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Bank Math

মোট প্রশ্ন১৬,১২৪এই পাতা১০০প্রতি পাতা১০০
ঘনত্ব
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উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

Bank Math

PrepBank · পাতা / ১৬১ · ৫০১৬০০ / ১৬,১২৪

৫০১.
A starts a business with Tk 4,500. After 4 months, B joins as a partner by investing some amount. At the end of one year from the start, the profits are shared in the ratio A : B = 3 : 4. Find B’s capital investment.
  1. 8000 TK
  2. 10,000 TK
  3. 12,000 TK
  4. 9000 TK
ব্যাখ্যা

Question : A starts a business with Tk 4,500. After 4 months, B joins as a partner by investing some amount. At the end of one year from the start, the profits are shared in the ratio A : B = 3 : 4. Find B’s capital investment.

Solution:
Let,
B's capital be TK X
Then,
(4500 × 12)/8X = 3/4
⇒ 24X = (4500 × 12 × 4)
⇒ 24X = 216,000
⇒ X = 216,000/24
∴ X = 9000

৫০২.
Two unbiased coins are tossed. What is the probability of getting at most one head?
  1. 1/2
  2. 1/4
  3. 3/4
  4. 3/8
ব্যাখ্যা

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

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

∴ Required Probability = 3/4

৫০৩.
What is the angle that is half of its own complement?
  1. ক) 30°
  2. খ) 45°
  3. গ) 60°
  4. ঘ) 150°
ব্যাখ্যা
Question: What is the angle that is half of its own complement?

Solution: 
As, we know that, if two angles are complementary then their sum must be equal to 90°
So, if x is the angle then its complementary angle will be 90° - x

Now
x = (90° - x)/2
2x = 90° - x
2x + x = 90° 
3x = 90° 
x= 30°
৫০৪.
If cos4θ - sin4θ = 2/3 then the value of (1 - 2sin2θ) is -
  1. ক) 2/3
  2. খ) 0
  3. গ) 1/3
  4. ঘ) 4/3
ব্যাখ্যা
Question: If cos4θ - sin4θ = 2/3 then the value of (1 - 2sin2θ) is - 

Solution:
cos4θ - sin4θ = 2/3
⇒ (cos2θ - sin2θ) (cos2θ + sin2θ) = 2/3
⇒ cos2θ - sin2θ = 2/3
⇒ 1 - sin2θ - sin2θ = 2/3
∴ 1 - 2sin2θ = 2/3
৫০৫.
Find the average of all the numbers between 11 and 54 which are divisible by 5.
  1. 30.5
  2. 32
  3. 34
  4. 32.5
ব্যাখ্যা
Question: Find the average of all the numbers between 11 and 54 which are divisible by 5.

Solution:
Numbers between 11 and 54 divisible by 5 are 15, 20, 25, 30, 35, 40, 45, 50.
Required average =(15 + 20 + 25 + 30 + 35 + 40 + 45 + 50​)/8
= 260/8
= 32.5
৫০৬.
The circumference of a circular plot is 352 meters. What is the area of the circular plot? 
  1. ক) 9325 m2
  2. খ) 9589 m2
  3. গ) 9612 m2
  4. ঘ) 9856 m2
ব্যাখ্যা
Question: The circumference of a circular plot is 352 meters. What is the area of the circular plot? 

Solution:
Given that,
2πr = 352
⇒ r = (352 × 7)/(2 × 22) 
∴ r = 56 m

Now, 
Area of the circular plot,
= πr2
= {(22/7) × 56 × 56}m2
= 9856 m2
৫০৭.
Find the total number of distinct vehicle numbers that can be formed using two letters followed by two numbers. Letters need to be distinct.
  1. 60000
  2. 65000
  3. 70000
  4. 58500
ব্যাখ্যা
Question: Find the total number of distinct vehicle numbers that can be formed using two letters followed by two numbers. Letters need to be distinct.

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

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

Total number of vehicle numbers = 26 × 25 × 100 = 65000
৫০৮.
Which one of the following numbers is divisible by 3 ?
  1. ক) 4006020
  2. খ) 2345678
  3. গ) 9566003
  4. ঘ) 2876423
ব্যাখ্যা
Sum of the digits in 4006020 = 4 + 0 + 0 + 6 + 0 + 2 + 0 =12, which is divisible by 3
Hence, 4006020 is divisible by 3
৫০৯.
If in a certain language, SISTER is coded as 535301, UNCLE is coded as 84670, and BOY as 129, how is SON coded?
  1. 520
  2. 524
  3. 425
  4. 345
ব্যাখ্যা
Question: If in a certain language, SISTER is coded as 535301, UNCLE is coded as 84670, and BOY as 129, how son is coded?

Solution: 
S → 5
O → 2
N → 4

Son is coded as 524 
৫১০.
Which of the following is closest to √3 = ?
  1. 1.70
  2. 1.45
  3. 9/4
  4. 1.73
  5. 1.78
ব্যাখ্যা
Square root of 3 : 

     = 1.73
৫১১.
A book seller allowed 10% discount on printed price. He gets 30% commission from publisher. His profit in percent will be?
  1. 10%
  2. 20%
  3. (200/7)% 
  4. (225/7)%
ব্যাখ্যা

Question: A book seller allowed 10% discount on printed price. He gets 30% commission from publisher. His profit in percent will be?

Solution: 
let, the marked price of book is 100 taka 
buying price 100 × 0.7 taka 
= 70 taka 

selling price of book seller = 100 × 0.9 taka 
= 90 taka 

Profit in percent = {(90 - 70)/70} × 100% 
= (200/7)% 

৫১২.
Rana obtained an amount of Tk. 8376 as simple interest on a certain amount at 8 p.c.p.a. after 6 years. What is the amount invested by Rana?
  1. Tk. 18110
  2. Tk. 17180
  3. Tk. 17450
  4. Tk. 16450
ব্যাখ্যা
Question: Rana obtained an amount of Tk. 8376 as simple interest on a certain amount at 8 p.c.p.a. after 6 years. What is the amount invested by Rana?

Solution:
Simple interest, I = Tk. 8376
Rate of interest, r = 8%
Time, n = 6 years

We know,
I = Pnr
Or, P = I/nr
= (8376 × 100)/(6 × 8)
∴ P = 17450 Tk.
৫১৩.
In how many ways can five different rings be worn on three fingers of one hand?
  1. 243 ways
  2. 320 ways
  3. 480 ways
  4. 720 ways
ব্যাখ্যা
Question: In how many ways can five different rings be worn on three fingers of one hand?

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

∴ 5 rings may be worn in = 35 ways.
= 243 ways
৫১৪.
A man's speed with the current is 18 km/hr and the speed of the current is 3.6 km/hr. The man's speed against the current is:
  1. ক) 10.5 km/hr
  2. খ) 10.8 km/hr
  3. গ) 11.2 km/hr
  4. ঘ) 12.4 km/hr
ব্যাখ্যা
Question: A man's speed with the current is 18 km/hr and the speed of the current is 3.6 km/hr. The man's speed against the current is:

Solution:
Man's rate in still water = (18 - 3.6) km/hr = 14.4 km/hr

∴ Man's rate against the current = (14.4 - 3.6) km/hr = 10.8 km/hr.
৫১৫.
A trader mixes 26 kg of rice at Tk 20 per kg with 30 kg of rice of other variety at Tk. 36 per kg and sells the mixture at Tk. 30 per kg. His profit percent is:
  1. no profit no loss
  2. 1% loss
  3. 1% profit
  4. 5% profit
ব্যাখ্যা

Question: A trader mixes 26 kg of rice at Tk 20 per kg with 30 kg of rice of other variety at Tk. 36 per kg and sells the mixture at Tk. 30 per kg. His profit percent is:

Solution: 
C.P. of 56 kg rice = (26 × 20 + 30 × 36)
= (520 + 1080)
=1600 taka

S.P. of 56 kg rice = (56 × 30)
= 1680 taka

∴ Profit = 1680 - 1600
= 80 taka

 ∴ Profit percentage = (80/1600) × 100% = 5%

৫১৬.
A group of men decided to do a job in 3 days. But since 30 men dropped out every day, the job completed at the end of the 5th day. How many men were there at the beginning?
  1. ক) 120
  2. খ) 150
  3. গ) 180
  4. ঘ) 210
ব্যাখ্যা
Question: A group of men decided to do a job in 3 days. But since 30 men dropped out every day, the job completed at the end of the 5th day. How many men were there at the beginning?

solution: 
ধরি,
শুরুতে লোক ছিলো = x

প্রশ্নমতে,
3x = x + (x - 30) + (x - 60) + (x - 90) + (x - 120)
3x = 5x - 300
2x = 300
x = 150

∴ শুরুতে ১৫০ জন লোক ছিল।
৫১৭.
The average age of a group of 12 students is 18 years. When 3 more students join the group, the overall average age increases by 1 year. What is the average age of the three new students?
  1. 14 years
  2. 23 years
  3. 15 years
  4. 30 years
ব্যাখ্যা

Question: The average age of a group of 12 students is 18 years. When 3 more students join the group, the overall average age increases by 1 year. What is the average age of the three new students?

