The smallest number which when decrease by 28 is exactly divisible by both 528 and 480
Answers
The given numbers are 520 and 468.
Let us find the LCM of 520 and 468
520 = 2 × 2 × 2 × 5 × 13
468 = 2 × 2 × 3 × 3 × 13
LCM of 520 and 468 = 2 × 2 × 2 × 3 × 3 ×5 × 13
LCM of 520 and 468 = 4680
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 is obtained by subtracting 17 from the LCM of 520 and 468.
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 = LCM of 520 and 468 – 17
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 = 4680 – 17
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 = 4663.
The given numbers are 520 and 468. The smallest number which when increased by 17 is exactly divisible by both 520 and 468 is obtained by subtracting 17 from the LCM of 520 and 468.
The given numbers are 520 and 468.
Let us find the LCM of 520 and 468
520 = 2 × 2 × 2 × 5 × 13
468 = 2 × 2 × 3 × 3 × 13
LCM of 520 and 468 = 2 × 2 × 2 × 3 × 3 ×5 × 13
LCM of 520 and 468 = 4680
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 is obtained by subtracting 17 from the LCM of 520 and 468.
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 = LCM of 520 and 468 – 17
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 = 4680 – 17
The smallest number which when increased by 17 is exactly divisible by both 520 and 468 = 4663.
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