the daughter’s share?

Solution:
The daughter's share and the wife's share are of 1 : 2 ratio
daughter's share = x
wife's share = 2x

As the son gets half of the total amount
∴ son's share = 16000/2
= 8000 Tk

∴ Rest of the share = 3x
∴ According to the question,
Or, 3x = 8000
Or, x = 8000/3
∴ x = 2666.66

∴ daughter's share = x = 2666.66 Tk

২,৪২৬.
In a cricket tournament 30,000 tickets were sold. One-fourth of the tickets were sold at Tk. 30 each, 1/3 were sold at Tk. 25 each, and the remaining tickets were sold at Tk. 20 each. How many tickets were sold at Tk. 20 each?
  1. ক) 10000
  2. খ) 12000
  3. গ) 12500
  4. ঘ) 13500
ব্যাখ্যা
Question: In a cricket tournament 30,000 tickets were sold. One-fourth of the tickets were sold at Tk. 30 each, 1/3 were sold at Tk. 25 each, and the remaining tickets were sold at Tk. 20 each. How many tickets were sold at Tk. 20 each?

Solution: 
মোট টিকিট বিক্রি করা হয়েছে ৩০০০০ টি 
১/৪ অংশ বিক্রি করা হয়েছে প্রতিটি ৩০ টাকায় 
১/৩ অংশ বিক্রি করা হয়েছে প্রতিটি ২৫ টাকায় 

বাকি থাকে = ১ - (১/৪) - (১/৩) অংশ 
= (১২ - ৩ - ৪)/১২ অংশ 
= ৫/১২ অংশ 

প্রতিটি ২০ টাকায় বিক্রি করা হয়েছে = ৩০০০০ এর ৫/১২ অংশ 
= ১২৫০০  টি 
২,৪২৭.
The average salary of 30 officers in a firm is Tk 120 and the average salary of laborers is Tk 40. Find the total number of laborers if the average salary of the firm is Tk 50.
  1. 210
  2. 190
  3. 200
  4. 220
ব্যাখ্যা
Question: The average salary of 30 officers in a firm is Tk 120 and the average salary of laborers is Tk 40. Find the total number of laborers if the average salary of the firm is Tk 50.

Solutions:
The sum of the salary of officers will be = 30 × 120 = 3600
Let the number of laborers = x
ATQ,
3600 + 40x = 50(30 + x)
⇒ 3600 + 40x = 1500 + 50x
⇒ 2100 = 10X
⇒ x = 210
২,৪২৮.
x2 − (x/2)2 =?
  1. x2 - x
  2. x2/4
  3. (3x2)/4
  4. (3x2)/2
ব্যাখ্যা
Question: x2 − (x/2)2 =?

Solution:
we can apply a2 - b2 = (a + b)(a - b)

x2 - (x/2)2
= (x + x/2) ( x - x/2)
= {(2x + x)/2} {(2x - x)/2}
= (3x/2) × (x/2)
= (3x2)/4
২,৪২৯.
One card is drawn from a deck of 52 cards, well-shuffled. Calculate the probability that the card will not be an ace.
  1. ক) 12/13
  2. খ) 51/52
  3. গ) 3/26
  4. ঘ) 1/13
ব্যাখ্যা
Question: One card is drawn from a deck of 52 cards, well-shuffled. Calculate the probability that the card will not be an ace.

Solution:
Total number of Ace is 4.
∴ The probability of a card will be 4/53 = 1/13

∴ The probability that the card will not be an ace = 1 - (1/13)
= (13 - 1)/13
= 12/13 
২,৪৩০.
A batsman scored 120 runs which included 3 boundaries and 8 sixes. What percent of his total score did he make by running between the wickets?
  1. ক) 42%
  2. খ) 45%
  3. গ) 50%
  4. ঘ) 55%
ব্যাখ্যা
Question: A batsman scored 120 runs which included 3 boundaries and 8 sixes. What percent of his total score did he make by running between the wickets?

Solution:
4 এবং 6 এর মাধ্যমে সে রান নিল = (3 x 4 ) + (6 × 8) = 12 + 48 = 60 রান
অতএব, সে দৌড়ে রান নিল = 120 - 60 = 60 রান

∴ শতকরা দৌঁড়ে রানের পরিমাণ = {(60/120) × 100}%
= 50%
২,৪৩১.
Find the roots of the quadratic equation,
p2 - 17p + 72 0
  1. 18 or 4
  2. 12 or 6
  3. 7 or 8
  4. 9 or 8
ব্যাখ্যা
Question: Find the roots of the quadratic equation, p2 - 17p + 72 0

Solution:
Given,
p2 - 17p + 72 0
⇒ p2 - 9p - 8p + 72 = 0
⇒ p(p - 9) - 8(p - 9) = 0
⇒ (p - 9)(p - 8) = 0
∴ p = 9 or 8
২,৪৩২.
A person subscribing to Netflix for a year pays BDT. 1560. If the monthly subscription is BDT. 150, how much discount does a yearly subscriber get?
  1. 10%
  2. 12.50%
  3. 13.33%
  4. 15%
ব্যাখ্যা

Question: A person subscribing to Netflix for a year pays BDT. 1560. If the monthly subscription is BDT. 150, how much discount does a yearly subscriber get?

Solution: 
Yearly subscription rate = BDT. 1560
Charge for 12 month as rate of BDT. 150 per month = 12 × 150
= BDT. 1800

∴ Discount = 1800 - 1560 = BDT. 240

Hence, discount % = (240 × 100)/1800 
= 13.33%

২,৪৩৩.
If A varies directly as B and inversely as C and A = 6, when B = 2 and C= 3, what is the value of A when B = 8 and C = 6?
  1. ক) 6
  2. খ) 18
  3. গ) 12
  4. ঘ) 24
ব্যাখ্যা

Let the constant be x,
so putting the first scenario in equation
A = x × (B/C)
⇒ 6 = x × 2/3
⇒ 2x = 18
⇒ x = 9
We can find out A in the second scenario by putting the value of x as 9
A = 9 × 8/6
⇒ A = 12.

২,৪৩৪.
Find compound amount and compound interest for Tk. 10000 at 3% interest per annum in 2 years.
  1. Tk. 10609, Tk. 609
  2. Tk. 10509, Tk. 509
  3. Tk. 10409, Tk. 409
  4. Tk. 10309, Tk. 309
ব্যাখ্যা
Question: Find compound amount and compound interest for Tk. 10000 at 3% interest per annum in 2 years.

Solution:
Principal (P) = Tk. 10000
Rate (R) = 3%
Time (n) = 2 years

A = P[1+(R/100)]n
A = 10000(1 + 3/100)2
= 10000 × 1.03 × 1.03
= 10609

Compound Amount (A) = Tk. 10609

Compound Interest (CI) = A - P
⇒ CI = 10609 - 10000
⇒ CI = 609
২,৪৩৫.
The last day of a century cannot be
  1. ক) Monday
  2. খ) Wednesday
  3. গ) Tuesday
  4. ঘ) Friday
ব্যাখ্যা

100 years contain 5 odd days.
∴ Last day of 1st century is Friday.
200 years contain (5 x 2) ≡ 3 odd days.
∴ Last day of 2nd century is Wednesday.
300 years contain (5 x 3) = 15 ≡ 1 odd day.
∴ Last day of 3rd century is Monday.
400 years contain 0 odd day.
∴ Last day of 4th century is Sunday.
This cycle is repeated.
∴ Last day of a century cannot be Tuesday or Thursday or Saturday.