Solution:
Total age of 12 students = 12 × 18 = 216 years
After 3 new students joined, total students = 12 + 3 = 15
New average = 18 + 1 = 19 years
Total age of 15 students = 15 × 19 = 285 years
Total age of 3 new students = 285 - 216 = 69 years
Average age of 3 new students = 69 ÷ 3 = 23 years

∴ The average age of the three new students is 23 years.

৫১৮.
A 250 meters long train crosses a bridge 750 meters long in 20 seconds and crosses a platform in 16 seconds. Find the length of the platform.
  1. ক) 500 m
  2. খ) 550 m
  3. গ) 580 m
  4. ঘ) 590 m
ব্যাখ্যা
Let the length of the platform be x

The speed of the train = (750 + 250)/20
                                    = 1000/20
                                    = 50 m/sec
Now, Again according to the question
The train crosses the platform in 16 seconds
250 + x = 50 × 16
⇒ x = 800 - 250
⇒ x = 550 m

∴ The length of the platform is 550 m.
৫১৯.
The average of the first five multiples of 11 is - 
  1. 33
  2. 33.625
  3. 31.2
  4. 44
ব্যাখ্যা
Question: The average of the first five multiples of 11 is - 

Solution: 
first five multiples of 11 is = 11, 22, 33, 44, 55

average = (11 + 22 + 33 + 44 + 55)/5
= 33
৫২০.
Find the value of cos(5π/6).
  1. - 1/2
  2. √3/2
  3. 1/2
  4. 1/√2
  5. - √3/2
ব্যাখ্যা

Question: Find the value of cos(5π/6).

Solution:
cos(5π/6)
= cos(π - π/6) [∵ (π - θ) দ্বিতীয় চতুর্ভাগে পড়ে এবং দ্বিতীয় চতুর্ভাগে cos ঋণাত্মক, তাই cos(π - θ) = -cos θ]
= - cos(π/6)
= - cos(30°)
= - √3/2

৫২১.
A man takes twice as long to row a distance against the stream as to row the same distance in favour of the stream. The ratio of the speed of the boat (in still water) and the stream is:
  1. 2 : 1
  2. 3 : 1
  3. 3 : 2
  4. 4 : 3
ব্যাখ্যা

Let man's rate upstream be x km/hr
Then, his rate downstream = 2x km/hr
∴ (speed in still water) : (Speed of stream)
(2x + x)/2 : (2x - x)/2
3x/2 : x/2
3 : 1

৫২২.
If you are living near a market place you should be read a market place you should be ready to bear the disturbances caused by traffic.
  1. ক) to bear upon
  2. খ) to bear away
  3. গ) to bear with
  4. ঘ) to bear on
ব্যাখ্যা
'To bear with ' should be used in place of 'to bear'
Bear with (Phrasal Verb)
Meaning: be patient or tolerant with someone.
Example Sentence: Bear with me a moment while I make a call.

Source: Oxford Dictionary
৫২৩.
If the difference between the circumference and diameter of a circle is 120 cm, then the radius of the circle is:
  1. 14 cm
  2. 16 cm
  3. 24 cm
  4. 28 cm
ব্যাখ্যা

Question: If the difference between the circumference and diameter of a circle is 120 cm, then the radius of the circle is:

Solution:
ধরি, বৃত্তের ব্যাসার্ধ = r
বৃত্তের ব্যাস = 2r
বৃত্তের পরিধি = 2πr

প্রশ্নমতে,
2πr - 2r = 120
⇒ 2r(π - 1) = 120
⇒ r = 120/{2(π - 1)}
⇒ r = 60/{(22/7) - 1}
⇒ r = 60/{(22 - 7)/7}
⇒ r = 60/(15/7)
⇒ r = 60 × (7/15)
⇒ r = 4 × 7
⇒ r = 28

∴ বৃত্তের ব্যাসার্ধ = 28 সে.মি.

৫২৪.
Mita is 36 years old and Mokit is 48 years old. How many years ago was the ratio of their ages 2 : 3?
  1. 11 years
  2. 15 years
  3. 10 years
  4. 12 years
ব্যাখ্যা
Question: Mita is 36 years old and Mokit is 48 years old. How many years ago was the ratio of their ages 2 : 3?

Solution:
Let,
'x' years ago the ratio of their ages was 2 : 3

ATQ,
(36 - x) : (48 - x) = 2 : 3
⇒ (36 - x)/(48 - x) = 2/3
⇒ 96 - 2x = 108 - 3x
⇒ 3x - 2x = 108 - 96
∴ x = 12
৫২৫.
In a raw of trees, a tree is 7th from the left and 14th from the right end. How many trees are there in the row?
  1. 18
  2. 19
  3. 20
  4. 21
ব্যাখ্যা
Total number of tree = 7 + 14 - 1 = 20
1 - 2 - 3 - 4 - 5 - 6 - 7 (a tree from the left as well as 14th from the right end) - 8 (13th) - 9 (12th) - 10 (11th) - 11 (10th) - 12 (9th) - 13 (8th) - 14 (7th) - 15(6th) - 16 (5th) - 17 (4th) - 18 (3rd) - 19 (2nd) - 20 (1st)
So total number of tree = 20
৫২৬.
The sum of the ages of a mother and daughter is 50 years. Five years ago, the mother was four times as old as her daughter. What is the present age of the daughter?
  1. 10 years
  2. 13 years
  3. 16 years
  4. 17 years
ব্যাখ্যা

Question: The sum of the ages of a mother and daughter is 50 years. Five years ago, the mother was four times as old as her daughter. What is the present age of the daughter?

Solution:
ধরি, মেয়ের বর্তমান বয়স = x বছর
তাহলে, মাতার বর্তমান বয়স = (50 - x) বছর

পাঁচ বছর আগে,
মেয়ের বয়স ছিল = (x - 5) বছর
মাতার বয়স ছিল = (50 - x) - 5 = (45 - x) বছর

প্রশ্নমতে,
45 - x = 4(x - 5)
⇒ 45 - x = 4x - 20
⇒ 45 + 20 = 4x + x
⇒ 65 = 5x
⇒ x = 65/5
⇒ x = 13

সুতরাং, মেয়ের বর্তমান বয়স হলো 13 বছর।

৫২৭.
3/4 part of the tank is full of water. When 18 liters of water is taken out, the tank becomes empty. The capacity of the tank is -
  1. 20 liters
  2. 24 liters
  3. 27 liters
  4. 30 liters
ব্যাখ্যা
Question: 3/4 part of the tank is full of water. When 18 liters of water is taken out, the tank becomes empty. The capacity of the tank is -

Solution: 
3/4 part of the tank is 18 liters

Capacity of the tank is = 18 × 4/3 
= 24 liters
৫২৮.
A right triangle has sides in the ratio of 5 : 12 : 13. What is in the measure of the smallest angle in a right triangle, in degrees?
  1. ক) 13.34
  2. খ) 22.62
  3. গ) 42.17
  4. ঘ) 34.14
ব্যাখ্যা

We know that, sinθ = AB/AC
⇒ sinθ = 5/13
⇒ θ = sin-15/13
∴ θ = 22.62°
৫২৯.
Arrange the letters of the word ''DARKER'' so that the three vowels do not appear together. In how many ways can this be done?
  1. ক) 240
  2. খ) 360
  3. গ) 500
  4. ঘ) 720
ব্যাখ্যা

'DARKER' has 6 letters.

