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Bank Math

মোট প্রশ্ন১৬,১২৪এই পাতা১০০প্রতি পাতা১০০
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Bank Math

PrepBank · পাতা ৯৭ / ১৬১ · ৯,৬০১৯,৭০০ / ১৬,১২৪

৯,৬০১.
Given that the diagonal of a square measures 10√6 units, find the area of the square in units.
  1. 300 square units
  2. 400 square units
  3. 150√3 square units
  4. 560 square units
ব্যাখ্যা

Question: Given that the diagonal of a square measures 10√6 units, find the area of the square in units.

Solution:
দেয়া আছে,
বর্গক্ষেত্রের কর্ণের দৈর্ঘ্য = 10√6 একক

আমরা জানি,
বর্গক্ষেত্রের কর্ণের দৈর্ঘ্য = √2 × বাহু

প্রশ্নমতে,
√2 × বাহু = 10√6
⇒ বাহু = 10√6/√2
⇒ বাহু = 10√3 একক

এখন, বর্গক্ষেত্রের ক্ষেত্রফল  =  বাহু2
= (10√3)2
= 300 বর্গ একক

∴ বর্গক্ষেত্রের ক্ষেত্রফল 300 বর্গ একক 

৯,৬০২.
The average of ten numbers is 7. What will be the new average if each of the numbers is multiplied by 8?
  1. 51
  2. 63
  3. 56
  4. 48
  5. 41
ব্যাখ্যা
10 টি সংখ্যার সমষ্টি = 10 × 7 = 70

8 দ্বারা ওই দশটি সংখ্যার প্রত্যেককে গুণ করার পর সমষ্টি হবে = 70 × 8 = 560

∴ নতুন গড় = 560/10 = 56
৯,৬০৩.
331, 482, 551, 263, 383, 362, 284
  1. ক) 263
  2. খ) 383
  3. গ) 331
  4. ঘ) 551
ব্যাখ্যা
In each number except 383, the product of first and third digits is the middle one.
৯,৬০৪.
If (3/2)X = (5/7)Y = (6/5)Z, then what is X : Y : Z?
  1. 105 : 50 : 84
  2. 24 : 25 : 32
  3. 15 : 21 : 25
  4. 20 : 42 : 25
ব্যাখ্যা
Question: If (3/2)X = (5/7)Y = (6/5)Z, then what is X : Y : Z?

Solution:
(3/2)X = (5/7)Y = (6/5)Z .................(1)

LCM of their numerators = LCM of (3, 5, 6) = 30

Divide the eq. (1) by 30.
3X/(2 × 30) =5Y/(7 × 30) = 6Z/(5 × 30)
⇒ X/20 = Y/42 = Z/25

∴ X : Y : Z = 20 : 42 : 25
৯,৬০৫.
If 25% of (A + B) = 50% of (A - B), then find B : A -  
  1. 3 : 1
  2. 5 : 1
  3. 1 : 3
  4. 1 : 1
ব্যাখ্যা

Question: If 25% of (A + B) = 50% of (A - B), then find B : A - 

Solution: 
25% of (A + B) = 50% of (A - B)
⇒ (A + B) × 25/100 = (A - B) × 50/100
⇒ (A + B)/4 = (A - B)/2
⇒ 2 (A + B) = 4 (A - B)
⇒ 2A + 2B = 4A - 4B 
⇒ 4A - 2A = 2B + 4B
⇒ 2A = 6B
⇒ A/B = 6/2 = 3/1
∴ B/A = 1/3
= 1 : 3

৯,৬০৬.
7 is added to a certain number; the sum is multiplied by 5, the product is divided by 9 and 3 is subtracted from the quotient. The remainder left is 12. Find the number.
  1. 20
  2. 25
  3. 30
  4. 15
ব্যাখ্যা
Question: 7 is added to a certain number; the sum is multiplied by 5, the product is divided by 9 and 3 is subtracted from the quotient. The remainder left is 12. Find the number.

Solution:
Let the original number be x

ATQ,
{5(x + 7)/9} - 3 = 12
⇒ {5(x + 7) - 27}/9 = 12
⇒ 5(x + 7) - 27 = 108
⇒ 5x + 35 - 27 = 108
⇒ 5x + 8 = 108
⇒ 5x = 100
∴ x = 20
৯,৬০৭.
In a class, there are 18 boys and 12 girls. Four students are selected at random. The probability that 2 girls and 2 boys are selected, is-
  1. 263/405
  2. 374/1203
  3. 4/15
  4. 36/95
  5. None of the above
ব্যাখ্যা
Question: In a class, there are 18 boys and 12 girls. Four students are selected at random. The probability that 2 girls and 2 boys are selected, is-

Solution:
Let S be the sample space and E be the event of selecting 2 girls and 2 boys.
Then,
n(S) = Number ways of selecting 4 students out of 30
= 30C4
= 27,405

n(E) = (12C2 × 18C2)
= (66 × 153)
= 10,098

∴ P(E) = n(E)/n(S) = 10,098/27,405
= 374/1015
৯,৬০৮.
A worker was hired for 7 days. Each day, he was paid Tk. 10 more than what he was paid for the previous day of work. The total amount he was paid in the first 4 days of work equaled the total amount he was paid in the last 3 days. What was his starting pay?
  1. 80
  2. 85
  3. 90
  4. 95
ব্যাখ্যা
Question: A worker was hired for 7 days. Each day, he was paid Tk. 10 more than what he was paid for the previous day of work. The total amount he was paid in the first 4 days of work equaled the total amount he was paid in the last 3 days. What was his starting pay?

Solution: 
ধরি,
১ম দিন ছিলো x টাকা 

২য় দিন = x + 10
৩য় দিন = (x + 20)
৪র্থ দিন = (x + 30)
৫ম দিন = (x + 40)
৬ষ্ঠ দিন = (x + 50) 
৭ম দিন = (x + 60) টাকা

প্রশ্নমতে,
x + (x + 10) + (x + 20) + (x + 30) = (x + 40) + (x + 50) + (x + 60)
⇒ 4x + 60 = 3x + 150
⇒ 4x - 3x = 150 - 60
∴ x = 90
৯,৬০৯.
One diagonal of a rhombus is four times the other diagonal. If its area is 56 sq. cm, find the sum of the diagonals. 
  1. 14√2 cm
  2. 10√7 cm
  3. 12√3 cm
  4. 18√7 cm
ব্যাখ্যা

Question: One diagonal of a rhombus is four times the other diagonal. If its area is 56 sq. cm, find the sum of the diagonals.

Solution:
let, one diagonal is x cm, other is 4x

ATQ,
(1/2) × x × 4x = 56
⇒ 2x2 = 56
⇒ x2 = 28
⇒ x = √28 = 2√7
x = 2√7

sum of diagonals = x + 4x
= 5x
= 5 × 2√7
= 10√7 cm

৯,৬১০.
A rectangular area of 16 meter by 12 meter, is surrounded by a road 3 meters wide. The area of the road is
  1. 78
  2. 132
  3. 204
  4. 216
  5. None of these
ব্যাখ্যা

Area of rectangle without road = 16 × 12 = 192
Area of rectangle with road = (16 + 2 × 3) × (12 + 2 × 3) = 396
Area of road = 396 - 192 = 204.

৯,৬১১.
After receiving a 25% discount, Sue paid $180 for a lawnmower. What is the original price of the lawnmower before the discount?
  1. ক) 215
  2. খ) 220
  3. গ) 225
  4. ঘ) 240
ব্যাখ্যা

At 25% discount, 75% = 180
So, 100% = (180×100)/75 = 240

৯,৬১২.
Trader A offers a discount of 25% on the marked price for cash purchase. Trader B offers a trade discount of 20% and a cash discount of 5% on the same article marked at the same price as that of Trader A. As a buyer whom should I buy from if I am to pay cash?
  1. Trader A
  2. Trader B
  3. Inadequate data
  4. None of these
ব্যাখ্যা
Question: Trader A offers a discount of 25% on the marked price for cash purchase. Trader B offers a trade discount of 20% and a cash discount of 5% on the same article marked at the same price as that of Trader A. As a buyer whom should I buy from if I am to pay cash?

Solution:
Trader A:
If the marked price = 100
then the net price to the buyer = 0.75 × 100 = 75.

