JEE Main Preparation Resources for Competitive Exams

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JEE Main MCQ & Objective Questions

The JEE Main exam is a crucial step for students aspiring to enter prestigious engineering colleges in India. It tests not only knowledge but also the ability to apply concepts effectively. Practicing MCQs and objective questions is essential for scoring better, as it helps in familiarizing students with the exam pattern and enhances their problem-solving skills. Engaging with practice questions allows students to identify important questions and strengthen their exam preparation.

What You Will Practise Here

Fundamental concepts of Physics, Chemistry, and Mathematics
Key formulas and their applications in problem-solving
Important definitions and theories relevant to JEE Main
Diagrams and graphical representations for better understanding
Numerical problems and their step-by-step solutions
Previous years' JEE Main questions for real exam experience
Time management strategies while solving MCQs

Exam Relevance

The topics covered in JEE Main are not only significant for the JEE exam but also appear in various CBSE and State Board examinations. Many concepts are shared with the NEET syllabus, making them relevant across multiple competitive exams. Common question patterns include conceptual applications, numerical problems, and theoretical questions that assess a student's understanding of core subjects.

Common Mistakes Students Make

Misinterpreting the question stem, leading to incorrect answers
Neglecting units in numerical problems, which can change the outcome
Overlooking negative marking and not managing time effectively
Relying too heavily on rote memorization instead of understanding concepts
Failing to review and analyze mistakes from practice tests

FAQs

Question: How can I improve my speed in solving JEE Main MCQ questions?
Answer: Regular practice with timed quizzes and focusing on shortcuts can significantly enhance your speed.

Question: Are the JEE Main objective questions similar to previous years' papers?
Answer: Yes, many questions are based on previous years' patterns, so practicing them can be beneficial.

Question: What is the best way to approach JEE Main practice questions?
Answer: Start with understanding the concepts, then attempt practice questions, and finally review your answers to learn from mistakes.

Now is the time to take charge of your preparation! Dive into solving JEE Main MCQs and practice questions to test your understanding and boost your confidence for the exam.

Chemistry Syllabus (JEE Main) Mathematics Syllabus (JEE Main) Physics Syllabus (JEE Main)

Q. Solve the inequality 6 - 3x ≥ 0. What is the solution?

A. x ≤ 2
B. x ≥ 2
C. x < 2
D. x > 2

Solution

6 - 3x ≥ 0 => -3x ≥ -6 => x ≤ 2.

Correct Answer: B — x ≥ 2

Q. Solve the inequality 6x + 2 < 14.

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

Solution

6x + 2 < 14 => 6x < 12 => x < 2.

Correct Answer: B — x < 3

Q. Solve 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

Q. Solve the inequality 7 - 3x > 1. What is the solution?

A. x < 2
B. x > 2
C. x ≤ 2
D. x ≥ 2

Solution

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

Correct Answer: B — x > 2

Q. Solve the inequality 7 - 3x < 1. What is the solution?

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

Q. Solve the inequality 7 - x < 2.

A. x > 5
B. x < 5
C. x > 7
D. x < 7

Solution

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

Correct Answer: A — x > 5

Q. Solve the inequality 7x + 2 < 3x + 10.

A. x < 2
B. x > 2
C. x ≤ 2
D. x ≥ 2

Solution

7x + 2 < 3x + 10 => 4x < 8 => x < 2.

Correct Answer: B — x > 2

Q. Solve the inequality 7x - 4 < 2x + 11. What is the solution?

A. x < 3
B. x > 3
C. x ≤ 3
D. x ≥ 3

Solution

7x - 4 < 2x + 11 => 5x < 15 => x < 3.

Correct Answer: B — x > 3

Q. Solve the inequality 7x - 5 < 2x + 10. What is the solution?

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

Solution

7x - 5 < 2x + 10 => 5x < 15 => x < 3.

Correct Answer: B — x > 1

Q. Solve the inequality 8 - x > 3.

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

Solution

8 - x > 3 => -x > -5 => x < 5.

Correct Answer: A — x < 5

Q. Solve the inequality x/3 + 2 > 1. What is the solution?

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

Solution

x/3 + 2 > 1 => x/3 > -1 => x > -3.

Correct Answer: C — x > 3

Q. Solve the inequality x/3 - 2 > 1. What is the solution set?

A. x < 9
B. x > 9
C. x < 3
D. x > 3

Solution

x/3 - 2 > 1 => x/3 > 3 => x > 9.

Correct Answer: B — x > 9

Q. Solve the inequality x/3 - 2 ≤ 1. What is the solution?

A. x ≤ 9
B. x ≥ 9
C. x ≤ 3
D. x ≥ 3

Solution

x/3 - 2 ≤ 1 => x/3 ≤ 3 => x ≤ 9.