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

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

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

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

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

৫৩০.
If the difference of the squares of two natural numbers 25. Find the sum of the square of these numbers?
  1. 351
  2. 420
  3. 313
  4. 245
  5. 321
ব্যাখ্যা
Question: If the difference of the squares of two natural numbers 25. Find the sum of the square of these numbers?

Solution:
Bigger number = (difference of squares + 1)/2 = (25 + 1)/2 = 13
Smaller number = (difference of squares - 1)/2 = (25 - 1)/2 = 12

So sum of the square of these numbers = 132 + 122 = 169 + 144 = 313
৫৩১.
The average attendance of a college for the first three days of a week is 325 and the first four days is 320. How many were present on the fourth day?
  1. ক) 300
  2. খ) 315
  3. গ) 305
  4. ঘ) 350
ব্যাখ্যা

Total attendance for first 3 days = 325×3 = 975
Total attendance for first 4 days = 320×4 = 1280
∴ Present on the 4th day = 1280 - 975 = 305

৫৩২.
(2√27 - √75 + √12) is equal to -
  1. ক) 4√3
  2. খ) √3
  3. গ) 2√3
  4. ঘ) 3√3
ব্যাখ্যা

(2√27 – √75 + √12)
= 2√(32.3) - √(3 × 52) + √(3 × 22)
= 6√3 – 5√3 + 2√3
= 3√3

৫৩৩.
If a person walks at 14 km/hr instead of 10 km/hr, he can cover 20 km more. The actual distance travelled by him is -
  1. 50 km
  2. 56 km
  3. 70 km
  4. 80 km
ব্যাখ্যা
Question: If a person walks at 14 km/hr instead of 10 km/hr, he can cover 20 km more. The actual distance travelled by him is -

Solution:
লোকের বেগ বৃদ্ধি পায় = ১৪ - ১০ কি.মি./ঘণ্টা 
= ৪ কি.মি./ঘণ্টা 

সে মোট হাটে = ২০/৪ ঘণ্টা = ৫ ঘণ্টা 

প্রকৃত বেগে ১ ঘণ্টায় যায় ১০ কি.মি.
∴ প্রকৃত বেগে ৫ ঘণ্টায় যায় (১০ × ৫) কি.মি.
= ৫০ কি.মি. 
৫৩৪.
The ratio of present age of two brothers is 1 : 2 and 5 years back. the ratio was 1 : 3. What will be the ratio of their age after 5 years?
  1. 3 : 5
  2. 2 : 5
  3. 4 : 5
  4. 2 : 3
ব্যাখ্যা
Question: The ratio of present age of two brothers is 1 : 2 and 5 years back. the ratio was 1 : 3. What will be the ratio of their age after 5 years?

Solution:
Let, the present age of small brother be = x
and the present age of elder = 2x years

Then,
5 years ago,
(x - 5)/(2x - 5) = 1/3
⇒ 3x - 15 = 2x - 5
∴ x = 10

∴ Age of elder brother = (2 × 10) = 20 years

So, Required ratio = (10 + 5)/(20 + 5)
= 15/25
= 3 : 5
৫৩৫.
Mr. X had Tk. 1000 in his savings account. Every month in the first week he needs money, so he withdraws Tk. 500, but by the end of the month, he deposits Tk. 750. After how many months, the original amount will grow three times?
  1. 9 months
  2. 6 months
  3. 7 months
  4. 8 months
ব্যাখ্যা
Question: Mr. X had Tk. 1000 in his savings account. Every month in the first week he needs money, so he withdraws Tk. 500, but by the end of the month, he deposits Tk. 750. After how many months, the original amount will grow three times?

Solution: 
Initial money Mr. X had = Tk.1000
Three times the initial money ⇒ 1000 × 3 = Tk. 3000
Money to be deposited ⇒ 3000 - 1000 = Tk. 2000

Net every month ⇒Tk. 750 - Tk. 500 = Tk. 250
Months required to make Tk. 2000 = 2000/250 = 8 months.
৫৩৬.
Three unbiased coins are tossed. What is the probability of getting at least 2 tails?
  1. 3/8
  2. 2/3
  3. 1/3
  4. 1/2
  5. None
ব্যাখ্যা
Question: Three unbiased coins are tossed. What is the probability of getting at least 2 tails?

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

So, the probability of getting at least 2 tails = Favorable outcomes/Total outcomes
= 4/8
= 1/2
৫৩৭.
2 men and 3 boys can do a piece of work in 10 days while 3 men and 2 boys can do the same work in 8 days . In how many days can 2 men and 1 boy do the work?
  1. ক) 15
  2. খ) 18.5
  3. গ) 12.5
  4. ঘ) 10.5
  5. ঙ) 16
ব্যাখ্যা

• 2 men and 3 boys can do a piece of work in 10 days.
Thus, 20 men and 30 boys can do a piece of work in 1 day......(i)

• 3 men and 2 boys can do the same work in 8 days.
Thus, 24 men and 16 boys can do the same work in 1 day....(ii)

• Equating (i) and (ii) we get -
o 20 men + 30 boys = 24 men + 16 boys
o 4 men = 14 boys
o 2 men = 7 boys

• Substituting this in equation (i) we get

10 boys can do a piece of work in 10 days.
But we need to find out in how many days 2 men and 1 boy can do the work, which is equivalent to 8 boys.

8 boys can do the same work in (10 × 10/8) = 12.5 days.

৫৩৮.
Average score of a class of 60 students, in an exam, was 45. Average score of the students who had passed is 50 and average score of students who had failed is 20. How many students failed in the exam?
  1. 30
  2. 10
  3. 20
  4. 15
  5. None
ব্যাখ্যা
Question: Average score of a class of 60 students, in an exam, was 45. Average score of the students who had passed is 50 and average score of students who had failed is 20. How many students failed in the exam?

Solution:
Let
total number of students fail = x
So, total number of student passed = 60 -x

ATQ,
50(60 - x) + 20x = 60 × 45
⇒ 3000 - 50x + 20x = 2700
⇒ 30x = 3000 - 2700
⇒ 30x = 300
∴ x = 10
৫৩৯.
A woman purchased 500 shares of the face value of Tk. 100 each from the market at Tk. 160 per share. If a dividend of 20% is declared, find her earning percent on the investment.
  1. 10%
  2. 12.5%
  3. 15.1%
  4. 16%
ব্যাখ্যা

Question: A woman purchased 500 shares of the face value of Tk. 100 each from the market at Tk. 160 per share. If a dividend of 20% is declared, find her earning percent on the investment.

Solution:
Given,
Price of 1 share (Market Value) = Tk. 160
∴ Price of 500 shares (Total Investment) = Tk. (160 × 500) = Tk. 80,000

Dividend per share = 20% of 100 = Tk. 20
∴ Total dividend income = 500 × 20 = Tk. 10,000

∴ Earning % = (Total Dividend/Total Investment) × 100
= (10,000/80,000) × 100
= (1/8) × 100
= 12.5%

৫৪০.
Tahsan took a loan at simple interest rate of 6 p.c.p.a. in the first year and it increased by 1.5 p.c.p.a. every year. If he pays Tk. 8190 as interest at the end of 3 years, what was his loan amount?
  1. Tk. 36500
  2. Tk. 36400
  3. Tk. 36800
  4. Tk. 35400
ব্যাখ্যা
Question: Tahsan took a loan at simple interest rate of 6 p.c.p.a. in the first year and it increased by 1.5 p.c.p.a. every year. If he pays Tk. 8190 as interest at the end of 3 years, what was his loan amount?