Trader B:
If the marked price = 100,
then the price after 1st discount = 0.8 × 100 = 80 and
the cash price = 0.95 × 80 = 0.76

Since the discount is higher or the price to me as a buyer is lower with Trader A, I should choose to buy from Trader A.
৯,৬১৩.
৭ জন ব্যক্তিকে ১ টি গোলটেবিলের চারপাশে কতভাবে বসানো যাবে?
  1. ২০০
  2. ২৮০
  3. ৫৬০
  4. ৪২০
  5. ৭২০
ব্যাখ্যা

প্রশ্ন: 7 জন ব্যক্তিকে 1 টি গোলটেবিলের চারপাশে কতভাবে বসানো যাবে?

সমাধান: 
7 জন ব্যক্তিকে 1 টি গোলটেবিলের চারপাশে সাজানো যাবে (n - 1)! উপায়ে।
= (7 - 1)! 
= 6!
= 720

৯,৬১৪.
Kiran purchased a scooter for Tk. 52000. He sold it at loss of 10%. With that money be purchased another scooter and sold it at profit of 20%. What is his overall loss/profit?
  1. ক) Tk. 2060 profit
  2. খ) Tk. 2560 loss
  3. গ) Tk. 1340 loss
  4. ঘ) Tk. 4160 profit
ব্যাখ্যা

At 10% loss, He got = (52000×90) / 100 = 46800 tk
His loss is = 52000 - 46800 = 5200

At 20% profit, He receives = (46800×120)/100 = 56160
Profit, 56160 - 46800 = 9360

∴ His net profit = 9360 - 5200 = 4160

৯,৬১৫.
If the sides of a square increase by 10%, how much will the area be increased in percentage?
  1. ক) 21%
  2. খ) 22%
  3. গ) 23%
  4. ঘ) 24%
ব্যাখ্যা
প্রশ্ন: If the sides of a square increase by 10%, how much will the area be increased in percentage?

সমাধান: 
ধরি, বর্গের এক বাহুর দৈর্ঘ্য ১০ মিটার।
ক্ষেত্রফল = ১০ বর্গমিটার
= ১০০ বর্গমিটার 

১০% বৃদ্ধিতে, বাহুর দৈর্ঘ্য = ১০ + ১০ এর ১০%
= ১০ + ১
= ১১ মিটার
ক্ষেত্রফল = ১১ বর্গমিটার 
= ১২১ বর্গমিটার 

ক্ষেত্রফল বৃদ্ধি = ১২১ - ১০০ বর্গমিটার 
= ২১ বর্গমিটার 
শতকরা ক্ষেত্রফল বৃদ্ধি = (২১/১০০) × ১০০%
= ২১%
৯,৬১৬.
The ratio of the present ages of a father and his son is 5 : 1. Five years ago, the ratio was 9 : 1. What will be the father's age five years from now?
  1. 50 years
  2. 60 years
  3. 65 years
  4. 55 years
ব্যাখ্যা

Question: The ratio of the present ages of a father and his son is 5 : 1. Five years ago, the ratio was 9 : 1. What will be the father's age five years from now?
 
Solution:
Let the present age of the son = x years
Then present age of the father = 5x years

Five years ago, Father's age = 5x - 5
And son's age = x - 5

According to the question,
(5x - 5) : (x - 5) = 9 : 1
⇒ (5x - 5)/(x - 5) = 9/1
⇒ 5x - 5 = 9(x - 5)
⇒ 5x - 5 = 9x - 45
⇒ 9x - 5x = 45 - 5
⇒ 4x = 40
⇒ x = 40/4 = 10
∴ x = 10

Therefore, present age of son = 10 years
present age of father = 5 × 10 = 50 years

Five years from now father's age = 50 + 5 = 55 years

So the father's age five years from now will be 55 years.

৯,৬১৭.
The average of several exam scores is 80. One make-up exam was given. Included with the other scores, the new average was 84. If the score on the make up exam was 92, how many total exams were given?
  1. ক) 3
  2. খ) 2
  3. গ) 4
  4. ঘ) 5
ব্যাখ্যা

Let, there was x exams (excluding the makeup exam)
ATQ, 80x + 92 = 84(x + 1)
Or, 80x + 92 = 84x + 84
Or, x = 2
So, total number of exams including the makeup exam = 2 + 1 = 3

৯,৬১৮.
the difference between two numbers is 3 and the difference between their squares is 63. Which is the larger number?
  1. ক) 9
  2. খ) 12
  3. গ) 15
  4. ঘ) Cannot be determined
  5. ঙ) None of these
ব্যাখ্যা

Let the number be x and y
Then,
x²−y² = 63 & x−y = 3
On dividing, we get: x + y = 21
Solving x + y = 21 and x - y = 3,
We get: x = 12 and y = 9
∴ Larger number = 12

৯,৬১৯.
A construction team can build a wall in 10 days. How many walls can they build in 100 days if they work at the same rate?
  1. ক) 5 walls
  2. খ) 8 walls
  3. গ) 10 walls
  4. ঘ) 12 walls
ব্যাখ্যা
Problem: A construction team can build a wall in 10 days. How many walls can they build in 100 days if they work at the same rate?

Solution:
The construction team builds 1 wall in 10 days.
In 100 days, they will build 100/10
= 10 walls.
৯,৬২০.
A fair coin is flipped three times. What is the probability that the coin lands head each time?
  1. 1/2
  2. 3/8
  3. 1/4
  4. 1/8
ব্যাখ্যা

Question: A fair coin is flipped three times. What is the probability that the coin lands head each time?

Solution:
All possible outcome = {HHH, HHT, HTT, ΗΤΗ, ΤΗΗ, TTH, THT, TTT} = 8

It will be head every time, this occurs 1 time = {HHH}

∴ Probability = 1/8

৯,৬২১.
15 buckets of water fill a tank when the capacity of each bucket is 15 litres. How many buckets will be needed to fill the same tank, if the capacity of each bucket is 25 liters?
  1. 12
  2. 11
  3. 10
  4. 9
ব্যাখ্যা
Question: 15 buckets of water fill a tank when the capacity of each bucket is 15 litres. How many buckets will be needed to fill the same tank, if the capacity of each bucket is 25 liters?

Solution:
The capacity of the tank = (15 x 15) litres
= 225 litres

The capacity of each bucket = 25 litres
Number of buckets needed = (225 ÷ 25) = 9
৯,৬২২.
A wholesale coffee dealer has 24 kilograms, 120 kilograms and 72 kilograms of three different qualities of coffee. He wants it all to be packed into various boxes of equal size without mixing. Find the capacity of the largest possible box.
  1. 50
  2. 36
  3. 24
  4. 45
  5. None of the above
ব্যাখ্যা
Question: A wholesale coffee dealer has 24 kilograms, 120 kilograms and 72 kilograms of three different qualities of coffee. He wants it all to be packed into various boxes of equal size without mixing. Find the capacity of the largest possible box.

Solution:
The capacity of the box is H.C.F. of 24, 120 and 72
H.C.F. of 24, 120 and 72 = 24.
৯,৬২৩.
What is the original price of a t - shirt, if the sale price after 15% discount is 272?
  1. ক) 300
  2. খ) 280
  3. গ) 320
  4. ঘ) 314
ব্যাখ্যা

15% discount - এ T - shirt টির বিক্রয়মূল্য 85 টাকা হলে প্রকৃত মূল্য 100 টাকা
∴ বিক্রয়মূল্য 272 টাকা হলে প্রকৃত মূল্য = (100 × 272) / 85 = 320 টাকা

৯,৬২৪.
The cost of an article was 75 taka. The cost was first increased by 20% and later on it was reduced by 20%. The present cost of the article is:
  1. 52
  2. 64
  3. 72
  4. 84
  5. 96
ব্যাখ্যা
Initial Cost = 75 taka
After 20% increase in the cost, it becomes (75 + 20% of 75) or 90 taka
Now, Cost is decreased by 20%, So cost will become (90 - 20% of 90) or 72 taka
So, present cost is 72 taka
৯,৬২৫.
If 6 persons working 8 hours a day earn Tk 9600 per week, then 9 persons working 6 hours a day will earn per week?
  1. ক) 10800 Tk
  2. খ) 12000 Tk
  3. গ) 12400 Tk
  4. ঘ) 12800 Tk
ব্যাখ্যা
Question: If 6 persons working 8 hours a day earn Tk 9600 per week, then 9 persons working 6 hours a day will earn per week?

Solution:
Earning of 6 × 8 = 48 hours is 9600 Tk
Earning of 1 hour is 9600/48 Tk
Earning of 9 × 6 = 54 hours is  (9600 × 54)/48 Tk
= 10800 Tk
৯,৬২৬.
A worker union contract specifies a 6% salary increase plus a Tk. 450 bonus for each worker. For a worker, this is equivalent to an 8% salary increase. What was this worker's salary before the new contract?
  1. Tk. 22,000
  2. Tk. 22500
  3. Tk. 24000
  4. Tk. 25400
ব্যাখ্যা

Question: A worker union contract specifies a 6% salary increase plus a Tk. 450 bonus for each worker. For a worker, this is equivalent to an 8% salary increase. What was this worker's salary before the new contract?

Solution:
ধরি, কর্মীর পূর্বের বেতন = x টাকা।

6% বৃদ্ধিতে বেতন = x + x এর 6%
= x + (6x/100) = 106x/100

বোনাস হিসেবে 450 টাকা যোগ করলে মোট বেতন = (106x/100) + 450

8% বৃদ্ধিতে বেতন = x + x এর 8%
= x + (8x/100) = (108x/100)

প্রশ্নমতে,
(106x/100) + 450 = (108x/100)
⇒ 450 = (108x/100) - (106x/100)
⇒ 450 = (2x/100)
⇒ x = (450 × 100)/2
∴ x = 22500

অর্থাৎ, কর্মীর পূর্ববর্তী বেতন ছিল 22500 টাকা।

৯,৬২৭.
If (a/b)z - 3 = (b/a)z - 1, what's the value of z?
  1. ক) 2
  2. খ) 3
  3. গ) -2
  4. ঘ) -1
ব্যাখ্যা
Question: If (a/b)z-3 = (b/a)z-1, what's the value of z?

Solution:
(a/b)z-3 = (b/a)z-1
(a/b)z-3 = (a/b)-z+1
z - 3 = - z + 1
2z = 4
z = 2
৯,৬২৮.
If a = 3 + √8 then is equal to?
  1. ক) 198
  2. খ) 207
  3. গ) 209
  4. ঘ) 234
ব্যাখ্যা
Question: If a = 3 + √8 then is equal to?

Solution:
Given,
 a = 3 + √8
1/a = 1/(3 + √8)
= (3 - √8)/(3 + √8)(3 - √8)
= (3 - √8)/(9 - 8)
∴ 1/a = 3 - √8

a + 1/a = 3 + √8 +  3 - √8
∴ a + 1/a = 6

Now, 
a3 + (1/a3)
= (a + 1/a)3 - 3 . a . 1/a (a + 1/a)
= (6)3 - 3 . 6
= 216 - 18
= 198
৯,৬২৯.
A student find the average of ten 2 digit numbers, and while copying numbers by mistake, he writes one number with its digit interchanged, as a result of that his average is 3.6 less that the correct answer, then find the difference of the digits of the number in which he made the mistake.
  1. 2
  2. 3
  3. 4
  4. 5
ব্যাখ্যা

Question: A student find the average of ten 2 digit numbers, and while copying numbers by mistake, he writes one number with its digit interchanged, as a result of that his average is 3.6 less that the correct answer, then find the difference of the digits of the number in which he made the mistake.

Solution:
The number = 10x + y
After interchanging the digit, the number becomes 10y + x
The difference in average after interchanging the digits = 3.6
As there are 10 numbers,
The difference between the numbers will be = 3.6 × 10 = 36

Now
10x + y - (10y + x) = 36
9x - 9y ⇒ 36
9(x - y) = 36
x - y = 4

Difference in digits, (x - y) = 4

∴ The difference of the digits of the number in which he made the mistake is 4.

৯,৬৩০.
What is the distance of (5, 12) from the origin?
  1. 12 units
  2. 8 units
  3. 5 units
  4. 13 units
ব্যাখ্যা

Question: What is the distance of (5, 12) from the origin?

Solution:
Since the distance of the coordinate (5, 12) is taken from the origin, then the coordinates of the origin are (0, 0).
Therefore,
x1 = 0, y1 = 0
x2 = 5, y2 = 12

We know,
The distance between two points = √[(x2 - x1)2 + (y2 - y1)2]
= √[(5 - 0)2 + (12 - 0)2]
= √[25 + 144] 
= √169
= 13 units

৯,৬৩১.
Find the odd number from the given alternatives.
  1. 143
  2. 168
  3. 195
  4. 224
  5. 256
ব্যাখ্যা

Question: Find the odd number from the given alternatives.

Solution:
256 = 162
∴ 256 is a perfect square of 16, others are not a perfect square.

৯,৬৩২.
A train covers a distance 10 km in 12 minutes. If its speed is decreased by 10 km/hr, the time taken by it to cover the same distance will be-
  1. ক) 10 min
  2. খ) 12 min
  3. গ) 15 min
  4. ঘ) 18 min
ব্যাখ্যা
Question: A train covers a distance 10 km in 12 minutes. If its speed is decreased by 10 km/hr, the time taken by it to cover the same distance will be-

Solution:
Old speed = (10 × 60)/12 = 50 kmph
New speed = 50 - 10 = 40 kmph

Time taken to go 10km at 40kmph = 10/40 hr
= (10 × 60)/40 min
= 15 min
৯,৬৩৩.
If 39/x = √(169/289), then what is the value of x?
  1. 51
  2. 58
  3. 68
  4. 70
ব্যাখ্যা
Question: If 39/x = √(169/289), then what is the value of x?

Sol:
39/x = √(169/289)
⇒ 39/x = 13/17
⇒ x = (39 × 17)/13
∴ x = 51
৯,৬৩৪.
Tk. 2100 is lent at compound interest of 5% per annum for 2 years. Find the amount after two years.
  1. Tk. 2300
  2. Tk. 2315.25
  3. Tk. 2310.25
  4. Tk. 2325.50
ব্যাখ্যা
Here, principal = Tk. 2100
Time, n = 2 years
Annual interest rate, r = 5%
The amount after two years, C = ?
We know, C= P(1 + r)n
                   = 2100(1 + 5/100)2
                   = Tk. 2315.25
৯,৬৩৫.
A train 180 meters long takes 9 seconds to pass a man standing on the platform. How much time will it take to pass a platform 420 meters long?
  1. 15 sec
  2. 30 sec
  3. 20 sec
  4. 40 sec
ব্যাখ্যা
Question: A train 180 meters long takes 9 seconds to pass a man standing on the platform. How much time will it take to pass a platform 420 meters long?

Solution:
Length of the train = 180 m
Time to pass the man = 9 sec

∴ Speed of the train =180/9 m/sec
= 20 m/sec

Now, total length of the train and platform = (180 + 420) m
= 600 m

∴ Time taken = 600/20 sec
= 30 sec
৯,৬৩৬.
80% of a number added to 80 gives the result as the number itself, then the number is:
  1. ক) 200
  2. খ) 300
  3. গ) 400
  4. ঘ) 480
  5. ঙ) 500
ব্যাখ্যা

Let X be the number which is added to 80
80% of X = 0.8X
Now,
80 + 0.8X = X
0.2X = 80
X = 80/0.2 = 400

৯,৬৩৭.
Hemal completes a job in 45/2 days. What part of the job will he do in 2 days?
  1. 4/45
  2. 1/45
  3. 2/45
  4. 8/45
  5. 1/15
ব্যাখ্যা
Question: Hemal completes a job in 45/2 days. What part of the job will he do in 2 days?

Solution:
We know, if a person does a job in n days, then his 1-day work = 1/n
Here,
n = 45/2
Hemal’s 1-day work = 2/45
Thus, Hemal’s 2 days work = 2 × (2/45) = 4/45
৯,৬৩৮.
From a circular sheet of paper with a radius of 20 cm, four circles of radius 5 cm each are cut out. What is the ratio of the uncut to the cut portion?
  1. 3 : 5
  2. 2 : 1
  3. 3 : 1
  4. 3 : 7
ব্যাখ্যা
Question: From a circular sheet of paper with a radius of 20 cm, four circles of radius 5 cm each are cut out. What is the ratio of the uncut to the cut portion?

Solution:
Area of the sheet of paper with a radius of 20 cm. = π(20)2 = 400π cm2
Area of 4 circles of radius 5 cm. = 4 × π(5)2=100π cm2
Area of remaining portion = 400π - 100π = 300π cm2
Therefore, the required ratio = 300π : 100π = 3 : 1
৯,৬৩৯.
[(289)0.17 × (17)0.16]2 = ?
  1. 17
  2. √19
  3. √17
  4. 7
ব্যাখ্যা

Question: [(289)0.17 × (17)0.16]2 = ? 
(Janata RC 22 এর অনুরূপ)

Solution:
(289)0.17 × (17)0.16
= {(17)2}0.17 × (17)0.16
= 17(2 × 0.17) × (17)0.16
= (17)0.34 × (17)0.16
= (17)0.34 + 0.16
= (17)0.50
= (17)50/100
= (17)1/2
= √17

Hence, (√17)2 = 17

৯,৬৪০.
The expression (3x2 + x - 12) - 2(x2 + 4x + 9) is equivalent to which of the following:
  1. x2 - 7x - 30
  2. x2 + 4x - 28
  3. 2x2 - 7x - 20
  4. x2 - 5x + 30
ব্যাখ্যা
Question: The expression (3x2 + x - 12) - 2(x2 + 4x + 9) is equivalent to which of the following:

Solution:
Here,
(3x2 + x - 12) - 2(x2 + 4x + 9)
= 3x2 + x - 12 - 2x2 - 8x - 18
= x2 - 7x - 30
৯,৬৪১.
The height of a equilateral triangle with a side 2 cm is -
  1. ক) √3 cm
  2. খ) 2√3 cm
  3. গ) 3√2 32cm
  4. ঘ) √5 cm
ব্যাখ্যা

The height of an equilateral triangle is also its median
hence, base gets divided into 2 equal parts

So,
Base = 1cm
Hypotenuse = 2cm
And, Height = p = ?

Now, h2 = b2 + p2
Or, 22 = 12 + p2
Or, 4 = 1 + p2
Or, p2 = 4 - 1
Or, p2 = 3
Or, p = 31/2

Hence, the height of the ∆ is 31/2 = √3 cm

৯,৬৪২.
A bag contains an equal number of 20Tk, 10Tk. and 5Tk. note. If the total value is Tk.700, how many notes of each type are there?
  1. ক) 15
  2. খ) 20
  3. গ) 25
  4. ঘ) 30
ব্যাখ্যা
Question: A bag contains an equal number of 20Tk, 10Tk. and 5Tk. note. If the total value is Tk.700, how many notes of each type are there?

Solution:
Let the note of each type is X.
X notes of 20Tk. is equal to 20X Tk.
X notes of 10Tk. is equal to 10X Tk. and
X notes of 5Tk. is equal to 5X

ATQ,
20X + 10X + 5X = 700
35X = 700
X = 20

Hence, there were 20 notes of each value and 60 notes in total.
৯,৬৪৩.
A boy bought a camel and carriage for Tk 5000. He sells the camel at a gain of 20% and the carriage at a loss of 10%. If he gains 3% on the whole, then find the cost of the camel.
  1. ক) Tk. 2166.67
  2. খ) Tk. 2400.38
  3. গ) Tk. 2315.25
  4. ঘ) Tk. 2600.45
ব্যাখ্যা

Now, in this numerical, there is no common loss and gain %.
Hence, solve it by making equations.

Let the cost price of the camel be x.
As the cost of camel and carriage = Tk 5000
Cost of carriage = Tk (5000 – x)
After selling the camel he gains 20% and on carriage a loss of 10%. But on the whole, he gains 3%.

Therefore,
20% of x – 10% of (5000 – x) = 3% of 5000
⇒ (20/100) × x - (10/100) × (5000 – x) = (3/100) × 5000
⇒ x/5 - (5000 – x)/10 = 150
⇒ 10x/5 - {(5000 – x) × 10}/10 = 150 × 10
⇒ 10x/5 - (5000 – x) = 1500
⇒ 2x - 5000 + x = 1500
⇒ 3x=1500 + 5000
⇒ x = 2166.67.
The cost of camel = Tk. 2166.67

৯,৬৪৪.
A stock increases in value by 25%. By what percent must the stock decrease to reach back to its former value?
  1. 30%
  2. 25%
  3. 22%
  4. 20%
  5. None
ব্যাখ্যা
Question: A stock increases in value by 25%. By what percent must the stock decrease to reach back to its former value?

Solution:
এখানে,
২৫% বৃদ্ধিতে মূল্য = (১০০ + ২৫) টাকা
= ১২৫ টাকা

১২৫ টাকায় মূল্য কমাতে হবে ২৫ টাকা
∴ ১ টাকায় মূল্য কমাতে হবে ২৫/১২৫ টাকা
∴ ১০০ টাকায় মূল্য কমাতে হবে (২৫ × ১০০)/১২৫ টাকা
= ২০ টাকা
৯,৬৪৫.
If X is 2/5 of Y and Y is 5/7 of Z, what is the ratio of Z : X?
  1. ক) 5 : 7
  2. খ) 2 : 7
  3. গ) 7 : 5
  4. ঘ) 7 : 2
ব্যাখ্যা
প্রশ্ন: If X is 2/5 of Y and Y is 5/7 of Z, what is the ratio of Z : X?

সমাধান:
X = 2Y/5 
Y = 5Z/7 

X = 2Y/5
⇒ X = (2/5) × (5Z/7)
⇒ X = 2Z/7
⇒ Z/X = 7/2
∴ Z : X = 7 : 2
৯,৬৪৬.
A and B together have Tk. 1210. If 4/15 of A's amount is equal to 2/5 of B's amount, how much amount does B have?
  1. Tk. 460
  2. Tk. 484
  3. Tk. 550
  4. Tk. 664
ব্যাখ্যা
Question: A and B together have Tk. 1210. If 4/15 of A's amount is equal to 2/5 of B's amount, how much amount does B have?

Solution:
(4/15) A = (2/5) B
⇒ A = (2/5 × 15/4) B
⇒ A = (3/2) B
⇒ A/B = 3/2
∴ A : B = 3 : 2

B's share = 1210 × (2/5) = Tk. 484
৯,৬৪৭.
A committee of 4 members is to be selected from 6 men and 5 women. In how many ways can this be done if exactly 2 men must be selected? 
  1. 50
  2. 150
  3. 70
  4. 120
ব্যাখ্যা

Question: A committee of 4 members is to be selected from 6 men and 5 women. In how many ways can this be done if exactly 2 men must be selected?

Solution:
Here, to form the committee of 4 members, we need to select 2 men 
and (4 - 2) = 2 women.

Number of ways to select 2 men from 6 men:
6C2 = 6!/[2! (6 - 2)!]
= {6 × 5 × 4!}/[2! × (4)!]
= (6 × 5)/(2 × 1)
= 3 × 5
= 15 ways

Number of ways to select 2 women from 5 women:
5C2 = 5!/[2! (5 - 2)!]
= 5!/[2! × (3)!]
= {5 × 4 × 3!}/[2! × (3)!]
= (5 × 4)/(2 × 1)
= 5 × 2
= 10 ways

So, total number of ways = 15 × 10 = 150.

৯,৬৪৮.
A boat can travel 36 km upstream in 5 hours. If the speed of the stream is 2.4 kmph, how much time will the boat take to cover a distance of 78 km downstream?(in hours)
  1. 4 hours
  2. 5.4 hours
  3. 6.5 hours
  4. 7 hours
ব্যাখ্যা
Question: A boat can trave 36 km upstream in 5 hours. If the speed of the stream is 2.4 kmph, how much time will the boat take to cover a distance of 78 km downstream?(in hours)

Solution:
Distance covered by a boat in 5 hours = 36 km
Rate upstream of boat = 36/5
= 7.2 kmph
Speed of the stream = 2.4 kmph

∴ Speed of the boat in still water = (7.2 + 2.4) kmph
= 9.6 kmph
∴ Rate downstream of the boat = (9.6 + 2.4) kmph
= 12 kmph

So, Time taken in covering 78 km distance = 78/12 = 6.5 hours
৯,৬৪৯.
What is the difference between the place value and the face value of 6 in the numeral 2962?
  1. ক) 54
  2. খ) 52
  3. গ) 62
  4. ঘ) 60
ব্যাখ্যা
Place value of 6 = 60
Face value of 6 = 6
Difference = 60 - 6
= 54
৯,৬৫০.
Himel is bigger than Rajib. Tofail is bigger than Rakib. Tanveer is not as big as Tofail but is bigger than Rajib. Rakib is not as big as Rajib. Which is the smallest?
  1. Tanveer
  2. Rajib
  3. Rakib
  4. Himel
ব্যাখ্যা
Question: Himel is bigger than Rajib. Tofail is bigger than Rakib. Tanveer is not as big as Tofail but is bigger than Rajib. Rakib is not as big as Rajib. Which is the smallest?

Solution:
Hime is bigger than Rajib. ⇒ Himel > Rajib
Tofail is bigger than Rakib. ⇒ Tofail > Rakib
Tanveer is not as big as Tofail but is bigger than Rajib. ⇒ Tofail > Tanveer > Rajib
Rakib is not as big as Rajib. ⇒ Rajib > Rakib

∴ Rakib is the smallest.
৯,৬৫১.
A sum invested at simple interest grows to Tk. 1665 in 3 years and Tk. 1782 in 4 years. Determine the original sum.
  1. 1302
  2. 1308
  3. 1314
  4. 1288
ব্যাখ্যা
Question: A sum invested at simple interest grows to Tk. 1665 in 3 years and Tk. 1782 in 4 years. Determine the original sum.

Solution: 
Interest in one year = (1782 - 1665 ) = 117
in three years = ( 117 × 3 ) = 351

∴ the sum of the money = ( 1665 - 351 )
= 1314
৯,৬৫২.
The wheel of scooter has diameter 140 cm. How many revolutions per minute must the wheel make so that the speed of the scooter is kept at 132 km per hour?
  1. 1100
  2. 1000
  3. 500
  4. 250
ব্যাখ্যা
Question: The wheel of scooter has diameter 140 cm. How many revolutions per minute must the wheel make so that the speed of the scooter is kept at 132 km per hour?

Solution:
Distance travelled by wheel in one revolution = circumference of wheel
= 22/7 × 140 = 440 cm.

Speed of scooter = 132 km/hr = (132 × 1000 × 100)/60 cm/min
= 220,000 cm/min.

The wheel has therefore got to travel 220,000 cm in 1 min i.e. it has to perform 220,000/440 revolution in 1 min = 500 revolutions.
৯,৬৫৩.
Solution set of the inequality: p - 5 > 4p + 7 is
  1. (- ∞, - 4]
  2. [- ∞, - 4)
  3. (- ∞, - 4)
  4. [- ∞, - 4]
ব্যাখ্যা

Question: Solution set of the inequality: p - 5 > 4p + 7 Is
(Janata RC 2022 অনুযায়ী)

Solution:
p - 5 > 4p + 7
⇒ - 5 > 4p - p + 7
⇒ - 5 > 3p + 7
⇒ - 5 - 7 > 3p
⇒ - 12 > 3p
⇒ - 12/3 > 3p/3
⇒ - 4 > p
⇒ p < - 4

∴ নির্ণেয় সমাধান সেট: (- ∞, - 4)

৯,৬৫৪.
What is the difference between the third proportional of 12 and 18, and mean proportional of 9 and 25?
  1. ক) 8
  2. খ) 12
  3. গ) 10
  4. ঘ) 9
ব্যাখ্যা
Question: What is the difference between the third proportional of 12 and 18, and mean proportional of 9 and 25?

Solution:
Third proportional = (18 × 18)/12 = 27
Mean proportional = √(9 × 25) = √225 = 15

So, the difference = 27 - 15 = 12
৯,৬৫৫.
What is the solution of
  1. ক) secA
  2. খ) 0
  3. গ) 1
  4. ঘ) tanA
ব্যাখ্যা
Question: What is the solution of

Solution: 

৯,৬৫৬.
If 3√x = 2√3, What is the value of x?
  1. ক) 3
  2. খ) 1.33
  3. গ) 2
  4. ঘ) 3√2
ব্যাখ্যা

Given, 3√x = 2√3
⇒ √x/√3 = 2/3
⇒ x/3 = 4/9
∴ x = (4×3)/9 = 1.33

৯,৬৫৭.
The selling price of 15 items equals the cost of 20 items. What is the percentage of profit earned by the seller?
  1. 23.54%
  2. 30.87%
  3. 23.33%
  4. 33.3%
  5. 56.4%
ব্যাখ্যা

Let cost price per item be 1.
cp of 15 items = 15
sp of 15 items = cost price of 20 items= 20

So, profit = 20 - 15 = 5.
∴ required profit % = (5/15) × 100 = 33.3%

৯,৬৫৮.
The average of 9 consecutive odd numbers is 33. What is the average of the first two and last two numbers?
  1. 35
  2. 33
  3. 31
  4. 29
ব্যাখ্যা
Question: The average of 9 consecutive odd numbers is 33. What is the average of the first two and last two numbers?

Solution:
The middle number is = 33
So, the other numbers are = 25, 27, 29, 31, 33, 35, 37, 39, 41

The average of the first two and last two numbers is = (25 + 27 + 39 + 41)/4 = 132/4 = 33
৯,৬৫৯.
Sani borrows 2500 taka from a leasing company at 4.5% compound interest per year. Calculate the total must be paid after 36 months.
  1. 2025.89
  2. 2852.92
  3. 2325.32
  4. 2758.78
  5. 2823.25
ব্যাখ্যা
Here, n = 36 months = 3 years

Compound interest rate = 4.5% = 4.5/100

We know, C = P ( 1 + r%)3 = P (1 + 4.5/100) 3 = tk. 2852.92
৯,৬৬০.
Selling 12 pen at a price of Tk. 10 yields a loss a%. Selling 12 pen at a price of Tk. 12 yields a profit of a %, what is the value of a?
  1. ক) 10
  2. খ) 11
  3. গ) 100/11
  4. ঘ) 11/100
ব্যাখ্যা
a% ক্ষতিতে,
ক্রয়মূল্য 100 টাকা হলে বিক্রয়মূল্য =(100 - a) টাকা 

a% লাভে 
ক্রয়মূল্য 100 টাকা হলে বিক্রয়মূল্য =(100 + a) টাকা 

এখন 
10 × 100/(100 - a) = 12 × 100/(100 + a) 
10/(100 - a) =12/(100 + a) 
1000 + 10a = 1200 - 12a
10a + 12a = 1200 - 1000
22a = 200
a = 200/22
a = 100/11
৯,৬৬১.
If b is equal to 20% of a, then what is b% of 20 equal to?
  1. 4% of a
  2. 5% of a
  3. 20% of a
  4. 10% of a
ব্যাখ্যা

Question: If b is equal to 20% of a, then what is b% of 20 equal to?

Solution:
20% of a = b    
⇒ 20a/100 = b

∴ b% of 20
= (b/100) × 20
= (20a/100) × (1/100) × 20
= 4a × (1/100)
= 4% of a

৯,৬৬২.
The area of a rectangle and square are equal. The side of the square is 5 cm and the smaller side of the rectangle is half that of the square. The length of the other side of the rectangle would be-
  1. 5 cm
  2. 8 cm
  3. 10 cm
  4. 12.5 cm
  5. None of these
ব্যাখ্যা
Question: The area of a rectangle and square are equal. The side of the square is 5 cm and the smaller side of the rectangle is half that of the square. The length of the other side of the rectangle would be-

Solution:
Side of Square = 5 cm, and length of one side of rectangle = 5/2 = 2.5 cm
Let the length of the other side of the rectangle = B

As per the question:
Area of rectangle = Area of square
Length × Breadth = Side × Side
⇒ 2.5 × B = 5 × 5
⇒ B = 25/2.5
∴ B = 10 cm
৯,৬৬৩.
Population of a town increase 2.5% annually but is decreased by 0.5% every year due to migration. What will be the percentage increase in 2 years?
  1. 6%
  2. 5.2%
  3. 4.04%
  4. 3.5%
ব্যাখ্যা

Question: Population of a town increase 2.5% annually but is decreased by 0.5% every year due to migration. What will be the percentage increase in 2 years?

Solution:
Net percentage increase in Population = (2.5 - 0.5) = 2% each year.
Assuming initial population = 100

Population of Town after 1st year = (100 + 2% of 100)
= 100 + 2 = 102

Population of Town after 2nd year = (102 + 2% of 102)
= 102 + 2.04 = 104.04

Increase = 104.04 - 100 = 4.04
∴ Percentage increase = (4.04/100) × 100% = 4.04%

৯,৬৬৪.
Write an equation of the line with slope 3 and x-intercept (- 2, 0). 
  1. y = 3x
  2. y = 2x + 6
  3. y = 3x + 6
  4. y = x + 6
ব্যাখ্যা

Question: Write an equation of the line with slope 3 and x-intercept (- 2, 0).

Solution:
Given:
Slope, m = 3
x-intercept = (- 2, 0)

We know the point-slope form of a line:
y - y1 = m(x - x1)

Substitute the values (x1, y1) = (- 2, 0) and m = 3:
y - 0 = 3(x - (- 2))
⇒ y = 3(x + 2)
⇒ y = 3x + 6

So, the equation of the line is y = 3x + 6.

৯,৬৬৫.
Find the HCF of 5/6, 3/7 and 11/21 = ?
  1. 1/21
  2. 1/24
  3. 1/42
  4. None of these
ব্যাখ্যা
Question: Find the HCF of 5/6, 3/7 and 11/21 = ?

Solution:
For the HCF of fractions, it has to be taken the HCF of numerators and LCM of denominators.

HCF of 5, 3, 11 = 1
LCM of 6, 7, 21 = 42

HCF of numerators/LCM of denominators = 1/42

Hence, the HCF of 5/6, 3/7 and 11/21 = 1/42
৯,৬৬৬.
A product is sold for Tk. 3600 with a 25% profit margin. How much profit or loss would there be if it was sold for Tk. 2700 instead?
  1. profit 7.75%
  2. loss 5.25%
  3. loss 6.25%
  4. None of the above
ব্যাখ্যা
Question: A product is sold for Tk. 3600 with a 25% profit margin. How much profit or loss would there be if it was sold for Tk. 2700 instead?

Solution: 
The cost price = (3600 × 100)/125 = 2880
New selling price = Tk. 2700

∴  Loss = 2880 - 2700 = 180

∴ Loss percentage = (100 × 180)/2880 = 6.25%.
৯,৬৬৭.
An amount of Tk. 15,000 is invested at a compound interest rate of 6% per annum. What will be the total value of the investment after 2 years?
  1. Tk. 16,854
  2. Tk. 16,950
  3. Tk. 17,288
  4. Tk. 17,660
  5. None
ব্যাখ্যা
Question: An amount of Tk. 15,000 is invested at a compound interest rate of 6% per annum. What will be the total value of the investment after 2 years?

Solution:
Given,
Initial amount P = Tk. 15,000
Annual growth rate r = 6% 
Time n = 2 years

We know,
Compount Interest = P × [1 + (r/100)]n

∴ The value of the investment after 2 years = 15,000 × [1 + (6/100)]2
= 15,000 × (106/100)2
= 15,000 × (53/50)2
= (15,000 × 53 × 53)/(50 × 50)
= 16,854

∴ The value of the investment after 2 years will be Tk. 16,854
৯,৬৬৮.
Add 2√2 + 5√3 and √2 - 3√3.
  1. 3√2 + 2√3
  2. 2√2 + 3√3
  3. 2√2 + 2√3
  4. 3√2 + 3√3
ব্যাখ্যা
Question: Add 2√2 + 5√3 and √2 - 3√3.

Solution:
(2√2 + 5√3) + (√2 - 3√3)
= 2√2 + √2 + 5√3 - 3√3
= (2 + 1)√2 + (5 - 3)√3
= 3√2 + 2√3
৯,৬৬৯.
A, B and C can do a piece of work in 20, 30 and 60 days respectively. In how many days can A do the work if he is assisted by B and C on every third day?
  1. 15 days
  2. 18 days
  3. 20 days
  4. 21 days
ব্যাখ্যা
Question: A, B and C can do a piece of work in 20, 30 and 60 days respectively. In how many days can A do the work if he is assisted by B and C on every third day?

Solution:
A's 2 day's work = (1/20) × 2 = 1/10
(A + B + C)'s 1 day's work = 1/20 + 1/30 + 1/60
= 6/60
= 1/10

Work done in 3 days = 1/10 + 1/10
= 2/10 part
= 1/ 5 part

Now,
1/5 work is done in 3 days.
∴ Whole work will be done in (3 × 5) = 15 days
৯,৬৭০.
A, B and C completed a work costing Tk. 1800. A worked for 6 days, B for 4 days and C for 9 days. If their daily wages are in the ratio of 5 : 6 : 4, how much amount will be received by A?
  1. ক) 600
  2. খ) 750
  3. গ) 800
  4. ঘ) 900
ব্যাখ্যা

Let the daily wages of A, B and C be Tk. 5x, Tk. 6x and Tk. 4x respectively.
Then, ratio of their amounts
= (5×6):(6×4):(4x9)
= 30:24:36
= 5:4:6
∴ A's amount
= Tk. (1800 × 5/15)
= Tk. 600

৯,৬৭১.
The complementary angle of supplementary angle of 135°-
  1. 45°
  2. 75°
  3. 60°
  4. 55°
  5. None of these
ব্যাখ্যা
Question: The complementary angle of supplementary angle of 135°-

Solution:
For supplementary angle: The sum of two angles is 180°.
For complementary angle: The sum of two angles is 90°.

The supplement angle of 135° = 180° - 135° = 45°
The complement angle of 45° = 90° - 45° = 45°

∴ The complement angle of the supplement angle of 135° is 45°
৯,৬৭২.
Determine the value of log7√3(1/21609) = ?
  1. - 1
  2. - 2
  3. - 3
  4. - 4
ব্যাখ্যা
log7√3(1/21609)
= log7√3(1/7√3)4
= log7√3(7√3)-4 
= - 4 log7√3(7√3)
= - 4
৯,৬৭৩.
A milkman mixed some water with milk to gain 25% by selling the mixture at the cost price. The ratio of water and milk is respectively -
  1. ক) 5 : 4
  2. খ) 4 : 5
  3. গ) 1 : 5
  4. ঘ) 1 : 4
ব্যাখ্যা
Question: A milkman mixed some water with milk to gain 25% by selling the mixture at the cost price. The ratio of water and milk is respectively -

Solution:
Cost price of 1 litres of milk = Tk 100
∴ Mixture sold for Tk 125
= 125/100 = 5/4 litres
∴ Quantity of mixture = 5/4 litres
∴ Quantity of milk = 1 litre
∴ Quantity of water =(5/4) - 1 = 1/4 litre
∴ Required ratio = 1/4 : 1 = 1 : 4
৯,৬৭৪.
A company increases salary of an officer at 20% per year. In 2025 an employee receives Tk. 43,200. What was his salary in 2023?
  1. Tk. 24,000
  2. Tk. 27,000
  3. Tk. 30,000
  4. Tk. 34,000
ব্যাখ্যা

Question: A company increases salary of an officer at 20% per year. In 2025 an employee receives Tk. 43,200. What was his salary in 2023?

Solution:
Let, his salary in 2023 was 100 Tk.

At 20% increment,
Salary of 2024 is = 100(1 + 20/100)
= 120 Tk.

Salary of 2025 is = 120(1 + 20/100)
= 144 Tk.

Now,
144 Tk. corresponds to = 43,200 Tk.
1 Tk. corresponds to = 43,200/144 Tk.
∴ 100 Tk. corresponds to = (43,200 × 100)/144
= 30,000 Tk.

∴ His salary in 2023 was 30,000 Tk.

৯,৬৭৫.
Given that 12 people can finish a task in 15 days, how long would it take 10 people to do the same work?
  1. 10 days
  2. 12 days
  3. 16 days
  4. 18 days
ব্যাখ্যা
Question: Given that 12 people can finish a task in 15 days, how long would it take 10 people to do the same work?

Solution:
12 men can finish a task in 15 days
∴ 1 men can finish a task in 15 × 12 days
∴ 10 men can finish a task in (15 × 12)/10 days
= 18 days
৯,৬৭৬.
In how many ways can a garland be made using 6 different flowers?
  1. 30
  2. 60
  3. 90
  4. 120
ব্যাখ্যা

Question: In how many ways can a garland be made using 6 different flowers?

