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Bank Math

মোট প্রশ্ন১৬,১২৪এই পাতা১০০প্রতি পাতা১০০
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Bank Math

PrepBank · পাতা ১৫৭ / ১৬১ · ১৫,৬০১১৫,৭০০ / ১৬,১২৪

১৫,৬০১.
What is the slope of a line perpendicular to the line whose equation is 20x - 2y = 6?
  1. - 10
  2. - 1/10
  3. 10
  4. 1/10
ব্যাখ্যা

Question: What is the slope of a line perpendicular to the line whose equation is 20x - 2y = 6?

Solution:
সরল রেখার সাধারণ সমীকরণ,
y = mx + c ......(1) (এখানেm = ঢাল)

যদি কোনো রেখার ঢাল হয় m, তবে তার লম্ব (perpendicular) রেখার ঢাল হবে,
m' = - (1/m)

এখন,
20x - 2y = 6
2y = 20x - 6
y = 10x - 3
(1) নং এর সাথে তুলনা করে পাই,
m = 10

∴ লম্ব (perpendicular) রেখার ঢাল হবে, m' = - (1/10)

১৫,৬০২.
A train traveled p kms in 40 minutes and completed the remaining 200 kms of the trip in q minutes. What was its average speed, in km per hour for the entire trip?
  1. ক) 60 (p +200)/(40 + q)
  2. খ) 240/(p + q)
  3. গ) 4/(p + q)
  4. ঘ) None
ব্যাখ্যা
Question: A train traveled p kms in 40 minutes and completed the remaining 200 kms of the trip in q minutes. What was its average speed, in km per hour for the entire trip?

Solution: 
p কিলোমিটার যেতে সময় লাগে 40 মিনিট 
200 কিলোমিটার যেতে সময় লাগে q মিনিট

মোট দূরত্ব = P + 200 কিলোমিটার
মোট সময় = (40 + q) মিনিট
=(40 + q)/60 ঘণ্টা 

গড় বেগ = (P + 200)/{(40 + q)/60}
= 60(P + 200)/(40 + q)
১৫,৬০৩.
A speedboat, whose speed in 15 km/hr in still water goes 30 km downstream and comes back in a total of 4 hours 30 minutes. What is the speed of the stream in km/hr?
  1. ক) 2.5 km/hr
  2. খ) 3.5 km/hr
  3. গ) 4 km/hr
  4. ঘ) 5 km/hr
ব্যাখ্যা

Let the speed of the stream be x km/hr
Upstream Speed = 15 + x
Downstream Speed = 15 - x

So,
{30/(15+x)} + {30/(15-x)} = 4(1/2)(4 hours 30 minutes)
⇒ {900/(225-x2)} = 9/2
⇒ 9x2 = 225
⇒ x2 = 25
⇒ x = 5.
Hence, the speed of the stream is 5 km/hr.

১৫,৬০৪.
Two trains are running in the same direction at 80 km/h and 60 km/h. The faster train crosses a man in the slower train in 36 seconds. What is the length of the faster train?
  1. 120 meters
  2. 140 meters
  3. 200 meters
  4. 220 meters
ব্যাখ্যা
Question: Two trains are running in the same direction at 80 km/h and 60 km/h. The faster train crosses a man in the slower train in 36 seconds. What is the length of the faster train?

Solution:
Relative speed of train = (80 - 60) km/h
= 20 km/h
= (20 × 1000)/3600
= (50/9) m/s

∴ Distance covered  = Speed × Time
= (50/9) × 36
= 200 meters

To overtake the person, the train has to travel a distance equal only to its own length.

So, Length of faster train = Distance covered =  200 meters.
১৫,৬০৫.
A is 30% more efficient than B. How much time will they, working together, take to complete a job which A alone could have done is 23 days?
  1. 11 days
  2. 13 days
  3. (343/17) days
  4. None of these
ব্যাখ্যা

Question: A is 30% more efficient than B. How much time will they, working together, take to complete a job which A alone could have done is 23 days?

Solution: 
Ratio of times taken by A and B = 100 : 130 = 10 : 13

Suppose B takes x days to do the work.
Then,
10 : 13 :: 23 : x
⇒ x = (23 × 13)/10
⇒ x = 299/10
A's 1 day's work = 1/23
B's 1 day's work = 10/299
(A + B)'s 1day's work = 1/23 + 10/299
= 23/299
= 1/13

∴ A and B together can complete the work in 13 days.

১৫,৬০৬.
On a sum of money, the simple interest for 2 years is Tk. 880, while the compound interest is Tk. 928.4, the rate of interest being the same in both cases. The rate of interest is -
  1. 10%
  2. 10.2%
  3. 10.5%
  4. 11%
ব্যাখ্যা
Question: On a sum of money, the simple interest for 2 years is Tk. 880, while the compound interest is Tk. 928.4, the rate of interest being the same in both cases. The rate of interest is -

Solution:
Difference of Compound interest and Simple interest for 2 years = Tk. (928.4 - 880) = Tk. 48.4
Simple interest for 1 years = 880/2 = Tk. 440

Simple interest on 440 for 1 year = 48.4
Interst rate = {(48.4 × 100)/440}% = 11%
১৫,৬০৭.
In what ratio must wheat A at Tk. 21.00 per kg be mixed with wheat B at Tk. 24.60 per kg, so that the mixture be worth of Tk. 22.00 per kg?
  1. ক) 13 : 5
  2. খ) 18 : 3
  3. গ) 17 : 5
  4. ঘ) 11 : 5
ব্যাখ্যা
Question: In what ratio must wheat A at Tk. 21.00 per kg be mixed with wheat B at Tk. 24.60 per kg, so that the mixture be worth of Tk. 22.00 per kg?

Solution: 
Let,
The quantity of wheat A = x kg 
The quantity of wheat B = y kg

ATQ,
21.00 x + 24.60 y = (x + y) × 22.00
⇒ 21.00 x + 24.60 y = 22.00 x + 22.00 y 
⇒ 22.00 x - 21.00 x = 24.60 y - 22.00 y
⇒ x = 2.60 y
⇒ x/y = 26/10
⇒ x/y = 13/5
x : y = 13 : 5 
১৫,৬০৮.
Find the largest number of 4-digits divisible by 12, 15 and 18.
  1. 9900
  2. 9750
  3. 9450
  4. 9000
ব্যাখ্যা
Question: Find the largest number of 4-digits divisible by 12, 15 and 18.

Solution:
Required largest number must be divisible by the L.C.M. of 12, 15 and 18
L.C.M. of 12, 15 and 18
12 = 2 × 2 × 3
15 =5 × 3
18 = 2 × 3 × 3
L.C.M. = 180
Now divide 9999 by 180, we get remainder as 99
The required largest number = (9999 - 99) = 9900
Number 9900 is exactly divisible by 180.
১৫,৬০৯.
If X and Y are in the ratio 3 : 4, and Y and Z in the ratio 12 : 13, then X and Z will be in the ratio-
  1. ক) 9 : 23
  2. খ) 19 : 13
  3. গ) 9 : 13
  4. ঘ) 9 : 11
ব্যাখ্যা
Question: If X and Y are in the ratio 3 : 4, and Y and Z in the ratio 12 : 13, then X and Z will be in the ratio-

Solution: 
X : Y = 3 : 4
⇒ X/Y = 3/4

Y : Z = 12 : 13
⇒ Y/Z = 12/13

 X/Y ×  Y/Z = 3/4 × 12/13
⇒ X/Z = 9/13
∴ X : Z = 9 : 13 
১৫,৬১০.
A man purchased 300 shares of the face value of Tk. 100 each from the market at Tk. 800 per share. If a dividend of 24% is declared, find his earning percent on the investment.
  1. 2.4%
  2. 30%
  3. 3%
  4. 8%
ব্যাখ্যা
Question: A man purchased 300 shares of the face value of Tk. 100 each from the market at Tk. 800 per share. If a dividend of 24% is declared, find his earning percent on the investment.

Solution:
Price of 1 share = Tk. 800.
Dividend rate = 24%.

∴ Earning % on investment = (24/800) × 100 = 3%.
১৫,৬১১.
Dog : Bark :: Goat : ?
  1. Bray
  2. Grunt
  3. Howl
  4. Bleat
ব্যাখ্যা
Question: Dog : Bark :: Goat : ?

Solution: 
The relationship between "Dog" and "Bark" is that a dog typically produces the sound "bark." In a similar manner, a sound often associated with a goat is "bleat." So, the analogy would be:

Goat : Bleat

Also,
Bray is a sound commonly associated with Donkey
"Grunt" is a sound commonly associated with pigs
"Howl" is a sound typically associated with wolves
১৫,৬১২.
If x + (1/x) = 4 then, x - (1/x) = ?
  1. ± √10
  2. 5
  3. 3
  4. ± 2√3
ব্যাখ্যা

Question: If x + (1/x) = 4 then, x - (1/x) = ?