২,৪৩৬.
What number should be added to 102255 to make it exactly divisible by 7?
  1. 1
  2. 2
  3. 5
  4. 6
ব্যাখ্যা
Question: What number should be added to 102255 to make it exactly divisible by 7?

Solution: 
if we divide 102255 by 7 the remainder is 6
to make it divisible by 7 we need to add 1 with that number.

adding 1 we get = 102255 + 1 = 102256
dividing 102256 by 7 we get 102256/7 = 14608
২,৪৩৭.
When 9 is added to one fourth of a number, the result is 19. What is the number?
  1. 10
  2. 15
  3. 40
  4. 25
  5. None
ব্যাখ্যা
প্রশ্ন: When 9 is added to one fourth of a number, the result is 19. What is the number?

প্রশ্ন:
ধরি,
সংখ্যাটি = x

প্রশ্নমতে,
(x/4) + 9 = 19
⇒ (x + 36)/4 = 19
⇒ x + 36 = 76
⇒ x = 76 - 36
∴ x = 40
২,৪৩৮.
A dealer originally bought 100 identical batteries at a total cost of Tk. q. If each battery was sold at 50 percent above the original cost per battery, then, in terms of q, for how many Tk. was each battery sold?
  1. (3q)/200
  2. (3q)/2
  3. 150q
  4. q/100
  5. 150/q
ব্যাখ্যা
Question: A dealer originally bought 100 identical batteries at a total cost of Tk. q. If each battery was sold at 50 percent above the original cost per battery, then, in terms of q, for how many Tk. was each battery sold?

Solution:
The cost of 100 batteries is Tk. q
∴ The cost of 1 battery is Tk. q/100

Since the selling price is 50% greater than the cost price than the selling price is (q/100) × 1.5
= (q/100) × (3/2)
= (3q)/200
২,৪৩৯.
Five children, Shihan, Masum, Jayed, Rana, and khairul, sit randomly in five chairs in a row. What is the probability that khairul and Masum don't sit next to each other?
  1. 1/5
  2. 2/5
  3. 3/5
  4. 1/2
ব্যাখ্যা
Question: Five children, Shihan, Masum, Jayed, Rana, and khairul, sit randomly in five chairs in a row. What is the probability that khairul and Masum don't sit next to each other?

Solution:
Total possibilities = 5! = 120
 events where  khairul and Masum sit next to each other= 4! × 2! 
= 24 × 2
= 48

probability that they sit next to each other= 48/120
= 2/5

∴ probability that khairul and Masum don't sit next to each other = 1 - 2/5
= (5 - 2)/5
= 3/5
২,৪৪০.
A can complete a task in 10 days, and B in 15 days. They work together for 5 days. What portion of the work remains?
  1. 7/9
  2. 1/5
  3. 2/5
  4. 1/6
ব্যাখ্যা
Question: A can complete a task in 10 days, and B in 15 days. They work together for 5 days. What portion of the work remains?

Solution:
'A' 10 দিনে করতে পারে কাজটির 1 অংশ
'A' 1 দিনে করতে পারে কাজটির 1/10 অংশ

'B' 15 দিনে করতে পারে কাজটির 1 অংশ
'B'1 দিনে করতে পারে কাজটির 1/15 অংশ

(A ও B) 1 দিনে করতে পারে কাজটির (1/10) + (1/15) অংশ
= (3 + 2)/30 অংশ
= 5/30 অংশ
= 1/6 অংশ

(A ও B) 5 দিনে করতে পারে কাজটির = 5/6 অংশ


∴ কাজ বাকি থাকে = 1 - (5/6) অংশ
= (6 - 5)/6 অংশ
= 1/6 অংশ
২,৪৪১.
At the end of a banquet 10 people shake hands with each other. How many handshakes will there be in total?
  1. 100
  2. 20
  3. 45
  4. 90
ব্যাখ্যা
Question: At the end of a banquet 10 people shake hands with each other. How many handshakes will there be in total?

Solution:
Two people can make 1 handshake
∴ No. of handshakes = 10C2 = 45
২,৪৪২.
A truck covers a distance of 540 meters in 1 minute where as a bus covers a distance of 56.7 km in 45 minutes. The ratio of their speeds is-
  1. 4 : 7
  2. 2 : 9
  3. 3 : 7
  4. 5 : 11
ব্যাখ্যা
Question: A truck covers a distance of 540 meters in 1 minute where as a bus covers a distance of 56.7 km in 45 minutes. The ratio of their speeds is-

Solution:
Speed of truck = 540/60 = 9 m/s
Speed of bus = (56.7 × 1000)/(45 × 60) = 21 m/s

∴ Ratio of speed = 9 : 21 = 3 : 7
২,৪৪৩.
If sinθ + cosecθ = 2 then sin5θ + cosec5θ =?
  1. 10
  2. 4
  3. 2
  4. 0
ব্যাখ্যা
Question: If sinθ + cosecθ = 2 then sin5θ + cosec5θ =?

Solution:
sinθ + cosecθ = 2
or, sinθ + (1/sinθ) = 2
or, sin2θ + 1 = 2sinθ
or, sin2θ - 2sinθ + 1 = 0
or, (sinθ - 1)2 = 0
or, sinθ - 1 = 0
∴ sinθ = 1

cosecθ = 1/sinθ = 1/1 = 1

∴ sin5θ + cosec5θ = (1)5 + (1)5 
= 2
২,৪৪৪.
If Kamal gves 20 marbles to Shuvo, then, both of them will have equal numbers of marbles in their possessions. If Shovo gives 40 marbles to Kamal then Kamal will have twice the number of marbles that Shuvo will retain. What is the number of marbles that Kamal has?
  1. 100
  2. 160
  3. 200
  4. None of these
ব্যাখ্যা

Question: If Kamal gves 20 marbles to Shuvo, then, both of them will have equal numbers of marbles in their possessions. If Shovo gives 40 marbles to Kamal then Kamal will have twice the number of marbles that Shuvo will retain. What is the number of marbles that Kamal has?

