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Bank Math Master

পরীক্ষাBank Math Masterতারিখতারিখ অনির্ধারিতসময়25 minutes১৯ বৈধ · অসম্পূর্ণ
মোট প্রশ্ন২১
সিলেবাস
Exam – 7: Topic: i) Cylinder - Area, Volume, and Surface Area ii) Unitary Method (Live Class –13 and 14)
ঘনত্ব
উত্তর
উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

Bank Math Master

Bank Math Master · তারিখ অনির্ধারিত · ২১ প্রশ্ন

.
A man can do 1 work in 8 hours. How many work he can do at 40 hours?
  1. ক) 2
  2. খ) 4
  3. গ) 5
  4. ঘ) 7
ব্যাখ্যা
Question: A man can do 1 work in 8 hours. How many work he can do at 40 hours?

Solution: 
In 8 hours 1 work is done
In 1 hour 1/8 work is done
∴ In 40 hours 40/8 work = 5 work can be done 
.
A and B can do a work in 9 days, B and C can do it in 12 days and A and C can do it in 18 days. If all of them work together, in how many days they can finish the work?
  1. ক) 5 days 
  2. খ) 8 days 
  3. গ) 10 days 
  4. ঘ) 15 days 
ব্যাখ্যা
Question: A and B can do a work in 9 days, B and C can do it in 12 days and A and C can do it in 18 days. If all of them work together, in how many days they can finish the work?

Solution:
A + B can do in 1 day = 1/9 part
B + C can do in 1 day = 1/12 part
A + C can do in 1 day = 1/18 part 
2(A + B + C ) can do in 1 day = ((1/9) + (1/12) + (1/18)) = 1/4 part
∴ A + B + C can do in 1 day = 1/(4 × 2) part = 1/8 part 

∴ Total days needed = 1/(1/8) = 8 days
.
A man works twice as much as his assistant. The man can finish the job in 9 days. Find the number of days in which the man and his assistant can finish the job if they work together? 
  1. ক) 6 days 
  2. খ) 8 days 
  3. গ) 12 days 
  4. ঘ) 15 days 
ব্যাখ্যা
Question: A man works twice as much as his assistant. The man can finish the job in 9 days. Find the number of days in which the man and his assistant can finish the job if they work together? 

Solution: 
Since, Man works twice as much as his assistant 
Assistant can do the work in (2 × 9) days = 18 days 
A man can do in 1 day = 1/9 part
Assistant can do in 1 day = 1/18 part 
They together can do in 1 day = (1/9) + (1/18) = 3/18 = 1/6 part 
They can do the job in = 1/(1/6) days = 6 days 
.
Mr. Rafiq moved 2/3 of his lawn in 4/3 hours. Mr. Shafiq makes twice a fast and finishes the remaining job. How many minutes did Mr. Shafiq work? 
  1. ক) 15
  2. খ) 20
  3. গ) 24
  4. ঘ) 30
ব্যাখ্যা
Question: Mr. Rafiq moved 2/3 of his lawn in 4/3 hours. Mr. Shafiq makes twice a fast and finishes the remaining job. How many minutes did Mr. Shafiq 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

Shafiq can complete the work in = 2/2 hours = 1 hour
Shafiq can do 1/3 part of the work in = 1/3 hour
= (1/3) × 60 minutes 
= 20 minutes
.
A contractor employs 40 persons for doing a job in 60 days. After 20 days it was found that only one-fourth of work was finished. How many more persons are to be employed to finish the job as per schedule?
  1. ক) 10
  2. খ) 20
  3. গ) 40
  4. ঘ) 60
ব্যাখ্যা
Question: A contractor employs 40 persons for doing a job in 60 days. After 20 days it was found that only one-fourth of work was finished. How many more persons are to be employed to finish the job as per schedule?