Solution:
দেওয়া আছে, x + 1/x = 4

আমরা জানি,
(x - 1/x)2 = (x + 1/x)2 - 4 . x . 1/x
⇒ (x - 1/x)2 = 42 - 4 [মান বসিয়ে]
⇒ (x - 1/x)2 = 16 - 4
⇒ (x - 1/x)2 = 12
⇒ x - (1/x) = ± √12
∴ x - (1/x) = ± 2√3

১৫,৬১৩.
If two pipes function simultaneously, the reservoir will be filled in 24 hrs. One pipe fills the reservoir 20 hours faster than the other. How many hours does it take for the second pipe to fill the reservoir?
  1. 12 hours
  2. 30 hours
  3. 44 hours
  4. 60 hours
ব্যাখ্যা

Assume that the reservoir is filled by the first pipe in 'x' hours.
So, the reservoir is filled by a second pipe in 'x + 20' hours.

Now, from these above conditions,
we can form the equations as,
1/x + 1/(x + 20) = 1/24
[x + 20 + x]/[x(x + 20)] = 1/24
x2– 28x – 480 = 0

By solving this quadratic equation , we get the factors (x – 40) (x+12) = 0
Hence, we get two values :
(x – 40) = 0 and (x+12) = 0
⇒ x = 40 and x = -6

Since the filling of the reservoir is positive work, we can neglect the negative value of 'x'.
Thus, x = 40

This means that the second pipe will take (x+ 20) hrs = 40 + 20 = 60 hrs to fill the reservoir.

১৫,৬১৪.
Solve the following equation: (x/3) - (1/12) = (1/6) + (x/4)
  1. - 2
  2. 3
  3. 4
  4. 12
ব্যাখ্যা
Question: Solve the following equation: x/3 - 1/12 = 1/6 + x/4

Solution:
Given,
x/3 - 1/12 = 1/6 + x/4
⇒ x/3 - x/4 = 1/6 + 1/12
⇒ (4x - 3x)/12 = (2 + 1)/12
⇒ x/12 = 3/12
⇒ 12x = 3 × 12
∴ x = 3
১৫,৬১৫.
The difference between the length and breadth of a rectangle is 23 meter. If its perimeter is 206 meter, then, its area is
  1. ক) 1520 sq meter
  2. খ) 2480 sq meter
  3. গ) 2520 sq meter
  4. ঘ) 2420 sq meter
ব্যাখ্যা
প্রশ্ন : The difference between the length and breadth of a rectangle is 23 meter. If its perimeter is 206 meter, then, its area is
সমাধান :
মনে করি,
দৈর্ঘ্য = l মিটার 
প্রস্থ = b মিটার। 
 
দৈর্ঘ্য ও প্রস্থের পার্থক্য, (l - b) = 23.............(1)
পরিসীমা, 2(l + b) = 206 
               বা, (l + b) = 103................(2)

সমীকরণ সমাধান করে আমরা পাই : l = 63 and b = 40.

সুতরাং,  ক্ষেত্রফল  = (l x b) = (63 x 40) m2 = 2520 m2.
১৫,৬১৬.
A wire can be bent in the form of a circle of radius 56cm. If it is bent in the form of a square, then what will be its area?
  1. ক) 7,744
  2. খ) 7,759
  3. গ) 1,456
  4. ঘ) None of these
ব্যাখ্যা
দেয়া আছে,
বৃত্তের ব্যাসার্ধ r = 56 cm 
বৃত্তের পরিধি = 2πr 
                    = 2 × (22/7) × 56 
                    = 2 × 22 × 8
                    = 352 cm 
বর্গের এক বাহুর দৈর্ঘ্য = 352/4 cm 
                                  = 88 cm 
বর্গের ক্ষেত্রফল = (88)2 cm
                        = 7,744 cm2
১৫,৬১৭.
In a certain code language, '-' represents '+', '+' represents '×', '×' represents '÷' and '÷' represents '-'. Find out the answer to the following question.
13 - 14 + 15 × 70 ÷ 14 = ?
  1. ক) 2
  2. খ) 5
  3. গ) 3
  4. ঘ) None of the above
ব্যাখ্যা
প্রশ্ন : In a certain code language, '-' represents '+', '+' represents '×', '×' represents '÷' and '÷' represents '-'. Find out the answer to the following question.
13 - 14 + 15 × 70 ÷ 14 = ?
সমাধান :
Given equation: 13 - 14 + 15 × 70 ÷ 14 = ?

প্রতীকগুলো পরিবর্তন করে পাই, 
13 + 14 × 15 ÷ 70 - 14 
= 13 + 210 ÷ 70 -14
= 13 + 3 – 14
=  16 - 14
=  2

অতএব, সঠিক উত্তর ‘2’.
১৫,৬১৮.
How many rotations will the hour hand of a clock complete in 96 hours?
  1. 9
  2. 6
  3. 7
  4. 8
ব্যাখ্যা
Question: How many rotations will the hour hand of a clock complete in 96 hours?

Solution: 
Number of rotation = 96/12 = 8
১৫,৬১৯.
A person rowing against the current can go 2 km per hour. If the speed of the current is 3 km per hour, how much time will he take to cover 32 km, rowing along the current?
  1. ক) 2 hr
  2. খ) 4 hr
  3. গ) 6 hr
  4. ঘ) 8 hr
ব্যাখ্যা
Question: A person rowing against the current can go 2 km per hour. If the speed of the current is 3 km per hour, how much time will he take to cover 32 km, rowing along the current?

Solution: 
ধরি, ব্যক্তির বেগ x কিমি/ঘণ্টা 
স্রোতের বেগ ৩ কিমি/ঘণ্টা

ব্যক্তি স্রোতের বিপরীতে ২ কিমি/ঘণ্টা বেগে যায়।

x - ৩ = ২
∴ x = ৫ কিমি/ঘণ্টা 

স্রোতের অনুকূলে বেগ = ৩ + ৫ কিমি/ঘণ্টা 
= ৮ কিমি/ঘণ্টা 

স্রোতের অনুকূলে যেতে সময় লাগে = ৩২/৮ ঘণ্টা 
= ৪ ঘন্টা 
১৫,৬২০.
Mr. Mohit moved 2/3 of his lawn in 4/3 hours. Mr. Akil makes twice a fast and finishes the remaining job. How many minutes did Mr. Akil work? 
  1. 18 minutes
  2. 20 minutes
  3. 25 minutes
  4. 28 minutes
ব্যাখ্যা
Question: Mr. Mohit moved 2/3 of his lawn in 4/3 hours. Mr. Akil makes twice a fast and finishes the remaining job. How many minutes did Mr. Akil work? 

Solution: 
2/3 of work is done in 4/3 hours 
Full work is done in (4/3) × (3/2) hours = 2 hours 
∴ Work left = 1 - (2/3) = 1/3 part

Akil can complete the work in = 2/2 hours = 1 hour
Akil can do 1/3 part of the work in = 1/3 hour
= (1/3) × 60 minutes 
= 20 minutes
১৫,৬২১.
If u, v, w, x, y, z are six consecutive odd integers. Find the average (arithmetic mean) of these six numbers.
  1. u + 10
  2. u + 5
  3. 6
  4. 5(u + 6)
ব্যাখ্যা
Question: If u, v, w, x, y, z are six consecutive odd integers. Find the average (arithmetic mean) of these six numbers.

Solution:
১৫,৬২২.
A train of length 240 meters crosses a pole in 12 seconds. In what time it will cross a platform of length 400 meters?
  1. 33 seconds
  2. 35 seconds
  3. 37 seconds
  4. 39 seconds
  5. None of these
ব্যাখ্যা
Question: A train of length 240 meters crosses a pole in 12 seconds. In what time it will cross a platform of length 400 meters?

Solution:
First, we need to find the speed of the train when it crosses the pole.
Length of the train: 240 meters
Time to cross the pole: 12 seconds
The speed of the train (S) can be calculated using the formula:
S = Distance/Time = 240 meters/12 seconds = 20 m/s

When crossing the platform, the train needs to cover its own length plus the length of the platform.
Length of the platform: 400 meters
Total distance to cross: Length of the train + Length of the platform
Total distance = 240 meters + 400 meters = 640 meters

∴ Required time = 640/20 seconds = 32 seconds
১৫,৬২৩.
A machine making cost is Tk 25,000, sold with two successive discounts of 25% and 20%. An additional discount of 10% is offered for cash payment. What is the total loss in the selling price of the machine at cash payment?
  1. 10856 Tk
  2. 11500 Tk
  3. 12420 Tk
  4. None of the above
ব্যাখ্যা
Question: A machine making cost is Tk 25,000, sold with two successive discounts of 25% and 20%. An additional discount of 10% is offered for cash payment. What is the total loss in the selling price of the machine at cash payment?

Solution:
Making price = 25000 Tk
Selling Price after first Discount of 25% = 25000 - 25% of 25000
= 25000 - {(25/100) × 25000}
= 18750 Tk

The selling price after the second Discount of 20% = 18750 - 20% of 18750
= 18750 - {(20/100) × 18750
= 15000 Tk

∴ The final selling price at cash = 15000 - 10% of 15000
= 15000 - {(10/100) × 15000}
= 13500 Tk

Total loss = (25000 - 13500) = 11500 Tk
১৫,৬২৪.
There are 7 non-collinear points. How many triangles can be drawn by joining these points?
  1. 28
  2. 35
  3. 46
  4. 54
ব্যাখ্যা

Question: There are 7 non-collinear points. How many triangles can be drawn by joining these points?

