Q. The ratio of the speeds of two cars is 3:4. If the faster car travels 120 km in 2 hours, how far does the slower car travel in the same time?
A.
80
B.
90
C.
100
D.
70
Solution
Let the speeds be 3x and 4x. Given 4x = 60 km/h, x = 15. Therefore, slower car's speed = 3x = 3*15 = 45 km/h. Distance = speed * time = 45 * 2 = 90 km.
Q. The ratio of the speeds of two cars is 3:4. If the first car travels 120 km in 2 hours, how far does the second car travel in the same time?
A.
160
B.
180
C.
200
D.
150
Solution
Speed of first car = 120 km / 2 hours = 60 km/h. Let speed of second car = 4x. 3x = 60, x = 20. Therefore, speed of second car = 4*20 = 80 km/h. Distance = speed * time = 80 * 2 = 160 km.
Q. The ratio of the speeds of two cars is 3:4. If the first car travels 120 km, how far does the second car travel?
A.
160
B.
150
C.
180
D.
140
Solution
Let the speed of the first car be 3x and the second car be 4x. The distance traveled is proportional to speed. Therefore, if 3x = 120, then 4x = (4/3)*120 = 160.
Q. Two cars start from the same point and drive in opposite directions. Car A travels at 70 km/h and Car B at 90 km/h. How far apart will they be after 1 hour?
A.
160 km
B.
150 km
C.
140 km
D.
130 km
Solution
Distance apart = (Speed of A + Speed of B) × Time = (70 km/h + 90 km/h) × 1 h = 160 km.
Q. Two cars start from the same point and travel in opposite directions. Car A travels at 70 km/h and Car B at 90 km/h. How far apart will they be after 1 hour?
A.
160 km
B.
150 km
C.
140 km
D.
130 km
Solution
Distance apart = (Speed of A + Speed of B) × Time = (70 km/h + 90 km/h) × 1 h = 160 km.
Q. Two cars start from the same point and travel in opposite directions. Car A travels at 70 km/h and Car B at 50 km/h. How far apart will they be after 2 hours?
Q. Two cars start from the same point and travel in opposite directions. Car A travels at 70 km/h and Car B at 90 km/h. How far apart will they be after 2 hours?
A.
320 km
B.
340 km
C.
360 km
D.
380 km
Solution
Relative speed = 70 km/h + 90 km/h = 160 km/h. Distance apart after 2 hours = 160 km/h × 2 h = 320 km.
Q. Two cyclists start from the same point and ride in opposite directions. Cyclist A rides at 12 km/h and Cyclist B at 16 km/h. How far apart will they be after 1.5 hours?
A.
42 km
B.
48 km
C.
54 km
D.
60 km
Solution
Distance apart = (Speed of A + Speed of B) × Time = (12 km/h + 16 km/h) × 1.5 h = 42 km.
Q. Two cyclists start from the same point and ride in the same direction. Cyclist A rides at 12 km/h and Cyclist B at 15 km/h. How long will it take for Cyclist B to be 9 km ahead of Cyclist A?
A.
3 hours
B.
4 hours
C.
5 hours
D.
6 hours
Solution
Relative speed = 15 km/h - 12 km/h = 3 km/h. Time = Distance / Speed = 9 km / 3 km/h = 3 hours.
Q. Two cyclists start from the same point and ride in the same direction. Cyclist A rides at 12 km/h and Cyclist B at 15 km/h. How far apart will they be after 2 hours?
A.
3 km
B.
4 km
C.
5 km
D.
6 km
Solution
Relative speed = 15 km/h - 12 km/h = 3 km/h. Distance apart = Relative speed × Time = 3 km/h × 2 h = 6 km.
Q. Two cyclists start from the same point and ride in the same direction. Cyclist A rides at 10 km/h and Cyclist B at 15 km/h. How far apart will they be after 2 hours?
A.
5 km
B.
10 km
C.
15 km
D.
20 km
Solution
Relative speed = 15 km/h - 10 km/h = 5 km/h. Distance apart = Relative speed × Time = 5 km/h × 2 h = 10 km.
Quantitative Aptitude is a crucial component of various exams, especially for students preparing for the SSC (Staff Selection Commission) exams. Mastering this subject not only enhances problem-solving skills but also boosts confidence in tackling objective questions. Regular practice with MCQs and practice questions is essential for scoring better and understanding important concepts effectively.
What You Will Practise Here
Number Systems and their properties
Percentage, Ratio, and Proportion calculations
Time, Speed, and Distance problems
Simple and Compound Interest concepts
Algebraic expressions and equations
Data Interpretation and analysis
Mensuration and Geometry basics
Exam Relevance
Quantitative Aptitude is a significant part of the syllabus for CBSE, State Boards, and competitive exams like NEET and JEE. In these exams, students can expect questions that assess their ability to apply mathematical concepts to real-world scenarios. Common question patterns include direct problem-solving, data interpretation, and application of formulas, making it essential for students to be well-prepared.
Common Mistakes Students Make
Misunderstanding the problem statement leading to incorrect assumptions
Neglecting to apply the correct formulas in calculations
Overlooking units of measurement in word problems
Rushing through questions without double-checking calculations
FAQs
Question: What are the best ways to prepare for Quantitative Aptitude in SSC exams? Answer: Regular practice with MCQs, understanding key concepts, and solving previous years' question papers are effective strategies.
Question: How can I improve my speed in solving Quantitative Aptitude questions? Answer: Practicing timed quizzes and focusing on shortcut methods can significantly enhance your speed and accuracy.
Start your journey towards mastering Quantitative Aptitude today! Solve practice MCQs and test your understanding to achieve your exam goals. Remember, consistent practice is the key to success!
Soulshift Feedback×
On a scale of 0–10, how likely are you to recommend
The Soulshift Academy?
