Mathematics (School)

Mathematics (School) MCQ & Objective Questions

Mathematics is a crucial subject in school education, forming the foundation for various competitive exams. Mastering Mathematics (School) not only enhances problem-solving skills but also boosts confidence during exams. Practicing MCQs and objective questions is essential for effective exam preparation, as it helps students identify important questions and understand concepts clearly.

What You Will Practise Here

Number Systems and their properties
Algebraic Expressions and Equations
Geometry: Angles, Triangles, and Circles
Statistics and Probability concepts
Mensuration: Area, Volume, and Surface Area
Trigonometry basics and applications
Functions and Graphs

Exam Relevance

Mathematics (School) is a significant part of the curriculum for CBSE and State Boards, as well as competitive exams like NEET and JEE. Students can expect a variety of question patterns, including direct application of formulas, conceptual understanding, and problem-solving scenarios. Familiarity with MCQs in this subject can greatly enhance performance in both board and competitive examinations.

Common Mistakes Students Make

Misinterpreting the question, leading to incorrect answers.
Overlooking the importance of units in measurement-related problems.
Confusing similar formulas, especially in Geometry and Algebra.
Neglecting to check calculations, resulting in simple arithmetic errors.
Failing to understand the underlying concepts, which affects problem-solving ability.

FAQs

Question: How can I improve my speed in solving Mathematics (School) MCQs?
Answer: Regular practice with timed quizzes and mock tests can significantly enhance your speed and accuracy.

Question: Are there any specific topics I should focus on for competitive exams?
Answer: Focus on Algebra, Geometry, and Statistics, as these areas frequently appear in competitive exams.

Start your journey towards mastering Mathematics (School) today! Solve practice MCQs to test your understanding and prepare effectively for your exams. Remember, consistent practice leads to success!

Algebra (Secondary) Arithmetic (Primary) Geometry Statistics & Probability Trigonometry

Q. Which of the following triangles is congruent to triangle DEF if DE = 5 cm, EF = 7 cm, and DF = 5 cm?

A. Triangle GHI with GH = 5 cm, HI = 7 cm, GI = 5 cm
B. Triangle JKL with JK = 6 cm, KL = 7 cm, JL = 5 cm
C. Triangle MNO with MN = 5 cm, NO = 7 cm, MO = 6 cm
D. Triangle PQR with PQ = 5 cm, QR = 5 cm, PR = 7 cm

Solution

Triangles DEF and GHI are congruent by the Side-Side-Side (SSS) congruence criterion since they have the same side lengths.

Correct Answer: A — Triangle GHI with GH = 5 cm, HI = 7 cm, GI = 5 cm

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Q. Which of the following triangles is similar to a triangle with angles 30°, 60°, and 90°?

A. 30°, 60°, 90°
B. 45°, 45°, 90°
C. 60°, 30°, 90°
D. 90°, 30°, 60°

Solution

Triangles are similar if they have the same angles. The triangle with angles 30°, 60°, and 90° is similar to itself.

Correct Answer: A — 30°, 60°, 90°

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Q. Which of the following triangles is similar to triangle ABC if angle A = angle D and angle B = angle E?

A. Triangle DEF
B. Triangle GHI
C. Triangle JKL
D. Triangle MNO

Solution

By the Angle-Angle (AA) similarity criterion, if two angles of one triangle are equal to two angles of another triangle, the triangles are similar.

Correct Answer: A — Triangle DEF

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Q. Which of the following triangles is similar to triangle ABC with angles 30°, 60°, and 90°?

A. 30°, 60°, 90°
B. 45°, 45°, 90°
C. 60°, 60°, 60°
D. 30°, 30°, 120°

Solution

Triangles are similar if they have the same angles. Triangle ABC has angles 30°, 60°, and 90°, so it is similar to any triangle with the same angles.

Correct Answer: A — 30°, 60°, 90°

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Q. Which of the following values satisfies the inequality: -3x + 6 < 0?

A. x = 1
B. x = 2
C. x = -1
D. x = -2

Solution

Step 1: Subtract 6 from both sides: -3x < -6. Step 2: Divide by -3 (reverse the inequality): x > 2. Thus, x = 2 satisfies the inequality.

Correct Answer: B — x = 2

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Q. Which of the following values satisfies the inequality: 3x + 4 < 10?

A. x = 1
B. x = 2
C. x = 3
D. x = 4

Solution

Step 1: Subtract 4 from both sides: 3x < 6. Step 2: Divide by 3: x < 2.

Correct Answer: A — x = 1

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Q. Which of the following values satisfies the inequality: 4 - x > 1?

A. x < 3
B. x > 3
C. x = 3
D. x ≤ 3

Solution

Step 1: Subtract 4 from both sides: -x > -3. Step 2: Multiply by -1 (reverse inequality): x < 3.

Correct Answer: A — x < 3

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Q. Which of the following values satisfies the inequality: 4x - 1 < 3?

A. x = 1
B. x = 0
C. x = 2
D. x = -1

Solution

Step 1: Add 1 to both sides: 4x < 4. Step 2: Divide by 4: x < 1. Therefore, x = 0 satisfies the inequality.

Correct Answer: B — x = 0

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Q. Which of the following values satisfies the inequality: 4x - 1 < 3x + 2?

A. x < 3
B. x > 3
C. x < 1
D. x > 1

Solution

Step 1: Subtract 3x from both sides: x - 1 < 2. Step 2: Add 1: x < 3.

Correct Answer: D — x > 1

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Q. Which of the following values satisfies the inequality: 5 - 2x > 1?

A. x < 2
B. x > 2
C. x < 1
D. x > 1

Solution

Step 1: Subtract 5 from both sides: -2x > -4. Step 2: Divide by -2 (reverse inequality): x < 2.

Correct Answer: A — x < 2

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Q. Which of the following values satisfies the inequality: 5 - x > 2?

A. x < 3
B. x > 3
C. x < 5
D. x > 5

Solution

Step 1: Subtract 5 from both sides: -x > -3. Step 2: Multiply by -1 (reverse the inequality): x < 3.

Correct Answer: A — x < 3

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Q. Which of the following values satisfies the inequality: x/3 + 2 < 5?

A. x < 9
B. x > 9
C. x = 9
D. x = 6

Solution

Step 1: Subtract 2 from both sides: x/3 < 3. Step 2: Multiply by 3: x < 9.

Correct Answer: A — x < 9

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Q. Which polynomial has a root at x = -1?

A. x^2 + 2x + 1
B. x^2 - 2x + 1
C. x^2 + x - 2
D. x^2 - x - 2

Solution

The polynomial x^2 + 2x + 1 can be factored as (x + 1)(x + 1), indicating that -1 is a root.

Correct Answer: A — x^2 + 2x + 1

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Q. Which theorem can be used to prove that two triangles are congruent if two sides and the included angle of one triangle are equal to two sides and the included angle of another triangle?

A. Angle-Angle-Angle (AAA)
B. Side-Angle-Side (SAS)
C. Side-Side-Side (SSS)
D. Angle-Side-Angle (ASA)

Solution

The Side-Angle-Side (SAS) theorem can be used to prove the congruence of the triangles.

Correct Answer: B — Side-Angle-Side (SAS)

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Mathematics (School)

Mathematics (School) MCQ & Objective Questions

What You Will Practise Here

Exam Relevance

Common Mistakes Students Make

FAQs

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