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!
Q. A mixture of two types of nuts costs $12 per kg. If one type costs $10 per kg and the other type costs $16 per kg, what is the ratio of the two types in the mixture?
A.
1:2
B.
2:1
C.
3:1
D.
1:3
Solution
Let the ratio be x:y. Then, (10x + 16y)/(x + y) = 12. Solving gives x:y = 2:1.
Q. A mixture of two types of tea contains 40% of tea A and 60% of tea B. If 20 liters of tea B is added, what will be the new percentage of tea A if the total mixture becomes 100 liters?
A.
30%
B.
35%
C.
40%
D.
45%
Solution
Initial volume of tea A = 0.4 * 80 = 32 liters. Total volume after adding tea B = 100 liters. New percentage of tea A = (32/100) * 100 = 32%.
Q. A mixture of two types of tea costs $5 per kg and $7 per kg. If 10 kg of the first type is mixed with 5 kg of the second type, what is the cost per kg of the mixture?
A.
$5.50
B.
$6.00
C.
$6.50
D.
$7.00
Solution
Total cost = (10 * 5) + (5 * 7) = 50 + 35 = $85. Total weight = 10 + 5 = 15 kg. Cost per kg = 85/15 = $5.67.
Q. A mother is 4 times as old as her daughter. After 8 years, the mother will be twice as old as her daughter. What is the present age of the daughter?
A.
4
B.
8
C.
12
D.
16
Solution
Let the daughter's age be x. Then the mother's age is 4x. In 8 years, 4x + 8 = 2(x + 8). Solving gives x = 8.
Q. A number is increased by 20% and then decreased by 20%. What is the net change in the number?
A.
0%
B.
4%
C.
5%
D.
10%
Solution
Let the original number be 100. After a 20% increase, it becomes 120. After a 20% decrease, it becomes 120 - 24 = 96. The net change is (96 - 100)/100 * 100% = -4%.
Q. A number is increased by 20% and then decreased by 20%. What is the net change?
A.
0%
B.
4%
C.
5%
D.
10%
Solution
Let the number be 100. After a 20% increase, it becomes 120. After a 20% decrease, it becomes 120 - 24 = 96. The net change is (96 - 100)/100 * 100% = -4%.
Q. A person has a total of $5000 in two accounts. If the first account earns 4% interest and the second earns 6%, how much is in the first account if the total interest earned in one year is $240?
A.
$2000
B.
$3000
C.
$2500
D.
$1500
Solution
Let the amount in the first account be x. Then, amount in the second account = 5000 - x. Interest from first account = 0.04x, from second = 0.06(5000 - x). Total interest = 0.04x + 0.06(5000 - x) = 240. Solving gives x = $2500.
