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When 13511, 13903 and 14589 are divided by the greatest number ‘n’, the remainder in each case is ‘m’. The value of (n + m) is
183
182
181
179
If a number 'a' and a number 'b' are divisible by a number 'n' then, a+b and a-b is also divisible by n => let the number be n which divides 13511, 13903 and 14589 leaving a reminder m. => the required number then becomes H.C.F of 13511-m, 13903-m and 14589-m. => it could also be the H.C.F of (13903-m)-(13511-m) and (14589-m)-(13903-m) i.e. 392 and 686. => H.C.F of 392 and 686 = 98 the required number n is 98. To find the remainder m , divide any of the given numbers by 98 . Lets take 13511 13511/98 gives 85 as remainder. Hence , m+n = 98+85 = 183 ,i.e., option a) 183.
By: Amit Kumar ProfileResourcesReport error
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