Solution:
We know,
For a circular garland, the formula for arrangements is (n - 1)!/2
Here, n = 6

∴ The number of ways to make a garland with 6 flowers = (6 - 1)!/2 
 = 5!/2 
= (5 × 4 × 3 × 2)/2 
= 60 

৯,৬৭৭.
Which number is to be added to the numerator and denominator of 7/17 to form 3/5?
  1. ক) 6
  2. খ) 7
  3. গ) 8
  4. ঘ) 9
ব্যাখ্যা
Question: Which number is to be added to the numerator and denominator of 7/17 to form 3/5?

Solution:
Let, the number is x.

ATQ,
(7 + x)/(17 + x) = 3/5
Or, 5x + 35 = 51 + 3x
Or, 5x - 3x = 51 - 35
Or, 2x = 16
∴ x = 8

∴ The number is 8.
৯,৬৭৮.
84 English books, 90 Mathematics books, and 120 Bangla books have to be stacked topicwise. How many books will be there in each stack so that each stack will have the same height too?
  1. 4
  2. 6
  3. 8
  4. 12
ব্যাখ্যা
Question: 84 English books, 90 Mathematics books, and 120 Bangla books have to be stacked topicwise. How many books will be there in each stack so that each stack will have the same height too?

Solution:
As the height of each stack is the same, the required number of books in each stack
= HCF of 84, 90 and 120

84 = 2 × 2 × 3 × 7
90 = 2 × 3 × 3 × 5
120 = 2 × 2 × 2 × 3 × 5

∴ HCF = 2 × 3 = 6

Hence, The required number of books in each stack is 6.
৯,৬৭৯.
A person travels a certain distance at 3 km/hr and reaches 15 min late. If he travels at 4 km/hr, he reaches 15 min earlier. The distance he has to travel is 
  1. ক) 4.5 km
  2. খ) 6 km
  3. গ) 7.2 km
  4. ঘ) 12 km
ব্যাখ্যা
Let
the time taken by him to travel certain distance be 't' hr
Since the distance travelled in both cases is constant,
we have
⇒ 3 × (t + 15/60) = 4 × (t - 15/60)
⇒ 3t + 3/4 = 4t - 1
⇒ t = 7/4 hr

∴ required distance = 3 × (t + 15/60) = 3 × (7/4 + 15/60) = 6 km
৯,৬৮০.
A is twice as fast as B and B is thrice as fast as C. The journey covered by C in 42 minutes will be covered by A in:
  1. 12 minutes
  2. 9 minutes
  3. 8 minutes
  4. 7 minutes
  5. None of the above
ব্যাখ্যা
Question: A is twice as fast as B and B is thrice as fast as C. The journey covered by C in 42 minutes will be covered by A in:

Solution:
Let C's speed be x metres/min
Let the time taken by A be y min

Then, B's speed = 3x metres/min
And, A's speed = 6x metres/min

Ratio of speed of A and C = Ratio of time taken by C and A

6x : x = 42 : y
⇒ 6x/x = 42/y
∴ y = 7 minutes

Hence, The journey covered by C in 42 minutes will be covered by A in 7 minutes.
৯,৬৮১.
Which of the following has the most number of divisors?
  1. ক) 98
  2. খ) 101
  3. গ) 176
  4. ঘ) 35
ব্যাখ্যা
Question: Which of the following has the most number of divisors?

Solution: 
৯৮ = ২ × ৭ × ৭
১০১ = ১ × ১০১
১৭৬ = ২ × ২ × ২ × ২ × ১১
৩৫ = ৫ × ৭

অর্থাৎ ১৭৬ এর উৎপাদক সবচেয়ে বেশি।
৯,৬৮২.
If the product of two numbers is 2,028, and their HCF is 13, what are the numbers?
  1. ক) 39, 52
  2. খ) 13, 52
  3. গ) 26, 78
  4. ঘ) All of the above
ব্যাখ্যা
Let two numbers be 13a and 13b.
Their product is 2028.
So,13a x 13b=2028
169ab=2028
ab=2028/169
ab=12
Co primes for 12 are (1,12) and (3,4)
So the numbers are (13×1,13×12) or (13×3,13×4)
Two numbers are 13, 156 or 39, 52
===============================
মনে করি, সংখ্যা দুইটি ১৩ক ও ১৩খ
অতএব, ১৩ক × ১৩খ = ২০২৮
ক × খ = ২০২৮/(১৩ × ১৩) = ১২
১২ = ১ × ১২ = ৩ × ৪
অতএব, সংখ্যা গুলো হচ্ছে ১৩ × ১ ও ১৩ × ১২ অথবা ১৩ × ৩, ১৩ × ৪
সুতরাং, সংখ্যা দুইটি ১৩ ও ১৫৬ অথবা ৩৯ ও ৫২
------------------------------------------------------
Step 1: Suppose the two numbers be x and y.
So, as per given information x*y = 2028.
Step 2: Do the factor of this number:
2028 = 2*2*3*13*13
Step 3: Now, use the another given information, i.e H.C.F (x,y) = 13.
Therefore, factor 13 should be present in both x and y. So, from 2*2*3*13*13 factors 13*13 are settled and now we left with 2*2*3.
Since, we can not share factor ‘2’ in both x and y , otherwise the H.C.F will become 26, So, we have now two sub-cases.
i) Whole 2*2*3 will go to one of the number (x or y), suppose it goes to y, then numbers will be: x= 13, y = 2*2*3*13
ii) Factor ‘3’ goes to one of the number (x or y), suppose goes to x, then numbers will be: x=13*3 , y= 2*2*13.
৯,৬৮৩.
A reservoir can be filled in 4 hours by three taps, P, Q, and R. Tap R is three times as fast as Q, and tap Q is twice as fast as P. How long will tap Q alone take to fill the reservoir?
  1. 18 hours
  2. 21 hours
  3. 24 hours
  4. 28 hours
ব্যাখ্যা

Question: A reservoir can be filled in 4 hours by three taps, P, Q, and R. Tap R is three times as fast as Q, and tap Q is twice as fast as P. How long will tap Q alone take to fill the reservoir?

Solution:
ধরি, নল P একা চৌবাচ্চাটি পূর্ণ করতে x ঘন্টা সময় নেয়।

যেহেতু নল Q, P এর দ্বিগুণ দ্রুত গতিতে পানি সরবরাহ করে, তাই Q এর সময় লাগবে x/2 ঘন্টা।
যেহেতু নল R, Q এর তিনগুণ দ্রুত গতিতে পানি সরবরাহ করে, তাই R এর সময় লাগবে (x/2)/3 = x/6 ঘন্টা।

প্রশ্নমতে, তারা একসাথে 4 ঘন্টায় চৌবাচ্চাটি পূর্ণ করে।
অতএব,
1/x + 1/(x/2) + 1/(x/6) = 1/4
⇒ 1/x + 2/x + 6/x = 1/4
⇒ (1+2+6)/x = 1/4
⇒ 9/x = 1/4
⇒ x = 9 × 4
⇒ x = 36 ঘন্টা।

অতএব, নল P একা চৌবাচ্চাটি পূর্ণ করতে 36 ঘন্টা সময় নেয়।
∴ নল Q একা চৌবাচ্চাটি পূর্ণ করতে সময় নেবে 36/2 = 18 ঘন্টা।

৯,৬৮৪.
In a simultaneous throw of pair of dice. Find the probability of getting the total more than 7.
  1. 4/17
  2. 2/15
  3. 3/11
  4. 5/12
ব্যাখ্যা
Question: In a simultaneous throw of pair of dice. Find the probability of getting the total more than 7.

Solution:
Here,
n(S) = (6 × 6) = 36

Let E = event of getting a total more than 7
= {(2, 6), (3, 5), (3, 6), (4, 4), (4, 5), (4, 6), (5, 3), (5, 4), (5, 5), (5, 6), (6, 2), (6, 3), (6, 4), (6, 5), (6, 6)}

Therefore,P(E) = n(E)/n(S)
= 15/36
= 5/12
৯,৬৮৫.
A person crosses a 600 m long street in 5 minutes. What is his speed in km per hour?
  1. 3.6
  2. 7.2
  3. 8.4
  4. 10
ব্যাখ্যা
Question: A person crosses a 600 m long street in 5 minutes. What is his speed in km per hour?

