Mathematics Syllabus for JEE Main

Mathematics Syllabus (JEE Main)

Algebra Calculus Coordinate Geometry Sets, Relations & Functions Statistics & Probability Trigonometry Vector & 3D Geometry

Q. Determine the solution set for the inequality 5x - 1 > 4.

A. x < 1
B. x > 1
C. x ≤ 1
D. x ≥ 1

Solution

5x - 1 > 4 => 5x > 5 => x > 1.

Correct Answer: B — x > 1

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Q. Determine the solution set for the inequality 5x - 7 < 3.

A. x < 2
B. x > 2
C. x ≤ 2
D. x ≥ 2

Solution

5x - 7 < 3 => 5x < 10 => x < 2.

Correct Answer: A — x < 2

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Q. Determine the solution set for the inequality 5x - 7 ≥ 3.

A. x ≥ 2
B. x < 2
C. x > 2
D. x ≤ 2

Solution

5x - 7 ≥ 3 => 5x ≥ 10 => x ≥ 2.

Correct Answer: A — x ≥ 2

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Q. Determine the solution set for the inequality 6x + 4 < 10.

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

Solution

6x + 4 < 10 => 6x < 6 => x < 1.

Correct Answer: A — x < 1

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Q. Determine the solution set for the inequality 6x - 4 < 2x + 8.

A. x < 3
B. x > 3
C. x < 2
D. x > 2

Solution

6x - 4 < 2x + 8 => 4x < 12 => x < 3.

Correct Answer: B — x > 3

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Q. Determine the solution set for the inequality 7 - 3x < 1.

A. x > 2
B. x < 2
C. x > 3
D. x < 3

Solution

7 - 3x < 1 => -3x < -6 => x > 2.

Correct Answer: B — x < 2

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Q. Determine the solution set for the inequality 7x + 2 ≥ 4.

A. x ≥ 0
B. x ≤ 0
C. x ≥ 1/7
D. x ≤ 1/7

Solution

Subtract 2 from both sides: 7x ≥ 2. Then divide by 7: x ≥ 2/7.

Correct Answer: C — x ≥ 1/7

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Q. Determine the solution set for the inequality 7x + 3 < 4x + 12.

A. x < 3
B. x > 3
C. x ≤ 3
D. x ≥ 3

Solution

7x + 3 < 4x + 12 => 3x < 9 => x < 3.

Correct Answer: B — x > 3

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Q. Determine the solution set for the inequality 7x - 4 ≥ 10.

A. x ≥ 2
B. x < 2
C. x > 2
D. x ≤ 2

Solution

Add 4 to both sides: 7x ≥ 14. Then divide by 7: x ≥ 2.

Correct Answer: A — x ≥ 2

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Q. Determine the value of a for which the function f(x) = { x^2 + a, x < 1; 2x + 3, x >= 1 } is differentiable at x = 1.

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

Solution

Setting f(1-) = f(1+) and f'(1-) = f'(1+) leads to a = 1 for differentiability.

Correct Answer: B — 0

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Q. Determine the value of c for which the function f(x) = { 3x + c, x < 1; 2x^2 - 1, x >= 1 } is continuous at x = 1.

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

Solution

Setting the two pieces equal at x = 1 gives us 3 + c = 1. Thus, c = -2.

Correct Answer: A — -1

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Q. Determine the value of k for which the function f(x) = { kx + 1, x < 1; 2x - 3, x >= 1 } is continuous at x = 1.

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

Solution

To ensure continuity at x = 1, k(1) + 1 = 2(1) - 3, solving gives k = 2.

Correct Answer: B — 2

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Q. Determine the value of k for which the function f(x) = { x^2 + k, x < 1; 2x + 1, x >= 1 } is continuous at x = 1.

A. 0
B. 1
C. 2
D. 3

Solution

To ensure continuity at x = 1, we need to set the two pieces equal: 1^2 + k = 2(1) + 1. This gives k = 2.

Correct Answer: B — 1

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Q. Determine the value of k for which the function f(x) = { x^2 + k, x < 1; 2x + 3, x >= 1 } is continuous at x = 1.

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

Solution

To ensure continuity at x = 1, we need to set the two pieces equal: k + 1^2 = 2(1) + 3. This gives k + 1 = 5, so k = 4.

Correct Answer: B — 0

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Q. Determine the value of k for which the function f(x) = { x^2 - 4, x < 2; k, x = 2; 3x - 2, x > 2 is continuous at x = 2.

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

Solution

For f(x) to be continuous at x = 2, we need limit as x approaches 2 from left to equal limit as x approaches 2 from right and equal to f(2). Thus, k = 4.

Correct Answer: B — 4

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Q. Determine the value of k for which the function f(x) = { x^2 - 4, x < 2; k, x = 2; 3x - 4, x > 2 is continuous at x = 2.

A. 0
B. 2
C. 4
D. 6

Solution

For f(x) to be continuous at x = 2, we need limit as x approaches 2 from left to equal limit as x approaches 2 from right. Thus, k must equal 0.

Correct Answer: B — 2

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Q. Determine the value of m for which the function f(x) = { mx + 1, x < 2; x^2 - 4, x >= 2 } is differentiable at x = 2.

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

Solution

Setting f(2-) = f(2+) and f'(2-) = f'(2+) leads to m = 1 for differentiability.

Correct Answer: B — 0

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Q. Determine the value of n for which the function f(x) = { n^2 - 1, x < 0; 2x + 3, x >= 0 } is continuous at x = 0.

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

Solution

Setting the two pieces equal at x = 0: n^2 - 1 = 3. Solving gives n = ±2.