Solution:
Let the loan amount be Tk. x

ATQ,
6% of x  + 7.5% of x + 9% of x = 8190
⇒ (6x/100) + (7.5x/100) + (9x/100) = 8190
⇒ 22.5x = 819000
∴ x = 36400
৫৪১.
If 3/5 of A = 80% of B = 0.5 of C, then A : B : C is
  1. 20 : 15 : 24
  2. 4 : 5 : 8
  3. 9 : 7 : 6
  4. 12 : 10 : 23
ব্যাখ্যা
Question : If 3/5 of A = 80% of B = 0.5 of C, then A : B : C is-

Solution :
According to the question,
3/5 of A = 80% of B
⇒ 3A/5 = 80B/100
⇒ 3A/5 = 4B/5
⇒ A/B = 4/3
⇒ A : B = 4 : 3
∴ A : B = 20 : 15 (multiple by 5)

80% of B = 0.5 of C
⇒ 80B/100 = 5C/10
⇒ 4B/5 = C/2
⇒ B/C = 5/8
⇒ B : C = 5 : 8
∴ B : C = 15 : 24 (multiple by 3)

A : B : C = 20 : 15 : 24
৫৪২.
What is Jashim’s present age, if after 10 years his age will be 5 times his age 5 years back?
  1. ক) 6.2 years
  2. খ) 7.7 years
  3. গ) 8.7 years
  4. ঘ) 10 years
ব্যাখ্যা

Let,
Jashim's present age be x
Jashim's age before 5 years = (x - 5)
Jashim's age after 10 years = (x + 10)
We are given that,
Jashim's age after 10 years (x + 10) is 5 times his age 5 years back (x – 5)

Therefore,
(x + 10) = 5 (x – 5)
⇒ x + 10 = 5x – 25
⇒ 4x = 35
⇒ x = 8.75 years.

৫৪৩.
In a class if 5 students are seated in each bench, 5 benches remain vacant. But if 4 students are seated on each bench, 8 students are to remain standing. What is the number of students in that class?
  1. 60
  2. 70
  3. 120
  4. 140
ব্যাখ্যা

Question: In a class if 5 students are seated in each bench, 5 benches remain vacant. But if 4 students are seated on each bench, 8 students are to remain standing. What is the number of students in that class?

Solution:
ধরি,
বেঞ্চ সংখ্যা x টি

একটি শ্রেণির প্রতি বেঞ্চে 5 জন করে ছাত্র বসলে 5 টি বেঞ্চ খালি থাকে।
∴ ছাত্রসংখ্যা= (x - 5) × 5 জন

প্রতি বেঞ্চে ৩ জন করে ছাত্র বসালে ৬ জন ছাত্রকে দাঁড়িয়ে থাকতে হয়।
∴ ছাত্রসংখ্যা = 4x + 8 জন

প্রশ্নমতে,
(x - 5) × 5 = 4x + 8
⇒ 5x - 25 = 4x + 8
⇒ 5x - 4x = 8 + 25 
∴ x = 33

∴ ছাত্রসংখ্যা = (x - 5) × 5 জন
= (33 - 5) × 5 জন 
= 28 × 5 জন 
= 140 জন 

∴ ঐ ক্লাসে ছাত্র সংখ্যা 140 জন। 

৫৪৪.
The next number in the sequence 4, 11, 19, 41, 79, __ is-
  1. 110
  2. 129
  3. 150
  4. 161
ব্যাখ্যা
Question: The next number in the sequence 4, 11, 19, 41, 79, __ is-

Solution:
19 = 11 + (4 × 2)
41 = 19 + (11 × 2)
79 = 41 + (19 × 2)

∴ next number = 79 + (41 × 2)
= 79 + 82
= 161
৫৪৫.
A contractor employed 30 men to do a piece of work in 38 days. After 25 days, he employed 5 men more and the work was finished one day earlier. How many days he would have been behind if he had not employed additional men?
  1. ক) 1
  2. খ) 1(1/4)
  3. গ) 1(3/4)
  4. ঘ) 1(1/2)
ব্যাখ্যা

After 25 days, 35 men complete the work in 12 days.
Thus, 35 men can finish the remaining work in 12 days.
∴ 30 men can do it in (12 × 35)/30
= 14 days.
which is 1 day behind.

৫৪৬.
The average of a group of men is increased by 5 years when a person aged of 18 years is replaced by a new person of aged 38 years. How many men are there in the group?
  1. 2
  2. 3
  3. 4
  4. 5
ব্যাখ্যা
Question: The average of a group of men is increased by 5 years when a person aged of 18 years is replaced by a new person of aged 38 years. How many men are there in the group?

Solution: 
Let N be the no. of persons in the group.

Required number of person is given by;
Member in group × aged increased = difference of replacement
N × 5 = 38 - 18
Or, 5N = 20
Or, N = 4
৫৪৭.
The product of two whole number is 37. The square root of the difference of the numbers is 
  1. ক) 8
  2. খ) 4
  3. গ) 6
  4. ঘ) 3
ব্যাখ্যা
Since 37 is a prime number 37 = 1 × 37
∴ Required square root =√(37 - 1) = √36 = 6
৫৪৮.
A man said to his son, ''I was two-third of your present age when you were born''. If the present age of the man is 48 years, find the present age of the son?
  1. ক) 25.7 years
  2. খ) 28 years
  3. গ) 29.3 years
  4. ঘ) 28.8 years
ব্যাখ্যা

The present age of the son is P, he was born P years ago.
The age of the man was: (48 - P).

His age when the son was born should be equal to 2/3 of P.
(48 - P) = (2/3)P
5P = 144
⇒ P = 28.8 years.

৫৪৯.
Given below are parts of a single sentence. Each part is labelled as K, L, M, N you need to arrange the given parts to form a coherent sentence by identifying the correct sequence:
K : lies in
L : beholder
M : beauty
N : the eyes of the
  1. ক) MNLK
  2. খ) MKNL
  3. গ) KLMN
  4. ঘ) MKLN
ব্যাখ্যা
The sentence must start with the subject 'Beauty.' Therefore, the part should be M.
M must be followed by K as it is having a verb 'lies.'
A sentence cannot end with an article 'the.'
Therefore, the conclusion part must be L.
​Therefore, the correct answer is 'MKNL.' ​​
Correct sentence: Beauty lies in the eyes of the beholder.

"Beauty lies in the eye of the beholder" is a proverb.
Bangla Meaning: দ্রষ্টার চোখেই সৌন্দর্য থাকে।
৫৫০.
A sum of money amounts to Tk. 9800 after 5 years and Tk. 12005 after 8 years at the same rate of simple interest. The rate of interest per annum is -
  1. 15%
  2. 5%
  3. 12%
  4. 8%
ব্যাখ্যা

Simple interest for 3 years
= 12005 - 9800
= 2205
Simple interest for 5 years
= (2205/3) × 5
= 3675
Some of money = 9800 - 3675
= 6125
R = (100 × 2205)/(6125 × 3)
= 12%

৫৫১.
The average temperature for the first 4 days of a week is 40.2°C and that of the last 4 days is 41.3°C. If the average temperature for the whole week is 40.6°C, then the temperature on the fourth day is
  1. 38.4° C
  2. 41.8° C
  3. 45.1° C
  4. 49° C
ব্যাখ্যা
Question: The average temperature for the first 4 days of a week is 40.2°C and that of the last 4 days is 41.3°C. If the average temperature for the whole week is 40.6°C, then the temperature on the fourth day is

Solution:
Temperature on the fourth day
= [(40.2 × 4 + 41.3 × 4) - (40.6 × 7)]° C
= 41.8° C
৫৫২.
Two cards are drawn at random and without replacement from a standard deck of 52 cards. What is the probability that both cards are face cards?
  1. 1/26
  2. 1/13
  3. 5/52
  4. 11/221
ব্যাখ্যা

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

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

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

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

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

৫৫৩.
If x2 + y2 = 50 and xy = 21, what is the value of (x - y)2?
  1. 8
  2. 12
  3. 16
  4. 25
ব্যাখ্যা

Question: If x2 + y2 = 50 and xy = 21, what is the value of (x - y)2?
 
