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ব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্স

পরীক্ষাব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্সতারিখতারিখ অনির্ধারিতসময়27 minutes
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Exam – 50 Topic: Math - 6: Geometry (Circle, Quadrilateral), Trigonometry (Area, Volume, Heights and Distances)
ঘনত্ব
উত্তর
উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

ব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্স

ব্যাংক নিয়োগ প্রস্তুতি ⎯ লং কোর্স · তারিখ অনির্ধারিত · ২১ প্রশ্ন

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The ratio of the length of a rod and its shadow is 1 : √3. The angle of elevation of the sun is:
  1. 60°
  2. 30°
  3. 90°
  4. 45°
ব্যাখ্যা
Question: The ratio of the length of a rod and its shadow is 1 : √3. The angle of elevation of the sun is:

Solution:
Let AB be rod and BC be its shadow
So, AB : BC = 1 : √3

Let θ be the angle of elevation

∴ tanθ = AB/BC = 1/√3 = tan30°

∴ θ = 30°
.
If arcs AXB and CYD of a circle are congruent, find the ratio of AB and CD.
  1. 1 : 2
  2. 2 : 3
  3. 3 : 2
  4. 1 : 1
ব্যাখ্যা
Question: If arcs AXB and CYD of a circle are congruent, find the ratio of AB and CD.

Solution:
Given that arcs AXB and CYD of a circle are congruent,
i.e. arc AXB ≅ arc CYD.

We know that if two arcs of a circle are congruent, their corresponding chords are also equal.
i.e. chord AB = chord CD

Thus, AB/CD = 1

AB/CD = 1/1
∴ AB : CD = 1 : 1
.
The difference between the length and breadth of a rectangle is 23 m. If its perimeter is 206 m, then its area is:
  1. 2520 m2
  2. 2480 m2
  3. 2420 m2
  4. 1520 m2
ব্যাখ্যা
Question: The difference between the length and breadth of a rectangle is 23 m. If its perimeter is 206 m, then its area is:

Solution: 
We have,
(l - b) = 23 and
2(l + b) = 206
⇒ (l + b) = 103

Solving the two equations, we get:
l = 63 and b = 40

∴ Area = (l  x  b) = (63  x  40) m2 = 2520 m2
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A triangle and a parallelogram are constructed on the same base such that their areas are equal. If the altitude of the parallelogram is 100 m, then the altitude of the triangle is:
  1. 50m
  2. 100m
  3. 125m
  4. 200m
ব্যাখ্যা
Question: A triangle and a parallelogram are constructed on the same base such that their areas are equal. If the altitude of the parallelogram is 100 m, then the altitude of the triangle is:

Solution: 
In this question, we will denote ‘b’ as the base h1 and h2 as the altitudes of the triangle and parallelogram respectively.

Then, according to the data in the question:

½ × b ×  h1 = b ×  h2
⇒ h1 = 2 h2
⇒ h1 = 2  × 100 = 200m

∴ The altitude of the triangle is 200m.
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If tanθ + cotθ = 5, then tan2θ + cot2θ is?
  1. 23
  2. 33
  3. 43
  4. 53
ব্যাখ্যা
Question: If tanθ + cotθ = 5, then tan2θ + cot2θ is?

Solution:
Given,
tanθ + cotθ = 5
⇒ (tanθ + cotθ)2 = 52 ( Squaring both sides)
⇒ tan2θ + cot2θ + 2tanθcotθ = 25
⇒ tan2θ + cot2θ = 25 - 2 [∵ tanθ . cotθ = 1]
∴ tan2θ + cot2θ = 23
.
The angle of depression of a car, standing on the ground, from the top of a 75 m tower, is 30°. The distance of the car from the base of the tower is:
  1. 25√3 m
  2. 50√3 m
  3. 75√3 m
  4. 190 m
ব্যাখ্যা
Question: The angle of depression of a car, standing on the ground, from the top of a 75 m tower, is 30°. The distance of the car from the base of the tower is:

Solution:
AB is a tower and AB = 75 m
From A, the angle of depression of a car C
on the ground is 30°


Let distance BC = x

Now, in ΔACB,
tanθ = AB/BC
⇒ tan30° = 75/x
⇒ 1/√3 = 75/x
⇒ x = 75√3
∴ BC = 75√3 m
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The ratio of the surface area of a sphere and the curved surface area of the cylinder circumscribing the sphere is:
  1. 5 : 2
  2. 3 : 2
  3. 1 : 2
  4. 1 : 1
ব্যাখ্যা
Question: The ratio of the surface area of a sphere and the curved surface area of the cylinder circumscribing the sphere is:

Solution: 
Let the radius of the sphere be r
Then, the radius of the cylinder = r
Height of the cylinder = 2r
Surface area of sphere = 4πr2

Surface area of the cylinder = 2πr(2r) = 4πr2

∴ Required ratio 
= 4πr2 : 4πr2
= 1 : 1
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If the area of the trapezium whose parallel sides are 6 cm and 10 cm is 32 sq. cm, then the distance between the parallel sides is:
  1. 2 cm
  2. 3 cm
  3. 4 cm
  4. 5 cm
ব্যাখ্যা
Question: If the area of the trapezium whose parallel sides are 6 cm and 10 cm is 32 sq. cm, then the distance between the parallel sides is:

Solution: 
Let the required distance be P cm
Then,
½ × (6 + 10) × P = 32
⇒ P = 4 cm
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A rectangular field is to be fenced on three sides leaving a side of 20 feet uncovered. If the area of the field is 680 sq. feet, how many feet of fencing will be required?
  1. 88
  2. 92
  3. 98
  4. 102
ব্যাখ্যা
Question: A rectangular field is to be fenced on three sides leaving a side of 20 feet uncovered. If the area of the field is 680 sq. feet, how many feet of fencing will be required?

Solution: 
Here,
l = 20 ft and
lb = 680 sq. ft.

So, b = 34 ft.

∴ Length of fencing = (l + 2b) = (20 + 68) ft = 88 ft.
১০.
An observer 1.6 m tall is 20√3 away from a tower. The angle of elevation from his eye to the top of the tower is 30º. The height of the tower is:
  1. 51.6 m
  2. 41.6 m
  3. 31.6 m
  4. 21.6 m
ব্যাখ্যা
Question: An observer 1.6 m tall is 20√3 away from a tower. The angle of elevation from his eye to the top of the tower is 30º. The height of the tower is:

Solution: 

Let AB be the observer and CD tower
Draw BE perpendicular to CD

Then CE = AB = 1.6 m
And BE = AC =  20√3 m

Then right angle triangle DEB
∴ tan30° = DE/BE
⇒ 1/√3 = DE/20√3
⇒ DE = 20√3m

Then CD = CE + DE = 1.6 + 20 = 21.6 m
১১.
The sides of a triangle are consecutive integers. The perimeter of the triangle is 120 cm. Find the length of the greatest side:
  1. 21 cm
  2. 31 cm
  3. 41 cm
  4. 51 cm
ব্যাখ্যা
Question: The sides of a triangle are consecutive integers. The perimeter of the triangle is 120 cm. Find the length of the greatest side:

Solution:
Let the sides of the triangles be x cm, (x + 1) cm and (x + 2) cm respectively.
Then,
x + (x + 1) + (x + 2) = 120
⇒ 3x + 3 = 120
⇒ 3x = 117
⇒ x = 39

∴ Length of the greatest side
= (39 + 2) cm
= 41 cm
১২.
Calculate the area of a rhombus if the length of its side is 2 cm and one of its angles A is 30 degrees.
  1. 5 cm2
  2. 4 cm2
  3. 3 cm2
  4. 2 cm2
ব্যাখ্যা
Question: Calculate the area of a rhombus if the length of its side is 2 cm and one of its angles A is 30 degrees.

Solution:
Given,
Side = s = 2 cm
Angle A = 30 degrees
Square of side = 2 × 2 = 4

Area, A = s2 × sin (30°)
⇒ A = 4 × (1/2)
∴ A = 2 cm2
১৩.
A swimming pool 9 m wide and 12 m long and 1 m deep on the shallow side and 4 m deep on the deeper side. Its volume is:
  1. 140 m3
  2. 170 m3
  3. 270 m3
  4. 340 m3
ব্যাখ্যা
Question: A swimming pool 9 m wide and 12 m long and 1 m deep on the shallow side and 4 m deep on the deeper side. Its volume is:

Solution: 
Given, length width of the swimming pool is 9 m and 12 m respectively.

The volume of the swimming pool
= 9 × 12 × {(1 + 4)/2}
= 9 × 12 × (5/2)
= 270 m3
১৪.
If the volume and surface area of a sphere are numerically the same, then its radius is:
  1. 4 units
  2. 3 units
  3. 2 units
  4. 1 unit
ব্যাখ্যা
Question: If the volume and surface area of a sphere are numerically the same, then its radius is:

Solution: 
Let, the volume of a sphere = (4/3)πr3
the surface area of a sphere = 4πr2

∴ (4/3)πr3 = 4πr2
⇒ r = 3 units
১৫.
What is the value of tan240°?
  1. √3
  2. √5
  3. 3
  4. √2
ব্যাখ্যা
Question: What is the value of tan240°?