Solution: 
A triangle is formed by joining any three non-collinear points in pairs.
There are 7 non-collinear points.

∴ The number of triangles formed = 7C3 = 35

১৫,৬২৫.
A boat running downstream covers a distance of 20 km in 2 hours while for covering the same distance upstream, it takes 5 hours. What is the speed of the boat in still water?
  1. ক) 6 kmph
  2. খ) 7 kmph
  3. গ) 5 kmph
  4. ঘ) 8 kmph
ব্যাখ্যা
Question: A boat running downstream covers a distance of 20 km in 2 hours while for covering the same distance upstream, it takes 5 hours. What is the speed of the boat in still water?

Solution: 
Rate downstream
= 20/2 kmph = 10 kmph
Rate upstream
= 20/5 kmph = 4 kmph

∴ Speed in still water
= (1/2)(10 + 4) kmph = 7 kmph
১৫,৬২৬.
A Company employs 15 persons, each working 44 hours a week. If 4 persons are absent, how many hours a week would the rest of the persons have to work to make up the time lost?
  1. 45
  2. 48
  3. 56
  4. 60
ব্যাখ্যা
Question: A Company employs 15 persons, each working 44 hours a week. If 4 persons are absent, how many hours a week would the rest of the persons have to work to make up the time lost?
 
Solution
একটি কোম্পানি ১৫ জন কর্মচারী নিয়োগ দেয়। প্রত্যেকে ৪৪ ঘণ্টা কাজ করে। 
মোট কাজ হয় = (১৫ × ৪৪)
= ৬৬০ ঘণ্টা 
 
৪ জন অনুপস্থিত থাকলে, বাকি থাকে = ১৫ - ৪ জন 
= ১১ জন 
 
∴ প্রত্যেকের কাজ করতে হবে = ৬৬০/১১ ঘণ্টা 
= ৬০ ঘণ্টা 
১৫,৬২৭.
If tanθ + cotθ = 3, then tan2θ + cot2θ is?
  1. ক) 3
  2. খ) 5
  3. গ) 7
  4. ঘ) 9
ব্যাখ্যা
Question: If tanθ + cotθ = 3, then tan2θ + cot2θ is?

Solution:
দেওয়া আছে,
tanθ + cotθ = 3
⇒ (tanθ + cotθ)2 = 32
⇒ tan2θ + cot2θ + 2tanθ . cotθ = 9
⇒ tan2θ + cot2θ = 9 - 2 [∵ tanθ . cotθ = 1]
∴ tan2θ + cot2θ = 7
১৫,৬২৮.
The greatest number which on dividing 1657 and 2037 leaves remainders 6 and 5 respectively is-
  1. ক) 121
  2. খ) 123
  3. গ) 127
  4. ঘ) 235
ব্যাখ্যা
Question: The greatest number which on dividing 1657 and 2037 leaves remainders 6 and 5 respectively is

Solution:
The number will be H.C.F (1657 - 6) = 1651 and (2037 - 5) = 2032.

So H.C.F of 1651 and 2032 = 127.
১৫,৬২৯.
A sum of money triples itself in 25 years at simple interest. What is the annual interest rate?
  1. 5%
  2. 8%
  3. 10%
  4. 12%
ব্যাখ্যা

Question: A sum of money triples itself in 25 years at simple interest. What is the annual interest rate?

Solution:
ধরি, আসল = P টাকা
∴ 25 বছরে সুদে-আসলে হয় (A) = 3P টাকা
সুতরাং, সুদ (I) = A - P = 3P - P = 2P টাকা
সময় (n) = 25 বছর
সুদের হার (r) = ?

আমরা জানি,
I = (Pnr)/100
⇒ r = (I × 100)/(P × n)
⇒ r = (2P × 100)/(P × 25)
⇒ r = (2 × 100)/25
⇒ r = 2 × 4
⇒ r = 8%
সুতরাং, বার্ষিক সুদের হার 8%।

১৫,৬৩০.
On a river, C is the mid-point between two points A and B on the same bank of the river. A boat can go from A to C and back in 14 hours and from A to B in 24 hour. How long it would take to go from B to A?
  1. 12 hours
  2. 11 hours
  3. 5.5 hours
  4. 4 hours
ব্যাখ্যা
Question: On a river, C is the mid-point between two points A and B on the same bank of the river. A boat can go from A to C and back in 14 hours and from A to B in 24 hour. How long it would take to go from B to A?

Solution:
Time required to travel from A to B = 24 hour
Time required to travel from A to C = 1/2 (24 hours)
= 12 hour
Given total time from A to C and C to A = 14h
∴ 12 hour + C to A = 14h
∴ C to A = 2 hour
Time taken from B to A is twice of C to A
then, time taken from B to A = (2 × 2) hour
= 4 hours
১৫,৬৩১.
A parallelogram has sides 30m and 14m and one of its diagonals is 40m long. Then, its area is:
  1. ক) 336 m²
  2. খ) 168 m²
  3. গ) 480 m²
  4. ঘ) 372 m²
  5. ঙ) 363 m²
ব্যাখ্যা

Let, ABCD be a || gm in which AB = 30 m, BC = 14 m & AC = 40 m.
Clearly, area of || gm ABCD = 2 (area of ∆ABC).
Let, a = 30, b = 14 & c = 40.
Then, s = (1/2)(a+b+c) = 42
Therefore, area of ∆ABC = √s(s-a)(s-b)(s-c)
= √42×12×28×2 = 168 m²
Therefore area of || gm = (2×168) m² = 336 m²

১৫,৬৩২.
Three houses are available in a locality. Three persons apply for the houses. Each applies for one house without consulting others. The probability that all the three apply for the same house is
  1. ক) 1/9
  2. খ) 5/9
  3. গ) 8/9
  4. ঘ) 4/9
ব্যাখ্যা

One person can select one house out of 3 = 3C1 ways =3 ways
Hence, three persons can select one  house in = 3 × 3 × 3 = 27 ways
So, All three apply for the same house, its probability = 3/27 = 1/9

১৫,৬৩৩.
A train takes 50 seconds to cross a platform 300 meters long and 35 seconds to cross another platform 150 meters long. Find the length of the train.
  1. 200 meters
  2. 300 meters
  3. 400 meters
  4. 240 meters
ব্যাখ্যা

Question: A train takes 50 seconds to cross a platform 300 meters long and 35 seconds to cross another platform 150 meters long. Find the length of the train.

Solution:
Let the length of the train = x meters

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

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

∴ The length of the train is 200 meters

১৫,৬৩৪.
A committee of 5 members is to be made of 5 males and 10 females so that there is always 3 females on the committee. How many ways can the committee be formed?
  1. 600
  2. 720
  3. 480
  4. 1200 
  5. 2400
ব্যাখ্যা
Question: A committee of 5 members is to be made of 5 males and 10 females so that there is always 3 females on the committee. How many ways can the committee be formed?

Solution:
As there should be always 3 females in the committee,
total ways = 5C2 × 10C3
= 10 × 120
= 1200
১৫,৬৩৫.
When 10% of a number is added to another number, the second number increases by 140%. What is the ratio between the first and the second number?
  1. 9 : 2
  2. 12 : 5
  3. 14 : 1
  4. 15 : 3
  5. None of the above
ব্যাখ্যা
Question: When 10% of a number is added to another number, the second number increases by 140%. What is the ratio between the first and the second number?

Solution:
Let,
The two numbers be x and y

ATQ,
y + 10% of x = y + 140% of y
⇒ 10x/100 = 140y/100
⇒ x/10 = 7y/5
⇒ 5x = 70y
⇒ x = 14y
⇒ x/y = 14/1
∴ x : y = 14 : 1
১৫,৬৩৬.
What is the missing number?
  1. 154
  2. 160
  3. 180
  4. 196
ব্যাখ্যা
Question: What is the missing number?

Solution: 
n the first column, (9 × 5) - 7 =38.
In the second column, (11 × 9) - 22=77.
So, missing number= (11 × 15) - 5 = 160.
So, the answer is 160
১৫,৬৩৭.
If DOUBLE = 59, Then SINGLE =? 
  1. 61
  2. 62
  3. 64
  4. 66
ব্যাখ্যা
Question: If DOUBLE = 59, Then SINGLE =? 

Solution:

D + O + U + B + L + E
4 + 15 + 21 + 2 + 12 + 5
= 59

Now,
S + I + N + G + L + E 
19 + 9 + 14 + 7 + 12 + 5
= 66
১৫,৬৩৮.
A car running at a speed of 140 km/hr reached its destination in 2 hours. If the car wants to reach at its destination in 1.5 hour, at what speed it needs to travel?
  1. 186.67 km/hr
  2. 240.50 km/hr
  3. 210 km/hr
  4. 280 km/hr
ব্যাখ্যা
Question: A car running at a speed of 140 km/hr reached its destination in 2 hours. If the car wants to reach at its destination in 1.5 hour, at what speed it needs to travel?