Solution:
We are given:
x2 + y2 = 50
xy = 21

Use the identity:
(x - y)2 = x2 + y2 - 2xy

Substitute the values:
⇒ (x - y)2 = x2 + y2 - 2xy
⇒ (x - y)2 = 50 - 2 × 21
⇒ (x - y)2 = 50 - 42
∴ (x - y)2 = 8

৫৫৪.
A man is 22 years older than his son. In three years, his age will be three times the age of his son. The present age of his son is -
  1. ক) 11 years
  2. খ) 8 years
  3. গ) 9 years
  4. ঘ) 12 years
ব্যাখ্যা
Question: A man is 22 years older than his son. In three years, his age will be three times the age of his son. The present age of his son is -

Solution: 
ধরি,
পুত্রের বর্তমান বয়স = ক
পিতার বর্তমান বয়স = (ক + ২২)

প্রশ্নমতে,
(ক + ২২ + ৩) = ৩(ক + ৩)
ক + ২৫ = ৩ক + ৯
২ক = ১৬
ক = ৮
৫৫৫.
A card is drawn from a deck of 52 cards, then replaced, and another card is drawn. What is the probability that both are aces?
  1. 1/169
  2. 2/221
  3. 1/221
  4. 4/663
ব্যাখ্যা
Question: A card is drawn from a deck of 52 cards, then replaced, and another card is drawn. What is the probability that both are aces?

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

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

৫৫৬.
The sum of first n odd natural numbers is be given by-
  1. (n + 1)2
  2. n2 + 1
  3. n2
  4. n2 - 1
ব্যাখ্যা
Question: The sum of first n odd natural numbers is be given by-

Solution:
প্রথম n সংখ্যক স্বাভাবিক বিজোড় সংখ্যার সমষ্টি = 1 + 3 + 5 + 7 +....... + n
প্রথম পদ, a = 1
সাধারন অন্তর, d = 3 - 1 = 2
পদ সংখ্যা = n

আমরা জানি,
সমষ্টি = (n/2){2a + (n - 1)d}
= (n/2){2.1 + (n - 1).2}
= (n/2)(2 + 2n - 2)
= (n/2).2n
= n2
৫৫৭.
Five years ago, the average age of A, B, C and D was 45 years. With E joining them now, the average of all the five is 49 years. How old is E?
  1. 55 years
  2. 65 years
  3. 95 years
  4. 45 years
ব্যাখ্যা
Question: Five years ago, the average age of A, B, C and D was 45 years. With E joining them now, the average of all the five is 49 years. How old is E?

Solution:
Total present age of A, B, C and D
= (45 × 4) + (4 × 5) years
= 200 years

Total age present age of A, B, C, D and E
= (49 × 5) years
= 245 years

So, Age of E = 45 years
৫৫৮.
A cylindrical tank with a radius of 7 m and height of 2 m is filled with water. If the water is poured into a rectangular tank with a base measuring 7 m × 7 m, what will be the height of water in the rectangular tank? 
  1. π m 
  2. 2π m 
  3. 4π m 
  4. 9π m 
ব্যাখ্যা

Question: A cylindrical tank with a radius of 7 m and height of 2 m is filled with water. If the water is poured into a rectangular tank with a base measuring 7 m × 7 m, what will be the height of water in the rectangular tank?

Solution: 
Volume of the cylinder = π(7)22
= π × 49 × 2
= 98π m3

Volume of the rectangle = 7 × 7 × h (Assuming, height of the rectangle is 'h')
= 49h m3 

So, 49h = 98π
⇒ h = (98/49)π
∴ h = 2π m 

৫৫৯.
A rectangular water reservoir contains 24000 litres of water. If the length of reservoir is 6m and breadth is 4m, depth of the reservoir will be - 
  1. ক) 1 m
  2. খ) 2 m
  3. গ) 4 m
  4. ঘ) 8 m
ব্যাখ্যা
Question: A rectangular water reservoir contains 24000 litres of water. If the length of reservoir is 6m and breadth is 4m, depth of the reservoir will be - 

Solution: 
1 m3 = 1000 litre
24000 litre = 24000/1000
= 24 m3 

24 = 6 × 4 × depth 
depth = 24/24
= 1 m
৫৬০.
Present ages of Asim and Nabil are in the ratio of 5 : 4 respectively. Three years after, the ratio of their ages will become 11 : 9 respectively. What is Nabil's present age in years?
  1. ক) 11
  2. খ) 24
  3. গ) 32
  4. ঘ) 36
ব্যাখ্যা
Present ages of Asim and Nabil are 5x and 4x respectively.
∴ (5x + 3)/(4x + 3) = 11/9
44x + 33 = 45x + 27
⇒ x = 6
Nabil's present age 4 × 6 = 24 years
৫৬১.

The trapezoid shown in the figure above represents a cross section of the rudder of a ship. If the distance from A to B is 13 feet, what is the area of the cross section of the rudder in square feet?
  1. 39
  2. 40
  3. 42
  4. 45
  5. 46.5
ব্যাখ্যা
Question:

The trapezoid shown in the figure above represents a cross section of the rudder of a ship. If the distance from A to B is 13 feet, what is the area of the cross section of the rudder in square feet?

Solution:

The formula for calculating the area of a trapezoid is: 
Area = (1/2)(base1 + base2)(height) = (1/2)(2 + 5)(height)

So, we need to find the height AC:
AC = √(AB2 - BC2) = √(132 - 52) = √(169 - 25) = √144 = 12

Therefore, 
Area = (1/2)(2 + 5) × 12 = 42 square feet
৫৬২.
A person's salary has increased from tk7200 to tk.8100. What is the percentage increase in his salary?
  1. ক) 25%
  2. খ) 18%
  3. গ) 12.5%
  4. ঘ) 16.67%
  5. ঙ) 20%
ব্যাখ্যা

Salary Increased = 8100-7200 = 900
Percent increased = (900/7200) × 100 = 12.5%

৫৬৩.
Set A contains all the even numbers between 2 and 50 inclusive. Set B contains all the even numbers between 102 abd 150 inclusive. What is the difference between the sum of elements of set B and that of set A?
  1. ক) 5050
  2. খ) 11325
  3. গ) 6275
  4. ঘ) 2500
ব্যাখ্যা
Question: Set A contains all the even numbers between 2 and 50 inclusive. Set B contains all the even numbers between 102 abd 150 inclusive. What is the difference between the sum of elements of set B and that of set A?

Solution: 
Set A contains 2, 4, 6 ............., 50
Set B contains 102, 104 , 106, .............., 150
Number of terms in each set = 25
Difference between corresponding terms in set A and B =(102 - 2), (104 - 4), (106- 6),..................,(150 - 50) = 100
Difference between Sum of set B and set A = 100 × 25 = 2500
৫৬৪.
A student scores 55% marks in 8 papers, each carrying 100 marks. He obtains 15% of his total obtained marks in the Bangla paper. How many marks did he score in Bangla?
  1. 62
  2. 66
  3. 68
  4. 72
ব্যাখ্যা

Question: A student scores 55% marks in 8 papers, each carrying 100 marks. He obtains 15% of his total obtained marks in the Bangla paper. How many marks did he score in Bangla?

Solution:
৮ টি বিষয়ে মোট নম্বর = 8 × 100 = 800
সে নম্বর পেয়েছে = 800 এর 55%
= 800 এর 55/100
= 440

∴ সে বাংলায় নম্বর পেয়েছে = 440 এর 15%
= 440 এর 15/100
= 66

৫৬৫.
The difference of two numbers is 1365. On dividing the larger number by the smaller, we get 6 as quotient and the 15 as remainder. What is the smaller number?
  1. 240
  2. 270
  3. 295
  4. 360
ব্যাখ্যা
Question: The difference of two numbers is 1365. On dividing the larger number by the smaller, we get 6 as quotient and the 15 as remainder. What is the smaller number?