Solution:
কামালের মার্বেল আছে = x টি
শুভর মার্বেল আছে = y টি

১ম শর্তমতে
x - 20 = y + 20
x - y = 20 + 20 
x - y = 40 ......................(1)

২য় শর্তমতে
x + 40 =2(y - 40)
x + 40 = 2y - 80
2y - x = 40 + 80 
2y - x = 120 ......................(2)

(1) × 2 + (2) ⇒ 
2x - 2y + 2y - x = 80 + 120
x = 200

কামালের মার্বেল আছে = 200 টি

২,৪৪৫.
A square is inscribed in a circle of diameter 2a and another square is circumscribing circle. The difference between the areas of outer and inner squares is-
  1. ক) a2
  2. খ) 2a2
  3. গ) 3a2
  4. ঘ) 4a2
ব্যাখ্যা
বৃত্তটির ব্যাস হলো অন্তবর্গের কর্ণ 

অন্তবর্গের এক বাহুর দৈর্ঘ্য x একক হলে 
x√2 = 2a
x = 2a/√2
x = √2a
অন্তবর্গের ক্ষেত্রফল = (√2a)2 = 2a2

বহিবর্গের এক বাহুর দৈর্ঘ্য = 2a
বহিবর্গের ক্ষেত্রফল = (2a)2
                               = 4a2
বহিবর্গ ও অন্তবর্গের ক্ষেত্রফলের পার্থক্য = 4a2 - 2a = 2a2
২,৪৪৬.
A train crosses a platform 300 meters long in 50 seconds and another platform 150 meters long in 35 seconds. What is the length of the train?
  1. 320 meters
  2. 280 meters
  3. 200 meters
  4. 240 meters
ব্যাখ্যা

Question: A train crosses a platform 300 meters long in 50 seconds and another platform 150 meters long in 35 seconds. What is the length of the train?

Solution:
Let the length of the train = x meters

Then,
For the first platform, the distance covered by the train = (x + 300) meters
And,
For the second platform, the distance covered by the train = (x + 150) meters

According to the question,
(x + 300)/50 = (x + 150)/35
⇒ 50(x + 150) = 35(x + 300)
⇒ 50x + 7500 = 35x + 10500
⇒ 50x - 35x = 10500 - 7500
⇒ 15x = 3000
⇒ x = 3000/15 
⇒ x = 200

∴ The length of the train is 200 meters

২,৪৪৭.
If the sum of (8, 12, 13, x) is 48, then the averahe of (8, 12, 13, x) is-
  1. 12
  2. 16
  3. 8
  4. 18
ব্যাখ্যা
Question: If the sum of (8, 12, 13, x) is 48, then the averahe of (8, 12, 13, x) is-

Solution:
Sum of the numbers are,
⇒ 8 + 12 + 13 + x = 48
⇒ x = 48 - 33
⇒ x = 15

The average of these four numbers is the sum of the numbers divided by 4,
Average = (8 + 12 + 13 + 15)/4
= 48/4
= 12
Thus, the average of the numbers 8, 12, 13, 15 is 12.
২,৪৪৮.
Find the speed of the stream when a boat takes 7 hours to travel 40km downstream at a rate of 12km per hour in still water.
  1. 2.63
  2. 3.72
  3. 5.82
  4. 4.11
ব্যাখ্যা

Let,
The speed of the stream is x km/hr.
Then,
Downstream Speed = (12 + x) km/hr
Upstream Speed = (12 - x) km/hr
The boat covers, 40 km downstream in 7 hours
Then we have,
[ 40/(12 + x) ] + [ 40/(12 - x) ] = 7
⇒ [{40(12 - x) + 40(12 + x)}/{(12 + x)(12 - x)}]
⇒[40(12 - x) + 40(12 + x)] = 7(144 - x2)
⇒ 480 - 40x + 480 + 40x = 1008 - 7x2
⇒ 960 = 1008 - 7x2
⇒ 7x2= 1008 - 960
⇒ 7x2 = 48
⇒ x2 = 48/7
⇒ x2 = 6.92
⇒ x = 2.63
Hence, the speed of the stream is 2.63 km/hr.

২,৪৪৯.
A is two years older than B who is twice as old as C. If the total of the ages of A, B and C be 27, then how old is B?
  1. 11
  2. 7
  3. 9
  4. 10
  5. 8
ব্যাখ্যা
Let C's age be x years.
Then,
B's age = 2x years.
A's age = (2x + 2) years.
(2x + 2) + 2x + x = 27
5x = 25
x = 5.
Hence,
B's age = 2x = 10 years.
২,৪৫০.
If 16 men working 7 hours a day can plow a field in 48 days, in how many days will 14 men working 12 hours a day plow the same field?
  1. 46
  2. 35
  3. 32
  4. 30
ব্যাখ্যা
Question: If 16 men working 7 hours a day can plow a field in 48 days, in how many days will 14 men working 12 hours a day plow the same field?

Solution:
Let the one-day work = number of men ×  total working hours per day
Now, the ratio of total work = (14 × 12) : (16 × 7)
Now, the ratio of days = 48 : x
Where x is the required number of days
Now,
one day work is inversely proportional to the number of days:
So, (14 × 12) : (16 × 7) = 48: x
Or, x = (48 ×16 × 7)/ (14 × 12) = 32

Therefore, 32 days are required to plow the same field.
২,৪৫১.
If A : B = (1/2) : (1/3) and B : C = (1/2) : (1/3), then A : B : C =? 
  1. 3 : 6 : 4
  2. 9 : 6 : 5
  3. 9 : 6 : 4
  4. None of these
ব্যাখ্যা
Question: If A : B = (1/2) : (1/3) and B : C = (1/2) : (1/3), then A : B : C =? 

Solution: 
A : B = (1/2) : (1/3)
⇒ A : B = (6/2) : (6/3)
= 3 : 2
= (3 × 3) : (3 × 2)
= 9 : 6

B : C = (1/2) : (1/3)
⇒ B : C = (6/2) : (6/3)
= 3 : 2
= (3 × 2) : (2 × 2)
= 6 : 4

then A : B : C = 9 : 6 : 4
২,৪৫২.
In how many different ways can the letters of the word MAGIC can be formed?
  1. 24 ways
  2. 120 ways
  3. 240 ways
  4. 720 ways
  5. None of these
ব্যাখ্যা
Question: In how many different ways can the letters of the word MAGIC can be formed?

Solution:
he word "MAGIC" consists of 5 distinct letters: M, A, G, I, C.
The formula for finding the number of permutations of n distinct items is given by n!
Here,
n = 5.

So, we need to calculate 5!
5! = 5 × 4 × 3 × 2 × 1 = 120

Therefore, the number of different ways the letters of the word 'MAGIC' can be formed is 120.
২,৪৫৩.
A train takes 20 seconds to cross a pole. It takes 50 seconds to cross the platform. What is the ratio of the length of the platform to that of the train? 
  1. 2 : 3
  2. 2 : 5
  3. 5 : 2
  4. 3 : 2 
  5. None
ব্যাখ্যা
Question: A train takes 20 seconds to cross a pole. It takes 50 seconds to cross the platform. What is the ratio of the length of the platform to that of the train?

Solution:
Let,
The speed of the train is x m/s

While cross the pole the train travels 20 × x meters = 20x meters, which is the length of the train

While cross the platform the train travels 50 × x meters = 50x meters
∴ Length of the platform 50x - 20x = 30x meters

∴ Length of the platform : Length of the train = 30x : 20x = 30 : 20 = 3 : 2
২,৪৫৪.
If the price of a commodity increases by 50%, by what fraction should the quantity consumed be decreased to maintain the same total expenditure?
  1. 1/2
  2. 1/3
  3. 1/4 
  4. 1/5
  5. None
ব্যাখ্যা

Question: If the price of a commodity increases by 50%, by what fraction should the quantity consumed be decreased to maintain the same total expenditure?