Solution:
Distance to be covered = Speed × Time = 140 × 2 = 280 km

Time = 1.5 hour
∴ Required Speed = 280/1.5 = 186.67 km/hr
১৫,৬৩৯.
In 87659_21 what is the least number which can be filled in blank so that the number is divisible by 11.
  1. 1
  2. 2
  3. 3
  4. 4
ব্যাখ্যা
Question: In 87659_21 what is the least number which can be filled in blank so that the number is divisible by 11.

Solution:
Divisibility rule of 11:
If the sum of digits at odd and even places are equal or differ by a number divisible by 11, then the number is also divisible by 11.
Let the number of blank place be x 
Now,
(8 + 6 + 9 + 2) - (7 + 5 + x + 1) = 0 or 11
⇒ 25 - 13 - x = 0 or 11 
⇒ 12 - x = 0 or 11 

12 - x = 0
∴ x = 12 

Or
12 - x = 11
⇒ x = 12 - 11 
∴ x = 1 
১৫,৬৪০.
Two pipes can fill a tank in 12 minutes working together. After working together for 8 minutes, the first pipe is closed. It then takes 10 more minutes for the second pipe to fill the tank completely. How long would the second pipe take alone to fill the tank?
  1. 20 minutes
  2. 30 minutes
  3. 36 minutes
  4. 40 minutes
  5. None of these
ব্যাখ্যা

Question: Two pipes can fill a tank in 12 minutes working together. After working together for 8 minutes, the first pipe is closed. It then takes 10 more minutes for the second pipe to fill the tank completely. How long would the second pipe take alone to fill the tank?

Solution: 
Let the first pipe fill the tank at rate A tanks per minute.
Let the second pipe fill the tank at rate B tanks per minute.
Both pipes together fill the tank in 12 minutes. so,
A + B = 1/12  ....... (1)

They work together for 8 minutes.
Work done in 8 minutes = 8 × (1/12) = 8/12 = 2/3 of the tank

∴ Remaining work = 1 - (2/3) = 1/3 of the tank
This remaining 1/3 is filled by the second pipe alone in 10 minutes.
⇒ B × 10 = 1/3
∴ B = (1/3)/10 = 1/30 tank per minute

Therefore, time taken by the second pipe alone to fill the full tank = 1/1/30 = 30 minutes.

১৫,৬৪১.
Two equal sum of money were lent at simple interest at 11% p. a for the 7/2 years and 9/2 years respectively. If the difference in interests for two periods was Tk. 411.4, Then each sum is: 
  1. ক) Tk. 3740
  2. খ) Tk. 3760
  3. গ) Tk. 3750
  4. ঘ) Tk. 3780
ব্যাখ্যা
Let the each sum be x 
Now 
{(x × 11 × 9)/(100 × 2)} - {(x × 11 × 7)/(100 × 2)} = 411.4
(99x - 77x)/200 = 411.4
22x = 82,280
x= 82,280/22
x = 3740
১৫,৬৪২.
The H.C.F. of two numbers is 23 and the other two factors of their L.C.M. are 13 and 14. The smaller of the two numbers is:
  1. ক) 299
  2. খ) 211
  3. গ) 319
  4. ঘ) 322
ব্যাখ্যা
The HCF of a group of numbers will be always a factor of their LCM.
HCF is the product of all common prime factors using the least power of each common prime factor.
LCM is the product of highest powers of all prime factors.
Clearly, the numbers are (23 x 13) and (23 x 14)
∴ smaller number = (23 x 13) = 299
--------------------------------------------------------------------------
দুইটি সংখ্যার গসাগু ২৩ এবং তাদের লসাগুর দুইটি উৎপাদক ১৩ ও ১৪ হলে, ছোট সংখ্যাটি কত?
একাধিক সংখ্যার গসাগু সর্বদা তাদের লসাগুর উৎপাদক হয়। সকল সাধারণ মৌলিক উৎপাদকের গুণফল হচ্ছে গসাগু।
সংখ্যা দুইটি ২৩ × ১৩ ও ২৩ × ১৪
ছোট সংখ্যাটি ২৩ × ১৩ = ২৯৯
১৫,৬৪৩.
A fruit seller sells apples at the rate of Tk. 9 per kg and thereby loses 20%. At what price per kg, he should have sold them to make a profit of 5%?
  1. Tk. 12
  2. Tk. 11.81
  3. Tk. 11
  4. Tk. 11.32
ব্যাখ্যা

Selling price = 9
Loss = 20%
Cost price = (9 × 100)/80
= 45/4
To make a profit of 5% selling price
= (45/4) × (105/100)
= (9 × 21)/(4 × 4)
= 11.81

১৫,৬৪৪.
The base of a triangle is thrice its height, which is 9 cm. What is the area, in square centimeters, of the triangle?
  1. ক) 486 cm2
  2. খ) 386 cm2
  3. গ) 13.5 cm2
  4. ঘ) 15.5 cm2
ব্যাখ্যা
Question: The base of a triangle is thrice its height, which is 9 cm. What is the area, in square centimeters, of the triangle?

Solution:
ত্রিভুজের ভূমি = 9 cm
ত্রিভুজের উচ্চতা = 9/3 = 3 cm

ত্রিভুজের ক্ষেত্রফল = (1/2) × 9 × 3 =  (1/2) × 27  =  13.5 cm2
১৫,৬৪৫.
  1. ক) 1
  2. খ) - 1
  3. গ) - 2
  4. ঘ) 2
ব্যাখ্যা
 Question:


Solution:

১৫,৬৪৬.
If the price of a commodity is increased by 25% and its consumption is decreased by 20%, what will be the increase or decrease in expenditure on the commodity?
  1. 4% decrease
  2. 4% increase
  3. 5% decrease
  4. No increase or decrease
ব্যাখ্যা
Question: If the price of a commodity is increased by 25% and its consumption is decreased by 20%, what will be the increase or decrease in expenditure on the commodity?

Solution:
Let the initial expenditure on the commodity be Tk. 100.

Price increases by 25%:
New Price = 100+ (25% of 100) = 100+ 25 = Tk. 125

Consumption decreases by 20%:
New Consumption = 125 (20% of 125) 125 - 25 = Tk. 100

So, the final expenditure remains Tk. 100, meaning there is no change in the expenditure on the commodity.
১৫,৬৪৭.
The price of an article is raised by 30% and then two successive discounts of 10% each are allowed. Ultimately, the price of the article is:
  1. Tk. 105.3
  2. Tk. 100
  3. Tk. 104
  4. Tk. 109.7
ব্যাখ্যা
Question: The price of an article is raised by 30% and then two successive discounts of 10% each are allowed. Ultimately, the price of the article is:

Solution: 
let, the price be 100 taka 

after 30% raise = 100 + 30 = 130 taka

after first 10% discount = 130 - 13 = 117 taka

after second 10% discount = 117 - 117 × 0.1 
= 117 - 11.7
= 105.3
১৫,৬৪৮.
30 workers can manufacture 30 machines working 5 hours a day. How many workers need to be appointed extra to triple the production if they work 10 hours a day? 
  1. 30 workers
  2. 25 workers
  3. 15 workers
  4. 40 workers
  5. 20 workers
ব্যাখ্যা

Question: 30 workers can manufacture 30 machines working 5 hours a day. How many workers need to be appointed extra to triple the production if they work 10 hours a day?

Solution:
5 hours to manufacture 30 machines by 30 workers
∴ 1 hour to manufacture 1 machine by = (30 × 5)/30 workers
∴ 10 hours to manufacture 90 machines by = (5 × 90)/10 workers
= 45 workers

∴ Extra workers required
= (45 - 30)
= 15 workers

১৫,৬৪৯.
Quadratic equation corresponding to the roots 2 + √5 and 2 - √5 is-
  1. x2 - 4x - 1 = 0
  2. x2 + 4x - 1 = 0
  3. x2 - 4x + 1 = 0
  4. x2 + 4x + 1 = 0
ব্যাখ্যা
Question: Quadratic equation corresponding to the roots 2 + √5 and 2 - √5 is-

Solution:
The quadratic equation is: x2 - (Sum of roots)x + Product of roots = 0

Let the roots of the equation be A and B.
A = 2 + √5 and B = 2 - √5

∴ A + B = 2 + √5 + 2 - √5 = 4

∴ A × B = (2 + √5)(2 - √5) = 4 - 5 = - 1

Then equation is
x2 - 4x - 1 = 0
১৫,৬৫০.
A can do a piece of work in 30 days. He works at it for 6 days and then B finishes it in 18 days. In what time can A and B together it?
  1. ক) 14 (1/2) days
  2. খ) 11 days
  3. গ) 13 (1/4) days
  4. ঘ) 12 (6/7) days
  5. ঙ) None of these
ব্যাখ্যা

Let 'B' alone can do the work in 'x' days
6/30 + 18/x = 1
=> x = 22.5
1/30 + 1/22.5 = 7/90
=> 90/7 = 12 (6/7) days

১৫,৬৫১.
The difference of the number consisting of two digits and the number formed by interchanging the digit is always divisible by-
  1. 5
  2. 6
  3. 7
  4. 9
ব্যাখ্যা
Question: The difference of the number consisting of two digits and the number formed by interchanging the digit is always divisible by-

Solution:
Let the ten's digit be x and the unit's digit be y.
So, the number = 10x + y
After interchanging the positions of the number's digits, the number will be = 10y + x

∴ Difference = (10x + y) - (10y + x) 
= 10x + y - 10y - x
= 9x - 9y
= 9(x - y); which is divisible by 9.
১৫,৬৫২.
The sum of digits of a 3-digit number is divisible by 7. Which of these numbers satisfies it?
  1. 234
  2. 351
  3. 142
  4. 429
ব্যাখ্যা

Question: The sum of digits of a 3-digit number is divisible by 7. Which of these numbers satisfies it?