Solution: 
Work remains = 1 - (1/4) part = 3/4 part
Day remaining = 60 - 20 = 40 days

1/4 th work is done in 20 days by 40 person
∴ 1 part is done in 20 days by 40 × 4 person
∴ 1 part is done in 1 day by (40 × 4 × 20) person
∴  3/4 part is done in 40 days by (40 × 4 × 20 × 3)/(40 × 4) = 60 person

∴ He needs = (60 - 40) = 20 more persons.
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A man and a boy can finish a job working together for 6 days. The man can work as much as two boys can do. Then in how many days can the man do it alone?
  1. ক) 5
  2. খ) 6
  3. গ) 9
  4. ঘ) 10
ব্যাখ্যা
Question: A man and a boy can finish a job working together for 6 days. The man can work as much as two boys can do. Then in how many days can the man do it alone?

Solution: 
1 man and 1 boy can do in 1 day 1/6 part
2 man and 2 boy can do in 1 day 2/6 part = 1/3 part

Now 1 man = 2 boys 
(2 + 1) man can do in 1 day is 1/3 part
3 man can do in 1 day is 1/3 part
1 man can do in 1 day is 1/(3 × 3) part = 1/9 part

∴ Man alone can do the work in 9 days
.
A can do a piece of work in 10 days and B in 20 days. They work together but 2 days before the completion of the work, A leaves. In how many days was the work completed?
  1. ক) 5 days     
  2. খ) 8 days     
  3. গ) 10 days     
  4. ঘ) 13 days     
ব্যাখ্যা
Question: A can do a piece of work in 10 days and B in 20 days. They work together but 2 days before the completion of the work, A leaves. In how many days was the work completed?

Solution: 
B's 2 day's work = (1/20) × 2 = 1/10
∴ Remaining work = 1 - (1/10) = 9/10

(A + B)'s 1 day's work = (1/10) + (1/20) = 3/20

Now, 3/20 work is done by A and B in 1 day
9/10 work is done by A and B in (20/3) × (9/10) = 6 days

Hence, total time taken = 6 + 2 = 8 days
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7 men and 3 boys working together can do four times as much as work as a man and a boy. What is the ratio of working capacities of a man and a boy?
  1. ক) 4 : 3
  2. খ) 5 : 2
  3. গ) 2 : 1
  4. ঘ) 3 : 2
অনির্ধারিত
ব্যাখ্যা
প্রশ্নে ভুল থাকার কারণে বাতিল করা হয়েছে?

প্রশ্নটি হওয়া উচিৎ ছিল -
Question:
If 5 men and 2 boys working together can do four times as much work per hour as a man and a boy together, compare the work of a man with that of a boy?

Solution:
Let 1 man 1 day work = x
1 boy 1day work = y

then 5x + 2y = 4(x + y)
⇒ 5x + 2y = 4x + 4y
⇒ x = 2y
⇒ x/y = 2/1
⇒ x : y = 2 : 1
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35 men can complete a work in 15 days. Five days after they started working,15 more men joined them. How man days will they now take to complete the remaining work? 
  1. ক) 7 days 
  2. খ) 9 days 
  3. গ) 12 days 
  4. ঘ) 15 days 
ব্যাখ্যা
Question: 35 men can complete a work in 15 days. Five days after they started working, 15 more men joined them. How man days will they now take to complete the remaining work? 

Solution: 
After working 5 days, days left = 15 - 5 = 10 dyas 
and now total man = 35 + 15 = 50 

35 man needed 10 days
1 man needed (10 × 35) days 
50 man needed (10 × 35)/50 days = 7 days
১০.
A man and a boy recieved Tk. 600 as wages for 6 days for the work they did together. The man's efficiency in the work was three times that of the boy. What is the daily wages of the boy?
  1. ক) Tk. 20 
  2. খ) Tk. 25 
  3. গ) Tk. 30
  4. ঘ) Tk. 35 
ব্যাখ্যা
Question: A man and a boy recieved Tk. 600 as wages for 6 days for the work they did together. The man's efficiency in the work was three times that of the boy. What is the daily wages of the boy?

