Quantitative Aptitude (SSC)

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Q. A pair of shoes is marked at $120. If a 10% discount is followed by a 5% discount, what is the final price?

A. $108
B. $114
C. $115
D. $110

Solution

First discount: 120 - (10/100 * 120) = 120 - 12 = $108. Second discount: 108 - (5/100 * 108) = 108 - 5.4 = $102.6.

Correct Answer: A — $108

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Q. A pair of shoes is marked at $120. If a customer receives a 25% discount followed by an additional 10% discount, what is the final price?

A. $81
B. $90
C. $84
D. $75

Solution

First discount: 120 - (0.25 * 120) = 120 - 30 = 90. Second discount: 90 - (0.10 * 90) = 90 - 9 = $81.

Correct Answer: C — $84

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Q. A pair of shoes is marked at $90. If a 15% discount is applied, what is the selling price?

A. $76.50
B. $75
C. $80
D. $70

Solution

Selling Price = Marked Price - (Discount % of Marked Price) = 90 - (15/100 * 90) = 90 - 13.5 = $76.50.

Correct Answer: A — $76.50

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Q. A pair of shoes is marked at $90. If a 30% discount is applied, what is the selling price?

A. $63
B. $70
C. $72
D. $75

Solution

Selling Price = Marked Price - (Discount % * Marked Price) = 90 - (0.30 * 90) = 90 - 27 = $63.

Correct Answer: A — $63

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Q. A pair of shoes is marked at $90. If a discount of 30% is applied, what is the selling price?

A. $63
B. $70
C. $60
D. $75

Solution

Selling Price = Marked Price - (Discount % of Marked Price) = 90 - (30/100 * 90) = 90 - 27 = $63.

Correct Answer: A — $63

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Q. A person buys a shirt for $40 and sells it for $50. What is the profit percentage?

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

Solution

Profit = Selling Price - Cost Price = $50 - $40 = $10. Profit Percentage = (Profit/Cost Price) × 100 = (10/40) × 100 = 25%.

Correct Answer: B — 25%

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Q. A person can complete a task in 15 days. How much of the task can he complete in 5 days?

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

Solution

Work done in 5 days = 5/15 = 1/3 of the task.

Correct Answer: A — 1/3

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Q. A person drives 120 km at a speed of 60 km/h. How long does the journey take?

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

Solution

Time = Distance / Speed = 120 km / 60 km/h = 2 hours.

Correct Answer: B — 2 hours

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Q. A person has 3 apples and gives away 1. How many apples does he have left?

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

Solution

Apples left = Initial apples - Apples given away = 3 - 1 = 2.

Correct Answer: B — 2

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Q. A person has 3 red balls, 2 blue balls, and 5 green balls. What fraction of the balls are red?

A. 1/5
B. 3/10
C. 3/5
D. 1/3

Solution

Total balls = 3 + 2 + 5 = 10. Fraction of red balls = 3/10.

Correct Answer: B — 3/10

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Q. A person is 40 meters away from a building and sees the top of the building at an angle of elevation of 30 degrees. What is the height of the building?

A. 20√3 meters
B. 30 meters
C. 40 meters
D. 10√3 meters

Solution

Using tan(30°) = height / distance, we have height = distance * tan(30°) = 40 * (1/√3) = 40/√3 = 20√3 meters.

Correct Answer: A — 20√3 meters

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Q. A person is looking at the top of a 10-meter tall building from a distance of 20 meters. What is the angle of elevation?

A. 26.57 degrees
B. 30 degrees
C. 45 degrees
D. 60 degrees

Solution

Using the tangent function, tan(angle) = 10 / 20. Therefore, angle = arctan(0.5) = 26.57 degrees.

Correct Answer: A — 26.57 degrees

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Q. A person is standing 20 meters away from a flagpole. If the angle of elevation to the top of the flagpole is 30 degrees, what is the height of the flagpole?

A. 10√3 meters
B. 20 meters
C. 15 meters
D. 5√3 meters

Solution

Using the tangent function, tan(30) = height / 20. Therefore, height = 20 * tan(30) = 20 * (1/√3) = 10√3 meters.