Solution:
Let the initial price of the commodity be 100.

After a 50% increase in price,
The increased price will be 150.
Now, we have to reduce the consumption to keep expenditure at 100.

Increase in price = 150 - 100 = 50

∴ We have to reduce the consumption
= (50/150) × 100
= 33.33% or 1/3

২,৪৫৫.
The sum of the ages of a father and his son is 45 years. Five years ago, the product of their ages was 4 times the father's age at that time. What are the present ages of the father and son?
  1. 10, 40
  2. 12, 45
  3. 9, 36
  4. 18, 64
ব্যাখ্যা

Question: The sum of the ages of a father and his son is 45 years. Five years ago, the product of their ages was 4 times the father's age at that time. What are the present ages of the father and son?

Solution:
ধরি,
বর্তমানে বাবার বয়স = x বছর
বর্তমানে ছেলের বয়স = (45 - x) বছর

5 বছর আগে,
বাবার বয়স = x - 5
ছেলের বয়স = (45 - x) - 5 = 40 - x

প্রশ্নমতে,
(x - 5)(40 - x) = 4(x - 5)
⇒ 40 - x = 4
⇒ x = 40 - 4 = 36

∴ বাবার বর্তমান বয়স = 36 বছর
ছেলের বর্তমান বয়স = 45 - 36 = 9 বছর

২,৪৫৬.
A, B and C started a business by investing Tk. 250000, Tk. 300000 and Tk. 350000 respectively. Find the share of B, out of an annual profit of Tk. 187200.
  1. Tk. 65400
  2. Tk. 62400
  3. Tk. 63400
  4. Tk. 66200
ব্যাখ্যা
Question: A, B and C started a business by investing Tk. 250000, Tk. 300000 and Tk. 350000 respectively. Find the share of B, out of an annual profit of Tk. 187200.

Solution:
Ratio of shares of A, B and C = Ratio of their investment
A : B : C = 250000 : 300000 : 350000
= 5 : 6 : 7

Share of B = Tk. [(187200 × 6)/ 18] = 62400.
২,৪৫৭.
A student gets 3 marks for each correctly done question but loses 2 marks for each wrongly done question. He attempts 40 questions and gets 70 marks. How many questions has he attempted wrongly?
  1. 9
  2. 10
  3. 12
  4. 15
  5. None
ব্যাখ্যা
Question:  A student gets 3 marks for each correctly done question but loses 2 marks for each wrongly done question. He attempts 40 questions and gets 70 marks. How many questions has he attempted wrongly?

Solution:
Let,
the number of correct answers be x,
and the number of wrong answers is (40 - x).

ATQ,
3x - 2(40 - x) = 70
⇒ 3x - 80 + 2x = 70
⇒ 5x - 80 = 70
⇒ 5x = 150
⇒ x = 150/5
∴ x = 30

∴ He attempted 30 questions correctly.
∴ The number of wrong answers is = (40 - 30) = 10 questions
২,৪৫৮.
If each edge of a cube is increased by 50%, find the percentage increase in its surface area.
  1. 125%
  2. 150%
  3. 175%
  4. 110%
ব্যাখ্যা
Question: If each edge of a cube is increased by 50%, find the percentage increase in its surface area.

Solution:
Let the edge = a cm
New measure of the edges after increase = a + 50% of a = a + a/2 = 3a/2

Total surface area of the original cube= 6a2

Total surafec area of the new cube = 6 × (3a/2)2
= 6 × (9a2/4)
= (9/4) × 6a2
= 2.25 × 6a2
= 2.25 × Total surface area of the original cube

Increase in the area
= New total surface area - orignal suface area
= (2.25 - 1) × 6a2
= 1.25 × 6a2

Total surface area of the original cube = 1.25 × Total surface area of the original cube.

∴ Percentage increase in surface area = 125%
২,৪৫৯.
A person has to completely put each of three liquids: 403 litres of petrol, 465 litres of diesel and 496 litres of Mobil Oil in bottles of equal size without mixing any of the above three types of liquids such that each bottle is completely filled. What is the least possible number of bottles required?
  1. 41
  2. 44
  3. 47
  4. 52
ব্যাখ্যা

Question: A person has to completely put each of three liquids: 403 litres of petrol, 465 litres of diesel and 496 litres of Mobil Oil in bottles of equal size without mixing any of the above three types of liquids such that each bottle is completely filled. What is the least possible number of bottles required?

Solution: For the least number of bottles, the capacity of each bottle must be maximum.
The capacity of each bottle = HCF of 403 liters, 465 liters, and 496 liters
= 31 liters.

For petrol, required number of bottles = 403/31 = 13
For diesel, required number of bottles = 465/31 = 15
For mobil, required number of bottles = 496/31 = 16

Hence,
required number of bottles = 13 + 15 + 16 = 44

২,৪৬০.
40 is subtracted from 60% of a number, the result is 50. Find the number?
  1. ক) 110
  2. খ) 330
  3. গ) 340
  4. ঘ) 150
ব্যাখ্যা
Question: 40 is subtracted from 60% of a number, the result is 50. Find the number?

Solutuion: 

ধরি,
সংখ্যাটি x 
প্রশ্নমতে,
x এর 60% - 40 = 50
60x/100 = 40 + 50
3x/5 = 90
3x = 90 × 5
x = (90 × 5)/3
x = 150
২,৪৬১.
The sum of the two numbers is 684 and their H.C.F is 57. The number of possible pairs of such numbers is -
  1. 1
  2. 2
  3. 3
  4. 4
  5. 7
ব্যাখ্যা
Let the two numbers be x and y respectively.

It is given that the sum of the two numbers is 684, therefore,
      
x+y = 684

Also, 57 is their HCF, thus both numbers must be divisible by 57.

So, let x = 57a and y = 57b, then  

57a + 57b = 684
⇒ 57(a+b)=684
⇒ a+b = 684/57
⇒ a+b=12

Therefore, the required possible pair of values of x and y which are prime to each other is (1,11) and (5,7).

Thus, the required numbers are (57, 627) and (285, 399).
Hence, the number of possible pairs is 2.
২,৪৬২.
If a+b+c = 12, a+b = 4, and a+c = 7, what is the value of a?
  1. ক) 2
  2. খ) -1
  3. গ) 3/23
  4. ঘ) -2
ব্যাখ্যা

Here, a + b + c = 12 & a + b = 4
So, c = 8
As, a + c = 7
∴ a = 7 - 8 = -1

২,৪৬৩.
Ten year ago A was half of B in age. If the ratio of their present ages is 3 : 4, what will be the total of their present ages
  1. ক) 15
  2. খ) 25
  3. গ) 35
  4. ঘ) 45
ব্যাখ্যা

Let A's age 10 year ago = x year. 
Then, B's age 10 year ago = 2x year.
(x + 10) / (2x+ 10) = 3/4 
=> x = 5.
So, the total of their present ages 
=(x + 10 + 2x + 10) 
= (3x + 20) 
= 35 year.

