Q. In a class of 60 students, the ratio of boys to girls is 3:2. If the number of boys is increased by 10, what will be the new ratio of boys to girls? (2023)
A.
4:3
B.
5:2
C.
3:2
D.
2:3
Solution
Initially, there are 36 boys and 24 girls. After increasing the boys by 10, there will be 46 boys and 24 girls, giving a new ratio of 46:24, which simplifies to 4:3.
Q. In a class of 60 students, the ratio of boys to girls is 3:2. If the number of boys is increased by 10 and the number of girls is decreased by 5, what will be the new ratio of boys to girls? (2023)
A.
2:3
B.
3:2
C.
5:3
D.
4:3
Solution
Initially, there are 36 boys and 24 girls. After the changes, there will be 46 boys and 19 girls. The new ratio is 46:19, which simplifies to approximately 4:3.
Q. In a class of 60 students, the ratio of boys to girls is 3:2. If the number of boys is increased by 5, what will be the new ratio of boys to girls? (2023)
A.
4:3
B.
5:2
C.
3:2
D.
2:3
Solution
Initially, there are 36 boys and 24 girls. After increasing boys by 5, there will be 41 boys and 24 girls, giving a new ratio of 41:24, which simplifies to approximately 4:3.
Q. In a class of six students, A is taller than B but shorter than C. D is shorter than E but taller than A. F is the tallest. Who is the second tallest? (2023)
A.
A
B.
B
C.
C
D.
D
Solution
The order of height is F > C > A > D > E > B. Therefore, C is the second tallest.
Q. In a class of six students, A is taller than B but shorter than C. D is shorter than E but taller than A. F is the tallest. Who is the shortest? (2023)
A.
A
B.
B
C.
D
D.
E
Solution
From the information, we can arrange them as C > A > D > E > B > F. Therefore, B is the shortest.
Q. In a class of six students, A is taller than B but shorter than C. D is shorter than A but taller than E. F is the shortest. Who is the tallest? (2023)
A.
A
B.
B
C.
C
D.
D
Solution
The order of height is C > A > D > E > F > B. Therefore, C is the tallest.
Q. In a class of students, if X is ranked 5th from the top and Y is ranked 10th from the bottom, what is the total number of students in the class? (2023)
A.
14
B.
15
C.
16
D.
17
Solution
If X is 5th from the top and Y is 10th from the bottom, then the total number of students is 5 + 10 - 1 = 14.
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!
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