Solution: 
tan240°
= tan(180° + 60°)
= tan(180° + θ)
= tanθ
= tan60°
=√3
১৬.
The length of a room is 5.5 m and the width is 3.75 m. Find the cost of paving the floor with slabs at the rate of Tk. 800 per square metre.
  1. 15500 Tk
  2. 16500 Tk
  3. 17500 Tk
  4. 18500 Tk
ব্যাখ্যা
Question: The length of a room is 5.5 m and the width is 3.75 m. Find the cost of paving the floor with slabs at the rate of Tk. 800 per square metre.

Solution:
Area of the floor
= (5.5 × 3.75)m2
= 20.625m2

∴ Cost of paying
= (800 × 20.625) Tk
=16500 Tk
১৭.
A man walked diagonally across a square lot. Approximately, what was the percent saved by not walking along the edges?
  1. 29.5%
  2. 33.5%
  3. 36.5%
  4. 39.5%
ব্যাখ্যা
Question: A man walked diagonally across a square lot. Approximately, what was the percent saved by not walking along the edges?

Solution: 
Let the side of the square (ABCD) be x metres.
Then, AB + BC = 2x metres

AC = √2x = (1.41x) m
Saving on 2x metres = (0.59x) m

∴ Saving% = {(0.59x/2x).100%}
= 29.5%
১৮.
How many metres of carpet 63 cm wide will be required to cover the floor of a room 14 metres by 9 metres?
  1. 50 metres
  2. 100 metres
  3. 200 metres
  4. 250 metres
ব্যাখ্যা
Question: How many metres of carpet 63 cm wide will be required to cover the floor of a room 14 metres by 9 metres?

Solution:
Area of the floor = (14 × 9) m2 = 126 m2

∴ Length of the carpet = {(126/63) × 100}m = 200 metres
১৯.
The circumcentre of a triangle ABC is 'O'. If ∠BAC = 85° and ∠BCA = 75°, then the value of ∠OAC is -
  1. 70°
  2. 40°
  3. 90°
  4. 60°
ব্যাখ্যা
Question: The circumcentre of a triangle ABC is 'O'. If ∠BAC = 85° and ∠BCA = 75°, then the value of ∠OAC is - 

Solution:
According to the question,
Given:
∠BAC = 85°
∠BCA = 75°
∠OAC = ?


∠ABC + ∠BCA + ∠CAB = 180°
⇒ ∠ABC + 75° + 85° = 180°
∴ ∠ABC = 20°

∠COA = 2 × ∠ABC
⇒ ∠COA = 2 × 20 = 40°

In ΔAOC,
We know OC = OA
∴ ∠OAC = ∠OCA
∴ ∠OAC + ∠OCA + ∠COA = 180°
⇒ 2∠OAC = 180° - 40°
⇒ 2∠OAC = 140°
∴ ∠OAC = 70°
২০.
If cosθ.cosec23° = 1, the value of θ is:
  1. 37°
  2. 47°
  3. 57°
  4. 67°
ব্যাখ্যা
Question: If cosθ.cosec23° = 1, the value of θ is:

Solution: 
Here,
cosθ.cosec23° = 1
⇒ 1/cos θ = secθ
⇒ cosec23° = cosec(90° – θ)
⇒ 23° = 90° – θ
⇒ θ = 90° – 23° = 67°

Alternative way,
cosθ.cosec23° = 1
If cosA.cosecB = 1

Then, A + B = 90°
So, θ + 23° = 90°
∴ θ = 67°
২১.
The length of a tangent from point A at a distance of 5 cm from the centre of the circle is 4 cm. Find the radius of the circle.
  1. 3 cm
  2. 4 cm
  3. 5 cm
  4. 6 cm
ব্যাখ্যা
Question: The length of a tangent from point A at a distance of 5 cm from the centre of the circle is 4 cm. Find the radius of the circle.

Solution: 
Let O be the centre of the circle and AB is the tangent.


OB ⊥ AB then ∆OAB is a right-angled triangle.

OA2 = AB2 + OB2 (by Pythagoras Theorem)
⇒ 52 = 42 + OB2
⇒ OB2 = 52 – 42
⇒ OB2 = 25 – 16
⇒ OB2 = 9
⇒ OB = √9 = 3

Hence, the radius of the circle = 3 cm.