Solution:
A number is divisible by 7 in terms of digit sum if the sum of its digits is divisible by 7.
Check each number:
234 → 2 + 3 + 4 = 9 → 9/7 = 1 remainder 2 
351 → 3 + 5 + 1 = 9 → 9/7 = 1 remainder 2 
142 → 1 + 4 + 2 = 7 → 7/7 = 1 
429 → 4 + 2 + 9 = 15 → 15/7 = 2 remainder 1

142 satisfies it.

১৫,৬৫৩.
=?
  1. ক) 19
  2. খ) 17
  3. গ) 256
  4. ঘ) 155
ব্যাখ্যা
Question:  =?

Solution:
এখানে,
√17956 = 134
√24025 = 155

= √(134 + 155)
= √289
= 17
১৫,৬৫৪.
The average of two numbers is 62. If 2 is added to the smaller number, the ratio between the numbers becomes 1 : 2. What is the smaller number?
  1. 40
  2. 30
  3. 60
  4. 80
ব্যাখ্যা
Question: The average of two numbers is 62. If 2 is added to the smaller number, the ratio between the numbers becomes 1 : 2. What is the smaller number?

Solution:
Let,
The numbers be x and y, x < y.
Then 
x + y = 124 ................(1)

(x + 2)/y = 1/2
⇒ y = 2x + 4 ..................(2)

x + y = 124
⇒ x + 2x + 4 = 124
⇒ 3x = 120
∴ x = 40
১৫,৬৫৫.
If the cost price of 20 books is the same as selling price of 25 books, then the loss percentage is-
  1. 10%
  2. 25%
  3. 20%
  4. 50%
ব্যাখ্যা
Question: If the cost price of 20 books is the same as selling price of 25 books, then the loss percentage is-

Solution:
Let, the cost price of 1 book be  x
So, the cost price of 20 books is = 20x

Let, the selling price of 1 book be  y
So, the selling price of 25 books is = 25y

Given that the cost price of 20 books is equal to the selling price of 25 books.
⇒ 20x = 25y
⇒ y = (20/25)x = 4x/5

∴ Loss = cost price - selling price = x - y = x - (4x/5)
∴ Loss = x/5

∴ The loss percentage is = {(x/5)/x} × 100
= (1/5) × 100
= 20%
১৫,৬৫৬.
A person subscribing to Sky Cable for a year packs Tk. 1785. If the monthly subscription is Tk. 175, how much discount does a yearly subscriber get?
  1. 10%
  2. 13.33%
  3. 25%
  4. 15%
  5. None
ব্যাখ্যা
Question: A person subscribing to Sky Cable for a year packs Tk. 1785. If the monthly subscription is Tk. 175, how much discount does a yearly subscriber get?

Solution:
Here, the yearly subscription rate = Tk. 1785

The charge for 12 months is the rate of Tk. 175 per month
= 12 × 175 = Tk. 2100

Discount = 2100 - 1785 = Tk. 315

% discount = (315/2100) × 100 = 15%
১৫,৬৫৭.
A college has 10 basketball players. A 5 member's team and a captain will be selected out of these 10 players. How many different selections can be made?
  1. 1260
  2. 1180
  3. 190
  4. 1140
ব্যাখ্যা

Question: A college has 10 basketball players. A 5 member's team and a captain will be selected out of these 10 players. How many different selections can be made?

Solution:
We can select the 5 member team out of the 10 in =  10C5 ways
= 252 ways

The captain can be selected from amongst the remaining 5 players in 5 ways.

∴ The total ways the selection of 5 players and a captain can be made = 252 × 5 ways
= 1260 ways

১৫,৬৫৮.
An engine pulls four identical carriages. The engine is 2/3the length of a carriage and the total length of the train is 86.8m. Find the length of the engine.
  1. ক) 12.4 m
  2. খ) 12 m
  3. গ) 11.5 m
  4. ঘ) 13 m
ব্যাখ্যা
ধরি,
১টি বগির দৈর্ঘ্য  = x মিটার
চারটি বগির দৈর্ঘ্য = 4x মিটার

প্রশ্নমতে,
4x + (2/3)x = 86.8
(12x + 2x)/3 = 86.6
14x/3 = 86.6
x = 86.6(3/14)
x = 18.55

ইঞ্জিনের দৈর্ঘ্য = 18.55 × (2/3) 
                        = 12.36 মিটার
                         = 12.4 মিটার
১৫,৬৫৯.
The average of the first five multiples of 11 is-
  1. 30
  2. 31
  3. 32
  4. 33
ব্যাখ্যা
Question: The average of the first five multiples of 11 is-

Solution: 
The  first five multiples of 11: (11 × 1), (11 × 2), (11 × 3), (11 × 4), (11 × 5)
their sum = (11 × 1) + (11 × 2) + (11 × 3) + (11 × 4) + (11 × 5)
= 11 (1 + 2 + 3 + 4 + 5)
= 11 × 15

∴ average = (11 × 15)/5
= 33
১৫,৬৬০.
The Sum of three consecutive numbers is 126. Find the highest number.
  1. 41
  2. 42
  3. 43
  4. 44
ব্যাখ্যা
Question: The Sum of three consecutive numbers is 126. Find the highest number.

Solution:
Let,
The numbers be x, x + 1, x + 2

ATQ,
x + x + 1 + x + 2 = 126
⇒ 3x + 3 = 126
⇒ 3x = 123
∴ x = 41

∴ Highest number 41 + 2 = 43
১৫,৬৬১.
Kamal and Kabir started a business investing Tk. 26000 and Tk. 30000 respectively. Out of a total profit of Tk. 7000, Kamal's share is -
  1. ক) 3750
  2. খ) 3250
  3. গ) 3150
  4. ঘ) 3050
ব্যাখ্যা
Question: Kamal and Kabir started a business investing Tk. 26000 and Tk. 30000 respectively. Out of a total profit of Tk. 7000, Kamal's share is -

Solution:
Given,
Investment ratio = 26000 : 30000
= 13 : 15
Sum of the ratio's = 13 + 15 = 28

∴ Kamal's share = 7000 × (13/28)
= 3250
১৫,৬৬২.
A contractor employs 30 men to complete a project in 40 days. After 16 days, only 40% of the work is completed. How many additional men should the contractor employ to finish the project on time?
  1. 10
  2. 20
  3. 30
  4. None
ব্যাখ্যা
Question: A contractor employs 30 men to complete a project in 40 days. After 16 days, only 40% of the work is completed. How many additional men should the contractor employ to finish the project on time?

Solution:
ধরি,
সম্পূর্ণ  কাজ ১০০ একক 
৪০% কাজ শেষ হওয়ায় কাজ বাকী থাকে ৬০ একক
দিন বাকি থাকে ৪০ - ১৬ = ২৪ দিন

১৬ দিনে ৪০ একক কাজ করে ৩০ জন
১ দিনে ৪০ একক কাজ করে ৩০ × ১৬ জন
১ দিনে ১ একক কাজ করে ৪৮০/৪০ জন
২৪ দিনে ১ একক কাজ করে ৪৮০/(৪০ × ২৪) জন
২৪ দিনে ৬০ একক কাজ করে (৪৮০ × ৬০)/(৪০ × ২৪) জন
= ৩০ জন

∴ অতিরিক্ত লোকের প্রয়োজন নেই।
১৫,৬৬৩.
Numbers from 10 to 20 are written on cards. One card is drawn at random. What is the probability that the number is prime or divisible by 3?
  1. 5/11
  2. 6/11
  3. 8/11
  4. 7/11
ব্যাখ্যা

Question: Numbers from 10 to 20 are written on cards. One card is drawn at random. What is the probability that the number is prime or divisible by 3?

Solution:
The numbers are, 
10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20
∴ Total numbers = 11

∴ Prime number are, 11, 13, 17, 19 = 4

And, List the numbers divisible by 3 = 3 numbers (12, 15, 18)

∴ Total favorable outcomes = Primes + Divisible by 3 - Overlap
= 4 + 3 - 0 = 7

∴ Probability = Favorable outcomes/Total outcomes
= 7/11

So the probability is 7/11.

