Question

using divisibility te$ts, determine the
to lowing number is divisible by 4 and 11
216832​

Answer 1

Answer:

yes this number is surely divisible by 4 and 11 by divisibility rule

because in the divisibility rule of 4

if last two digits from the right side are coming in the table of 4 so that number will be divisible by 4

and in the divisibility rule of 11 if any number the sum of the numbers in the event position=some sum of odd numbers in the odd positions then the number is divisible by 11

so these were the divisibility rule of 11 and 4 now I hope you can understand

Answer 2

Answer:

YES

Step-by-step explanation:

Divisibility of 4 = Divide the last 2 digits with 4 if the reminder is zero then it is divisible.

Last 2 digits = 32

∴ 32/4 = 8 (The reminder is zero)

So, yes it is divisible by 4.

Divisibility of 11 =  Form the alternating sum of the digits. The result must be divisible by 11.  Then, add the digits in blocks of two from right to left. The result must be divisible by 11.  Then subtract the last digit from the rest. The result must be divisible by 11.

216832​

2 + 8 + 1 = 11

3 + 6 + 2 = 11

11 - 11 = 0

So, yes it is divisible by 11.