Understanding problems on ages questions is pivotal for aspirants looking to crack competitive exams. A frequently addressed topic in the quantitative aptitude section, problems on ages questions is a familiar sight in many government exams. At first glance, these aptitude problems on ages might seem daunting. Yet, with a solid grasp of the underlying concepts, cracking aptitude problems on ages becomes much simpler. Interestingly, many candidates have come across problems on ages questions and answers as they prepare, underscoring the theme’s importance.
Problems on ages questions may initially read as complicated brain teasers. However, diving deep, one realizes they’re often straightforward. What’s fascinating is how these problems on ages for bank exams and other competitive tests range from direct questions to equation forms. And, there’s more than just the basic questions. Problems on ages questions and answers can also be integral to sections like data sufficiency or data interpretation. Thus, understanding aptitude problems on ages is absolutely crucial.
If you’ve ever come across problems on ages for bank exams or other competitive tests like SSC, SBI, RBI, or even state government exams, you’d know how often they feature. While problems on ages questions is a broad category, a predominant portion of them leans on the concept of ratio. Get the ratio right, and most of your aptitude problems on ages become easy to tackle.
So, for all those gearing up for exams and delving into problems on ages questions and answers, remember, it’s all about understanding the basics. And once you do, not just problems on ages for bank exams, but for all competitive exams, will be within your grasp.
270+ Problems on Ages Questions
261. The ratio of the present age of A and B is 1:3 and after 16 years the ratio of the ages of A to B becomes 3:5. What is the ratio of the ages of A to B 4 years ago? A और B की वर्तमान आयु का अनुपात 1: 3 है और 16 वर्ष के बाद A से B की आयु का अनुपात 3: 5 हो जाता है। 4 साल पहले A से B की आयु का अनुपात क्या था? A. 2:3 |
262. The average age of A, B and C, 4 years ago was 48 years and the sum of age of A and B after 6 years is 100. Find the present age of C. A, B और C की औसत आयु 4 वर्ष पहले 48 वर्ष थी और 6 वर्ष के बाद A और B की आयु का योग 100 है। C की वर्तमान आयु ज्ञात कीजिए। A. 80 yrs |
263. Ratio of the ages of Amal and Vimal after 6 years is 5:9 and the average ages of Vimal, Saran and Amal is 44 years. If the present age of Saran is double of the age of Amal after 6 years, then find the ratio of the age of Vimal and Saran after 3 years? 6 वर्ष बाद अमल और विमल की आयु का अनुपात 5:9 है और विमल, सारण और अमल की औसत आयु 44 वर्ष है। यदि सारण की वर्तमान आयु 6 वर्ष बाद अमल की आयु की दोगुनी है, तो 3 वर्ष बाद विमल और सारण की आयु का अनुपात ज्ञात कीजिये? A. 17:21 |
264. The ratio of the ages of A to B is 2: 1 and 10 years hence, the ratio of their ages is 5: 3. What is the ratio of the ages of A to B 12 years ago? A से B की आयु का अनुपात 2:1 है और 10 वर्ष बाद, उनकी आयु का अनुपात 5:3 है। 12 वर्ष पहले A से B की आयु का अनुपात क्या है? A. 3: 1 |
265. If four years ago, the age of Punitha is half of that of Santhosh and after 4 years, the age of Punitha is 40% less than that of Santhosh, then what is the ratio of the present age of Santhosh and Punitha? यदि चार वर्ष पहले, पुनीता की आयु संतोष की आधी है और 4 वर्ष बाद, पुनीता की आयु संतोष की तुलना में 40% कम है, फिर संतोष और पुनीता की वर्तमान आयु का अनुपात क्या है? A. 10:7 |
266. Ravi’s present age is three times the age of his son and half of the age of his father. Present age of his son is 14 years. Find Ravi’s father’s age after 5 years? रवि की वर्तमान आयु उसके पुत्र की आयु की तीन गुनी और उसके पिता की आयु की आधी है। उनके पुत्र की वर्तमान आयु 14 वर्ष है। 5 वर्ष बाद रवि के पिता की आयु ज्ञात कीजिये? A. 85 years |
267. 10 years ago, the ratio of the age of Kumar to Mohan is 4:3 and after 4 years, the ratio of the age of Kumar to Mohan is 6:5. The present age of Kavin is 50% more than the present age of Kumar. Find the sum of the present age of Kumar and Kavin? 10 वर्ष पहले, कुमार से मोहन की आयु का अनुपात 4:3 है और 4 वर्ष बाद, कुमार से मोहन की आयु का अनुपात 6:5 है। कविन की वर्तमान आयु कुमार की वर्तमान आयु से 50% अधिक है। कुमार और कविन की वर्तमान आयु का योग ज्ञात कीजिए? A. 95 years |
268. C is 12 years younger than A and 3 years younger than B. Ratio of the present age of A and B is 6:5 respectively, Find the sum of ages of all three persons after 10 years. C, A से 12 वर्ष छोटा है और B से 3 वर्ष छोटा है। A और B की वर्तमान आयु का अनुपात क्रमशः 6:5 है, 10 वर्ष बाद तीनों व्यक्तियों की आयु का योग ज्ञात कीजिए। A. 121 |