১৫,৬৬৪.
A man takes 2.2 times as long to row a distance upstream as to row the same distance downstream. If he can row 55 km downstream in 2 hour 30 minutes, what is the speed of the boat in the still water?
  1. ক) 10 km/hr
  2. খ) 12 km/hr
  3. গ) 16 km/hr
  4. ঘ) 18 km/hr
ব্যাখ্যা
Speed of the boat in downstream  = 55/2.5
                                                       =(55 × 10)/25 = 22km/hr.

Speed of the boat in upstream = 22/2.2= (22 × 10)/22 =10km/hr.


∴ Speed of the boat in still water = (22 + 10)/2 = 16km/hr.
                                                      =  16km/hr.
১৫,৬৬৫.
Currently, a mother is three times older than her daughter. In 12 years, the mother will be twice as old as her daughter. What is the daughter's current age?
  1. 10 Years
  2. 12 Years
  3. 14 Years
  4. 16 Years
ব্যাখ্যা
Question: Currently, a mother is three times older than her daughter. In 12 years, the mother will be twice as old as her daughter. What is the daughter's current age?

Solution:
Let, the daughter's age be x years
Then, mother's age = 3x years

According to the question,
3x + 12 = 2 (x + 12)
⇒ 3x + 12 = 2x + 24
⇒ 3x - 2x = 24 - 12
∴ x = 12
১৫,৬৬৬.
Tk. 10000 becomes Tk. 12000 in 4 years at a certain rate of simple interest. If the rate becomes 2.5 times of itself, the amount of same principal in 6 years will be -
  1. Tk. 17000
  2. Tk. 17500
  3. Tk. 18600
  4. Tk. 19200
ব্যাখ্যা

Question: Tk. 10000 becomes Tk. 12000 in 4 years at a certain rate of simple interest. If the rate becomes 2.5 times of itself, the amount of same principal in 6 years will be -

সমাধান:
10000 টাকা 4 বছরে 12000 টাকা হয়।
∴ 4 বছরে সুদ = 12000 - 10000 টাকা = 2000 টাকা
1 বছরে সুদ = 2000/4 = 500 টাকা

2.5 গুণ বৃদ্ধিতে নতুন 1 বছরের সুদ = 500 × 2.5 টাকা
= 1250 টাকা

6 বছরে মোট সুদ = 1250 × 6 টাকা = 7500 টাকা
সুতরাং, 6 বছর পর সুদাসলে হবে = 10000 + 7500 টাকা
= 17500 টাকা

১৫,৬৬৭.
Find out the missing number in the following series: 256, 16, 4, ____?
  1. 2
  2. 4
  3. 16
  4. None of these
ব্যাখ্যা

Question: Find out the missing number in the following series. 256, 16, 4, ____?

Solution:
√256 = 16
√16 = 4
√4 = 2

So, missing number is = √4 = 2

১৫,৬৬৮.
The sum of three consecutive odd natural numbers each divisible by 3 is 63. What is the smallest among them?
  1. 5
  2. 15
  3. 21
  4. 27
ব্যাখ্যা
Question: The sum of three consecutive odd natural numbers each divisible by 3 is 63. What is the smallest among them?

Solution: 
let, the numbers 3x, 3x + 6, 3x + 12

ATQ,
3x + 3x + 6 + 3x + 12 = 63
⇒ 9x + 18 = 63 
⇒ 9x = 45
∴ x = 5

The smallest among them is = 3 × 5 
= 15
১৫,৬৬৯.
Speed of a boat in standing water is 18 kmph and the speed of the stream is 3 kmph. A man rows to a place at a distance of 105 km and comes back to the starting point. The total time taken by him is:
  1. 12 hours
  2. 16 hours
  3. 18 hours
  4. 20 hours
ব্যাখ্যা
Question: Speed of a boat in standing water is 18 kmph and the speed of the stream is 3 kmph. A man rows to a place at a distance of 105 km and comes back to the starting point. The total time taken by him is:

Solution:
Speed of a boat in standing water = 18 kmph
The speed of the stream = 3 kmph

∴ Speed upstream
= (18 - 3) kmph
= 15 kmph.

∴ Speed downstream
=  (18 + 3) kmph
= 21 kmph.

Total time taken
= (105/15 + 105/21) hours
= 7 + 5 hours
= 12 hours
১৫,৬৭০.
An aeroplane covers a certain distance at a speed of 240 kmph in 5 hours. To cover the same distance in 5/3 hours, it must travel at a speed of-
  1. 300 kmph
  2. 360 kmph
  3. 600 kmph
  4. 720 kmph
  5. 800 kmph
ব্যাখ্যা
Question: An aeroplane covers a certain distance at a speed of 240 kmph in 5 hours. To cover the same distance in 5/3 hours, it must travel at a speed of-

Solution:
Distance = (240 × 5) = 1200 km.
Speed = Distance/Time
Speed = 1200/(5/3) km/hr.

∴ Required speed = 1200 × (3/5) km/hr = 720 km/hr.
১৫,৬৭১.
A, B and C are partners in a business. Their shares are in the proposition of (1/3) : (1/4) : (1/5). A withdraws half of his capital after 15 months and after another 15 months, a profit of Tk. 4340 is divided. The share of C is -
  1. Tk. 1240
  2. Tk. 1250
  3. Tk. 1300
  4. Tk. 1400
ব্যাখ্যা
Question: A, B and C are partners in a business. Their shares are in the proposition of (1/3) : (1/4) : (1/5). A withdraws half of his capital after 15 months and after another 15 months, a profit of Tk. 4340 is divided. The share of C is -

Solution: 
Ratio of initial investments = (1/3) : (1/4) : (1/5)
= 20 : 15 : 12

Let their initial investments be 20x, 15x and 12x respectively.

A : B : C = (20x × 15) + (10x × 15): (15x × 30) : (12x × 30)
= 450x : 450x : 360x
= 5 : 5 : 4

Sum of the ratio = 5 + 5 + 4 = 14.

C's share = 4340 × (4/14)
= 1240 Tk.
১৫,৬৭২.
A tailor had a number of shirt pieces to cut from a roll of fabric. He cut each roll of equal length into 10 pieces. He cut at the rate of 45 cuts a minute. How many rolls would be cut in 24 minutes?
  1. 100
  2. 108
  3. 112
  4. 120
ব্যাখ্যা
Question: A tailor had a number of shirt pieces to cut from a roll of fabric. He cut each roll of equal length into 10 pieces. He cut at the rate of 45 cuts a minute. How many rolls would be cut in 24 minutes?

Solution: 
Number of cuts made to cut a roll into 10 pieces = 9

Total cuts = 24 × 45
= 1080 

Number of rolls = 1080/9
= 120
১৫,৬৭৩.
The angle of elevation of the top of a tower 30 m high from the foot of another tower in the same plane is 60°, then the distance between the two towers is:
  1. ক) 10√3 m
  2. খ) 15√3 m
  3. গ) 12√3 m
  4. ঘ) 36 m
ব্যাখ্যা
The angle of elevation = 60° 
The height of the tower = 30 m


Let us assume the distance between two towers be X

 প্রশ্নমতে,
⇒ tan 60° = (Perpendicular)/(Base)
⇒ √3 = 30/x
⇒ x = 30/√3 = 10√3 m

∴ The required result will be 10√3.

১৫,৬৭৪.
A man's regular pay is Taka 30 per hour up to 40 hours. Overtime is twice the payment for regular time. If he was paid taka 1680, how many hours overtime did he work? 
  1. ক) 48
  2. খ) 28
  3. গ) 16
  4. ঘ) 8
ব্যাখ্যা
ধরি,
Overtime করেছিল x ঘণ্টা
প্রশ্নমতে,
30 × 40 + 30 × 2 × x = 1680 
1200 + 60x = 1680 
60x = 1680 - 1200
60x = 480 
x = 480/60 
x = 8
১৫,৬৭৫.
A man aged 40 has three sons whose current ages are 6, 3, and 1 years respectively. In how many years will the total of their ages equal four-fifths of their father's age?
  1. 2 years
  2. 5 years
  3. 10 years
  4. 12 years
ব্যাখ্যা
Question: A man aged 40 has three sons whose current ages are 6, 3, and 1 years respectively. In how many years will the total of their ages equal four-fifths of their father's age?

Solution:
দেওয়া আছে,
পিতার বর্তমান বয়স = ৪০ বছর 
তিন পুত্রের বয়স যথাক্রমে ৬ বছর, ৩ বছর ও ১ বছর।

ধরি,
ক বছর পর তিন পুত্রের বয়সের সমষ্টি পিতার বয়সের 4/5 অংশ হবে।

প্রশ্নমতে,
(40 + ক) × (4/5) = (6 + ক) + (3 + ক) + (1 + ক)
⇒ (40 + ক) × (4/5) = 10 + 3ক
⇒ 4(40 + ক) = 5(10 + 3ক)
⇒ 160 + 4ক = 50 + 15ক
⇒ 15ক - 4ক = 160 - 50
⇒ 11ক = 110
⇒ ক = 110/11
⇒ ক = 10

অর্থাৎ 10 বছর পর তিন পুত্রের বয়সের সমষ্টি পিতার বয়সের 4/5 অংশ হবে।
১৫,৬৭৬.
What is the next term in the sequence 4, 9, 6,11, 8, 13, …….?
  1. ক) 18
  2. খ) 16
  3. গ) 10
  4. ঘ) 9
ব্যাখ্যা

4, 9, 6,11, 8, 13
Here in both in even and in odd position numbers increased by 2
4, 6, 8, 10
and, 9, 11, 13, 15

So, the next number in the series is 10

১৫,৬৭৭.
In order to obtain an income of Tk. 750 from 10% stock at Tk. 96, one must make an investment of -
  1. ক) Tk. 6040
  2. খ) Tk. 6084
  3. গ) Tk. 7200
  4. ঘ) Tk. 6142
ব্যাখ্যা
Market Value = Tk. 96.
Required Income = Tk. 650.
Here face value is not given. Take face value as Tk. 100 if it is not given in the question
To obtain Tk. 10 (ie,10% of the face value 100), investment = Tk. 96
To obtain Tk. 650, investment = {(96/10) × 750}
= Tk. 7200.
১৫,৬৭৮.
A fraction become 1/3 when 1 is subtracted from the numerator and it becomes 1/4 when 8 is added to its denominator. The fraction obtained is-
  1. 12/13
  2. 5/12
  3. 5/13
  4. 6/13
ব্যাখ্যা
Question: A fraction become 1/3 when 1 is subtracted from the numerator and it becomes 1/4 when 8 is added to its denominator. The fraction obtained is-

Solution:
Let the fraction be x/y. 

Given that, the fraction becomes 1/3 when 1 is subtracted from the numerator.
⇒ (x - 1)/y = 1/3
⇒ 3(x - 1) = y
⇒ 3x - 3 = y
⇒ 3x - y = 3 -------------(1)

Given that, the fraction becomes 1/4 when 8 is added to its denominator.
⇒ x / (y + 8) = 1/4
⇒ 4x = y + 8 
⇒ 4x - y = 8 ------------ (2)

By solving equations (1) & (2) by the method of elimination, we get:
⇒ 4x - y - 3x + y = 8 - 3
⇒ x = 5

From equation (1):
⇒ 3x - y = 3
⇒ 3 × (5) - y = 3
⇒ 15 - y = 3
⇒ -y = 3 - 15
⇒ - y = -12
⇒ y = 12

Thus, the fraction, x/y = 5/12
১৫,৬৭৯.
The profit earned after selling an article for Tk. 1754 is the same as loss incurred after selling the article for Tk. 1492. What is the cost price of the article?
  1. Tk. 2623
  2. Tk. 1646
  3. Tk. 1423
  4. Tk. 1623
ব্যাখ্যা
Question: The profit earned after selling an article for Tk. 1754 is the same as loss incurred after selling the article for Tk. 1492. What is the cost price of the article?

Solution:
Let,
The cost price of the article be Tk. x.

ATQ,
x - 1492 = 1754 - x
⇒ 2x = 1754 + 1492
⇒ 2x = 3246
⇒ x = 3246/2
∴ x ​= 1623

∴ The cost price of the article is Tk. 1623.
১৫,৬৮০.
A boatman can row 3 km against the stream in 20 minutes and return in 18 minutes. Find the rate of current:
  1. ক) 1 km/hr
  2. খ) 1/2 km/hr
  3. গ) 3/2 km/hr
  4. ঘ) 1/3 km/hr
ব্যাখ্যা

Speed upstream = 3/(20/60)
= 9 km/hr.
Speed downstream = 3/(18/60)
= 10 km/hr.
Rate of current = (10 - 9)/2
= 1/2 km/hr.

১৫,৬৮১.
A school has a total of 270 students. There are 90 students taking Physics, 75 taking English, and 39 taking both. Approximately what percentage of the students is taking either Physics or English?
  1. 32%
  2. 36%
  3. 47%
  4. 51%
ব্যাখ্যা
Question: A school has a total of 270 students. There are 90 students taking Physics, 75 taking English, and 39 taking both. Approximately what percentage of the students is taking either Physics or English?

Solution:
Students taking physics n(A) = 90 (these 90 include those 39 that take both)
Students taking english n(B) = 75 (these 75 also include those 39)
Students taking both n(A ∩ B) = 39
Students taking either Physics or English n(A ∪ B) = ?

We know
n(A ∪ B) = n(A) + n(B) - n(A ∩ B)
= 90 + 75 - 39 = 126

Required percentage = (126/270) × 100
= 46.67 %
= 47% (approx.)
১৫,৬৮২.
What is the square root of 0.16?
  1. 0.004
  2. 0.04
  3. 0.4
  4. 4
ব্যাখ্যা

Question: What is the square root of 0.16?

Solution:
 The square root of 0.16 = √0.16
= 0.4

১৫,৬৮৩.
Mina can do a work in 3 days while Rubel can do the same work in 2 days. Both of them finish the work together and get Tk. 150. What is the share of Mina?
  1. Tk. 50
  2. Tk. 60
  3. Tk. 70
  4. Tk. 40
ব্যাখ্যা
Mina's wages : Rubel's wages
= Lopa's 1 day's work : Rasel's 1 day's work
= 1/3 : 1/2
= 2 : 3
∴ Mina's share = Tk.(2/5) × 150
= Tk 60
১৫,৬৮৪.
Topu's income is Tk.2,000 more than that of Jamal. Their total salary is Tk.x. What is Jamal's salary?
  1. ক) x - 1000
  2. খ) x/2 - 1000
  3. গ) x/2 - 2000
  4. ঘ) None
ব্যাখ্যা

ধরি, জামালের আয় = y টাকা
সুতরাং তপুর আয় = y + 2000 টাকা
প্রশ্নমতে,
y + (y + 2000) = x
বা, 2y + 2000 = x
বা, 2y = x - 2000
বা, y = x/2 - 1000.

১৫,৬৮৫.
A is 60 years old and B is 40 years old. How many years ago was the ratio of their ages 5 : 3?
  1. ক) 20
  2. খ) 18
  3. গ) 12
  4. ঘ) 10
ব্যাখ্যা
Question: A is 60 years old and B is 40 years old. How many years ago was the ratio of their ages 5 : 3?

Solution: 
Let, 'x' years ago the ratio of their ages was 5 : 3

According to the question,
(60 - x) : (40 - x) = 5 : 3
⇒ (60 - x) / (40 - x) = 5 / 3
⇒ 180 - 3x = 200 - 5x
⇒ 2x = 20
⇒ x = 10
১৫,৬৮৬.
If 4 students sit on each bench in a class, 2 benches remain vacant. 12 people stand if 3 people sit on each bench. How many students are there in that class?
  1. 58
  2. 64
  3. 68
  4. 72
ব্যাখ্যা
Question: If 4 students sit on each bench in a class, 2 benches remain vacant. 12 people stand if 3 people sit on each bench. How many benches are there in that class?

Solution:
Let,
Total bench = x

According to the 1st condition,
Number of student = 4(x - 2)  = 4x - 8

According to the 2nd condition,
Number of student = 3x + 12

∴ 4x - 8 = 3x +12
⇒ 4x - 3x = 12 + 8
⇒ x = 20
Here, total bench = 20

So, Total Number of students = (4 × 20) - 8
= 72
১৫,৬৮৭.
Suppose a shopkeeper has bought 1 kg of apples for Tk. 100. And sold it for Tk. 120 per kg. How much is the profit gained by him?
  1. Tk. 20
  2. Tk. 10
  3. Tk. 25
  4. Data inadequate
ব্যাখ্যা
Question: Suppose a shopkeeper has bought 1 kg of apples for Tk. 100. And sold it for Tk. 120 per kg. How much is the profit gained by him?
 
Solution:
Cost Price for apples is Tk. 100
Selling Price for apples is Tk. 120
Then profit gained by shopkeeper is = SP - CP = 120 - 100 = Tk. 20
১৫,৬৮৮.
A man rowed 4 miles upstream in 2 hours. If the river current is 1 mile per hour, how long will it take him to return downstream?
  1. 3 hour
  2. 2 hour
  3. 1 hour
  4. 5 hour
  5. None
ব্যাখ্যা

Question: A man rowed 4 miles upstream in 2 hours. If the river current is 1 mile per hour, how long will it take him to return downstream?

Solution:
Let,
the velocity of the boat in still water = x mph
and the velocity of the stream = y mph = 1 mph

In upstream, he covers 4 miles in 2 hours.
∴ Upstream speed = 4 ÷ 2 = 2 mph

ATQ,
x - y = 2
⇒ x - 1 = 2
⇒ x = 3

So, downstream speed = x + y = 3 + 1 = 4 mph

Time to row 4 miles downstream = 4 ÷ 4 = 1 hour

∴ The return trip will take 1 hour.

১৫,৬৮৯.
A bag contains Tk. 410 in the form of Tk. 5, Tk. 2, and Tk. 1 coins. The number of coins is in the ratio 4 : 6 : 9. So, find the number of 2 Taka’s coins -
  1. 60
  2. 56
  3. 58
  4. 62
  5. 64
ব্যাখ্যা
ATQ,
if the ratio of coins = 4 : 6 : 9
That means Tk. 5 coins are 4, Tk. 2 coins are 6, and then Tk. 1 coins are 9.