Correct Answer: A — 10√3 meters

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Q. A person is standing 25 meters away from a building and measures the angle of elevation to the top of the building as 36.87 degrees. What is the height of the building?

A. 15 meters
B. 20 meters
C. 10 meters
D. 25 meters

Solution

Let h be the height of the building. tan(36.87°) = h/25. Therefore, h = 25 * tan(36.87°) = 25 * 0.75 = 18.75 meters.

Correct Answer: A — 15 meters

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Q. A person is standing 25 meters away from a building and sees the top of the building at an angle of elevation of 30 degrees. What is the height of the building?

A. 25/√3 meters
B. 15 meters
C. 20 meters
D. 10 meters

Solution

Using tan(30) = height/25, height = 25 * (1/√3) = 25/√3 meters.

Correct Answer: A — 25/√3 meters

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Q. A person is standing 25 meters away from a building and sees the top of the building at an angle of elevation of 60 degrees. What is the height of the building?

A. 25√3 meters
B. 15 meters
C. 20 meters
D. 30 meters

Solution

Using tan(60°) = height / distance, we have height = distance * tan(60°) = 25 * √3 = 25√3 meters.

Correct Answer: A — 25√3 meters

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Q. A person is standing 25 meters away from a building. If the angle of elevation to the top of the building is 36.87 degrees, what is the height of the building?

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

Solution

Using the tangent function, tan(36.87) = height / 25. Therefore, height = 25 * tan(36.87) = 25 * 0.75 = 18.75 meters.

Correct Answer: A — 15 meters

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Q. A person is standing 25 meters away from a cliff and sees the top of the cliff at an angle of elevation of 75 degrees. What is the height of the cliff?

A. 25√3 meters
B. 25√2 meters
C. 25√5 meters
D. 25 meters

Solution

Using tan(75°) = height / 25, height = 25 * tan(75°) ≈ 25 * 3.732 = 93.3 meters.

Correct Answer: A — 25√3 meters

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Q. A person is standing 25 meters away from a cliff and sees the top of the cliff at an angle of elevation of 60 degrees. What is the height of the cliff?

A. 25√3 meters
B. 30 meters
C. 20 meters
D. 15 meters

Solution

Using tan(60) = height/25, height = 25 * √3 = 25√3 meters.

Correct Answer: A — 25√3 meters

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Q. A person is standing 30 meters away from a flagpole. If the angle of elevation to the top of the flagpole is 30 degrees, what is the height of the flagpole?

A. 15√3 meters
B. 10 meters
C. 5√3 meters
D. 20 meters

Solution

Using the tangent function, tan(30) = height / 30. Therefore, height = 30 * tan(30) = 30 * (1/√3) = 10√3 meters.

Correct Answer: A — 15√3 meters

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Q. A person is standing 40 meters away from a building and sees the top of the building at an angle of elevation of 45 degrees. What is the height of the building?

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

Solution

Using tan(45) = height/40, height = 40 * tan(45) = 40 meters.

Correct Answer: A — 40 meters

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Q. A person is standing 40 meters away from a building and sees the top of the building at an angle of elevation of 60 degrees. What is the height of the building?

A. 20√3 meters
B. 40 meters
C. 30 meters
D. 50 meters

Solution

Using tan(60°) = height / 40, height = 40 * tan(60°) = 40 * √3 ≈ 69.28 meters.

Correct Answer: A — 20√3 meters

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Q. A person is standing 40 meters away from a statue and measures the angle of elevation to the top of the statue as 53.13 degrees. What is the height of the statue?

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

Solution

Let h be the height of the statue. tan(53.13°) = h/40. Therefore, h = 40 * tan(53.13°) = 40 * 1.6 = 64 meters.

Correct Answer: A — 30 meters

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Q. A person is standing 40 meters away from a tower and sees the top of the tower at an angle of elevation of 60 degrees. What is the height of the tower?

A. 20√3 meters
B. 40 meters
C. 30 meters
D. 10√3 meters

Solution

Using tan(60) = height/40, height = 40 * √3 = 20√3 meters.

Correct Answer: A — 20√3 meters

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Q. A person is standing 50 meters away from a cliff. If the angle of elevation to the top of the cliff is 60 degrees, what is the height of the cliff?