Solution:
Let the smaller number be x.
Then larger number = (x + 1365).

ATQ,
x + 1365 = 6x + 15
⇒ 5x = 1350
∴ x = 270

∴ Smaller number = 270.
৫৬৬.
I forgot the last digit of a 7 digit telephone number. If one randomly dial the final three digits after correctly dialling the four, then what is the chance of dialling the correct number?
  1. 1/10
  2. 1/1000
  3. 1/500
  4. 1/900
ব্যাখ্যা
Question: I forgot the last digit of a 7 digit telephone number. If one randomly dial the final three digits after correctly dialling the four, then what is the chance of dialling the correct number?

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

Hence required probability
= 1/10 × 1/10 × 1/10
= 1/1000
৫৬৭.
Two pipes P and Q can fill a cistern in 15 and 20 minutes respectively. Both pipes are opened together, after how many minutes should Q be turned off, so that the cistern be fill in 12 minutes?
  1. 9 minutes
  2. 6 minutes
  3. 4 minutes
  4. 8 minutes
ব্যাখ্যা
Question: Two pipes P and Q can fill a cistern in 15 and 20 minutes respectively. Both pipes are opened together, after how many minutes should Q be turned off, so that the cistern be fill in 12 minutes?

Solution:
P can fill the cistern in 15 minutes
So in 1 min P can fill the cistern = 1/15 th part
In 12 min, P can fill the cistern = 12/15
= 4/5 part

Remaining part = 1- (4/5) part
= 1/5 part

As Q can fill full cistern in 20 minutes
So it will fill 1/5 part in = (1/5) × 20 = 4 minutes.

∴ Pipe Q should be turned off after 4 minutes.
৫৬৮.
In how many ways 2 books can be chosen from the class of 20 books?
  1. 170
  2. 180
  3. 190
  4. 200
ব্যাখ্যা
Question: In how many ways 2 books can be chosen from the class of 20 books?

Solution:

Here,
n = 20
r = 2

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

∴ 2 books can be chosen from the class of 20 books in 190 ways.
৫৬৯.
A truck cover a distance of 480 meters in 1 min whereas a bus covers a distance of 54 km in 45 min. The ratio of their speed- 
  1. ক) 3 : 4
  2. খ) 4 : 5
  3. গ) 2 : 5
  4. ঘ) 3 : 5
ব্যাখ্যা
Question: A truck cover a distance of 480 meters in 1 min whereas a bus covers a distance of 54 km in 45 min. The ratio of their speed- 

Solution:
Speed of truck = 480/60 = 8 m/s
speed of bus = (54 × 1000)/(45 × 60) = 20 m/s

Ratio = 8 : 20 = 2 : 5
৫৭০.
If a2 - 5a - 1 = 0; what is the value of a2 + (1/a2)?
  1. 23
  2. 25
  3. 27
  4. 29
ব্যাখ্যা
Question: If a2 - 5a - 1 = 0; what is the value of a2 + (1/a2)?

Solution: 
a2 - 5a - 1 = 0
⇒ a2 - 1 = 5a
⇒a - 1/a = 5
⇒ (a - 1/a)2 = (5)2
⇒ a2 + 1/a2 - 2 = 25
∴ a2 + 1/a2 = 27
৫৭১.
0.009/p = 0.01, what is the value of p?
  1. .09
  2. .0003
  3. .9
  4. .0009
ব্যাখ্যা
Question: 0.009/p = 0.01, what is the value of p?

Solution:
Here,
.009/p = .01 

Then p = .009/.01
= .9/1
= .9
৫৭২.
Three numbers are in the ratio 1 : 2 : 3, and the sum of their cubes is 7776. The smallest number will be -
  1. 8
  2. 6
  3. 12
  4. 18
ব্যাখ্যা

Question: Three numbers are in the ratio 1 : 2 : 3, and the sum of their cubes is 7776. The smallest number will be -

Solution:
Given,
The numbers be in the ratio 1 : 2 : 3
So, let:
Smallest number = x
Middle number = 2x
Largest number = 3x

ATQ,
x3 + 8x3 + 27x3 = 7776
⇒ 36x3 = 7776
⇒ x3 = 7776/36 = 216
∴ x = 6

So the smallest number is 6

৫৭৩.
If x2 - √7x + 1 = 0, then the value of x2 + x- 2 = ?
  1. 3
  2. 5
  3. 8
  4. 3√2
ব্যাখ্যা

Question: If x2 - √7x + 1 = 0, then the value of x2 + x- 2 = ?

Solution:
দেয়া আছে,
x2 - √7x + 1 = 0
⇒ x2 + 1 = √7x
⇒ x + (1/x) = √7 [উভয়পক্ষকে x দ্বারা ভাগ করে]

প্রদত্ত রাশি = x2 + x- 2
= x2 + (1/x2)
= (x + 1/x)2 - 2 . x . (1/x)
= (√7)2 - 2
= 7 - 2
= 5

∴ নির্ণেয় মান হলো 5

৫৭৪.
A 20 liters mixture of acid and water has 5% acid. How much acid must be added to make the solution 20% acid?
  1. 3.75 liters
  2. 4 liters
  3. 5.25 liters
  4. 3 liters
  5. 4.50 liters
ব্যাখ্যা
Question: A 20 liters mixture of acid and water has 5% acid. How much acid must be added to make the solution 20% acid?

Solution:
Given that,
Acid = 5% of 20 liters
= (5/100) × 100 = 1 liters
∴ Water = 20 - 1 = 19 liters

Let the amount of acid to be added = x liters
Then,
New total acid = 1 + x 
New total mixture = 20 + x 

Now,
We want the acid to be 20% of the final mixture is
⇒ (1 + x)/(20 + x) = 20/100
⇒ (1 + x)/(20 + x) = 1/5
⇒ 5 + 5x = 20 + x
⇒ 4x = 15
⇒ x = 15/4
∴ x = 3.75
So 3.75 liters of acid must be added​
৫৭৫.
If x is 50% of y, then what percent of x is y?
  1. 50%
  2. 100%
  3. 150%
  4. 200%
ব্যাখ্যা
50% of y = x
or, x = y/2
or, y = 2x
or, y = 2 × 100% of x    [ 100% = 1 ]
        = 200% of x
Required percentage = 200%
৫৭৬.
In how many years Tk. 1000 will become Tk. 1331 at compound interest rate of 10% per annum?
  1. 4 years
  2. 6 years
  3. 3 years
  4. 9 years
ব্যাখ্যা

Question: In how many years Tk. 1000 will become Tk. 1331 at compound interest rate of 10% per annum?

Solution:
Given,
P = Tk. 1000
C = Tk. 1331
r = 10% p.a

We know,
P(1 + r)n = C
⇒ 1000(1 + 10%)n = 1331
⇒ (1 + 1/10)n = 1331/1000
⇒ (11/10)n = (11/10)3
∴ n = 3

∴ required time = 3 years

৫৭৭.
A box contains three white balls, four black balls and three red balls. The number of ways in which three balls can be drawn from the box so that at least one of the balls is black is-
  1. 200
  2. 150
  3. 100
  4. 50
  5. None of these
ব্যাখ্যা
Question: A box contains three white balls, four black balls and three red balls. The number of ways in which three balls can be drawn from the box so that at least one of the balls is black is-

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

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

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

∴ Total = 60 + 36 + 4 = 100
৫৭৮.
The speed of a boat in still water in 12 km/h and the rate of current is 3 km/hr. The distance travelled downstream in 24 minutes is-
  1. 5 km
  2. 6 km
  3. 3 km
  4. 4 km
ব্যাখ্যা
Question: The speed of a boat in still water in 12 km/h and the rate of current is 3 km/hr. The distance travelled downstream in 24 minutes is-

Solution:
Speed downstream
= (12 + 3) kmph
= 15 kmph

Distance travelled = (15 × 24/60) km
= 6 km
৫৭৯.
  1. √5 + √3
  2. √5 + √2
  3. √5 - √3
  4. √5 - √2
ব্যাখ্যা
৫৮০.
The slope of the line 3x + y = 5 is not the same as the slope of which one of the following lines?
  1. 3x + y = 2
  2. x + (y/3) = 4
  3. y =  - 3x + 1
  4. x + 3y = 6
ব্যাখ্যা

Question: The slope of the line 3x + y = 5 is not the same as the slope of which one of the following lines?

