General Aptitude

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General Aptitude

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General Aptitude MCQ & Objective Questions

General Aptitude is a crucial component of many school and competitive exams in India. Mastering this subject not only enhances your problem-solving skills but also boosts your confidence during exams. Practicing MCQs and objective questions helps you familiarize yourself with the exam format, identify important questions, and improve your overall performance in exam preparation.

What You Will Practise Here

Numerical Ability: Basic arithmetic, percentages, and ratios.
Logical Reasoning: Patterns, sequences, and analogies.
Data Interpretation: Reading charts, graphs, and tables.
Verbal Ability: Synonyms, antonyms, and comprehension.
Quantitative Aptitude: Algebra, geometry, and measurements.
Time and Work: Problems related to efficiency and time management.
Profit and Loss: Understanding financial transactions and calculations.

Exam Relevance

General Aptitude is a significant part of the curriculum for CBSE, State Boards, NEET, JEE, and various other competitive exams. Questions often focus on logical reasoning and quantitative skills, with patterns that include multiple-choice questions, fill-in-the-blanks, and problem-solving scenarios. Familiarity with these formats will help you tackle the exams with ease.

Common Mistakes Students Make

Misinterpreting questions due to lack of careful reading.
Overlooking units in numerical problems, leading to incorrect answers.
Rushing through calculations, resulting in simple arithmetic errors.
Neglecting to practice time management during mock tests.
Confusing similar concepts in logical reasoning sections.

FAQs

Question: What are General Aptitude MCQ questions?
Answer: General Aptitude MCQ questions are multiple-choice questions designed to test your reasoning, numerical, and analytical skills relevant to various exams.

Question: How can I improve my performance in General Aptitude objective questions?
Answer: Regular practice of important General Aptitude questions for exams, along with reviewing your mistakes, can significantly enhance your performance.

Don't wait any longer! Start solving practice MCQs today to test your understanding and boost your confidence for your upcoming exams. Every question you tackle brings you one step closer to success!

Arithmetic Aptitude Data Interpretation

Q. A jar contains 5 red, 3 green, and 2 blue marbles. What is the probability of picking a green marble?

A. 1/5
B. 1/4
C. 3/10
D. 1/2

Solution

The total number of marbles is 5 + 3 + 2 = 10. The probability of picking a green marble is 3/10.

Correct Answer: C — 3/10

Q. A job can be done by 4 men in 20 days. How many days will it take for 2 men to complete the same job?

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

Solution

Total work = 4 men * 20 days = 80 man-days. 2 men will take 80/2 = 40 days.

Correct Answer: B — 40 days

Q. A jogger runs at a speed of 8 km/h. How far can he run in 45 minutes?

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

Solution

Distance = Speed * Time = 8 km/h * (45/60) hours = 6 km.

Correct Answer: A — 5 km

Q. A jogger runs at a speed of 8 km/h. How far will he run in 45 minutes?

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

Solution

Distance = Speed * Time = 8 km/h * (45/60) hours = 6 km.

Correct Answer: A — 6 km

Q. A jogs at a speed of 8 km/h and B jogs at 10 km/h. If they start together and A runs for 30 minutes, how far ahead will A be?

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

Solution

Distance A runs = 8 km/h * 0.5 h = 4 km. Distance B runs = 10 km/h * 0.5 h = 5 km. A is 1 km behind.

Correct Answer: A — 2 km

Q. A jogs at a speed of 8 km/h and B jogs at 10 km/h. If they start together, how far apart will they be after 30 minutes?

A. 2 km
B. 1 km
C. 1.5 km
D. 3 km

Solution

Distance covered by A in 0.5 hours = 8 km/h * 0.5 = 4 km. Distance covered by B = 10 km/h * 0.5 = 5 km. Difference = 5 km - 4 km = 1 km.

Correct Answer: A — 2 km

Q. A kite is flying at a height of 100 meters. If the angle of elevation from a point on the ground to the kite is 60 degrees, how far is the point from the base of the kite?