Solution:
Ratio of 1 day's work of man and boy = 3 : 1
Total wages of the boy = 600 × ( 1/4) = 150
Daily wages of the boy = 150/6 = Tk. 25 
১১.
If the volume of a cube is 1728 cm3, then the surface area of the cube will be -
  1. ক) 144 cm2
  2. খ) 432 cm2
  3. গ) 512 cm2
  4. ঘ) 864 cm2
ব্যাখ্যা
Question: If the volume of a cube is 1728 cm3, then the surface area of the cube will be -

Solution: 
দেওয়া আছে,
আয়তন, a3 = 1728
⇒ a3 = 123
⇒ a = 12

পৃষ্ঠের ক্ষেত্রফল = 6a2
= 6 × 122
= 6 × 144
= 864 cm2
১২.
If the radius of a cylinder is decreased by 40% and the height is increased by 50% to form a new cylinder, the volume will be decreased by -
  1. ক) 46%
  2. খ) 54%
  3. গ) 62%
  4. ঘ) 48%
ব্যাখ্যা
Question: If the radius of a cylinder is decreased by 40% and the height is increased by 50% to form a new cylinder, the volume will be decreased by -

Solution:
মনে করি,
ব্যাসার্ধ, r = 10 একক
এবং উচ্চতা, h = 10 একক

আয়তন = πr2h
= π × (10)2 × 10
= 1000π একক3

40% হ্রাসে ব্যাসার্ধ = 10 - 4 = 6 একক
50% বৃদ্ধিতে উচ্চতা = 10 + 5 = 15 একক

নতুন আয়তন = π × (6)2 × 15
= 540 একক3

আয়তন হ্রাস পেয়েছে = 1000 - 540 = 460 একক3
আয়তন শতকরা হ্রাস পেয়েছে = (460 × 100)/(1000 = 46%
১৩.
If the numbers representing the volume and surface area of a cube are equal, then the length of the edge of the cube in terms of the unit of measurement will be -
  1. ক) 3
  2. খ) 6
  3. গ) 12
  4. ঘ) 18
ব্যাখ্যা
Question: If the numbers representing the volume and surface area of a cube are equal, then the length of the edge of the cube in terms of the unit of measurement will be -

Solution:
ঘনকের ধার a হলে,
আয়তন = a3
পৃষ্ঠের ক্ষেত্রফল = 6a2

প্রশ্নমতে,
a3 = 6a2
⇒ a = 6
১৪.
A right triangle with sides 6 cm, 8 cm, and 10 cm is rotated on the side of 6 cm to form a cone. The volume of the cone so formed is -
  1. ক) 48π cm3
  2. খ) 64π cm3
  3. গ) 72π cm3
  4. ঘ) 96π cm3
ব্যাখ্যা
Question: A right triangle with sides 6 cm, 8 cm, and 10 cm is rotated on the side of 6 cm to form a cone. The volume of the cone so formed is -

Solution:

We have,
r = 6cm
h = 8cm

∴ Volume = (1/3)πr2h  
= (1/3) × π × 62 × 8 cm3
= 96π cm3
১৫.
Find the number of lead balls, each with a diameter of 1 cm, that can be made from a sphere of diameter 12 cm.
  1. ক) 980
  2. খ) 1224
  3. গ) 1728
  4. ঘ) 1920
ব্যাখ্যা
Question: Find the number of lead balls, each with a diameter of 1 cm, that can be made from a sphere of diameter 12 cm.

Solution:
ব্যাসার্ধ, r = 6

গোলকটির আয়তন = (4/3) × π × r3
= (4/3) × π × 63
= 288π

নতুন বলের ব্যাস 1 সেমি হলে ব্যাসার্ধ = 1/2 সেমি
নতুন বলের আয়তন = (4/3) × π × (1/2)3
= π/6 

নতুন বলের সংখ্যা হবে = 288π/(π/6) = 1728
১৬.
Find the volume of the cube, if its diagonal is 6​√3 cm.
  1. ক) 18
  2. খ) 12
  3. গ) 9
  4. ঘ) 0
অনির্ধারিত
ব্যাখ্যা
অপশনে সঠিক উত্তর না থাকায় বাতিল করা হয়েছে।

Question: Find the volume of the cube, if its diagonal is 6​√3 cm.

Question:
দেওয়া আছে,
ঘনকটির কর্ণ,
√3a = 6√3 
⇒ a = 6 

ঘনকটির আয়তন = a3 = 63 = 216
১৭.
The ratio of radii of two cones is 6 : 7 and height are in the ratio 7 : 3. What is the ratio of their volume?
  1. ক) 12 : 7
  2. খ) 9 : 8
  3. গ) 8 : 5
  4. ঘ) 11 : 7
ব্যাখ্যা
Question: The ratio of radii of two cones is 6 : 7 and height are in the ratio 7 : 3. What is the ratio of their volume?

Solution:
মনে করি,
কোণক দুটির উচ্চতা যথাক্রমে 7h এবং 3h
এবং ব্যাসার্ধ 6r এবং 7r

আয়তনের অনুপাত =[(1/3) × (6r)2 × 7h] / [(1/3) × (7r)2 × 3h]
= (36 × 7)/(49 × 3)
= 12/7
= 12 : 7
১৮.
Three solid spheres of radii 3 cm, 4 cm, and 5 cm respectively are melted and converted into a single solid sphere. Find the radius of this sphere.
  1. ক) 3 cm
  2. খ) 4 cm
  3. গ) 6 cm
  4. ঘ) 12 cm
ব্যাখ্যা
Question: Three solid spheres of radii 3 cm, 4 cm, and 5 cm respectively are melted and converted into a single solid sphere. Find the radius of this sphere.

Solution:
মনে করি,
নতুন গোলকটির ব্যাসার্ধ  = r cm

প্রশ্নমতে,
(4/3) × π × r3 = {(4/3) × π × 33} + {(4/3) × π × 43} + {(4/3) × π × 53}
⇒ (4/3) × π × r3 = (4/3) × π × {27 + 64 +125)
⇒ r3 = 63
⇒ r3 = 216
⇒ r = 6
১৯.
A cube of side 4 cm is cut into cubes of side 1 cm. Calculate the total surface area of all the small cubes.
  1. ক) 24 cm2
  2. খ) 384 cm2
  3. গ) 96 cm2
  4. ঘ) 196 cm2
ব্যাখ্যা
Question: A cube of side 4 cm is cut into cubes of side 1 cm. Calculate the total surface area of all the small cubes.

Solution: 
Side of original cube = 4 cm.

Number of cubes of side 1 cm
= (Volume of the bigger cube)/(Volume of the smaller cube)
= (4 × 4 × 4)/(1 × 1 × 1)
= 64

Now, the surface area of one cube = 6(side)2
= 6 × 12
= 6 cm2

∴ The surface area of 64 cubes = 6 × 64 cm2
= 384 cm2
২০.
A copper sphere of diameter 18 cm is drawn into a wire of diameter 4 mm. Find the length of the wire.
  1. ক) 24300 m
  2. খ) 81 m
  3. গ) 729 m
  4. ঘ) 243 m
ব্যাখ্যা
Question: A copper sphere of diameter 18 cm is drawn into a wire of diameter 4 mm. Find the length of the wire.

Solution:
ব্যাসার্ধ, r = 18/2 = 9 সেমি
গোলকটির আয়তন = (4/3) × π × r3
= (4/3) × π × 93
= 972π

তারটি ব্যাসার্ধ = 4/2 = 2 মিমি = 0.2 সেমি
তারটির আয়তন = πr2l
= π × (0.2)2 × l
= 0.04πl

শর্তমতে,
0.04πl = 972π
⇒ l = 972/0.04
⇒ l = 24300 cm
⇒ l = 243 m
২১.
A cistern 6 m long and 4 m wide contains water up to a depth of 2 m. The total area of the wet surface is -
  1. ক) 48 square meter
  2. খ) 64 square meter
  3. গ) 72 square meter
  4. ঘ) 88 square meter
ব্যাখ্যা
Question: A cistern 6 m long and 4 m wide contains water up to a depth of 2 m. The total area of the wet surface is -

Solution: 
চৌবাচ্চার উপরের অংশ খোলা থাকে। এখানে ভেজা অংশের ক্ষেত্রফল জানতে চাওয়া হয়েছে। 
তাই মোট ক্ষেত্রফল থেকে উপরের খোলা অংশ বাদ দিতে হবে।

Area of open side = 6 × 4 = 24 square meter

So, the area of total wet surface = 2(6 × 4 + 4 × 2 + 6 × 2) - (6 × 4)
= 88 - 24 
= 64