Solution: 
প্রথমে, প্রদত্ত রেখাটির ঢাল নির্ণয় করতে হবে। রেখাটির সমীকরণকে y =mx + c তে রূপান্তর করতে হবে। এখানে 'm' হলো ঢাল (Slope)।

 3x + y = 5 
⇒ y = - 3x + 5

∴ এই রেখাটির ঢাল (m) হলো - 3

এবার, প্রদত্ত বিকল্পগুলোর প্রত্যেকটির ঢাল নির্ণয় করি:
ক) 3x + y = 2
⇒ y = - 3x + 2
∴ ঢাল -3

খ) x + (y/3) = 4
⇒ y/3 = - x + 4
⇒ y = - 3x + 12
∴ ঢাল - 3.

গ) y = - 3x + 1
∴ ঢাল - 3.

ঘ) x + 3y = 6
⇒ 3y = - x + 6
⇒ y = - 1/3x + 2
∴ ঢাল - 1/3.

∴ অপশন (ঘ) এর রেখার ঢাল মূল রেখার ঢাল থেকে ভিন্ন।

৫৮১.
Given a box containing three red, two blue, and four white balls, what is the probability that we will select two red and one white ball when we have to pick three balls from it?
  1. 1/3
  2. 1/7
  3. 1/12
  4. 1/24
ব্যাখ্যা
Question: Given a box containing three red, two blue, and four white balls, what is the probability that we will select two red and one white ball when we have to pick three balls from it?

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

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

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

The probability that we will select two red and one white ball = favourable event / total event
= 12/84 
= 1/7
৫৮২.
x, y are positive integers. When x is divided by y, the remainder is 5. If x/y=5.20, what is the value of x?
  1. ক) 130
  2. খ) 155
  3. গ) 330
  4. ঘ) 425
ব্যাখ্যা
Question: x, y are positive integers. When x is divided by y, the remainder is 5. If x/y = 5.20, what is the value of x
Solution: 
দেয়া আছে 
x/y = 5.20
x/y = 520/100
x/y = 26/5

এখানে 5 দিয়ে 26  ভাগ করলে ভাগশেষ 1 থাকে 
কিন্তু বলা আছে ভাগশেষ 5 থাকবে 
তাই 
26/5 এর লব ও হরের সাথে 5 গুণ করতে হবে। 
x/y = 26/5 = (26 × 5)/(5 × 5) = 130/25
130 কে 25 দ্বারা ভাগ করলে 5 ভাগশেষ থাকে। 
x এর মান = 130
৫৮৩.
In a Mathematics examination, the number scored by 5 candidates is 5 successive odd integers. If their total marks are 185, the highest score is:
  1. 33
  2. 37
  3. 39
  4. 41
ব্যাখ্যা
Question: In a Mathematics examination, the number scored by 5 candidates is 5 successive odd integers. If their total marks are 185, the highest score is:

Solution:
Let the five successive odd numbers be,
x, x + 2, x + 4, x + 6, x + 8

Then, according to given information,
x + x + 2 + x + 4 + x + 6 + x + 8 = 185 
⇒ 5x + 20 = 185 
⇒ 5x = 165 
⇒ x = 33

∴ Highest number = 33 + 8 = 41
৫৮৪.
330 + 330 + 330 = ?
  1. 360
  2. 333
  3. 331
  4. 930
ব্যাখ্যা
Question: 330 + 330 + 330 = ?

Solution:
330 + 330 + 330
= 3 × 330
= 31 + 30
= 331
৫৮৫.
Two-fifths of one-fourth of three-seventh of a number is 15. What is the one-seventh of the number?
  1. 30
  2. 40
  3. 50
  4. 75
ব্যাখ্যা
Question: Two-fifths of one-fourth of three-seventh of a number is 15. What is the one-seventh of the number?

Solution:
Let the number be x

According to the question
(2/5) . (1/4) . (3/7) . x = 15
⇒ (1/10) × (3/7) × x = 15
⇒ 3/70 × x = 15
⇒ x = (15 × 70)/3
∴ x = 350

The one-seventh of the number = 350/7
= 50
৫৮৬.
M and N can do a piece of work in 20 days and 12 days respectively. M started the work alone and then after 4 days, N joined him till the completion of the work. How long did the work last?
  1. 8 days
  2. 10 days
  3. 12 days
  4. 15 days
ব্যাখ্যা
Question: M and N can do a piece of work in 20 days and 12 days respectively. M started the work alone and then after 4 days, N joined him till the completion of the work. How long did the work last?

Solution:
work done by m in 4 days = (1/20) × 4 = 1/5
∴ Remaining work = 1 - (1/5) = 4/5

(M + N)'s 1day's work = (1/20) + (1/12)
= 8/60 = 2/15

Now, 2/15 work is done by M and N in 1 day.
So, 4/5 work will be done by M and N in = (15/2) × (4/5)
= 6 days

∴ Total time taken = (6 + 4) days = 10 days
৫৮৭.
In what ratio must a mixture of 30% alcohol strength be mixed with that of 50% alcohol strength so as to get a mixture of 45% alcohol strength?
  1. 1 : 2
  2. 2 : 5
  3. 1 : 3
  4. 3 : 2
ব্যাখ্যা

Question: In what ratio must a mixture of 30% alcohol strength be mixed with that of 50% alcohol strength so as to get a mixture of 45% alcohol strength?

Solution:
মনে করি, প্রথম প্রকারের x একক এবং দ্বিতীয় প্রকারের y একক মিশ্রিত করতে হবে।

প্রশ্নমতে,
প্রথম প্রকারের অ্যালকোহলের পরিমাণ = 30% of x = 0.30x
দ্বিতীয় প্রকারের অ্যালকোহলের পরিমাণ = 50% of y = 0.50y

মিশ্রণের মোট পরিমাণ = (x + y)
মিশ্রণে অ্যালকোহলের মোট পরিমাণ = 45% of (x + y) = 0.45(x + y)

শর্তমতে,
0.30x + 0.50y = 0.45(x + y)
⇒ 30x + 50y = 45(x + y)  [উভয় পক্ষকে 100 দ্বারা গুণ করে]
⇒ 30x + 50y = 45x + 45y
⇒ 50y - 45y = 45x - 30x
⇒ 5y = 15x
⇒ x/y = 5/15
⇒ x/y = 1/3
∴ x : y = 1 : 3

∴ The ratio is 1 : 3

৫৮৮.
A number when multiplied by 3 and increased by 5 gives 20. Find the number.
  1. 4
  2. 5
  3. 6
  4. 8
ব্যাখ্যা
Question:  A number when multiplied by 3 and increased by 5 gives 20. Find the number.

Solution:
Let, the number be = x

According to the question,
3x + 5 = 20
⇒ 3x = 20 - 5 
⇒ 3x = 15 
⇒ x =15/3
⇒ x = 5

Therefore, the number is 5
৫৮৯.
A cube has a base with a perimeter of 24 cm. What is its volume?
  1. 125 cm3
  2. 729 cm3
  3. 216 cm3
  4. 343 cm3
ব্যাখ্যা

Question: A cube has a base with a perimeter of 24 cm. What is its volume?