২,৪৬৪.
A seller bought 120 pens for 600 taka. How many pens does he need to sell for 600 taka to make a profit of 20%?
  1. 80 pens
  2. 110 pens
  3. 120 pens
  4. 100 pens
ব্যাখ্যা

Question: A seller bought 120 pens for 600 taka. How many pens does he need to sell for 600 taka to make a profit of 20%?

Solution:
Cost price of 120 pens = Tk. 600 Cost price per pen = 600 ÷ 120
= Tk. 5

∴ Selling price per pen for 20% profit = 5 × (120/100)
= 5 × 1.2
= Tk. 6

∴ Number of pens to be sold for Tk. 600
= 600 ÷ 6
= 100 pens

২,৪৬৫.
If a boy sells a book for Tk. 450 he gets a loss of 10%, then finds the cost price. To gain 10%, what should be the selling price?
  1. ক) 400, 500
  2. খ) 550, 600
  3. গ) 500, 550
  4. ঘ) 475, 525
ব্যাখ্যা

1) Find the cost price

Let C.P. of book = x and S.P. = Tk. 450
S.P. of book = C.P. – (10% of C.P.)
S.P. = x – (0.10x)
450 = 0.9 x
x i.e cost price = Tk. 500

2) Find Selling Price to gain 10%.

Now, we are asked to find a selling price to gain 10% profit.
Selling price = (100 + Gain%)/100 × C.P.
Selling price = (100 + 10)/100 × 500
Selling price = (110/100) × 500
= Tk. 550

২,৪৬৬.
A letter is taken out at random from 'ASSISTANT'  and another is taken out from 'STATISTICS'. The probability that they are the same letter is :
  1. 19/90 
  2. 35/96
  3. 35/73
  4. 1/5
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 letter is :

Solution: 
For S = (3/9) × (3/10) = 1/10
For A = (2/9) × (1/10) = 1/45
For I = (1/9) × (2/10) = 1/45
For T = (2/9) × (3/10) = 1/15

Total probability = (1/10) + (1/45) + (1/45) + (1/15)
= 19/90 
২,৪৬৭.
If (16)2x + 3 = (4)3x + 6, than x = ?
  1. - 2
  2. 4
  3. 0
  4. - 3
ব্যাখ্যা
Question: If (16)2x + 3 = (4)3x + 6, than x = ?

Sulotion:
Given that,
⇒ (16)2x + 3 = (4)3x + 6
⇒ (24)2x + 3 = (22)3x + 6
⇒ (2)8x + 12 = (2)6x + 12
⇒ 8x + 12 = 6x + 12
⇒ 8x - 6x = 12 - 12
⇒ 2x = 0
∴ x = 0
২,৪৬৮.
The ratio of the present ages of P and Q is 3 : 4. Five years ago, the ratio of their ages was 5 : 7. Find their present ages.
  1. 30, 40
  2. 24, 32
  3. 27, 36
  4. 40, 50
ব্যাখ্যা

Question: The ratio of the present ages of P and Q is 3 : 4. Five years ago, the ratio of their ages was 5 : 7. Find their present ages.

Solution:
As the ratio of their present ages is 3 : 4 ,
let their present ages be 3x and 4x.
So, 5 years ago, as the ratio of their ages was 5 : 7,

According to the question,
(3x - 5) : (4x - 5) = 5 : 7
⇒ (3x - 5)/(4x - 5) = 5/7
⇒ 21x - 35 = 20x - 25
⇒ x = 10

Hence, their present ages are 3x = 30 and 4x = 40

২,৪৬৯.
A dice is cast twice, and the sum of the appearing numbers is 10. The probability that the number 5 has appeared at least once is-
  1. 2/3
  2. 1/2
  3. 1/5
  4. 1/3
ব্যাখ্যা

Question: A dice is cast twice, and the sum of the appearing numbers is 10. The probability that the number 5 has appeared at least once is-

Solution:
A dice is cast twice
Sum of the numbers = 10
Find probability that number 5 appears at least once

Now,
All possible pairs (first die, second die) whose sum = 10 is,
(4, 6), (5, 5), (6, 4)
∴ Total outcomes = 3

And,
Outcomes with at least one 5
From the above pairs we get only 1 outcome has at least one 5.

 ∴ Probability = Favorable Outcome/Total outcomes = 1/3

২,৪৭০.
Let A, B, C, D be the angles of a quadrilateral. If they are concyclic, then the value of cos A + cos B + cos C + cos D is ?
  1. 0
  2. 1
  3. 2
  4. 3
ব্যাখ্যা
Every angle = 90°
So, A = B = C = D = 90°
∴ cosA + cosB + cosC + cosD
= cos90° + cos90° + cos90° + cos90°
= 0 + 0 + 0 + 0
= 0
২,৪৭১.
If a man rows at the rate of 7 kmph in still water and his rate against the current is 4 kmph, then the man's rate along the current is-
  1. ক) 3 kmph 
  2. খ) 5 kmph 
  3. গ) 8 kmph 
  4. ঘ) 10 kmph 
ব্যাখ্যা
Question: If a man rows at the rate of 7 kmph in still water and his rate against the current is 4 kmph, then the man's rate along the current is-

Solution: 
Speed of current = 7 - 4 = 3 km
so, the speed in downstream = 7 + 3 = 10 kmph 
২,৪৭২.
If each side of a square is increased by 25%, find the percentage change in its area.
  1. ক) 24.25%
  2. খ) 43.25%
  3. গ) 56.25%
  4. ঘ) 66.25%
ব্যাখ্যা
Question: If each side of a square is increased by 25%, find the percentage change in its area.

Solution: 
Let, each side of the square be a,
then area = a2
Given that The side is increased by 25%, then

New side = 125a/100 = 5a/4
New area = (5a/4)2

Increased area = (25a2/16) − a2
= (25a2 - 16a2)/16
= 9a2/16

∴ Increase % = [9a2/16]/a2 × 100 %
= 56.25%
২,৪৭৩.
A woman complete a journey in 8 hours. She travels first half of the journey at the rate of 30 km/hr and second half at the rate of 20 km/hr. Find the total journey in km.
  1. 292 km
  2. 322 km
  3. 192 km
  4. 300 km
  5. None of these
ব্যাখ্যা
Question: A woman complete a journey in 8 hours. She travels first half of the journey at the rate of 30 km/hr and second half at the rate of 20 km/hr. Find the total journey in km.

Solution:
Let, Total distance = x
⇒ {(1/2)x/30} + {(1/2)x}/20 = 8
⇒ (x/30) + (x/20) = 16
⇒ (2x + 3x)/60 = 16
⇒ 5x = 16 × 60
⇒ x = (16 × 60)/5
∴ x = 192

So, the total distance is 192 km.
২,৪৭৪.
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. 2/5
  3. 1/2
  4. 1/3
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 numbers (5, 10, 15, 20, 25,.....,100)
when n + 1 is divisible by 5, there are 20 such numbers (4, 9, 14,.....,99)

∴ probability = (20 + 20)/100
= 40/100
= 2/5
২,৪৭৫.
The ratio of X : Y is 3 : 5, and the ratio of Y : Z is 6 : 7. If X = 18, what is the value of Z? 
  1. 28
  2. 30
  3. 35
  4. 25
ব্যাখ্যা

Question: The ratio of X : Y is 3 : 5, and the ratio of Y : Z is 6 : 7. If X = 18, what is the value of Z?

