GMAT-Quantitative Aptitude

GMAT-Quantitative Aptitude
101. The sum of the first 100 numbers, 1 to 100 is divisible by
  • 2, 4 and 8
  • 2 and 4
  • 2 only
  • None of these
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102. The sum of the first 100 numbers, 1 to 100 is divisible by
  • 2, 4 and 8
  • 2 and 4
  • 2 only
  • None of these
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103. For what value of 'n' will the remainder of 351n and 352n be the same when divided by 7?
  • 2
  • 3
  • 6
  • 4
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104. A person starts multiplying consecutive positive integers from 20. How many numbers should he multiply before the will have result that will end with 3 zeroes?
  • 11
  • 10
  • 6
  • 5
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105. What is the minimum number of square marbles required to tile a floor of length 5 metres 78 cm and width 3 metres 74 cm?
  • 176
  • 187
  • 54043
  • 748
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106. What number should be subtracted from x3 + 4x2 - 7x + 12 if it is to be perfectly divisible by x + 3?
  • 42
  • 39
  • 13
  • None of these
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107. Let x, y and z be distinct integers. x and y are odd and positive, and z is even and positive. Which one of the following statements cannot be true?
  • (x-z)2y is even
  • (x-z)y2 is odd
  • (x-z)y is odd
  • (x-y)2z is even
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108. Anita had to do a multiplication. Instead of taking 35 as one of the multipliers, she took 53. As a result, the product went up by 540. What is thenew product?
  • 1050
  • 540
  • 1440
  • 1590
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109. Let n be the number of different 5 digit numbers, divisible by 4 with the digits 1, 2, 3, 4, 5 and 6, no digit being repeated in the numbers. What is thevalue of n?
  • 144
  • 168
  • 192
  • None of these
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110. Find the greatest number of five digits, which is exactly divisible by 7, 10, 15, 21 and 28.
  • 99840
  • 99900
  • 99960
  • 99990
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