Solution:
দেওয়া আছে,
ঘনকের ভূমির পরিসীমা = 24 cm
আমরা জানি,
ঘনকের ভূমি একটি বর্গক্ষেত্র।

বর্গক্ষেত্রের পরিসীমা = 4 × বাহুর দৈর্ঘ্য

ধরি, ঘনকের প্রতিটি বাহুর দৈর্ঘ্য = a

প্রশ্নমতে,
4a = 24
⇒ a = 24/4
⇒ a = 6 cm

এখন,
ঘনকের আয়তন, V = a3 ঘন একক
= (6)3
= 216 cm3

সুতরাং, ঘনকটির আয়তন হল 216 cm3

৫৯০.
A fruit seller buys lemons at 2 for one tk and sells then at 5 for three tk. His gain percentage is
  1. 22%
  2. 18%
  3. 15%
  4. 20%
ব্যাখ্যা
Question: A fruit seller buys lemons at 2 for one tk and sells then at 5 for three tk. His gain percentage is

Solution:
2 lemons cost 1 tk
So 1 lemon costs 1/2 tk
For comparing, let's calculate CP for 10 lemons
CP of 10 lemons = 10 × (1/2) = 5 tk

Now let's find selling price (SP) of lemons:
5 lemons cost 3 tk
So 10 lemons will cost = (10/5) × 3 = 6 tk

Gain = SP - CP = 6 - 5 = 1 tk
Gain percentage = (Gain/CP) × 100
= (1/5) × 100
= 20%
৫৯১.
ΔABC is a right-angled isosceles triangle, and ∠B is the right angle in the triangle. If AC measures 10√2, then which one of the following would equal the lengths of AB and BC, respectively?



  1. 7, 7
  2. 9, 9
  3. 10, 10
  4. 12, 13
ব্যাখ্যা

Question: ΔABC is a right-angled isosceles triangle, and ∠B is the right angle in the triangle. If AC measures 10√2, then which one of the following would equal the lengths of AB and BC, respectively?


Solution:
যেহেতু ABC একটি সমকোণী সমদ্বিবাহু ত্রিভুজ এবং ∠B হলো সমকোণ, তাই সমকোণের সাথে সংযুক্ত বাহু দুটি অর্থাৎ AB এবং BC এর দৈর্ঘ্য সমান হবে।

 পিথাগোরাসের উপপাদ্য অনুসারে,
AB2 + BC2 = AC2
⇒ BC2 + BC2 = (10√2)2 [এখানে, AB = BC এবং AC = 10√2]
⇒ 2BC2 = 102 × 2
⇒ BC2 = 10
⇒ BC = 10

সুতরাং, AB এবং BC এর দৈর্ঘ্য যথাক্রমে 10 এবং 10।

৫৯২.
If x + 1 > 1 - 2x then -
  1. ক) x > 1/2
  2. খ) x > 0
  3. গ) x > 3
  4. ঘ) x < 0
ব্যাখ্যা
Question: If x + 1 > 1 - 2x then -

Solution:
x + 1 > 1 - 2x
⇒ x + 2x > 1 - 1
⇒ 3x > 0
∴ x > 0
৫৯৩.
A fair coin is flipped three times. What is the probability that the coin lands head each time?
  1. ক) 1/2
  2. খ) 1/3
  3. গ) 1/4
  4. ঘ) 1/8
ব্যাখ্যা

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

৫৯৪.
A train is travelling at 48 kmph. It crosses another train having half of its length, travelling in the opposite direction at 42 kmph, in 12 seconds. It also passes a railway platform in 45 seconds. What is the length of the platform?
  1. ক) 500 metre
  2. খ) 480 metre
  3. গ) 400 metre
  4. ঘ) 360 metre
ব্যাখ্যা

Speed of the first train = 48 km/hr.
Let the length of the first train = 2x metre.

Speed of the second train = 42 km/hr.
Let the length of the second train = x metre.

Distance = (2x + x) = 3x metre.
Time = 12 seconds

Relative speed = 48 + 42 = 90 km/hr.
= 90 × (5/18) = 25 m/s.
3x = 25 × 12
⇒ x = 100 metre.

Length of the first train = 200
Time is taken to cross the platform = 45 seconds.
Speed of first train = 48 km/hr
= 48 × (5/18)
= 40/3 m/s.

Let the length of the platform = y metre.
Distance = 200 + y metre.
⇒ 200 + y = 45 × (40/3)
⇒ 200 + y = 600
⇒ y = 400 metre.

৫৯৫.
Rahim ranks seventh from the top and twenty-sixth from the bottom in class. How many students are there in the class?
  1. ক) 32
  2. খ) 33
  3. গ) 34
  4. ঘ) 31
ব্যাখ্যা

Total number of students = (26 + 7) - 1 = 32

৫৯৬.
A man sitting in a train is counting the pillars of electricity. The distance between two pillars is 60 meters and the speed of the train is 36 km/hr. In 5 hours, how many pillars will be count?
  1. 3000
  2. 3001
  3. 3006
  4. 3010
ব্যাখ্যা
Question: A man sitting in a train is counting the pillars of electricity. The distance between two pillars is 60 meters and the speed of the train is 36 km/hr. In 5 hours, how many pillars will be count?

Solution:
Distance covered by the train in 5 hours = (36 × 5) km
= (180 km × 1000)
= 180000 m

∴ Number of pillars counted by man = {(180000/60) + 1}
= (3000 + 1)
= 3001

[ Since the man start counting with pillar and end with pillar so 1 is added]
৫৯৭.
A mixture contains acid and water in the ratio 7 : 5. If 6 liters of water is added to the mixture, the ratio becomes 7 : 8. Find the quantity of acid in the given mixture.
  1. 8 liters
  2. 10 liters
  3. 12 liters
  4. 14 liters
ব্যাখ্যা
Question: A mixture contains acid and water in the ratio 7 : 5. If 6 liters of water is added to the mixture, the ratio becomes 7 : 8. Find the quantity of acid in the given mixture.

Solution:
Let, the quantity of acid and water be 7x liters and 5x liters respectively

ATQ,
7x/(5x + 6) = 7/8
⇒ 56x = 7(5x + 6)
⇒ 56x = 35x + 42
⇒ 56x - 35x = 42
⇒ 21x = 42
∴ x = 2

So, Quantity of acid = (7 × 2) liters
= 14 liters
৫৯৮.
A shopkeeper earns a profit of 12% on selling a book at 10% discount on the printed price. The ratio of the cost price and the printed price of the book is :
  1. ক) 45 : 56
  2. খ) 45 : 51
  3. গ) 47 : 56
  4. ঘ) 47 : 51
ব্যাখ্যা

According to the question,
Cost Price : Marked Price
(100 - Discount) : (100 + Profit)
100 - 10 : 100 + 12
90 : 112
45 : 56

৫৯৯.
A train is moving at a speed of 132 km/h. If the length of the train is 110 metres, how long will it take to cross a railway platform, 165 metres long?
  1. 8.5 s
  2. 5.5 s
  3. 10.5 s
  4. 7.5 s
  5. None
ব্যাখ্যা
Question: A train is moving at a speed of 132 km/h. If the length of the train is 110 metres, how long will it take to cross a railway platform, 165 metres long?

Solution:
Speed of the train = 132 km/h = 132 × (5/18) m/s
Distance = (110 + 165) = 275 m

Time required to cross the railway platform = (275 × 18)/(132 × 5)
=  7.5 s
৬০০.
What is the angle between the hour and minute hands of a clock when it is 20 minutes past 8?
  1. 250°
  2. 130°
  3. 180°
  4. 120°
ব্যাখ্যা

Question: What is the angle between the hour and minute hands of a clock when it is 20 minutes past 8?

Solution:
20 minutes past 8 অর্থাৎ, 8 টা 20 মিনিট।
= 8 + (20/60) ঘন্টা
= 8 + (1/3)
= 25/3 ঘন্টা

আমরা জানি,
ঘণ্টার কাঁটা 12 ঘণ্টায় 360° ঘোরে।
∴ 1 ঘণ্টায় ঘোরে = 360°/12 = 30°
∴ 25/3 ঘন্টায় ঘোরে = (30° × 25)/3 = 250°

আবার,
মিনিটের কাঁটা 60 মিনিটে 360° ঘোরে।
∴ 1 মিনিটে ঘোরে = 360°/60 = 6°
∴ 20 মিনিটে ঘোরে = 20 × 6° = 120°

∴ ঘড়ির কাঁটা দুটির মধ্যবর্তী কোণ = | 250° - 120° | = 130°