Major Competitive Exams

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Major Competitive Exams

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Major Competitive Exams MCQ & Objective Questions

Major Competitive Exams play a crucial role in shaping the academic and professional futures of students in India. These exams not only assess knowledge but also test problem-solving skills and time management. Practicing MCQs and objective questions is essential for scoring better, as they help in familiarizing students with the exam format and identifying important questions that frequently appear in tests.

What You Will Practise Here

Key concepts and theories related to major subjects
Important formulas and their applications
Definitions of critical terms and terminologies
Diagrams and illustrations to enhance understanding
Practice questions that mirror actual exam patterns
Strategies for solving objective questions efficiently
Time management techniques for competitive exams

Exam Relevance

The topics covered under Major Competitive Exams are integral to various examinations such as CBSE, State Boards, NEET, and JEE. Students can expect to encounter a mix of conceptual and application-based questions that require a solid understanding of the subjects. Common question patterns include multiple-choice questions that test both knowledge and analytical skills, making it essential to be well-prepared with practice MCQs.

Common Mistakes Students Make

Rushing through questions without reading them carefully
Overlooking the negative marking scheme in MCQs
Confusing similar concepts or terms
Neglecting to review previous years’ question papers
Failing to manage time effectively during the exam

FAQs

Question: How can I improve my performance in Major Competitive Exams?
Answer: Regular practice of MCQs and understanding key concepts will significantly enhance your performance.

Question: What types of questions should I focus on for these exams?
Answer: Concentrate on important Major Competitive Exams questions that frequently appear in past papers and mock tests.

Question: Are there specific strategies for tackling objective questions?
Answer: Yes, practicing under timed conditions and reviewing mistakes can help develop effective strategies.

Start your journey towards success by solving practice MCQs today! Test your understanding and build confidence for your upcoming exams. Remember, consistent practice is the key to mastering Major Competitive Exams!

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Q. A ladder 15 m long reaches a window 12 m above the ground. What is the angle of elevation of the ladder from the ground? (2019)

A. 30 degrees
B. 45 degrees
C. 60 degrees
D. 75 degrees

Solution

Using sin(θ) = opposite/hypotenuse = 12/15, θ = sin⁻¹(0.8) ≈ 53.13 degrees, which is closest to 60 degrees.

Correct Answer: C — 60 degrees

Q. A ladder 15 meters long reaches a window 12 meters above the ground. What is the angle of elevation of the ladder from the ground?

A. 30 degrees
B. 45 degrees
C. 60 degrees
D. 75 degrees

Solution

Using sin(θ) = opposite/hypotenuse, we have sin(θ) = 12/15. Therefore, θ = sin⁻¹(0.8) ≈ 53.13 degrees.

Correct Answer: C — 60 degrees

Q. A ladder is leaning against a wall. The foot of the ladder is 12 meters away from the wall, and the angle between the ladder and the ground is 60 degrees. What is the height at which the ladder touches the wall?

A. 12√3 m
B. 6 m
C. 12 m
D. 24 m

Solution

Using sin(60°) = height/hypotenuse, we find the height = 12 * tan(60°) = 12√3 m.

Correct Answer: A — 12√3 m

Q. A ladder leans against a wall and is in equilibrium. What forces are acting on the ladder?

A. Weight, normal force from the ground, and friction
B. Only weight and normal force
C. Only weight and friction
D. Only normal force and friction

Solution

The ladder experiences weight, a normal force from the ground, and friction at the base.

Correct Answer: A — Weight, normal force from the ground, and friction

Q. A ladder leans against a wall making a 60-degree angle with the ground. If the foot of the ladder is 4 meters from the wall, how high does the ladder reach on the wall?

A. 2√3 meters
B. 4√3 meters
C. 4 meters
D. 2 meters

Solution

Using sine, height = 4 * tan(60) = 4 * √3 = 4√3 meters.

Correct Answer: B — 4√3 meters

Q. A lake ecosystem has a fish population that doubles every year. If there are 50 fish in the first year, how many will there be after 4 years?

A. 200
B. 400
C. 800
D. 1600

Solution

50 fish * 2^4 = 50 * 16 = 800 fish after 4 years.

