Question

Find the highest power of 63 which can exactly divide 6336?​

Answer 1

Answer:

Ones digit in the power of 3.

3^1=3, 3^2=9,3^3=7,3^4=1 and repeating the same.

Multiple of ones digit of 6336.

6*1=6, 6*2=2,6*3=8,6*4=4,6*6=6 and repeating the same.

Now once digit of 63 power/s and ones digit of multiple of 6336 is never same.

So there is no highest or lowest power that divide 6336 besides 63^0=1.

Step-by-step explanation: