Solution:

Let, the 1st term of two AP’s be a₁ and a_{2 ;}

The c.d of the AP’s be ” d ” .

For 1st A.P

a_n = a+(n−1)d

Therefore,

a₁₀₀ = a₁+(100−1)d

= a₁ + 99d

a₁₀₀₀ = a₁+(1000−1)d

a₁₀₀₀ = a₁+999d

For 2nd A.P ,

a_n = a+(n−1)d

Therefore,

a₁₀₀ = a₂ + (100−1)d

= a₂ + 99d

a₁₀₀₀ = a₂ + (1000−1)d

= a₂ + 999d

It is given that the difference between 100^th term of the two APs = 100

i,e (a₁ + 99d) − (a₂ + 99d) = 100

a₁−a₂ = 100         ………………………….. (i)

Diff. b/w 1000th terms of the two APs

(a₁+999d) − (a₂+999d) = a₁−a₂

From eq. (i),

This diff.  , a₁−a₂ = 100

The difference between 1000th terms of the 2 A.P’s will be 100.