Solution:

The 1st Three Digit number that is divisible by seven is,

First no. = 105

Second no. = 105+7 = 112

Third no.= 112+7 =119

Therefore, 105, 112, 119, …

All are three digit numbers are divisible by 7 and thus, all these are terms of an Arithmetic Progression having 1st term as 105 and c.d as 7.

The largest possible three-digit number is 999.

When we divide 999 by 7, 5 will be the remainder.

i.e, 999-5 = 994 is the maximum possible three-digit number that is divisible by 7.

Now the series is:

105, 112, 119, …, 994

Let 994 be the nth term of this Arithmetic Progression of this A.P.

a = 105

d = 7

a_n = 994

n = ?

As we know that;

a_n = a+(n−1)d

994 = 105+(n−1)7

889 = (n−1)7

(n−1) = 127

n = 128

i.e 128 three digit numbers are divisible by 7.