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 government scheme allocates ₹2,00,000 for 5 different initiatives. If one initiative receives ₹50,000, what fraction of the total budget does it represent?
Q. A group of 4 friends has an average age of 25 years. If one friend leaves and the average age becomes 26 years, what is the age of the friend who left?
A.
24
B.
25
C.
26
D.
27
Solution
Total age of 4 friends = 4 * 25 = 100. New total age for 3 friends = 3 * 26 = 78. Age of friend who left = 100 - 78 = 22.
Q. A group of 8 friends has an average age of 25 years. If one friend leaves and the average age becomes 26 years, what is the age of the friend who left?
A.
24
B.
25
C.
26
D.
27
Solution
Total age of 8 friends = 8 * 25 = 200. New total age for 7 friends = 7 * 26 = 182. Age of friend who left = 200 - 182 = 18.
Q. A group of friends consists of three pairs of siblings: A and B, C and D, E and F. If A is older than B, and C is younger than D, who is the youngest among them? (2023)
A.
A
B.
B
C.
C
D.
D
Solution
B is the youngest as A is older than B and C is younger than D.
Q. A group of friends has an average age of 25 years. If one friend aged 30 leaves the group, what will be the new average age if the group originally had 5 friends?
A.
24
B.
25
C.
26
D.
27
Solution
Total age = 5 * 25 = 125. New total age = 125 - 30 = 95. New average = 95 / 4 = 23.75.
Q. A group of friends has an average age of 25 years. If one friend aged 30 leaves the group, what will be the new average age if the group originally had 5 members?
A.
24
B.
25
C.
26
D.
27
Solution
Total age = 25 * 5 = 125. New total age = 125 - 30 = 95. New average = 95 / 4 = 23.75.
Q. A group of friends has an average age of 25 years. If one friend who is 30 years old leaves the group, what will be the new average age if there were originally 5 friends?
A.
24
B.
25
C.
26
D.
27
Solution
Total age of 5 friends = 5 * 25 = 125. New total age = 125 - 30 = 95. New average = 95 / 4 = 23.75.
Q. A group of friends went out for dinner. If the average cost per person was $20 and there were 5 people, what was the total cost of the dinner? (2023)
A.
$80
B.
$100
C.
$120
D.
$140
Solution
Total cost = Average cost per person × Number of people = 20 × 5 = $100.
Q. A group of students can complete a project in 12 days. If 4 more students join, they can complete it in 8 days. How many students were initially in the group?
A.
6
B.
8
C.
10
D.
12
Solution
Let the initial number of students be x. The work done is inversely proportional to the number of days. Setting up the equation gives x = 10.
Q. A group of students can complete a project in 12 days. If 4 more students join, the project can be completed in 8 days. How many students were initially in the group? (2023)
A.
6
B.
8
C.
10
D.
12
Solution
Let the initial number of students be x. The work done is constant, so x * 12 = (x + 4) * 8. Solving gives x = 8.
Q. A group of students has an average age of 20 years. If a new student aged 22 joins the group, what will be the new average age if there were originally 15 students?
A.
20.5
B.
20.6
C.
20.7
D.
20.8
Solution
The total age of the original group is 20 * 15 = 300. Adding the new student gives 300 + 22 = 322. The new average age is 322 / 16 = 20.125, which rounds to 20.6.
Q. A group of students has an average attitude score of 60. If one student with a score of 90 joins the group, what will be the new average if the group had 5 students initially?
A.
65
B.
66
C.
67
D.
68
Solution
New total score = (60 * 5) + 90 = 390. New average = 390 / 6 = 65.
