Geometry Study Resources for Competitive Exams

Geometry

Q. Two parallel lines are cut by a transversal, creating angles of 75° and x°. What is the value of x?

A. 75°
B. 105°
C. 180°
D. 90°

Solution

The angles are supplementary, so x = 180° - 75° = 105°.

Correct Answer: B — 105°

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Q. Two parallel lines are intersected by a transversal. If one of the corresponding angles is 75 degrees, what is the measure of the other corresponding angle?

A. 75 degrees
B. 105 degrees
C. 90 degrees
D. 60 degrees

Solution

Corresponding angles are equal, so the other corresponding angle is also 75 degrees.

Correct Answer: A — 75 degrees

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Q. Two parallel lines are intersected by a transversal. If one of the corresponding angles is 65 degrees, what is the measure of the other corresponding angle?

A. 65 degrees
B. 115 degrees
C. 180 degrees
D. 90 degrees

Solution

Corresponding angles are equal when two parallel lines are cut by a transversal.

Correct Answer: A — 65 degrees

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Q. Two triangles are similar if their corresponding angles are equal. If triangle DEF is similar to triangle XYZ, and angle D = 50 degrees, what is the measure of angle X?

A. 50 degrees
B. 60 degrees
C. 70 degrees
D. 80 degrees

Solution

Since the triangles are similar, corresponding angles are equal. Therefore, angle X = angle D = 50 degrees.

Correct Answer: A — 50 degrees

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Q. Two triangles are similar if their corresponding angles are equal. If triangle DEF is similar to triangle XYZ, and angle D = 30°, what is angle X?

A. 30°
B. 60°
C. 90°
D. 120°

Solution

Since the triangles are similar, corresponding angles are equal. Therefore, angle X = angle D = 30°.

Correct Answer: A — 30°

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Q. Two triangles are similar if their corresponding angles are equal. If triangle DEF is similar to triangle XYZ, and angle D = 30 degrees, what is the measure of angle X?

A. 30 degrees
B. 60 degrees
C. 90 degrees
D. 120 degrees

Solution

Since the triangles are similar, corresponding angles are equal. Therefore, angle X = angle D = 30 degrees.

Correct Answer: A — 30 degrees

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Q. Two triangles are similar with a ratio of their corresponding sides as 3:5. If the area of the smaller triangle is 27 cm², what is the area of the larger triangle?

A. 45 cm²
B. 75 cm²
C. 60 cm²
D. 50 cm²

Solution

Area ratio = (side ratio)² = (3/5)² = 9/25. Let area of larger triangle be A. 27/A = 9/25, A = 27 * (25/9) = 75 cm².

Correct Answer: B — 75 cm²

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Q. Two triangles are similar. If the lengths of the sides of the first triangle are 3, 4, and 5 units, what are the lengths of the corresponding sides of the second triangle if the shortest side is 6 units?

A. 6, 8, 10
B. 9, 12, 15
C. 12, 16, 20
D. 15, 20, 25

Solution

The ratio of the sides is 6/3 = 2. Therefore, the corresponding sides are 6*2, 4*2, and 5*2, which are 6, 8, and 10 units.

Correct Answer: A — 6, 8, 10

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Q. Two triangles are similar. If the sides of the first triangle are 3 cm, 4 cm, and 5 cm, what is the length of the corresponding side in the second triangle if its longest side is 10 cm?

A. 6 cm
B. 8 cm
C. 10 cm
D. 12 cm

Solution

The ratio of the sides is 10/5 = 2. Therefore, the corresponding side is 4 * 2 = 8 cm.

Correct Answer: B — 8 cm

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Q. Two triangles are similar. If the sides of the first triangle are 3 cm, 4 cm, and 5 cm, what is the length of the longest side of the second triangle if its shortest side is 6 cm?

A. 8 cm
B. 10 cm
C. 12 cm
D. 9 cm

Solution

The ratio of the sides is 6/3 = 2. Therefore, the longest side is 5 * 2 = 10 cm.

Correct Answer: B — 10 cm

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Q. Two triangles are similar. If the sides of the first triangle are 3 cm, 4 cm, and 5 cm, what is the area of the second triangle if its longest side is 10 cm?

A. 40 cm²
B. 20 cm²
C. 30 cm²
D. 50 cm²

Solution

The ratio of the sides is 10/5 = 2. Area ratio = (2)² = 4. Area of first triangle = 6 cm². Area of second triangle = 6 * 4 = 24 cm².

Correct Answer: B — 20 cm²

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Q. Two triangles are similar. If the sides of the first triangle are 3 cm, 4 cm, and 5 cm, what are the corresponding sides of the second triangle if the shortest side is 6 cm?

A. 8 cm, 10 cm, 12 cm
B. 9 cm, 12 cm, 15 cm
C. 6 cm, 8 cm, 10 cm
D. 12 cm, 16 cm, 20 cm

Solution

The ratio of similarity is 6/3 = 2. Therefore, the sides are 3*2 = 6 cm, 4*2 = 8 cm, 5*2 = 10 cm.