A. 25√3 meters
B. 50 meters
C. 30 meters
D. 40 meters

Solution

Using the tangent function, tan(60) = height / 50. Therefore, height = 50 * tan(60) = 50 * √3 = 50√3 meters.

Correct Answer: A — 25√3 meters

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Q. A person received a salary increase of 15%. If his current salary is $1,200, what will be his new salary?

A. $1,300
B. $1,380
C. $1,400
D. $1,500

Solution

Increase = 15% of 1200 = 0.15 * 1200 = $180. New salary = 1200 + 180 = $1380.

Correct Answer: B — $1,380

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Q. A person standing 30 meters away from a building observes the angle of elevation to the top of the building as 60 degrees. What is the height of the building?

A. 15√3 meters
B. 30 meters
C. 20 meters
D. 25 meters

Solution

Using tan(60) = height/30, height = 30 * √3 = 15√3 meters.

Correct Answer: A — 15√3 meters

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Q. A person standing 30 meters away from a building observes the top of the building at an angle of elevation of 60 degrees. What is the height of the building?

A. 15√3 meters
B. 30 meters
C. 20 meters
D. 10√3 meters

Solution

Using tan(60°) = height / distance, we have height = distance * tan(60°) = 30 * √3 = 15√3 meters.

Correct Answer: A — 15√3 meters

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Q. A person standing 30 meters away from a cliff measures the angle of elevation to the top of the cliff as 60 degrees. How tall is the cliff?

A. 15√3 meters
B. 30 meters
C. 20 meters
D. 10√3 meters

Solution

Let h be the height of the cliff. tan(60°) = h/30. Therefore, h = 30 * tan(60°) = 30 * √3 = 15√3 meters.

Correct Answer: A — 15√3 meters

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Q. A person travels 120 km at a speed of 40 km/h and returns at a speed of 60 km/h. What is the total time taken for the round trip?

A. 4 hours
B. 5 hours
C. 6 hours
D. 7 hours

Solution

Time = Distance / Speed. Time to go = 120 km / 40 km/h = 3 hours. Time to return = 120 km / 60 km/h = 2 hours. Total time = 3 + 2 = 5 hours.

Correct Answer: B — 5 hours

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Quantitative Aptitude (SSC) MCQ & Objective Questions

Quantitative Aptitude is a crucial component of various exams, especially for students preparing for the SSC (Staff Selection Commission) exams. Mastering this subject not only enhances problem-solving skills but also boosts confidence in tackling objective questions. Regular practice with MCQs and practice questions is essential for scoring better and understanding important concepts effectively.

What You Will Practise Here

Number Systems and their properties
Percentage, Ratio, and Proportion calculations
Time, Speed, and Distance problems
Simple and Compound Interest concepts
Algebraic expressions and equations
Data Interpretation and analysis
Mensuration and Geometry basics

Exam Relevance

Quantitative Aptitude is a significant part of the syllabus for CBSE, State Boards, and competitive exams like NEET and JEE. In these exams, students can expect questions that assess their ability to apply mathematical concepts to real-world scenarios. Common question patterns include direct problem-solving, data interpretation, and application of formulas, making it essential for students to be well-prepared.

Common Mistakes Students Make

Misunderstanding the problem statement leading to incorrect assumptions
Neglecting to apply the correct formulas in calculations
Overlooking units of measurement in word problems
Rushing through questions without double-checking calculations

FAQs

Question: What are the best ways to prepare for Quantitative Aptitude in SSC exams?
Answer: Regular practice with MCQs, understanding key concepts, and solving previous years' question papers are effective strategies.

Question: How can I improve my speed in solving Quantitative Aptitude questions?
Answer: Practicing timed quizzes and focusing on shortcut methods can significantly enhance your speed and accuracy.

Start your journey towards mastering Quantitative Aptitude today! Solve practice MCQs and test your understanding to achieve your exam goals. Remember, consistent practice is the key to success!

Quantitative Aptitude (SSC)

Quantitative Aptitude (SSC) MCQ & Objective Questions

What You Will Practise Here

Exam Relevance

Common Mistakes Students Make

FAQs

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