Question

On dividing 1837 as well as 594 by a 3-digit
number N, we get the same remainder in each
case. The sum of the digits of N is​

Answer 1

Answer:

Since the remainder is same . Think it for a while , difference between numbers must be divided by N .

In mathematical terms

$1837 = na + r \\ 594 = nb + r$

Where a and b are integers and r is common remainder .

Subtract both

$1837 - 594 = n(a - b) \\ let \: a - b = k \: (integer) \\ 1243 = nk \\ nk = 113 \times 11$

So possible value of n = 113

Sum of digits = 5

Answer 2

Answer:

divided by N OK GDGVHFHB