Correct Answer: A — 8 cm, 10 cm, 12 cm

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Q. What can be concluded if two angles are supplementary and one of them is 90 degrees?

A. Both angles are acute.
B. Both angles are right angles.
C. The other angle is 90 degrees.
D. The other angle is obtuse.

Solution

If two angles are supplementary, their sum is 180 degrees. If one angle is 90 degrees, the other must also be 90 degrees.

Correct Answer: C — The other angle is 90 degrees.

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Q. What can be concluded if two angles are supplementary and one of them is an exterior angle formed by a transversal intersecting two parallel lines?

A. They are both acute.
B. They are both obtuse.
C. One is an interior angle.
D. They are equal.

Solution

If one angle is an exterior angle formed by a transversal intersecting two parallel lines, the other angle must be an interior angle, as they are supplementary.

Correct Answer: C — One is an interior angle.

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Q. What can be concluded if two lines are cut by a transversal and the alternate exterior angles are equal?

A. The lines are parallel.
B. The lines are perpendicular.
C. The lines intersect.
D. No conclusion can be made.

Solution

If the alternate exterior angles are equal, by the Alternate Exterior Angles Theorem, the lines are parallel.

Correct Answer: A — The lines are parallel.

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Q. What can be concluded if two lines are cut by a transversal and the alternate interior angles are equal?

A. The lines are parallel.
B. The lines are perpendicular.
C. The lines intersect.
D. The angles are complementary.

Solution

If the alternate interior angles are equal, it can be concluded that the two lines are parallel.

Correct Answer: A — The lines are parallel.

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Q. What is the area of a circle with a circumference of 62.8 cm?

A. 100 cm²
B. 200 cm²
C. 300 cm²
D. 400 cm²

Solution

Circumference = 2πr, so r = 62.8 / (2π) ≈ 10 cm. Area = πr² = π(10)² = 100π ≈ 314.16 cm².

Correct Answer: A — 100 cm²

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Q. What is the area of a circle with a diameter of 10?

A. 25π
B. 50π
C. 100π
D. 75π

Solution

Area = πr². Diameter = 10, so radius r = 5. Area = π(5)² = 25π.

Correct Answer: A — 25π

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Q. What is the area of a circle with a diameter of 12 cm?

A. 36π cm²
B. 144 cm²
C. 12π cm²
D. 24π cm²

Solution

Area = πr² = π(6)² = 36π cm².

Correct Answer: A — 36π cm²

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Q. What is the area of a circle with a diameter of 12 units?

A. 36π square units
B. 144π square units
C. 24π square units
D. 48π square units

Solution

The radius is 6 units (diameter/2). Area = πr² = π(6)² = 36π square units.

Correct Answer: A — 36π square units

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Q. What is the area of a circle with a diameter of 14 cm?

A. 49π cm²
B. 98π cm²
C. 14π cm²
D. 7π cm²

Solution

Radius = diameter/2 = 14/2 = 7 cm. Area = πr² = π(7)² = 49π cm².

Correct Answer: A — 49π cm²

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Q. What is the area of a circle with a radius of 3 units?

A. 9π
B. 6π
C. 3π
D. 12π

Solution

The area of a circle is given by the formula A = πr². For r = 3, A = π(3)² = 9π.

Correct Answer: A — 9π

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Q. What is the area of a circle with a radius of 3?

A. 9π
B. 12π
C. 15π
D. 18π

Solution

The area of a circle is given by the formula A = πr^2. Thus, A = π * 3^2 = 9π.

Correct Answer: A — 9π

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Q. What is the area of a circle with a radius of 4?

A. 16π
B. 8π
C. 12π
D. 20π

Solution

Area = πr² = π(4)² = 16π.

Correct Answer: A — 16π

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Q. What is the area of a circle with a radius of 5 cm?

A. 25π cm²
B. 10π cm²
C. 20 cm²
D. 15 cm²

Solution

Area = πr² = π(5)² = 25π cm².

Correct Answer: A — 25π cm²

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Q. What is the area of a circle with a radius of 5 units?

A. 25π
B. 50π
C. 75π
D. 100π

Solution

The area of a circle is given by the formula A = πr². For r = 5, A = π(5)² = 25π.

Correct Answer: A — 25π

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Q. What is the area of a circle with a radius of 5?

A. 25π
B. 50π
C. 75π
D. 100π

Solution

Area = πr² = π(5)² = 25π.

Correct Answer: A — 25π

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Q. What is the area of a circle with a radius of 7 units?

A. 49π
B. 14π
C. 21π
D. 28π

Solution

Area = πr² = π(7)² = 49π.

Correct Answer: A — 49π

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Q. What is the area of a circle with a radius of 8 cm?

A. 64π cm²
B. 32π cm²
C. 16π cm²
D. 24π cm²

Solution

Area = πr² = π(8)² = 64π cm².

Correct Answer: A — 64π cm²

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Q. What is the area of a parallelogram with a base of 10 cm and a height of 4 cm?

A. 40 cm²
B. 30 cm²
C. 50 cm²
D. 20 cm²

Solution

Area = base * height = 10 * 4 = 40 cm².

Correct Answer: A — 40 cm²

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Geometry

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