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!
Q. A pie chart shows the distribution of expenses for a household in a month. If the largest segment represents 40% of the total expenses, which category could this segment most likely represent?
A.
Groceries
B.
Rent
C.
Utilities
D.
Entertainment
Solution
Rent is typically the largest expense for a household, often exceeding 30% of total expenses.
Q. A pie chart shows the distribution of expenses for a household in a month. If the largest segment represents food expenses, which of the following statements can be inferred?
A.
Food expenses are the only significant expense.
B.
The household spends more on food than on all other categories combined.
C.
The household has a balanced budget.
D.
Food expenses are a major part of the household's budget.
Solution
The largest segment indicates that food expenses are significant, but it does not imply they are the only significant expense.
Correct Answer:
D
— Food expenses are a major part of the household's budget.
Q. A pie chart shows the distribution of expenses for a household in a month. If the largest segment represents 40% of the total expenses, which category is most likely represented by this segment?
A.
Groceries
B.
Rent
C.
Utilities
D.
Entertainment
Solution
Typically, rent constitutes the largest portion of household expenses, often around 30-40%.
Q. A pie chart shows the distribution of expenses for a household. If the largest segment represents 40% of the total expenses, which of the following could be the total percentage of the other segments combined?
A.
60%
B.
50%
C.
70%
D.
80%
Solution
The largest segment is 40%, so the other segments combined must total 100% - 40% = 60%.
Q. A pie chart shows the distribution of expenses in a household. If the rent is represented by 120 degrees, what fraction of the total expenses does it represent? (2023)
Q. A pie chart shows the distribution of expenses: Rent: 40%, Food: 30%, Utilities: 20%, Entertainment: 10%. What percentage is spent on Rent and Food combined?
A.
60%
B.
70%
C.
80%
D.
90%
Solution
The combined percentage spent on Rent (40%) and Food (30%) is 40% + 30% = 70%.
Q. A pie chart shows the market share of four companies. If Company A has 30%, Company B has 25%, Company C has 20%, what percentage does Company D have? (2023)
A.
15%
B.
20%
C.
25%
D.
30%
Solution
Total percentage is 100%. Therefore, Company D has 100% - (30% + 25% + 20%) = 25%.
Q. A pie chart shows the percentage of different fruits sold in a store. If 'Apples' account for 35% of the sales, which of the following could be the total sales if 'Apples' sold for $70,000?
A.
$150,000
B.
$200,000
C.
$250,000
D.
$300,000
Solution
If 'Apples' account for 35%, then total sales = $70,000 / 0.35 = $200,000.
Q. A pie chart shows the percentage of different types of transportation used by commuters. If 25% use bicycles and there are 400 commuters, how many use bicycles?
A.
80
B.
90
C.
100
D.
110
Solution
25% of 400 = 0.25 * 400 = 100 commuters use bicycles.
Q. A pie chart shows the percentage of different types of transportation used by commuters. If 25% use bicycles and the total number of commuters is 800, how many use bicycles?
A.
100
B.
150
C.
200
D.
250
Solution
Number of commuters using bicycles = 25% of 800 = 0.25 * 800 = 200.
Q. A pie chart shows the percentage of students enrolled in different courses. If 10% of students are enrolled in Art, which of the following could be a valid percentage for the course with the highest enrollment?
A.
10%
B.
25%
C.
40%
D.
50%
Solution
The course with the highest enrollment must logically exceed 10%, making 50% a valid option.
Q. A pie chart shows the percentage of students enrolled in different courses. If 15% are in Mathematics, 25% in Science, and 10% in Arts, what is the maximum percentage that could be in Humanities?
A.
50%
B.
40%
C.
35%
D.
30%
Solution
The maximum percentage for Humanities can be calculated as 100% - (15% + 25% + 10%) = 50%.
Q. A pie chart shows the percentage of students enrolled in different courses. If 30% of students are in Science, what fraction of students are not in Science?
A.
1/3
B.
2/3
C.
1/2
D.
3/4
Solution
If 30% are in Science, then 70% are not in Science, which is 70/100 = 7/10 or 2/3.
Q. A pie chart shows the percentage of students enrolled in different courses. If 30% of students are enrolled in Science, what fraction of students are not enrolled in Science?
A.
1/3
B.
2/3
C.
1/2
D.
3/10
Solution
If 30% are in Science, then 70% are not, which is 70/100 = 7/10 or 2/3.
Q. A pie chart shows the percentage of students enrolled in different courses. If 40% are in Science, 30% in Arts, and 20% in Commerce, what percentage is enrolled in other courses?
A.
10%
B.
20%
C.
30%
D.
40%
Solution
Total percentage in Science, Arts, and Commerce = 40% + 30% + 20% = 90%. Therefore, other courses = 100% - 90% = 10%.
Q. A pie chart shows the percentage of time spent on different activities in a day. If 25% is spent sleeping and 15% is spent eating, what is the maximum percentage of time that can be spent on leisure activities?
A.
60%
B.
70%
C.
75%
D.
80%
Solution
The maximum percentage for leisure activities is 100% - (25% + 15%) = 60%.
Q. A pie chart shows the percentage of time spent on different activities in a day. If sleeping takes up 33.33% of the day, how many hours does that represent?
Q. A pie chart shows the percentage of time spent on different activities in a week. If 'Exercise' is represented by 15% of the chart, how many hours does this represent in a 168-hour week?
Q. A pie chart shows the percentage of time spent on different subjects by a student. If Mathematics takes up 35% of the time and the total study time is 20 hours, how many hours are spent on Mathematics?
A.
5 hours
B.
6 hours
C.
7 hours
D.
8 hours
Solution
Hours spent on Mathematics = 35% of 20 hours = 0.35 * 20 = 7 hours.
Q. A pie chart shows the percentage of time spent on various activities by a student. If 'Study' takes up 40% of the time and the total time is 50 hours, how many hours are spent studying?
Q. A place is located at 45°N latitude. What is the maximum altitude of the sun at noon during the summer solstice?
A.
45°
B.
23.5°
C.
66.5°
D.
90°
Solution
During the summer solstice, the sun is directly overhead at the Tropic of Cancer (23.5°N). The maximum altitude at 45°N is 90° - (45° - 23.5°) = 66.5°.