Solution:
600 m = 600/1000 km
= 3/5 km

5 minutes = 5/60 = 1/12 hr

Speed = (3/5)/(1/12) 
= (3 × 12)/5 km/hr
= 36/5 km/hr
= 7.2 km/hr
৯,৬৮৬.
If x = 7 - 4√3 then find the value of (x2 + 1)/ x?
  1. ক) 3√3
  2. খ) 8√3
  3. গ) 14
  4. ঘ) 14 + 8√3
ব্যাখ্যা
Solution:
দেওয়া আছে,
x = 7 - 4√3

∴ 1/x = 1 / (7 - 4√3)
= (7 + 4√3) / (7 - 4√3) (7 + 4√3)
= (7 + 4√3) / {(7)2 - (4√3)2}
= (7 + 4√3) / (49 -48)
= (7 + 4√3)

প্রদত্ত রাশি = (x2 + 1)/x
= x + 1/x
= 7 - 4√3 + 7 + 4√3
= 14 
৯,৬৮৭.
Find the missing term,
3, 12, 27, 48, 75, 108, ?
  1. 147
  2. 162
  3. 183
  4. 192
ব্যাখ্যা

Question: Find the missing term,
3, 12, 27, 48, 75, 108, ?

Solution: 
The terms of the given series are,
3 = 3 × 12
12 = 3 × 22
27 = 3 × 32
48 = 3 × 42
75 = 3 × 52
108 = 3 × 62
So, missing term = 3 × 72 = 3 × 49 = 147

৯,৬৮৮.
(41-70): Choose the correct answer.
Spot the odd man out.
  1. ক) Electricity
  2. খ) Coal
  3. গ) Wood
  4. ঘ) Gas
ব্যাখ্যা
এখানে,
কয়লা, কাঠ, গ্যাস হলো জ্বালানী, এইগুলো পুড়িয়ে শক্তি উৎপাদন করা যায়।

কিন্তু ইলেকট্রিসিটি হলো একধরনের শক্তি।
৯,৬৮৯.
A tank is filled in 5 hours by three pipes A, B and C. The pipe C is twice as fast as B and B is twice as fast as A. How much time will pipe A alone take to fill the tank?
  1. ক) 15 hours
  2. খ) 25 hours
  3. গ) 35 hours
  4. ঘ) 38 hours
ব্যাখ্যা
Question: A tank is filled in 5 hours by three pipes A, B and C. The pipe C is twice as fast as B and B is twice as fast as A. How much time will pipe A alone take to fill the tank?

Solution:
Let,
pipe A alone takes x hours to fill the tank.
Then, pipe B take x/2 hours to fill the tank.
and pipe C will take x/4 hours to fill the tank.

ATQ,
(1/x) + (2/x) + (4/x) = 1/5
⇒ 7/x = 1/5
∴ x = 35 hours.
৯,৬৯০.
If |2x - 2| ≤ 8, what is the maximum value of x?
  1. 5
  2. 3
  3. 7
  4. 2
ব্যাখ্যা

Question: If |2x - 2| ≤ 8, what is the maximum value of x?

Solution:
Given that,
|2x - 2| ≤ 8
⇒ - 8 ≤ 2x - 2 ≤ 8 
⇒ - 8 + 2 ≤ 2x - 2 + 2 ≤ 8 + 2 
⇒ - 6 ≤ 2x ≤ 10
⇒ (- 6/2) ≤ (2x/2) ≤ (10/2)
⇒ - 3 ≤ x ≤ 5

∴ The maximum value of x is 5

৯,৬৯১.
If then what is a/b?
  1. 25/3
  2. 9/25
  3. 25/16
  4. 25/9
ব্যাখ্যা
Question: If then what is a/b?

Solution:
(3a + 5b)/(3a - 5b) = 4
⇒ 3a + 5b = 4(3a - 5b)
⇒ 3a + 5b = 12a - 20b
⇒ 5b + 20b = 12a - 3a
⇒ 25b = 9a
∴ a/b = 25/9
৯,৬৯২.
In a school with the same number of boys and girls, 1/8th of the girls and 5/6th of the boys are residing in the hostel. What percent of the students consists of boys who do not reside in the hostel?
  1. 1/12
  2. 1/6
  3. 7/48
  4. 13/48
  5. None of these
ব্যাখ্যা

Let,
Number of girls = boys = 24 (LCM of 8 and 6)
boys who do not reside in hostel = 24 - (5 × 24/6)
= 24 - 20
= 4
The students consist of boys who do not reside hostel = 4/(2 × 24)
= 1/12.

৯,৬৯৩.
Of four numbers whose average is 70, the first is one-fourth of the sum of the last three. The first number is-
  1. ক) 54
  2. খ) 55
  3. গ) 56
  4. ঘ) 57
ব্যাখ্যা
Let
The four numbers be a, b, c and d 
According the question 
a = (1/4)(b + c + d)
b + c + d = 4a

again 
a + b + c + d = 70 × 4 
a + 4a = 280 
5a = 280 
a = 280/5
a = 56
৯,৬৯৪.
Evaluate 4⅓−2⅚
  1. ক) 3(⅓)
  2. খ) 1(½)
  3. গ) 3(½)
  4. ঘ) 2(½)
ব্যাখ্যা
4⅓−2⅚
= (13/3)-(17/6)
= (26-17)/6
= 9/6
= 1(½)
৯,৬৯৫.
If 3x + 6y = 69 and 2x - y = 11, what is the value of y?
  1. 6
  2. 7
  3. 8
  4. 9
ব্যাখ্যা
Question: If 3x + 6y = 69 and 2x - y = 11, what is the value of y?

Solution:
3x + 6y = 69
⇒ x + 2y = 23
∴ x = 23 - 2y ............ (1)

2x - y = 11
⇒ 2(23 - 2y) - y = 11
⇒ 46 - 4y - y = 11
⇒ 46 - 5y = 11
⇒ - 5y = 11 - 46
⇒ - 5y = - 35
⇒ y = 35/5
∴ y = 7 
৯,৬৯৬.
The average of six consecutive numbers A, B, C, D, E and F is 62. What is the sum of B and F?
  1. 120
  2. 125
  3. 134
  4. 140
ব্যাখ্যা

Question: The average of six consecutive numbers A, B, C, D, E and F is 62. What is the sum of B and F?

Solution:
Let the Numbers A, B, C, D, E, F be x, x + 1, x + 2, x + 3, x + 4, x + 5.
According to question, 
x + x + 1 + x + 2 + x + 3 + x + 4 + x + 5 = 62 × 6
⇒ 6x + 15 = 372
⇒ 6x = 372 - 15 = 357
⇒ 6x = 357
⇒ x = 59.5

∴ B = x + 1 = 60.5 
∴ F = x + 5 = 64.5

∴ B + F = 60.5 + 64.5 = 125

৯,৬৯৭.
A box contains 100 pens. Out of which six are defective. Four pen is out from the box. Find the probability that the pen is not defective.
  1. 1/10
  2. 9/10
  3. 8/49
  4. 47/50
ব্যাখ্যা
Question: A box contains 100 pens. Out of which six are defective. Four pen is out from the box. Find the probability that the pen is not defective.

Solution:
Total pen = 100
Good pen = 100 - 6 = 94

The probability of pen is not defective = 94/100
= 47/50
৯,৬৯৮.
The difference between simple and compound interest on Tk. 1400 for one year at 20% per annum reckoned half-yearly is -
  1. ক) Tk. 120
  2. খ) Tk. 3
  3. গ) Tk. 14
  4. ঘ) Tk. 154
ব্যাখ্যা
S.I. = (1400 × 20 × 1)/100 = Tk. 280 
C.I. = [1400 × (1 + 10/100)2 - 1400] 
      = [1400  × 11/10 × 11/10 -1400
      = 1694 - 1400
      = Tk. 294
Difference = (294 - 280) = Tk. 14.
৯,৬৯৯.
A trader buys egg for TK. M dozen and sells them for Tk M/6 per piece. What is his profit?
  1. 20%
  2. 50%
  3. 60%
  4. 100%
  5. None of these
ব্যাখ্যা

Selling price of egg Tk (M/6) × 12 per dozen
= 2M
profit = 2M - M = M
profit percentage = (M/M) × 100
= 100%.

৯,৭০০.
Which one will replace the question mark ?
  1. ক) 94
  2. খ) 86
  3. গ) 84
  4. ঘ) 82
ব্যাখ্যা
Which one will replace the question mark ?
 

(4)2 + (2)2 + (1)2 = 21
(5)2 + (3)2 + (8)2 = 98
(6)2 + (7)2 + (3)2 = 94