Dear Readers,
Mahendras has started special quizzes for IBPS PO & Clerk Exam so that you can practice more and more to crack the examination. This IBPS PO & Clerk 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 & Clerk Exam Exam.
Q-(1-) What will come in place of question mark (?) in the question given below?
निम्नलिखित प्रश्न में प्रश्नचिन्ह (?) के स्थान पर क्या आयेगा?
(1) ![](data:image/png;base64,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)
(1) 32
(2) 30
(3) 24
(4) 36
(5) 40
(2) 548.44 – 244.18 + 23.14 – 15.2 = ?
(1) 330.8
(2) 312.2
(3) 305.6
(4) 318.4
(5) 322
(3) ![](data:image/png;base64,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)
(1) 11
(2) ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACEAAAApCAYAAAC7t0ACAAAE2UlEQVRYCc2XOUtsTRCGjwuGGgsG/gdD9Q+ooKgoKgZGgmAqiKlG/gExEwVRAyMRwUAMzAxcIhFXxH3f1748xX0P5YzO3HuPH3wNM93TVV311ltVfc5EIeF4fX0Nj4+PZuXp6Slef2f24+MjTRSl7fzDxvv7e9opnD0/P6ftf7XxIyBg4uHhIdzf3wcAvby8hOvra/MHmK+i92ASg8CxBulg7O3thd7e3lBfX2+gvmJKZ5gTg8DIzc2NMcF6Z2cnVFVVhSiKQk1NTaBm/nMQUC+6ccjg99jYWGhpaTEQb29vtv/d148wcXd3F9snJUQ+NzcXmpqarD7+CAR5pbAYzBzyFGaSiwXpq11nZ2dDc3OzsQJbfuiM9iMtULq8vIx1b29vbZ1NDmB0lAoOwczo6Gioq6v71KbYVNegpzMRAu8oRvF7kU0ufe4EnIuRhYWF0NjYaEXrOwh9gKOvNFlN8EMbohNloc4kpzN0VoCurq7C+Ph4aG1t1ZalBV1Fj0AlEPmi8gJFlE3ub0Uf8czMTGhoaAjHx8dB94cQEZzSzZ4xQS2cnJyYjjckB9nkHIQNRXZ6ehqGh4dDdXW1/Nrs0+4ZNxDn5+emdHR0FDo7O+1DBBrZ5BcXF1INGxsboaKiwi6rwsLCUFpaGhYXF00OSAXLhgKO1C4olJWVxTedrP6pHH0x57vF14CPXqxxzpjgkIpramrK+psi0sgkl2NYZAg0+3wEQjWA/OzszHTlM607Jicn7boVVWijrANfyb2uIlT+AUFhMqcWuSERE3SCDk1MTFhryRiK2eQUogZFLDa0xyx7YgGm1YHGBCg9iLa2tvjdAAOZ5Djko/PeMa2ITPeNnHrm0I/TIQVqor293UAoBczfybXPDO1cVIzDw0ObJdeDjU2CYqhO4u6w3RACOQeELphUalPlnCMy3h/y8vJCUVGRrYuLi21mv6CgIOTm5sbOObO9vS2XIVK02hkZGbHuUDv9jZxukP7+/r6ZVNS+buRLD0x7iiqvRD80NBRqa2vjSibXmeSi21e+XwuUHKse/H6kPucmq6ysjCksKSkxyrLJZRwwfKSvfd03u7u7tgUzSrHYtsLUAVUxv/31mk3uoxIYnKUCwqkcyyazMYHAt5iQ0tsYyiTHKXo6g1G/Rn5wcBD79DKlJmZC0eBQreNRZ5IrACjHcHl5eZzW1dXVGAAL6sXbZc8KEyN8QO0HqCX7Tg7tANTZgYEBA4Kd6elpAzM/P2+BqVOQqVZYx0zwgyhwhnNdOuxrfCcHAEB4iK2trcX1RI3xsjs4OGgmSC32/cWFwEDIiEcKEKUgk9xHlEoz5/v7+0N3d3dcpGIX5zr7iQkEFJkKxuCnfGWS634ANIBw2NHREZaXl80KTCDTQM5IAyGFv5nFgJiEAZ6W3IhdXV1mSqwqejb1aEgMQtH4O0bR9vX1hc3NTQPh7x0Y8WwnBoEHpYG13k15Bq2vr3+6M2BDbBmy31+JQXgAW1tbZpYO4X8HLEE5v3kZpp4YMEFadDYxCIxCv/K7tLRkdwOPbj3WefteWVmx9jQUKV+JQfia4J94fn5+yMnJiW9M1j09PbFbaoe7gqE6SQyCHCvP6hIVpjynXnwCLnliEBiSUYFhz7einAEOHbWrzv0ICDn51/l/AeIXMwQFgfJ4OacAAAAASUVORK5CYII=)
(3) ![](data:image/png;base64,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)
(4) 12
(5) 10
(4) ![](data:image/png;base64,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)
(1) 6450
(2) 6825
(3) 6675
(4) 6375
(5) 6750
(5) 114816 ÷ 65% of 3840 =?
(1) 46
(2) 48
(3) 50
(4) 52
(5) 56
Q-(6-10) What value will come in place of question mark (?) in the number series given below?
निम्नलिखित संख्या-श्रृंखला में प्रश्नचिन्ह (?) के स्थान पर क्या मान आयेगा?
(6) 222 245 ? 360 452 567
(1) 271
(2) 281
(3) 291
(4) 287
(5) 297
(7) 15 22 36 57 85 120 ?
(1) 164
(2) 162
(3) 165
(4) 154
(5) 152
(8) 4.5 3.75 6.25 ? 30.25 81.125
(1) 14.825
(2) 14.875
(3) 13.875
(4) 12.875
(5) 12.825
(9) 23 23 115 1035 13455 ?
(1) 227835
(2) 228745
(3) 227745
(4) 228735
(5) 226735
(10) 1 16 81 256 625 ?
(1) 889
(2) 1096
(3) 1176
(4) 1246
(5) 1296
Answer Key-
Q-(1) Sol-(4)
? = (144/ 4)
? = 36
Q-(2) Sol-(2)
571.58 - 259.38 = ?
? = 312.2
Q-(3) Sol-(1)
(8+2) + ![](data:image/png;base64,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)
10 + 1
11
Q-(4) Sol-(5)
? = 11.25 × 600 = 6750
Q-(5) Sol-(1)
? = 46
Q-(6) Sol-(3)
+(1 × 23), +(2 × 23), +(3 × 23), +(4 × 23), +(5 × 23)
Q-(7) Sol-(2)
+7, +14, +21, +28, +35, +42
Q-(8) Sol-(4)
× 0.5 + 1.5, × 1 + 2.5, × 1.5 + 3.5, × 2 + 4.5, × 2.5 + 5.5
Q-(9) Sol-(4)
× 1, ×5, × 9, × 13, × 17
Q-(10) Sol-(3)
14, 24, 34, 44, 54, 64
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MAHENDRA GURU