if 896 is exactly divisible by 7, find the value of x
Answers
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- EXPLAINATION
We know the divisibility rule for 11:
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17Sum of the even places =0+6=6
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17Sum of the even places =0+6=6Difference = Sum of the odd places − Sum of the even places
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17Sum of the even places =0+6=6Difference = Sum of the odd places − Sum of the even placesDifference =17−6=11
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17Sum of the even places =0+6=6Difference = Sum of the odd places − Sum of the even placesDifference =17−6=11So, 8036 is divisible by 11.
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17Sum of the even places =0+6=6Difference = Sum of the odd places − Sum of the even placesDifference =17−6=11So, 8036 is divisible by 11.Therefore, 0 is the missing digit.
We know the divisibility rule for 11: If the difference of the sum of its digits at odd places and sum of its digits at even places is either 0 or a number divisible by 11.8096:Sum of the odd places =8+9=17Sum of the even places =0+6=6Difference = Sum of the odd places − Sum of the even placesDifference =17−6=11So, 8036 is divisible by 11.Therefore, 0 is the missing digit.So, option D is correct.
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Step-by-step explanation:
the possible value of x is 7