Dear Readers,
Mahendras has started special quizzes for IBPS PO & RRB Exam so that you can practice more and more to crack the examination. This IBPS PO & RRB Exam special quiz series will mold your preparations in the right direction and the regular practice of these quizzes will be really very helpful in scoring good marks in the Examination. Here we are providing you the important question of reasoning ability for the IBPS PO & RRB Exam.
Q-(1-5) Read the following line graph and answer the given Questions carefully:
दिये गये लाइन ग्राफ को ध्यानपूर्वक पढ़िए और उत्तर दीजिए
(1) The number of employees working in the pharmacy department of Cipla are what percent of the total number of employees working in the company?
सिप्ला के फार्मेसी विभाग में कार्य करने वाले कर्मचारी सिप्ला में कार्य करने वाले कर्मचारियों की कुल संख्या का कितना प्रतिशत है?
(1) 25%
(2) 28%
(3) 30%
(4) 33%
(5) 35%
(2) What is the ratio of the total number of employees working in the Packaging department of both the companies together and the total number of employees working in the Quality Control Department of both the companies together
दोनों कम्पनियों के पैकेजिंग विभाग में और क्वालिटी नियंत्रण विभाग में कार्य करने वाले कार्य करने वाले कुल कर्मचारियों का अनुपात क्या है?
(1) 3 : 4
(2) 4 : 3
(3) 2 : 3
(4) 3 : 2
(5) 1 : 2
(3) The number of employees working in the cold store of Ranbaxy is approximately what percent of the number of employees working in the Quality control department of Cipla?
रेनबक्सी के कोल्ड स्टोर में कार्य करने वाले कर्मचारियों की संख्या सिप्ला के क्वालिटी नियंत्रण विभाग में कार्य करने वाले कर्मचारियों का कितना प्रतिशत है?
(1) 129%
(2) 229%
(3) 329%
(4) 139%
(5) 339%
(4) If the number of employees working in the research department of Cipla is increased by 20%, what would be the difference between the number of employees working in the research department of Cipla and the packaging department of Ranbaxy?
यदि सिप्ला के रिसर्च विभाग में कार्य करने वाले कर्मचारियों की संख्या में 20% की वृद्धि की जाए, तो सिप्ला के रिसर्च विभाग में कार्य करने वाले कर्मचारियों और रेनबक्सी के पैकेजिंग विभाग में कार्य करने वाले कर्मचारियों की संख्या में कितना अंतर होगा ।
(1) 4000
(2) 4500
(3) 4750
(4) 5000
(5) 5500
(5) What is the average number of employees working in all the departments of Ranbaxy?
रेनबक्सी के सभी विभागों में कार्य करने वाले कर्मचारियों का औसत ज्ञात कीजिये?
(1) 6000
(2) 6100
(3) 6200
(4) 6300
(5) 6400
Q-(6-10) What will come at the place of question mark (?) in the following question?
निम्न प्रश्न में प्रश्नवाचक चिन्ह (?) के स्थान पर क्या आयेगा?
(6) 24.5% of 740 - ?% of 470 = 87.3
(1) 25
(2) 20
(3) 19.5
(4) 14.75
(5) 18.25
(7) ![](data:image/png;base64,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)
(1) ![](data:image/png;base64,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)
(2) ![](data:image/png;base64,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)
(3) ![](data:image/png;base64,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)
(4) ![](data:image/png;base64,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)
(5) None of these
(8) 164 × 43 – 6070 = ? + 132
(1) 682
(2) 790
(3) 880
(4) 1082
(5) 850
(9) 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)
(1) 2010
(2) 2094
(3) 1278
(4) 2124
(5) 1954
(10) 6666 ÷ 66 ÷ 6.25 + 31.9% of 2650 = ?