A. 50 meters
B. 100 meters
C. 150 meters
D. 200 meters

Solution

Distance = height / tan(angle) = 100 / √3 = 100√3/3 meters.

Correct Answer: A — 50 meters

Q. A kite is flying at a height of 100 meters. If the angle of elevation from a point on the ground to the kite is 60 degrees, how far is the point from the base of the kite's height?

A. 50 meters
B. 100 meters
C. 150 meters
D. 200 meters

Solution

Distance = height / tan(angle) = 100 / √3 ≈ 50 meters.

Correct Answer: A — 50 meters

Q. A kite is flying at a height of 30 meters. If the angle of elevation from a point on the ground to the kite is 60 degrees, how far is the point from the base of the kite?

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

Solution

Distance = height / tan(angle) = 30 / √3 = 10√3 meters.

Correct Answer: C — 10√3 meters

Q. A kite is flying at a height of 30 meters. If the angle of elevation from a point on the ground to the kite is 60 degrees, how far is the point from the base of the kite's height?

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

Solution

Distance = height / tan(angle) = 30 / (√3/3) = 30√3/3 = 10√3 meters.

Correct Answer: A — 15√3 meters

Q. A kite is flying at a height of 40 meters. If the string makes an angle of 30° with the horizontal, how long is the string?

A. 40 meters
B. 60 meters
C. 80 meters
D. 100 meters

Solution

Using sin(30°) = height/string length, string length = 40/sin(30°) = 40/0.5 = 80 meters.

Correct Answer: B — 60 meters

Q. A kite is flying at a height of 40 meters. If the string makes an angle of 60 degrees with the ground, how long is the string?

A. 20√3 meters
B. 40 meters
C. 80 meters
D. 60 meters

Solution

Length of string = height / sin(60) = 40 / (√3/2) = 80/√3 = 20√3 meters.

Correct Answer: A — 20√3 meters

Q. A kite is flying at a height of 45 meters. If the string makes an angle of 30° with the horizontal, how long is the string?

A. 45√3 meters
B. 90 meters
C. 45 meters
D. 60 meters

Solution

Using sin(30°) = height/string length, string length = height/sin(30°) = 45/(1/2) = 90 meters.

Correct Answer: A — 45√3 meters

Q. A kite is flying at a height of 50 meters. If the angle of elevation from a point on the ground to the kite is 60 degrees, how far is the point from the base of the kite's height?

A. 25 meters
B. 30 meters
C. 35 meters
D. 40 meters

Solution

Distance = height / tan(angle) = 50 / √3 = 50 / 1.732 = 28.87 meters.

Correct Answer: A — 25 meters

Q. A kite is flying at a height of 50 meters. If the angle of elevation from a point on the ground is 30 degrees, how far is the point from the base of the kite?

A. 50√3
B. 25√3
C. 75√3
D. 100√3

Solution

distance = height / tan(30) = 50 / (1/√3) = 50√3 meters

Correct Answer: A — 50√3

Q. A kite is flying at a height of 50 meters. If the angle of elevation from a point on the ground to the kite is 60 degrees, how far is the point from the base of the kite?

A. 25√3 meters
B. 50 meters
C. 50√3 meters
D. 75 meters

Solution

Distance = height / tan(angle) = 50 / (√3/3) = 50 * 3/√3 = 25√3 meters.

Correct Answer: A — 25√3 meters

Q. A kite is flying at a height of 60 meters. If the angle of elevation from a point on the ground to the kite is 30 degrees, how far is the point from the base of the kite?

A. 60√3 meters
B. 30√3 meters
C. 20√3 meters
D. 10√3 meters

Solution

Distance = height / tan(angle) = 60 / (1/√3) = 60√3 meters.

Correct Answer: A — 60√3 meters

Q. A kite is flying at a height of 60 meters. If the angle of elevation from a point on the ground to the kite is 45 degrees, how far is the point from the base of the kite?