Correct Answer: A — x ≤ 9

Q. Solve the inequality x/4 - 1 < 0.

A. x < 4
B. x > 4
C. x ≤ 4
D. x ≥ 4

Solution

x/4 - 1 < 0 => x/4 < 1 => x < 4.

Correct Answer: A — x < 4

Q. Solve the inequality: 4x + 1 ≥ 3.

A. x ≥ 0.5
B. x ≤ 0.5
C. x ≥ 1
D. x ≤ 1

Solution

4x + 1 ≥ 3 => 4x ≥ 2 => x ≥ 0.5.

Correct Answer: A — x ≥ 0.5

Q. Solve the inequality: 6 - x ≤ 2.

A. x ≥ 4
B. x ≤ 4
C. x ≥ 6
D. x ≤ 6

Solution

6 - x ≤ 2 => -x ≤ -4 => x ≥ 4.

Correct Answer: B — x ≤ 4

Q. The angle between the lines represented by the equation 2x^2 + 3xy + y^2 = 0 is:

A. 0 degrees
B. 45 degrees
C. 90 degrees
D. 60 degrees

Solution

Using the angle formula, we find the angle between the lines is 60 degrees.

Correct Answer: D — 60 degrees

Q. The angle between the lines represented by the equation 3x^2 - 4xy + 2y^2 = 0 is:

A. 30 degrees
B. 45 degrees
C. 60 degrees
D. 90 degrees

Solution

Using the formula tan(θ) = |(m1 - m2) / (1 + m1*m2)|, we find that the angle is 60 degrees.

Correct Answer: C — 60 degrees

Q. The area of a rectangle with vertices at (1, 1), (1, 4), (5, 1), and (5, 4) is:

A. 12
B. 16
C. 20
D. 24

Solution

Length = 5 - 1 = 4, Width = 4 - 1 = 3. Area = Length * Width = 4 * 3 = 12.

Correct Answer: B — 16

Q. The area of a triangle with vertices at (0,0), (4,0), and (0,3) is:

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

Solution

Area = 0.5 * base * height = 0.5 * 4 * 3 = 6.

Correct Answer: A — 6

Q. The area of triangle ABC is 24 cm², and the base BC = 8 cm. What is the height from A to BC?

A. 6 cm
B. 8 cm
C. 4 cm
D. 3 cm

Solution

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

Correct Answer: A — 6 cm

Q. The area of triangle ABC is 30 square units, and the base BC is 10 units. What is the height from A to BC?

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

Solution

Area = 1/2 * base * height => 30 = 1/2 * 10 * height => height = 6 units.

Correct Answer: B — 6 units

Q. The argument of the complex number z = -1 - i is?

A. -3π/4
B. 3π/4
C. π/4
D. -π/4

Solution

The argument of z = -1 - i is θ = tan^(-1)(-1/-1) = -3π/4.

Correct Answer: A — -3π/4

Q. The Arrhenius equation relates the rate constant to which of the following?

A. Temperature and concentration
B. Temperature and activation energy
C. Concentration and pressure
D. Temperature and volume

Solution

The Arrhenius equation relates the rate constant to temperature and activation energy.

Correct Answer: B — Temperature and activation energy

Q. The average kinetic energy of gas molecules is proportional to which of the following?

A. Pressure
B. Volume
C. Temperature
D. Density

Solution

The average kinetic energy of gas molecules is directly proportional to the absolute temperature of the gas.

Correct Answer: C — Temperature

Q. The average of five numbers is 18. If one number is excluded, the average becomes 16. What is the excluded number?

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

Solution

Total sum = 5 * 18 = 90. New sum = 4 * 16 = 64. Excluded number = 90 - 64 = 26.

Correct Answer: C — 24

Q. The average of five numbers is 18. If one number is removed, the average becomes 16. What was the removed number?

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

Solution

Total of five numbers = 5 * 18 = 90. Total of four numbers = 4 * 16 = 64. Removed number = 90 - 64 = 26.

Correct Answer: C — 24

Q. The concept of an ideal gas is based on which of the following assumptions?

A. Molecules have no volume
B. Molecules do not attract or repel each other
C. Collisions are perfectly elastic
D. All of the above

Solution

The concept of an ideal gas is based on the assumptions that molecules have no volume, do not attract or repel each other, and that collisions are perfectly elastic.

Correct Answer: D — All of the above

Q. The concept of mean free path is associated with which of the following?

A. Distance traveled by a gas molecule between collisions
B. Average speed of gas molecules
C. Pressure of the gas
D. Volume of the gas

Solution

Mean free path is defined as the average distance traveled by a gas molecule between successive collisions.

Correct Answer: A — Distance traveled by a gas molecule between collisions

Q. The condition for the lines represented by ax^2 + 2hxy + by^2 = 0 to be parallel is:

A. h^2 = ab
B. h^2 > ab
C. h^2 < ab
D. a + b = 0

Solution

The lines are parallel if h^2 = ab.

Correct Answer: A — h^2 = ab

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