Correct Answer: D — 1600

Q. A lake ecosystem has a fish population that doubles every year. If there are initially 50 fish, how many fish will there be after 4 years?

A. 200
B. 400
C. 800
D. 1600

Solution

50 * 2^4 = 50 * 16 = 800 fish.

Correct Answer: D — 1600

Q. A lake has a volume of 1,200,000 cubic meters. If the evaporation rate is 5% per month, how much water evaporates in one month?

A. 50,000 m³
B. 60,000 m³
C. 70,000 m³
D. 80,000 m³

Solution

Water evaporated = 5% of 1,200,000 m³ = 0.05 * 1,200,000 = 60,000 m³.

Correct Answer: B — 60,000 m³

Q. A landfill site can hold 1 million tons of waste. If it receives 20000 tons of waste per week, how many weeks will it take to fill the site?

A. 50 weeks
B. 40 weeks
C. 60 weeks
D. 30 weeks

Solution

1 million tons / 20000 tons/week = 50 weeks

Correct Answer: A — 50 weeks

Q. A landfill site can hold 5000 tons of waste. If it receives 200 tons of waste per day, how many days will it take to fill the site?

A. 20 days
B. 25 days
C. 30 days
D. 35 days

Solution

5000 tons / 200 tons/day = 25 days

Correct Answer: B — 25 days

Q. A laptop is marked at $1000. If it is sold for $800 after a discount, what is the discount percentage?

A. 15%
B. 20%
C. 25%
D. 30%

Solution

Discount = 1000 - 800 = 200. Percentage Discount = (200 / 1000) * 100 = 20%.

Correct Answer: B — 20%

Q. A laptop is marked at $1000. If it is sold for $800, what is the total percentage discount?

A. 20%
B. 25%
C. 30%
D. 15%

Solution

Discount = Marked Price - Selling Price = 1000 - 800 = $200. Percentage Discount = (200/1000) * 100 = 20%.

Correct Answer: B — 25%

Q. A laptop is marked at $1200 and has two successive discounts of 5% and 10%. What is the final selling price?

A. $1020
B. $1080
C. $1100
D. $1150

Solution

First discount = 1200 * 5/100 = 60. New price = 1200 - 60 = 1140. Second discount = 1140 * 10/100 = 114. Final price = 1140 - 114 = $1026.

Correct Answer: B — $1080

Q. A laptop is marked at $1200. If a discount of 30% is applied, what is the selling price?

A. $840
B. $860
C. $880
D. $900

Solution

Selling Price = Marked Price - (Discount % of Marked Price) = 1200 - (30/100 * 1200) = 1200 - 360 = $840.

Correct Answer: A — $840

Q. A laptop is marked at $1200. If it is sold for $960 after a discount, what is the discount percentage?

A. 20%
B. 25%
C. 30%
D. 15%

Solution

Discount = 1200 - 960 = 240. Percentage Discount = (240/1200) * 100 = 20%.

Correct Answer: B — 25%

Q. A laptop is marked at $800. If it is sold for $720, what is the percentage discount given?

A. 10%
B. 12.5%
C. 15%
D. 20%

Solution

Discount = Marked Price - Selling Price = 800 - 720 = $80. Percentage Discount = (80/800) * 100 = 10%.

Correct Answer: B — 12.5%

Q. A laptop is sold for $1200 after a 15% increase in price. What was the original price?

A. $1000
B. $1100
C. $900
D. $950

Solution

Let original price be x. Then, x + 0.15x = 1200. 1.15x = 1200. x = 1200 / 1.15 = $1043.48 (not an option).

Correct Answer: A — $1000

Q. A law is passed to reduce the maximum penalty for corruption by 25%. If the original penalty was $100,000, what is the new maximum penalty?

A. $50,000
B. $60,000
C. $70,000
D. $75,000

Solution

25% of $100,000 is $25,000. Therefore, $100,000 - $25,000 = $75,000.

Correct Answer: B — $60,000

Q. A legal document requires 5 signatures. If each signature takes 2 minutes, how long will it take to get all signatures?

