Find the Smallest Number Which Leaves Remainder 7 When Divided by 35, 56 and 91

Video Explanation

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Question: What is the smallest number that, when divided by 35, 56 and 91, leaves remainders of 7 in each case?

If a number leaves remainder 7 when divided by 35, 56 and 91, then the number minus 7 is exactly divisible by all three numbers.

Required number − 7 is divisible by 35, 56 and 91

Prime factorisation:

35 = 5 × 7

56 = 2³ × 7

91 = 7 × 13

LCM = 2³ × 5 × 7 × 13

LCM = 3640

Required number = LCM + 7

Required number = 3640 + 7

Required number = 3647

∴ The smallest number that leaves remainder 7 when divided by 35, 56 and 91 is 3647.

Thus, by subtracting the common remainder and finding the LCM of the given divisors, we obtain the required smallest number as 3647.

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