269. The ratio of the present ages of Divya to that of Sara is 9: 11. Siva is 2 years older than Sara. Siva’s age after 9 years will be 44 years. What is the present age of Divya’s mother, who is 26 years older than Divya? दिव्या की वर्तमान आयु से सारा की वर्तमान आयु का अनुपात 9:11 है। शिवा सारा से 2 वर्ष बड़ा है। 9 वर्ष बाद शिवा की आयु 44 वर्ष होगी। दिव्या की माँ की वर्तमान आयु क्या है, जो दिव्या से 26 वर्ष बड़ी है? A. 44 years |
270. The present age of Kalai and Prakash is in the ratio of 2 : 3. After 6 years, the age of Kalai and 8 years ago, the age of Prakash is in the ratio of 15 : 14. Find the age of Prakash, 10 years hence. कलाई और प्रकाश की वर्तमान आयु 2:3 के अनुपात में है। 6 वर्ष बाद, कलाई की आयु और 8 वर्ष पूर्व प्रकाश की आयु का अनुपात 15:14 है। 10 वर्ष बाद प्रकाश की आयु ज्ञात कीजिए। A. 38 years |
When we begin our preparation journey for government and bank exams, one of the most integral areas of focus is invariably the quantitative aptitude section. A quintessential component of this section, which often raises eyebrows, is the problems on ages questions. As we’ve navigated through the intricate maze of these questions, it’s evident that their importance cannot be understated.
A novice might initially feel intimidated when confronted with aptitude problems on ages. It’s understandable; the wording of the problems can make them seem like intricate puzzles. However, with the right preparation strategy and understanding of the underlying concepts, these problems can become second nature.
There’s a misconception that problems on ages questions are overly complex, designed to trip candidates up. Yet, this couldn’t be further from the truth. Just like any other aptitude question, the key lies in understanding the basics. With a solid foundation, even the most seemingly complex aptitude problems on ages become solvable.
The versatility of problems on ages questions is highlighted by their diverse presentation. They can be direct, equation-based, or even form part of more composite questions in data interpretation or data sufficiency segments. This multiplicity underscores the necessity for a comprehensive understanding of the topic.
While it’s true that some candidates might specifically look into problems on ages questions and answers as a preparation strategy, it’s equally crucial to grasp the logic and method behind the solutions. Merely memorizing answers will not provide the adaptability required to tackle new or unexpected problems in the exam.
As many aspirants would attest, encountering problems on ages for bank exams like SBI, RBI, and others is a common occurrence. This prevalence extends beyond bank exams to a plethora of competitive examinations including SSC, RRB, LIC, and various state government exams. The sheer frequency with which these questions appear solidifies their standing as a must-know topic for any serious candidate. Simply put, if one aims to score well in the quantitative section, proficiency in problems on ages questions is non-negotiable.
A deeper dive into these questions reveals an interesting observation: a significant portion of problems on ages questions hinges on the concept of ratios. This interrelation between age problems and ratios offers a strategic advantage. By honing one’s skills in ratios, a candidate indirectly strengthens their ability to tackle aptitude problems on ages. Thus, a two-pronged approach – understanding the intricacies of age problems and mastering the concept of ratios – can be a game-changer in exam preparation.
For those specifically targeting banking sectors, it’s imperative to note the emphasis on problems on ages for bank exams. Given the competitive nature of these exams and the sheer number of aspirants, every mark counts. A strong grip on problems on ages questions and answers can provide that slight edge, making the difference between success and missed opportunities.
In conclusion, the journey of mastering problems on ages questions is akin to building a jigsaw puzzle. Each piece, whether it’s understanding the basics, practicing diverse problems, mastering ratios, or exploring a vast array of problems on ages questions and answers, contributes to the bigger picture. As aspirants, our goal is not just to solve the problems but to understand them, to see the patterns and logic beneath the surface.
By doing so, not only do we conquer aptitude problems on ages, but we also build a robust foundation for all quantitative challenges that lie ahead. Whether you’re gearing up for a bank exam or any other competitive test, remember: mastery over age problems is a formidable weapon in your quantitative arsenal. Embrace it, hone it, and let it pave your way to success.