A. 10 minutes
B. 8 minutes
C. 12 minutes
D. 15 minutes

Solution

Total time = 5 signatures * 2 minutes/signature = 10 minutes

Correct Answer: A — 10 minutes

Q. A legal firm has 8 lawyers. If each lawyer can handle 3 cases at a time, what is the maximum number of cases they can handle simultaneously?

A. 24
B. 30
C. 20
D. 18

Solution

Maximum cases = 8 lawyers * 3 cases/lawyer = 24 cases

Correct Answer: A — 24

Q. A length is measured as 100 m with a possible error of 1 m. What is the percentage error?

A. 1%
B. 0.5%
C. 2%
D. 0.1%

Solution

Percentage error = (Absolute error / True value) * 100 = (1 / 100) * 100 = 1%.

Correct Answer: A — 1%

Q. A length is measured as 100.0 m with an uncertainty of ±0.5 m. If this length is used to calculate the area of a square, what is the uncertainty in the area?

A. 1 m²
B. 0.5 m²
C. 2 m²
D. 0.25 m²

Solution

Area = L², so uncertainty in area = 2 * L * (uncertainty in L) = 2 * 100 * 0.5 = 100 m².

Correct Answer: A — 1 m²

Q. A length is measured as 100.0 m with an uncertainty of ±0.5 m. What is the significant figure of the measurement?

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

Solution

The measurement has 4 significant figures (100.0).

Correct Answer: C — 4

Q. A length is measured as 15.0 m with an uncertainty of ±0.2 m. What is the total uncertainty if this length is used in a calculation involving addition with another length of 10.0 m (±0.1 m)?

A. 0.3 m
B. 0.2 m
C. 0.1 m
D. 0.4 m

Solution

Total uncertainty = √((0.2)² + (0.1)²) = √(0.04 + 0.01) = √0.05 ≈ 0.224 m.

Correct Answer: A — 0.3 m

Q. A length is measured as 15.0 m with an uncertainty of ±0.3 m. If this length is used to calculate the area of a rectangle, what is the maximum possible error in the area calculation?

A. 9.0 m²
B. 1.5 m²
C. 0.9 m²
D. 0.45 m²

Solution

Area = length², maximum error = 2 * length * uncertainty = 2 * 15.0 * 0.3 = 9.0 m².

Correct Answer: C — 0.9 m²

Q. A length is measured as 15.0 m with an uncertainty of ±0.3 m. What is the fractional error in this measurement?

A. 0.02
B. 0.03
C. 0.01
D. 0.005

Solution

Fractional error = (absolute error / measured value) = 0.3 / 15.0 = 0.02.

Correct Answer: B — 0.03

Q. A length is measured as 15.0 m with an uncertainty of ±0.3 m. What is the total length if two such lengths are added?

A. 29.4 m
B. 30.0 m
C. 30.6 m
D. 31.0 m

Solution

Total length = 15.0 + 15.0 = 30.0 m; Total uncertainty = ±0.3 + ±0.3 = ±0.6 m.

Correct Answer: C — 30.6 m

Q. A length is measured as 15.0 m with an uncertainty of ±0.5 m. If this length is used to calculate the area of a rectangle, what is the maximum possible error in the area calculation?

A. 15 m²
B. 7.5 m²
C. 3.75 m²
D. 1.5 m²

Solution

Maximum error in area = 2 * length * uncertainty = 2 * 15.0 * 0.5 = 15 m².

Correct Answer: B — 7.5 m²

Q. A length is measured as 15.0 m with an uncertainty of ±0.5 m. If this length is used to calculate the area of a square, what is the maximum possible error in the area?

A. 3.0 m²
B. 1.5 m²
C. 0.5 m²
D. 2.0 m²

Solution

Area = L², maximum error = 2 * L * ΔL = 2 * 15.0 * 0.5 = 15.0 m².

Correct Answer: A — 3.0 m²

Q. A length is measured as 150 cm with an error of 3 cm. What is the lower limit of the measurement?

A. 147 cm
B. 150 cm
C. 153 cm
D. 148 cm

Solution

Lower limit = Measured value - Error = 150 - 3 = 147 cm

Correct Answer: A — 147 cm

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