(1) 860.59
(2) 861.51
(3) 864.01
(4) 863.61
(5) 836.47
Answer -
Q-(1) Sol-(2)
Required percentage = ![](data:image/png;base64,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)
Q-(2) Sol-(1)
6 : 8 = 3 : 4
Q-(3) Sol-(2)
Required percentage = ![](data:image/png;base64,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)
Q-(4) Sol-(4)
Increased number of employees= ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMkAAABDCAYAAAA27SG7AAAFY0lEQVR4Ae2bgbGkIAyGrWsLsh6rsZkthpsgcQFjEnXnFh7/zdy4EoTkg1+D+KaAfyAAAiqBSbXCCAIgECASTAIQMAhAJAYgmEEAIsEcAAGDAERiAIIZBCASzAEQMAhAJAYgmEEAIsEcAAGDAERiAIIZBCASzAEQMAhAJAYgmEEAIsEcAAGDAERiAIIZBCASzAEQMAiYInkvrzBNU/X/FZa30vJ7Ca/8mnlVKsMEAm0TMESyhjmf7Pz7tQRdI6WwoJG2JwG80wnoIlnXcHgGrHN4qY+RNcxQhU4d1q4I6CIRQllnI9Va5z01g1YEgCjqjsBFkaxhVlOtd1he1foFSuluUsDhksA1kZipVt74RzDQSc4Fv3sjcEkkZqolRL/OU5igEoEMinohcEEkVqp1EjKtUSCSEzgo7oGAXySXUq0s9HUO0EjGAz+7I+AWyZ1UK9CmorrQ744XHB6QgFMkZ6lWWpyzEOqddi7/Gtiqv6LdcuNTenrlXw9I9qI514nmTwhaf5qNurbsLveMSnG9mDaIpb0vy4endsO9ZsxOkbTgbyaCg/hoss77xicPXiGEuH/Ddba2CvvlEDV/Qghaf5qN/LDsl309XlC+UNliKYRi+fDUfnSp2ZKORLIxjAKoRbIu1bdk6Q6/q2A730+pKRrkup0bwyT6E7T+NBs5YNlvOFlfEp/4fMNIxmLSWz48tdcOtX3+Y5HQHawaLOKlrGXkSXmEXNwp46SovhSQysKX/JHa5rKVPv5UfOF6+cdxUtkxZH9JIYh0Wexj2l6ySP3lZflv7jUvy39Ldi7r5PhjkRClamISYOUO7xNJdaeTJkXsN02KYrC+4I/W30yf7dQ3Buoz+aJde/iQrnDcfxL7kITq9MHy0bL7PW2iZgMiIQ5pYhoCoZoukdTtXB60h/5o/X1ZJPni+/gnDWcbuZsoi3Qz+pyEo/lPQn1qb2Lq+51oRCRJKMoThEPyiOTwuloa1JgSSE8S7unsjR7bt6Poj9afJJLcF+3abz1JyPXUZyms9ISzfHhqLxE2fyaKpARXfbDIf1Ny8ygTeXjnzhqlSVss0MkWJ4SUXlRlezsP/dH6a2FNssfJP7b0dH+7pflPa6Wndu62k6Mokv/re5qQ3CkNgPJEEe/cfG39VcB7CUu8+1ZrFDVt+4Y/Wn+ajQKx7BzsdryXbpVtHJlaPjy1l/23fvZjkVQTkmkpQomTQhJRTAHqp162QCb7fh31K6VaX/bnrD/LF8vOnB4ft8l+fJFQvyIXeFk+WvbHvv+/Bn4skiuBbgP1SQU/qVK8E0rpX5V35fUq0xVHUt1zf7gxrT/NRtdbdu7j1jGmS9sNZU+xhIYsH57ahS6bLOpIJE3yg1MDEIBIBhhkhPiMgCKSlK/ueXXZ0SiP2jJqnI1I4EQkWb4tiYQWZfuu8cmiTrOPSBoxd0vgRCRbPPFpcRDJ8fVf+bGgZe+WFRwflMB1kQy2kTTovEDYGYHrIilSLW4pS7ksO1+CIwh0QgAi6WSg4ObvCHxHJGlzKm7QSU+S3P67WNEzCNwicF0kWJPcAo2L+iVwXSTmB3jHt1vyW7J+ocHzsQioIlE/JtxfDWeLdmZHKZdm53o4gkAHBE5Ekm0mxg8HPx8TckzYcWcSOP51Aici+ethIz4Q8BOASPysUHNQAhDJoAOPsP0EIBI/K9QclABEMujAI2w/AYjEzwo1ByUAkQw68AjbTwAi8bNCzUEJQCSDDjzC9hOASPysUHNQAhDJoAOPsP0EIBI/K9QclABEMujAI2w/AYjEzwo1ByUAkQw68AjbTwAi8bNCzUEJQCSDDjzC9hOASPysUHNQAv8Aykc9ajGvK+gAAAAASUVORK5CYII=)
Difference=9000–4000=5000
Q-(5) Sol-(2)
Average employees =
Q-(6) Sol-(2)
Q-(7) Sol-(3)
Q-(8) Sol-(5)
164 × 43 – 6070 = ? + 132
7052 – 6070 = ? + 132
982 = ? + 132
850 = ?
Q-(9) Sol-(2)
Q-(10) Sol-(2)
6666 ÷ 66 ÷ 6.25 + 31.9% of 2650 = ?
101 ÷ 6.25 + 845.35 = ?
16.16 + 845.35 = ?
? = 861.51
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MAHENDRA GURU