Correct Answer: A — 1

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Q. Determine the value of p for which the function f(x) = { 2x + 3, x < 2; px + 1, x = 2; x^2 - 1, x > 2 is continuous at x = 2.

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

Solution

Setting 2(2) + 3 = p(2) + 1 gives p = 3 for continuity.

Correct Answer: C — 3

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Q. Determine the value of p for which the function f(x) = { 3x - 1, x < 2; px + 4, x = 2; x^2 - 2, x > 2 is continuous at x = 2.

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

Solution

Setting 3(2) - 1 = p(2) + 4 gives p = 2.

Correct Answer: C — 3

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Q. Determine the value of p for which the function f(x) = { x^2 + p, x < 0; 1, x = 0; 2x + p, x > 0 is continuous at x = 0.

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

Solution

Setting p = 1 for continuity at x = 0 gives f(0) = 1.

Correct Answer: B — 0

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Q. Determine the value of p for which the function f(x) = { x^2 - 1, x < 1; p, x = 1; 2x + 1, x > 1 is continuous at x = 1.

A. 0
B. 1
C. 2
D. 3

Solution

Setting the left limit (1 - 1 = 0) equal to the right limit (2(1) + 1 = 3), we find p = 2.

Correct Answer: C — 2

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Q. Determine the value of p for which the function f(x) = { x^3 - 3x + p, x < 1; 2x + 1, x >= 1 is continuous at x = 1.

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

Solution

Setting -3 + p = 3 gives p = 0.

Correct Answer: A — -1

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Q. Determine the value of p for which the function f(x) = { x^3 - 3x + p, x < 1; 2x^2 + 1, x >= 1 is continuous at x = 1.

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

Solution

Setting 1 - 3 + p = 2 + 1 gives p = 4.

Correct Answer: A — -1

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Q. Determine the value of \( k \) such that \( \begin{vmatrix} 1 & 2 & 3 \\ 4 & 5 & 6 \\ 7 & 8 & k \end{vmatrix} = 0 \).

A. 9
B. 10
C. 11
D. 12

Solution

Setting the determinant to zero and solving gives \( k = 10 \).

Correct Answer: B — 10

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Q. Determine the values of x that satisfy cos^2(x) - 1/2 = 0.

A. π/4, 3π/4
B. π/3, 2π/3
C. π/6, 5π/6
D. 0, π

Solution

The solutions are x = π/4 and x = 3π/4.

Correct Answer: A — π/4, 3π/4

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Q. Determine the values of x that satisfy sin^2(x) - sin(x) = 0.

A. 0, π
B. 0, π/2, π
C. 0, π/2, 3π/2
D. 0, π/2, π, 3π/2

Solution

The solutions are x = 0, π/2, π, 3π/2.

Correct Answer: D — 0, π/2, π, 3π/2

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Q. Determine the values of x that satisfy the equation sin(2x) = 0.

A. x = nπ/2
B. x = nπ
C. x = nπ/4
D. x = nπ/3

Solution

The solutions are x = nπ/2, where n is any integer.

Correct Answer: A — x = nπ/2

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Q. Determine the values of x that satisfy the equation sin^2(x) - sin(x) = 0.

A. 0, π
B. 0, π/2, π
C. 0, π/2, 3π/2
D. 0, π/2, π, 3π/2

Solution

Factoring gives sin(x)(sin(x) - 1) = 0, so x = 0, π/2, π, 3π/2.

Correct Answer: D — 0, π/2, π, 3π/2

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Q. Determine the x-intercept of the line 4x - 2y + 8 = 0.

A. -2
B. 2
C. 4
D. 0

Solution

Setting y = 0 in the equation gives 4x + 8 = 0, thus x = -2.

Correct Answer: B — 2

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Showing 301 to 330 of 2847 (95 Pages)

Mathematics Syllabus (JEE Main) MCQ & Objective Questions

The Mathematics Syllabus for JEE Main is crucial for students aiming to excel in competitive exams. Understanding this syllabus not only helps in grasping key concepts but also enhances your ability to tackle objective questions effectively. Practicing MCQs and important questions from this syllabus is essential for solid exam preparation, ensuring you are well-equipped to score better in your exams.

What You Will Practise Here

Sets, Relations, and Functions
Complex Numbers and Quadratic Equations
Permutations and Combinations
Binomial Theorem
Sequences and Series
Limits and Derivatives
Statistics and Probability

Exam Relevance

The Mathematics Syllabus (JEE Main) is not only relevant for JEE but also appears in CBSE and State Board examinations. Students can expect a variety of question patterns, including direct MCQs, numerical problems, and conceptual questions. Mastery of this syllabus will prepare you for similar topics in NEET and other competitive exams, making it vital for your overall academic success.

Common Mistakes Students Make

Misinterpreting the questions, especially in word problems.
Overlooking the importance of units and dimensions in problems.
Confusing formulas related to sequences and series.
Neglecting to practice derivations, leading to errors in calculus.
Failing to apply the correct methods for solving probability questions.

FAQs

Question: What are the key topics in the Mathematics Syllabus for JEE Main?
Answer: Key topics include Sets, Complex Numbers, Permutations, Binomial Theorem, and Calculus.

Question: How can I improve my performance in Mathematics MCQs?
Answer: Regular practice of MCQs and understanding the underlying concepts are essential for improvement.

Now is the time to take charge of your exam preparation! Dive into solving practice MCQs and test your understanding of the Mathematics Syllabus (JEE Main). Your success is just a question away!

Mathematics Syllabus (JEE Main)

Mathematics Syllabus (JEE Main) MCQ & Objective Questions

What You Will Practise Here

Exam Relevance

Common Mistakes Students Make

FAQs

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