A. 30 meters
B. 40 meters
C. 60 meters
D. 70 meters

Solution

Distance = height / tan(angle) = 60 / 1 = 60 meters.

Correct Answer: C — 60 meters

Q. A ladder 10 meters long leans against a wall. If the foot of the ladder is 6 meters away from the wall, how high does the ladder reach on the wall?

A. 8 meters
B. 9 meters
C. 10 meters
D. 7 meters

Solution

Using Pythagoras: height = √(10^2 - 6^2) = √(100 - 36) = √64 = 8 meters.

Correct Answer: A — 8 meters

Q. A ladder 10 meters long reaches a window 8 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, sin(θ) = 8/10, θ = sin⁻¹(0.8) ≈ 53.13 degrees.

Correct Answer: C — 60 degrees

Q. A ladder 10 meters long reaches a window 8 meters high. How far is the base of the ladder from the wall?

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

Solution

Using Pythagoras: base = √(10^2 - 8^2) = √(100 - 64) = √36 = 6 meters

Correct Answer: A — 6 meters

Q. A ladder 10 meters long reaches a window 8 meters high. 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, sin(θ) = 8/10, θ = arcsin(0.8) = 53.13 degrees.

Correct Answer: C — 60 degrees

Q. A ladder 20 meters long reaches a window 15 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, sin(θ) = 15/20, θ = sin⁻¹(0.75) ≈ 48.6 degrees.

Correct Answer: C — 60 degrees

Q. A ladder 20 meters long reaches a window 16 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, sin(θ) = 16/20, θ = sin⁻¹(0.8) ≈ 60 degrees.

Correct Answer: C — 60 degrees

Q. A ladder 25 meters long leans against a wall. If the foot of the ladder is 7 meters away from the wall, how high does the ladder reach on the wall?

A. 24 meters
B. 20 meters
C. 21 meters
D. 22 meters

Solution

Using Pythagoras: height = √(25^2 - 7^2) = √(625 - 49) = √576 = 24 meters

Correct Answer: B — 20 meters

Q. A ladder is leaning against a wall. If the foot of the ladder is 6 feet away from the wall and the top of the ladder reaches a height of 8 feet, what is the length of the ladder?

A. 10 feet
B. 12 feet
C. 14 feet
D. 16 feet

Solution

Using the Pythagorean theorem, length of ladder = √(6^2 + 8^2) = √(36 + 64) = √100 = 10 feet.

Correct Answer: A — 10 feet

Q. A ladder is leaning against a wall. If the foot of the ladder is 6 meters away from the wall and the top of the ladder reaches a height of 8 meters, what is the length of the ladder?

A. 10 meters
B. 12 meters
C. 14 meters
D. 16 meters

Solution

Using the Pythagorean theorem, length of ladder = √(6^2 + 8^2) = √(36 + 64) = √100 = 10 meters.

Correct Answer: A — 10 meters

Q. A ladder is leaning against a wall. If the foot of the ladder is 6 meters away from the wall and the top of the ladder reaches a height of 8 meters on the wall, what is the length of the ladder?

A. 10 meters
B. 12 meters
C. 14 meters
D. 16 meters

Solution

Using the Pythagorean theorem, length of ladder = √(6^2 + 8^2) = √(36 + 64) = √100 = 10 meters.

Correct Answer: A — 10 meters

Q. A ladder leans against a wall making an angle of 60 degrees with the ground. If the foot of the ladder is 5 meters away from the wall, what is the height of the ladder on the wall?

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

Solution

Height = 5 * √3 = 5√3 meters.

Correct Answer: A — 5√3 meters

Q. A laptop is sold for $800 after a discount of 20%. What was the marked price?

A. $1000
B. $960
C. $800
D. $850

Solution

Let Marked Price = x. Selling Price = x - 20% of x = 0.8x. 0.8x = 800. x = 800/0.8 = 1000.

Correct Answer: A — $1000

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