Dear Readers,
As SSC GD/CPO/CHSL notification is out and candidates have started their preparation for this exam. Mahendras also has started special quizzes for this examination. This series of quizzes are based on the latest pattern of the SSC GD/CPO/CHSL examination. Regular practice of the questions included in the quizzes will boost your preparations, and it will be very helpful in scoring good marks in the examination.
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)
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)
Question 1. Which number will replace the question mark (?) in the following series?
निम्नलिखित श्रृंखला में प्रश्नचिन्ह (?) के स्थान पर कौन-सी संख्या आएगी?
25, 42, 67, 101, 145, ?
A 200
B 202
C 199
D 201
Question 2 Three friends A, B and C have different amounts of rupees with them. If B takes ₹7 from A, then B will have an equal amount as C has. B and C together have total ₹157. How many rupees does C have?
तीन दोस्तों A, B और C के पास अलग-अलग रूपए हैं। यदि B, A से 7 रूपए लेता है, तो B के पास C के बराबर राशि होगी। B और C को मिलाकर कुल 157 रूपए है। C के पास कितने रुपये हैं?
A 82
B 81
C 80
D 83
Question 3. Two different positions of the same dice are shown below, the six faces of which are numbered 1 to 6. Find the number opposite to the face having 1.
एक ही पासे की दो अलग-अलग स्थितियां दिखाई गई हैं, जिनमें से छह फलकों की संख्या 1 से 6 तक है। फलक 1 के विपरीत संख्या ज्ञात कीजिए।
A 2
B 4
C 3
D 5
Question 4 Select the set in which the numbers are related in the same way as are the numbers of the following set.
उस सेट का चयन करें जिसमें संख्याएँ उसी तरह से संबंधित हैं जैसे कि निम्नलिखित सेट की संख्याएँ हैं।
(4, 41, 5)
A (7, 81, 9)
B (6, 85, 8)
C (2, 21, 4)
D (5, 61, 6)
Question 5 If FINANCIAL is coded as 695153913, then how will LUCRATIVE be coded as?
यदि FINANCIAL को 695153913 के रूप में कोडित किया जाता है, तो LUCRATIVE को किस प्रकार कोडित किया जाएगा?
A 433922945
B 333912955
C 343912945
D 333912945
Question 6 Select the word-pair in which the two words are related in the same way as are the two words in the following word-pairs.
Exercise : Fitness
A Hobby : Internet
B Harmony : War
C Treatment : Recovery
D Education : Institute
उस शब्द-युग्म का चयन करें जिसमें दो शब्द उसी तरह से संबंधित हैं जैसे कि निम्नलिखित शब्द-जोड़े में दो शब्द हैं।
व्यायाम: फिटनेस
A हॉबी : इंटरनेट
B एकता : युद्ध
C उपचार : स्वास्थ्य लाभ
D शिक्षा: संस्थान
Question 7 Select the Venn diagram that best illustrates the relationship between the following classes. Mobile phones, Electronic devices, Laptops
उस वेन आरेख का चयन करें जो निम्नलिखित वर्गों के बीच के सर्वश्रेष्ठ संबंध दर्शाता है।
मोबाइल फोन, इलेक्ट्रॉनिक उपकरण, लैपटॉप
Question 8 Three of the following four letter-clusters are alike in a certain way and one is different. Pick the odd one out.
निम्नलिखित चार अक्षर-समूहों में से तीन एक निश्चित तरीके से एक जैसे हैं और एक अलग है। उस विषम का चयन करें।
A DFHJ
B VXZB
C BDGJ
D JLNP
Question 9 Select the combination of letters that when sequentially placed in the gaps of the given letter series will complete the series.
अक्षरों के संयोजन का चयन करें जो कि दिए गए अक्षर श्रृंखला के अंतराल में क्रमिक रूप से रखे जाने पर श्रृंखला को पूरा करेंगे।
t s m _ _ n q _ _ s m m n _ _ s t _ m m n _ q s
A mnstnqsn
B mmstmqtn
C mnstnqmn
D nmstnqns
Question 10 Which of the following sequence of signs will correctly solve the given equation by replacing the question marks?
निम्नलिखित में से कौन-सा चिह्नों का क्रम प्रश्नचिन्ह को प्रतिस्थापित करके दिए गए समीकरण को संतुलित करेगा?
1105 ? 65 ? 835 ? 25 ? 5 = 727
A ÷,+,−,×
B +,÷,−,×
C +,−,×,÷
D ×,−,+,÷
EXPLANATION:-
1. A
2 : A
3 : A
4 : D
5 : D
6 : C
7 : C
8 : C
9 : A
10 : A
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MAHENDRA GURU