According to the given ratio, the ratio of amounts = 5 × 4 : 6 × 2: 9 × 1 = 20 : 12 : 9
The sum of the ratios of the amounts = 20 + 12 + 9
= Tk. 41

But ATQ,
it is Tk. 410, which means multiply each ratio by 10
i.e., new ratio = 40 : 60 : 90
Now, 40 × 5 : 60 × 2 : 90 × 1 = 200 : 120 : 90

The total amount in the form of two taka coins = 120
So, the two taka coins = 120/2 = 60.
১৫,৬৯০.
Given 16x = 44, what is x?
  1. - 2
  2. - 1/2
  3. 1/2
  4. 2
ব্যাখ্যা

Question: Given 16x = 44, what is x?

Solution:
16x = 44
⇒ (42)x = 44
⇒ 42x = 44
⇒ 2x = 4
⇒ x = 4/2
∴ x = 2

১৫,৬৯১.
If two non-zero positive integers p and q are such that p = 4q and p < 8, then q = ?
  1. ক) 1
  2. খ) 2
  3. গ) ±3
  4. ঘ) 5
ব্যাখ্যা

Given, p = 4q
if q = 1 then p = 4
if q = 2 then p = 8 not acceptable as p have to be less than 8
So, the correct answer is 1

১৫,৬৯২.
The least number by which 294 must be multiplied to make it a perfect square is -
  1. 4
  2. 6
  3. 5
  4. 3
ব্যাখ্যা

Question: The least number by which 294 must be multiplied to make it a perfect square is :

Solution:
294 = 7 × 7 × 2 × 3
Here, 2 and 3 have odd exponents.
Multiplying by 2 × 3 = 6 will make 294 a perfect square.

∴ Multiplying by 6 will make 294 a perfect square.

১৫,৬৯৩.
Father is four times the age of his daughter. If after 5 years, he would be three times of daughter’s age, then further after 5 years, how many times he would be of his daughter’s age?
  1. 2 times
  2. 2.5 times
  3. 1.5 times
  4. 3 times
ব্যাখ্যা
Question: Father is four times the age of his daughter. If after 5 years, he would be three times of daughter’s age, then further after 5 years, how many times he would be of his daughter’s age?

Solution:
Let the daughter's age be x and father's age be 4x.
So as per question, 4x + 5 = 3(x + 5)
⇒ 4x + 5 = 3x + 15
∴ x = 10.
Hence present age of daughter is 10 years and present age of father is 40 years.
So after 5 + 5 = 10 years, daughter age would be 20 years and father’s age would be 50 years.
Hence father would be 50/20 = 2.5 times of daughter’s age.
১৫,৬৯৪.
If Kabir loses 8 pounds, he will weigh twice as much as his sister. Together they now weigh 278 pounds. What is Kabir’s present weight, in pounds?
  1. ক) 135
  2. খ) 139
  3. গ) 147
  4. ঘ) 188
ব্যাখ্যা

Let, K = Kabir’s current weight, in pounds
S = Sister’s current weight, in pounds

We are told that “If Kabir loses 8 pounds, he will weigh twice as much as his sister.'' We put this into an equation:
K – 8 = 2S
∴ K = 2S + 8...... (i)

Next, we are told that “Together they now weigh 278 pounds.” We can also put this into an equation.
K + S = 278........ (ii)
To solve this equation, we can substitute 2S + 8 from Equation (i) for the variable K in Equation 2:
2S + 8 + S = 278
3S = 270
S = 90

From equation (ii) we can find,
K = 278 - 90 = 188

১৫,৬৯৫.
Six friends Rina, Toma, Jui, Lima, Arif, and Sayeed sit randomly in a row of six chairs. What is the probability that Rina and Toma do not sit next to each other?
  1. 1/2
  2. 1/3
  3. 2/3
  4. 5/6
  5. None
ব্যাখ্যা
Question: Six friends Rina, Toma, Jui, Lima, Arif, and Sayeed sit randomly in a row of six chairs. What is the probability that Rina and Toma do not sit next to each other?

Solution:
Total number of possibilities = 6! = 720

Number of possibilities where Rina and Toma sit together = 5! × 2! 
= 120 × 2
= 240

So the possibilities where Rina and Toma do not sit together = 720 - 240
= 480

∴Probability that Rina and Toma do not sit next to each other = 480/720
= 2/3
১৫,৬৯৬.
The slope of a line perpendicular to one with slope (- 3/4) is:
  1. 4/3
  2. 3/4
  3. 1
  4. - 4/3
ব্যাখ্যা

Question: The slope of a line perpendicular to one with slope (- 3/4) is:

Solution:
আমরা জানি, 
দুটি সরলরেখা পরস্পর লম্ব হলে তাদের ঢালদ্বয়ের গুণফল - 1 হয়।
অর্থাৎ, যদি কোনো সরলরেখার ঢাল (m) হয়, তাহলে তার উপর লম্ব রেখার ঢাল হবে - 1/m.

এখানে, মূল রেখার ঢাল = - 3/4 । 
তাই লম্ব রেখার ঢাল হবে = -1/(- 3/4) = 4/3

অতএব, লম্ব রেখার ঢাল = 4/3.

১৫,৬৯৭.
The average age of a group of 10 students is 15 years. When 5 more students join the group, the average age increases by 1 year. The average age of the new students is?
  1. ক) 12 years
  2. খ) 16 years
  3. গ) 18 years
  4. ঘ) 20 years
  5. ঙ) 22 years
ব্যাখ্যা

Total age of 10 students = 150 years
Total age of 15 students = 240 years
Total age of 5 new students = 240 - 150 = 90 years
Therefore,
Average age of 5 new students = 90/5 = 18 years

১৫,৬৯৮.
Two pipes A and B can fill a tank in 45 and 30 minutes respectively. If both the pipes are used together, then how long will it take to fill the tank?
  1. ক) 19 minutes
  2. খ) 18 minutes
  3. গ) 20 minutes
  4. ঘ) 22 minutes
ব্যাখ্যা
Question: Two pipes A and B can fill a tank in 45 and 30 minutes respectively. If both the pipes are used together, then how long will it take to fill the tank?

Solution: 
Part filled by A in 1 min = 1/45
Part filled by B in 1 min = 1/30 
Part filled by (A + B) in 1 min = (1/45) + (1/30) = 1/18 

1/18 part filled by (A + B) in = 1 minute
∴ 1 part  filled by (A + B) in = 1× 18/1 = 18 minutes

 ∴  Both pipes can fill the tank in 18 minutes
১৫,৬৯৯.
A cyclist completes a journey in 8 hours. He travels the first half of the journey at the rate of 15 km/hr and the second half at the rate of 25 km/hr. Find the total journey in km.
  1. 150 km
  2. 180 km
  3. 200 km
  4. 240 km
ব্যাখ্যা

Question: A cyclist completes a journey in 8 hours. He travels the first half of the journey at the rate of 15 km/hr and the second half at the rate of 25 km/hr. Find the total journey in km.

Solution:
ধরা যাক, মোট যাত্রার দূরত্ব হলো D কিমি। তাহলে, যাত্রার প্রথম অর্ধেকের দূরত্ব হবে D/2 কিমি এবং দ্বিতীয় অর্ধেকের দূরত্বও হবে D/2 কিমি।

প্রথম অর্ধেক যাত্রায়, সময় = দূরত্ব/গতিবেগ
= (D/2)/15 ঘন্টা
= D/30 ঘন্টা

দ্বিতীয় অর্ধেক যাত্রায়, সময় = দূরত্ব/গতিবেগ
= (D/2)/25 ঘন্টা
= D/50 ঘন্টা

প্রশ্নমতে,
 D/30 + D/50 = 8
⇒ (5D + 3D)/150 = 8
⇒ 5D + 3D = 8 × 150
⇒ 8D = 1200
⇒ D = 1200/8
⇒ D = 150 কিমি

সুতরাং, মোট যাত্রার দূরত্ব হলো 150 কিমি।

১৫,৭০০.
A man runs at a speed of 7 km per hour and he increases his speed every hour by 1 km per hour. In how many hours will he cover 19.5 km?
  1. ক) 1(1/4) hours
  2. খ) 2(1/2) hours
  3. গ) 3(1/3) hours
  4. ঘ) 3 hours
ব্যাখ্যা

The man starts with 7 kmph
Distance covered in first 1 hour = 7 km
He increases his speed every hour by 1 km.
Speed in 2nd hour = 8 km/hr
Distance covered in 2nd hour = 8 km
Remaining distance = 19.5 - (7 + 8)
19.5 - 15
= 4.5 km
Speed in the third hour = 9 km/hr
Time taken to cover 4.5 km at 9 km/hr
= 4.5/9
= 1/2 hour.
Therefore,
Total time = 1 + 1 + (1/2) hours = 2 (1/2) hours.
Hence, the answer is 2(1/2) hours.