Geometry Study Resources for Competitive Exams

Geometry

Q. A circle has a circumference of 31.4 cm. What is the radius of the circle?

A. 5 cm
B. 10 cm
C. 7 cm
D. 15 cm

Solution

Circumference = 2πr => 31.4 = 2πr => r = 31.4/(2π) = 5 cm.

Correct Answer: A — 5 cm

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Q. A circle has a diameter of 10 cm. What is its area?

A. 78.5 cm²
B. 31.4 cm²
C. 50 cm²
D. 100 cm²

Solution

Radius = diameter / 2 = 10 / 2 = 5 cm. Area = πr² = π(5)² = 25π ≈ 78.5 cm².

Correct Answer: A — 78.5 cm²

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Q. A circle has a radius of 2.5 m. What is its circumference?

A. 15.7 m
B. 10 m
C. 5 m
D. 20 m

Solution

Circumference = 2πr = 2π(2.5) = 5π ≈ 15.7 m.

Correct Answer: A — 15.7 m

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Q. A circle has a radius of 3 cm. What is the circumference?

A. 6π cm
B. 9.42 cm
C. 12 cm
D. 3π cm

Solution

Circumference = 2πr = 2π(3) = 6π cm.

Correct Answer: A — 6π cm

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Q. A circle has a radius of 3 cm. What is the length of its diameter?

A. 3 cm
B. 6 cm
C. 9 cm
D. 12 cm

Solution

Diameter = 2 * radius = 2 * 3 cm = 6 cm.

Correct Answer: B — 6 cm

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Q. A circle has a radius of 4 m. What is the length of an arc that subtends a central angle of 90 degrees?

A. π/2 m
B. 2π m
C. 4 m
D. 3.14 m

Solution

Arc length = (θ/360) * 2πr; θ = 90; Arc length = (90/360) * 2π(4) = π/2 m.

Correct Answer: A — π/2 m

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Q. A circle has an area of 50.24 cm². What is its diameter?

A. 8 cm
B. 10 cm
C. 12 cm
D. 14 cm

Solution

Area = πr², so r = √(Area/π) = √(50.24/π) ≈ 4 cm. Diameter = 2r = 8 cm.

Correct Answer: B — 10 cm

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Q. A circle has an area of 78.5 cm². What is its radius?

A. 5 cm
B. 7 cm
C. 10 cm
D. 8 cm

Solution

Area = πr², so r² = Area/π = 78.5/π ≈ 25, thus r ≈ 5 cm.

Correct Answer: B — 7 cm

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Q. A circle is inscribed in a square with a side length of 10 cm. What is the area of the circle?

A. 78.5 cm²
B. 100 cm²
C. 50 cm²
D. 25 cm²

Solution

Radius of the circle = side length / 2 = 10 / 2 = 5 cm. Area = πr² = π(5)² = 25π ≈ 78.5 cm².

Correct Answer: A — 78.5 cm²

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Q. A circle is inscribed in a square with a side length of 6 cm. What is the area of the circle?

A. 28.26 cm²
B. 36 cm²
C. 18.84 cm²
D. 12 cm²

Solution

Radius = side length / 2 = 6 / 2 = 3 cm. Area = πr² = π(3)² = 9π ≈ 28.26 cm².

Correct Answer: A — 28.26 cm²

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Q. A circle is inscribed in a square with a side length of 8 cm. What is the area of the circle?

A. 50.24 cm²
B. 64 cm²
C. 25.12 cm²
D. 32 cm²

Solution

Radius = side length / 2 = 8 / 2 = 4 cm. Area = πr² = π(4)² = 16π ≈ 50.24 cm².

Correct Answer: A — 50.24 cm²

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Q. A circle is inscribed in a square. If the side of the square is 8 cm, what is the radius of the circle?

A. 2 cm
B. 4 cm
C. 6 cm
D. 8 cm

Solution

The radius of the inscribed circle is half the side of the square, so r = 8/2 = 4 cm.

Correct Answer: B — 4 cm

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Q. A circle is inscribed in a square. If the side of the square is 8 cm, what is the area of the circle?

A. 50.24 cm²
B. 64 cm²
C. 25.12 cm²
D. 32 cm²

Solution

Radius of the circle = side/2 = 8/2 = 4 cm. Area = πr² = π(4)² = 16π ≈ 50.24 cm².

Correct Answer: A — 50.24 cm²

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Q. A circle is inscribed in a triangle with sides 6 cm, 8 cm, and 10 cm. What is the radius of the inscribed circle?

A. 2 cm
B. 3 cm
C. 4 cm
D. 5 cm

Solution

Semi-perimeter = (6+8+10)/2 = 12 cm; Area = √(12(12-6)(12-8)(12-10)) = 24 cm²; Radius = Area/semi-perimeter = 24/12 = 2 cm.

Correct Answer: B — 3 cm

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Q. A circle is inscribed in a triangle with sides 7 cm, 8 cm, and 9 cm. What is the radius of the inscribed circle?

A. 4 cm
B. 3 cm
C. 2 cm
D. 5 cm

Solution

Semi-perimeter = (7+8+9)/2 = 12 cm. Area = √[12(12-7)(12-8)(12-9)] = √[12*5*4*3] = 12√5. Radius = Area/semi-perimeter = (12√5)/12 = √5 cm.

Correct Answer: B — 3 cm

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Q. A circle is inscribed in a triangle with sides 8 cm, 15 cm, and 17 cm. What is the radius of the inscribed circle?

A. 4 cm
B. 5 cm
C. 6 cm
D. 7 cm

Solution

Semi-perimeter = (8 + 15 + 17)/2 = 20 cm. Area = 60 cm². Radius = Area/semi-perimeter = 60/20 = 3 cm.

Correct Answer: B — 5 cm

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Q. A circle is inscribed in a triangle with sides of lengths 7 cm, 8 cm, and 9 cm. What is the radius of the inscribed circle?

A. 4 cm
B. 3 cm
C. 2 cm
D. 5 cm

Solution

The semi-perimeter s = (7 + 8 + 9)/2 = 12 cm. The area A can be calculated using Heron's formula. The radius r = A/s. The area is 24 cm², so r = 24/12 = 2 cm.

Correct Answer: B — 3 cm

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Q. A circle is inscribed in a triangle. If the sides of the triangle are 7 cm, 8 cm, and 9 cm, what is the radius of the inscribed circle?

A. 3 cm
B. 4 cm
C. 5 cm
D. 6 cm

Solution

The radius r of the inscribed circle can be found using the formula r = A/s, where A is the area and s is the semi-perimeter. The semi-perimeter s = (7 + 8 + 9)/2 = 12 cm. The area A can be calculated using Heron's formula: A = √[s(s-a)(s-b)(s-c)] = √[12(12-7)(12-8)(12-9)] = √[12*5*4*3] = √720 = 12√5. Thus, r = A/s = (12√5)/12 = √5 cm, which is approximately 2.24 cm.

Correct Answer: B — 4 cm

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Q. A circle is inscribed in a triangle. If the triangle has sides of lengths 7 cm, 8 cm, and 9 cm, what is the radius of the inscribed circle?

A. 3 cm
B. 4 cm
C. 5 cm
D. 6 cm

Solution

The area A of the triangle can be calculated using Heron's formula. The semi-perimeter s = (7 + 8 + 9) / 2 = 12. The area A = √(s(s-a)(s-b)(s-c)) = √(12(12-7)(12-8)(12-9)) = √(12*5*4*3) = 12√5. The radius r = A/s = (12√5)/12 = √5 cm, which is approximately 4 cm.

Correct Answer: B — 4 cm

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Q. A circle is inscribed in a triangle. If the triangle has sides of lengths 7, 8, and 9 units, what is the radius of the inscribed circle?

A. 3 square units
B. 4 square units
C. 5 square units
D. 6 square units

Solution

The area of the triangle is 24 square units (using Heron's formula). The semi-perimeter is 12 units. The radius r = Area/semi-perimeter = 24/12 = 2 units.

Correct Answer: B — 4 square units

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Q. A circle is inscribed in a triangle. What is the radius of the incircle if the triangle has sides of lengths 7, 8, and 9 units?

A. 4 square units
B. 3 square units
C. 5 square units
D. 2 square units

Solution

The area of the triangle can be calculated using Heron's formula. The semi-perimeter s = (7+8+9)/2 = 12. The area A = √(s(s-a)(s-b)(s-c)) = √(12(12-7)(12-8)(12-9)) = √(12*5*4*3) = 12√5. The radius r = A/s = 12√5/12 = √5. The radius is approximately 3 square units.

Correct Answer: B — 3 square units

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Q. A circle is inscribed in a triangle. What is the relationship between the radius of the incircle and the area of the triangle?

A. r = A/s
B. r = s/A
C. r = 2A/s
D. r = s/2A

Solution

The radius of the incircle (r) is given by the formula r = A/s, where A is the area of the triangle and s is the semi-perimeter.

Correct Answer: A — r = A/s

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Q. A parallelogram has a base of 12 cm and a height of 4 cm. What is its area?

A. 48 cm²
B. 24 cm²
C. 36 cm²
D. 60 cm²

Solution

Area = base × height = 12 cm × 4 cm = 48 cm².

Correct Answer: A — 48 cm²

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Q. A point Q divides the segment joining P(1, 1) and R(7, 5) in the ratio 2:1. What are the coordinates of Q?

A. (5, 3)
B. (4, 2)
C. (6, 4)
D. (3, 2)

Solution

Using the section formula: Q = ((mx2 + nx1)/(m+n), (my2 + ny1)/(m+n)) where m=2, n=1. Q = ((2*7 + 1*1)/(2+1), (2*5 + 1*1)/(2+1)) = (5, 3).

Correct Answer: A — (5, 3)

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Q. A rectangle has a length of 8 cm and a width of 3 cm. What is its perimeter?

A. 22 cm
B. 24 cm
C. 20 cm
D. 26 cm

Solution

Perimeter = 2(length + width) = 2(8 + 3) = 22 cm.

Correct Answer: A — 22 cm

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Q. A rectangle has a length of 8 m and a width of 3 m. What is its perimeter?

A. 22 m
B. 24 m
C. 20 m
D. 26 m

Solution

Perimeter = 2 * (length + width) = 2 * (8 + 3) = 22 m.

Correct Answer: A — 22 m

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Q. A right triangle has legs of lengths 6 cm and 8 cm. What is the area of the triangle?

A. 24 cm²
B. 30 cm²
C. 48 cm²
D. 36 cm²

Solution

Area = 1/2 * base * height = 1/2 * 6 * 8 = 24 cm².

Correct Answer: A — 24 cm²

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Q. A right triangle has legs of lengths 6 cm and 8 cm. What is the length of the hypotenuse?

A. 10 cm
B. 12 cm
C. 14 cm
D. 16 cm

Solution

Using the Pythagorean theorem, hypotenuse = √(6² + 8²) = √(36 + 64) = √100 = 10 cm.

Correct Answer: A — 10 cm

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Q. A sector of a circle has a radius of 5 cm and a central angle of 60 degrees. What is the area of the sector?

A. 13.09 cm²
B. 25 cm²
C. 15.71 cm²
D. 20.94 cm²

Solution

Area of sector = (θ/360) * πr² = (60/360) * π(5)² = (1/6) * 25π ≈ 13.09 cm².

Correct Answer: A — 13.09 cm²

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Q. A sector of a circle has a radius of 6 cm and a central angle of 60 degrees. What is the area of the sector?

A. 12π cm²
B. 6π cm²
C. 3π cm²
D. 9π cm²

Solution

Area of sector = (θ/360) * πr² = (60/360) * π(6)² = (1/6) * 36π = 6π cm².

Correct Answer: B — 6π cm²

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Geometry

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