Solution:
Given that,
X : Y = 3 : 5
Y : Z = 6 : 7
And X = 18

Now,
X : Y = 3 : 5
⇒ X/Y = 3/5
⇒ 5X = 3Y
⇒ Y = (5 × 18)/3 ; [X = 18]
∴ Y = 30

And,
Y : Z = 6 : 7
Y/Z = 6/7
⇒ 30/Z = 6/7
⇒ Z = (30 × 7)/6
∴ Z = 35

So the value of Z is 35.

২,৪৭৬.
A man's present age is two-fifth of the age of his mother. After 8 years, he will be one-half of the age of his mother. What is the sum of their ages at present ages?
  1. ক) 40
  2. খ) 48
  3. গ) 52
  4. ঘ) 56
ব্যাখ্যা
Question: A man's present age is two-fifth of the age of his mother. After 8 years, he will be one-half of the age of his mother. What is the sum of their ages at present ages?

Solution: 
Let, the mother's age be = x years
so, man's age = (2x/5) years

According to the question,
(2x/5) + 8 = (x + 8)/2
⇒ (2x + 40)/5 = (x + 8)/2
⇒ 5x + 40 = 4x  + 80
⇒ x = 40

mother's age = 40 years
man's age =  (2 × 40)/5 = 16 years

So, sum their age = 40 + 16 = 56 years
২,৪৭৭.
A can do a work in 15 days and B in 20 days. They work on it together for 4 days, then the fraction of the work that is left is -
  1. 1/4
  2. 1/8
  3. 1/15
  4. 8/15
ব্যাখ্যা
Question: A can do a work in 15 days and B in 20 days. They work on it together for 4 days, then the fraction of the work that is left is -

Solution:
A's 1 day work 1/15 
B's 1 day work 1/20

A and B's 1 day work (1/15 + 1/20) = (4 + 3)/60 = 7/60
∴ A and B's 4 day work = 28/60 = 7/15

∴ Remaining work = (1 - 7/15) = 8/15
২,৪৭৮.
A man reduces his speed from 20 kmph to 18 kmph. So, he takes 10 minutes more than the normal time. What is the distance traveled by him?
  1. ক) 30 km
  2. খ) 25 km
  3. গ) 50 km
  4. ঘ) 36 km
ব্যাখ্যা

As the speed decreases from 20 kmph to 18 kmph i.e. 10 % increment in usual time.
10% = 10 min
100% = 100 min.

Now,
Distance traveled by him,
= (100/60) × 18
= 30 km.

২,৪৭৯.
A 2-year certificate of deposit is purchased for Tk. K. If the certificate earns interest at an annual rate of 6 percent compound quarterly, which of the following represents the value, in Tk., of the certificate at the end of 2 years?
  1. k(1.06)6
  2. k(1.06)8
  3. k(1.015)8
  4. k(1.015)2
  5. k(1.06)2
ব্যাখ্যা
Question: A 2-year certificate of deposit is purchased for Tk. K. If the certificate earns interest at an annual rate of 6 percent compound quarterly, which of the following represents the value, in Tk., of the certificate at the end of 2 years?

Solution:
Annual Rate of interest= 6%
∴ Quaterly rate of interest= (6/4)% = 1.5% = 1.5/100 = 0.015

Now, periods of compounding in 2 years= 8 (8 quarters)

value of k at the end of 2 years, if compounded quaterly = k(1 + r)n
= k(1 + 0.015)8
= k(1.015)8
২,৪৮০.
A tap can fill a tank in 6 hours. After half the tank is filled, three more similar taps are opened. What is the total time taken to fill the tank completely?
  1. 3 hrs 15 min
  2. 3 hrs 45 min
  3. 4 hrs 15 min
  4. 4 hrs 1 min
ব্যাখ্যা
Question: A tap can fill a tank in 6 hours. After half the tank is filled, three more similar taps are opened. What is the total time taken to fill the tank completely?

Solution:
Time taken by one tap to fill half of the tank = 3 hrs.
Part filled by the four taps in 1 hour = 4 × (1/6) = 2/3
Remaining part =(1 - 1/2) = 1/2

Four taps filled 2/3 part in 60 min
∴ Four taps filled full part in (60 × 3)/2 min
∴ Four taps filled 1/2 part in (60 × 3)/(2 × 2) min
= 45 min

So, total time taken = 3 hrs. 45 mins.
২,৪৮১.
Digit 1 is occurring 136 times on writing all of the page numbers of a book. What will be the number of pages in the book?
  1. 194
  2. 195
  3. 200
  4. 295
ব্যাখ্যা
Question: Digit 1 is occurring 136 times on writing all of the page numbers of a book. What will be the number of pages in the book?

Solution:
From 1 - 99, the digit 1 occurs 20 times, 
from 100 - 199, the digit 1 occurs 120 times.
So, from 1 to 199, the digit 1 occurs  20 + 120 = 140 times
According to question 1 is occurring only 136 times, which means we need to remove 196, 197, 198, and 199.
So, the required number of pages will be 195.
২,৪৮২.
A group has 8 men and 7 women. In how many ways can a committee of 5 people be formed if the number of women is at least 3?
  1. 785
  2. 988
  3. 1281
  4. 1125
ব্যাখ্যা

Question:  A group has 8 men and 7 women. In how many ways can a committee of 5 people be formed if the number of women is at least 3?

​Solution:
​Given that,
​Total committee size = 5

And for women ≥ 3, possible distributions:
Three ways to formed the committee
1. 3 women + 2 men
2. 4 women + 1 man
3. 5 women + 0 men

​Now, 1st case- 3 women + 2 men
​Choose 3 women from 7, (7C3) = 35
​Choose 2 men from 8,  (8C2) = 28
​∴ Total ways = 35 × 28 = 980

​2nd case- 4 women + 1 man
​Choose 4 women from 7, (7C4) = 35
Choose 1 man from 8, (8C1) = 8
 ​∴ Total ways = 35 × 8 = 280

​And 3rd case-​5 women + 0 men
Choose 5 women from 7,  (7C5) = 21
No men to choose
​∴ Total ways = 21

​∴ ​Total ways = 980 + 280 + 21= 1281

২,৪৮৩.
In a code SUMMER is written as RUNNER, WINTER is written as VIOUER, then how can SPRING be written in the same code?
  1. TPSGNG
  2. ENLTSO
  3. QORIMF
  4. RPSJNG
ব্যাখ্যা
Question: In a code SUMMER is written as RUNNER, WINTER is written as VIOUER, then how can SPRING be written in the same code?

