Problem #2: A number is divisible by 11 if the difference of the sum of its digits at odd places and the sum of its digits at even places is either 0 or divisible by 11. For example, for 2547039: (Sum...

write the program usig java

Problem #2: A number is divisible by 11 if the difference of the sum of its digits at odd places and the sum of<br>its digits at even places is either 0 or divisible by 11.<br>For example, for 2547039:<br>(Sum of digits at odd places) - (Sum of digits at even places) = (9 + 0+4 + 2) - (3 +7+ 5) = 0<br>So 2547039 is divisible by 11.<br>But for 13165648:<br>(Sum of digits at odd places) - (Sum of digits at even places) = (8 + 6 + 6 + 3) - (4 + 5 + 1 + 1) = 12<br>12 is not divisible by 11 so 13165648 is also not divisible by 11.<br>Sample run:<br>Give your number: 13165648<br>Total is: 12<br>13165648 is not divisible by 11.<br>

Extracted text: Problem #2: A number is divisible by 11 if the difference of the sum of its digits at odd places and the sum of its digits at even places is either 0 or divisible by 11. For example, for 2547039: (Sum of digits at odd places) - (Sum of digits at even places) = (9 + 0+4 + 2) - (3 +7+ 5) = 0 So 2547039 is divisible by 11. But for 13165648: (Sum of digits at odd places) - (Sum of digits at even places) = (8 + 6 + 6 + 3) - (4 + 5 + 1 + 1) = 12 12 is not divisible by 11 so 13165648 is also not divisible by 11. Sample run: Give your number: 13165648 Total is: 12 13165648 is not divisible by 11.

Jun 08, 2022

SOLUTION.PDF

Problem #2: A number is divisible by 11 if the difference of the sum of its digits at odd places and the sum of its digits at even places is either 0 or divisible by 11. For example, for 2547039: (Sum...

Get Answer To This Question

Related Questions & Answers

Submit New Assignment