Solution:
Given,
S          U       M         M         E       R
↓(- 1)  ↓(0)     ↓(+ 1)   ↓(+ 1)   ↓(0)  ↓(0)
R         U       N          N          E       R

W         I        N         T          E        R
↓(- 1)   ↓(0)   ↓(+ 1)   ↓(+ 1)  ↓(0)    ↓(0)
V          I        O         U         E        R

Similarly,

S         P        R         I         N       G
↓(- 1)  ↓(0)    ↓(+ 1)  ↓(+ 1) ↓(0)    ↓(0)
R        P        S          J        N        G
২,৪৮৪.
What is the average (arithmetic mean) of the numbers 15, 16, 17, 17, 18, and 19?
  1. 14.2
  2. 16.5
  3. 17
  4. 17.5
ব্যাখ্যা
Question: What is the average (arithmetic mean) of the numbers 15, 16, 17, 17, 18, and 19?

Solution:
Sum = 15 + 16 + 17 + 17 + 18 + 19 = 102
Average = Sum/number of entities = 102/6 = 17
২,৪৮৫.
A starts business with Tk 3500 and after 5 months, B joins with A as his partner. After a year, the profit is divided between A and B in the ratio 2 : 3. What is B's contribution, in Tk. in the capital? 
  1. 9000
  2. 8500
  3. 8000
  4. 7500
  5. None
ব্যাখ্যা
Question: A starts business with Tk 3500 and after 5 months, B joins with A as his partner. After a year, the profit is divided between A and B in the ratio 2 : 3. What is B's contribution, in Tk. in the capital?

Solution:
Let B's capital be Tk. x.
Then,
(3500 × 12)/7x = 2/3
⇒ 14x = 126000
∴ x = 9000.
২,৪৮৬.
A copy machine, working at a constant rate, makes 35 copies per minute. A second copy machine, working at a constant rate, makes 55 copies per minute. Working together at their respective rates, how many copies do the two machines make in half an hour?
  1. 1700 copies
  2. 2000 copies
  3. 2400 copies
  4. 2700 copies
ব্যাখ্যা
Question: A copy machine, working at a constant rate, makes 35 copies per minute. A second copy machine, working at a constant rate, makes 55 copies per minute. Working together at their respective rates, how many copies do the two machines make in half an hour?

Solution:
first copy machine makes 35 copies in  1 minute 
In 30 minutes, it will make  35 × 30 = 1050 copies

first copy machine makes 55 copies in  1 minute 
In 30 minutes, it will make  55 × 30 = 1650 copies

total copies = 1050 copies + 1650 copies
= 2700 copies
২,৪৮৭.
Robi buys a second-hand car for Tk. 2,00,000. He then repaints it for Tk. 2000. He attaches new threading to all 4 tyres. Cost of threading per tyre is Tk. 200. At what price he should resell the car so that he gains 10%?
  1. 223080
  2. 223090
  3. 232080
  4. 223880
ব্যাখ্যা

Cost of second hand car = Tk. 2,00,000
Repainting cost = Tk. 2000
Cost of threading per tyre = Tk. 200
Cost of threading for all tyres = Tk. 200 x 4 = Tk. 800
Total costs involved = Actual cost + Repainting costs + Threading costs
= 2,00,000 + 2000 + 800
= 202800
Profit Percentage = 10% = (SP - CP)/CP x 100%
Or, 10% = (SP - 202800)/202800 x 100%
Or, 10 = (SP - 202800)/2028
Or, 20280 = SP - 202800
Or, SP = 20280 + 202800
= 223080.
∴ Selling Price = 223080

২,৪৮৮.
What is John's present age, if 10 years later his age will be 5 times his age 6 years ago?
  1. 16.2 years
  2. 7.7 years
  3. 8.7 years
  4. 10 years
  5. None of these
ব্যাখ্যা
Question: What is John's present age, if 10 years later his age will be 5 times his age 6 years ago?

Solution:
Let John's present age be x
John's age 6 years ago = (x - 6)
John's age 10 years later = (x + 10)
We are given that John's age after 10 years (x + 10) is 5 times his age 6 years ago (x - 6). 

Therefore, 
(x +10) = 5(x - 6)
⇒ x + 10 = 5x - 30
⇒ 4x = 40
∴ x = 10 
২,৪৮৯.
Mina is 25% more efficient than Rina. Rina alone can build a craft in 20 days. Find the number of days taken by Mina to finish the same piece of work?
  1. ক) 18 days
  2. খ) 20 days
  3. গ) 16 days
  4. ঘ) 14 days
ব্যাখ্যা
The ratio of times taken by Rina and Mina
= 125 : 100
= 5: 4.
Suppose Mina takes x days to do the work.
5 : 4 = 20 : x
so, 5x= (4 x 20)
or, 5x = 80
       x= 80/5
      x =16 days
২,৪৯০.
In a cricket match, 6 players had an average X of their runs. Average increases by 10 runs, if the seventh player makes a score of 112 runs. What is the average of the first 6 players?
  1. ক) 36
  2. খ) 39
  3. গ) 40
  4. ঘ) 42
ব্যাখ্যা

The average of 6 players = X
Average increases by 10, when the seventh player makes a score of 112 runs.
Therefore, average of 7 players = X + 10
Average =Sum of Scores/Number of Players -------(1)
Here, average = X, number of players = 6
Hence,
Sum of scores = 6X
Score of 7 players = (Score of 6 players + score of 7 player) = (6X + 112)------- (2)
Total average = (X + 10) --------- (3)
Substitute (2) and (3), in (1)
(X + 10) = (6X + 112)/7
⇒ 7X + 70 = 6X + 112
⇒ 7X - 6X = 112 - 70
⇒ X = 42.

২,৪৯১.
A piece of wire 91 cm long is bent in the form of an isosceles triangle. If the ratio of one of the equal sides to the base is 5 : 3, then what is the length of the base?
  1. ক) 24 cm
  2. খ) 21 cm
  3. গ) 18 cm
  4. ঘ) 14 cm
ব্যাখ্যা
Question: A piece of wire 91 cm long is bent in the form of an isosceles triangle. If the ratio of one of the equal sides to the base is 5 : 3, then what is the length of the base?

Solution:
Given,
Ratio of one of the equal sides to the base is 5 : 3
Therefore, the sides are 5x, 3x, 5x.

91 cm piece of wire is bent to form an isosceles triangle.
Thus perimeter of triangle is 91 cm.

ATQ,
∴ 13x = 91
⇒ x = 7

Thus the length of the base = 3 × 7 = 21 cm.
২,৪৯২.
A store sells an item for Tk. 1.50 each, or 3 items amounted to Tk. 3.50. If 202 items were sold and revenue amounted to Tk 279.00, how many of these items were sold one at a time?
  1. ক) 150
  2. খ) 120
  3. গ) 40
  4. ঘ) 130
ব্যাখ্যা
প্রশ্ন: A store sells an item for Tk. 1.50 each, or 3 items amounted to Tk. 3.50. If 202 items were sold and revenue amounted to Tk 279.00, how many of these items were sold one at a time?

সমাধান: 
একটি দোকানে, একটি দ্রব্য একটি করে বিক্রয় করলে প্রতিটি ১.৫ টাকা পড়ে।
কিন্তু, একই দ্রব্য ৩ টি করে বিক্রয় করলে ৩.৫ টাকা পড়ে। 

ধরি, একটি করে ক সংখ্যক দ্রব্য বিক্রয় করা হয়েছে। 
খরচ = ১.৫ক 

অতএব, বাকি ২০২ - ক সংখ্যক দ্রব্য তিনটি একসাথে বিক্রয় করা হয়েছে। 
খরচ = (২০২ - ক) × ৩.৫/৩
= (৭০৭ - ৩.৫ক)/৩

প্রশ্নমতে, 
১.৫ক + (৭০৭ - ৩.৫ক)/৩ = ২৭৯ 
⇒ ৪.৫ক + ৭০৭ - ৩.৫ক = ৩ × ২৭৯ 
⇒ ৪.৫ক + ৭০৭ - ৩.৫ক = ৮৩৭ 
⇒ ক + ৭০৭ = ৮৩৭
⇒ ক = ৮৩৭ - ৭০৭ 
∴ ক = ১৩০ টি 

অতএব, একটি করে দোকানদার ১৩০ টি দ্রব্য বিক্রয় করেছে। 
২,৪৯৩.
A is two years older than B who is twice as old as C. If the total age of A, B and C is 27, then how old is B?
  1. ক) 7
  2. খ) 8
  3. গ) 9
  4. ঘ) 10
ব্যাখ্যা

ধরি, C এর বয়স x বছর
তাহলে B এর বয়স = 2x বছর এবং A এর বয়স = (2x + 2) বছর
প্রশ্নমতে, x + 2x + 2x + 2 = 27
⇒ 5x = 27 - 2
⇒ x = 25/5
⇒ x = 5
∴ B এর বয়স (2×5) বছর = 10 বছর

২,৪৯৪.
In a certain class consisting of 36 students, some boys and some girls, exactly 1/3 of the boys and exactly 1/4 of the girls walk to school. What is the greatest possible number of students in this class who walk to school?
  1. ক) 9
  2. খ) 10
  3. গ) 11
  4. ঘ) 12
ব্যাখ্যা

Since 1/3 (boys) > 1/4 (girls); have to maximize number of boys

The number of girls has to be a multiple of 4 since we cannot have half girls and number of boys multiple of 3

Working backwards.

36 - 4 girls = 32 boys not divisible by three
36 - 8 girls = 28 boys not divisible by three
36 - 12 girls = 24 boys which is divisible by three

So there are 24 boys and 12 girls

∴ total of 24×1/3 + 12×1/4 = 11 students walk to school

২,৪৯৫.
Which number will complete the series:
1, 3, 7, 15, 31, 63, 127, __?
  1. 252
  2. 254
  3. 255
  4. 257
ব্যাখ্যা
Question: Which number will complete the series:
1, 3, 7, 15, 31, 63, 127, __?

Solution:
3 - 1 = 2
7 - 3 = 4 = 2 × 2
15 - 7 = 8 = 4 × 2
31 - 15 = 16 = 8 × 2
63 - 31 = 32 = 16 × 2
127 - 63 = 64 = 32 × 2

∴ The next number of 127 will be 127 + 64 × 2
= 127 + 128
= 255
২,৪৯৬.
বার্ষিক ৫% মুনাফায় ১৬,০০০ টাকার ২ বছরের সরল ও চক্রবৃদ্ধি মুনাফার পার্থক্য কত হবে?
  1. ৫০ টাকা
  2. ৬০ টাকা
  3. ৭০ টাকা
  4. ৪০ টাকা
  5. ৮০ টাকা
ব্যাখ্যা

প্রশ্ন: বার্ষিক ৫% মুনাফায় ১৬,০০০ টাকার ২ বছরের সরল ও চক্রবৃদ্ধি মুনাফার পার্থক্য কত হবে?

সমাধান:
এখানে,
মূলধন, P = ১৬০০০ টাকা
সুদের হার, R = ৫%
সময়, T = ২ বছর

সরল মুনাফা, I = (PRT)/১০০
= (১৬০০০ × ৫ × ২)/১০০
= ১৬০০০০/১০০
= ১৬০০ টাকা

চক্রবৃদ্ধি মুনাফার ক্ষেত্রে,
A = P × {১ + (R/১০০)}T
= ১৬০০০ × {১ + (৫/১০০)}
= ১৬০০০ × (১.০৫)
= ১৬০০০ × ১.১০২৫
= ১৭৬৪০ টাকা

∴ চক্রবৃদ্ধি মুনাফা, CI = A − P
= ১৭৬৪০ − ১৬০০০
= ১৬৪০ টাকা

∴ পার্থক্য = ১৬৪০ − ১৬০০ = ৪০ টাকা

২,৪৯৭.
Which number will complete the series:
3, 7, 15, 31, 63, ? 
  1. 117
  2. 127
  3. 89
  4. 93
ব্যাখ্যা

Question: Which number will complete the series:
3, 7, 15, 31, 63, ?

Solution:
The pattern is alternate multiplication by 2 and adding 1:
n = 2n + 1, where n = 3, 7, 15, 31...

The pattern:
(2 × 3) + 1 = 6 + 1 = 7
(2 × 7) + 1 = 14 + 1 = 15
(2 × 15) + 1 = 30 + 1 = 31
(2 × 31) + 1 = 62 + 1 = 63

So, the missing term = (2 × 63) + 1 = 126 + 1 = 127.

২,৪৯৮.
A and B are two partners in a firm sharing the profit in the ratio 4 : 5. If the firm earns a profit of Tk. 72000, then profit to be received by B ?
  1. ক) Tk. 40,000
  2. খ) Tk. 32,000
  3. গ) Tk. 48,000
  4. ঘ) Tk. 56,000
ব্যাখ্যা
Sum of 4 and 5 is 9
Share of B = 72000 × 5/9 = Tk. 40,000
২,৪৯৯.
If Tk. P is invested at an annual interest rate of 5 percent, which of the following gives the amount of simple interest, in Tk., earned after n months?
  1. 0.05P + n
  2. 0.05P + (n/12)
  3. 0.05P × n
  4. (0.05P)/(12n)
  5. 0.05P × (n/12)
ব্যাখ্যা
Question: If Tk. P is invested at an annual interest rate of 5 percent, which of the following gives the amount of simple interest, in Tk., earned after n months?

Solution:
Simple Interest, I = (Pnr)/100
= (P) × (5/100) × (n/12)
= 0.05P × (n/12)
২,৫০০.
A reduction of 25% in the price of sugar enables a housewife to purchase 5 kg more for 600 Taka. What is the original price per kg of sugar?
  1. Tk. 48
  2. Tk. 28
  3. Tk. 32
  4. Tk. 40
ব্যাখ্যা
Question: A reduction of 25% in the price of sugar enables a housewife to purchase 5 kg more for 600 Taka. What is the original price per kg of sugar?

Solution:
Let original price per kg = p Taka
Reduced price = p - p of 25% = 0.75p
Original quantity for 600 Taka
Q₁ = 600/p kg

And
New quantity for 600 Taka
Q₂ = 600/0.75p = 800/p kg

Now, quantity difference,
Q₂ - Q₁ = 5
(800/p) - (600/p) = 5
200/p = 5
p = 200/5
p = 40 

∴ Original price per kg = Tk. 40