Assuming all the terms of A.P [an] are integers with a 1=2019 and for n ∈ I +these always exists positive integer m such that a1+a2+a3+ ldots+an-2+an-1+an=am, then find number of such sequences

Question

Assuming all the terms of A.P [an] are integers with a 1=2019 and for n ∈ I +these always exists positive integer m such that a1+a2+a3+ ldots+an-2+an-1+an=am, then find number of such sequences (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Assuming common difference of [an] is d where d ∈ I ⇒ a1+a2=ak for some positive integer k ⇒ 2 a1+d=a1+(k-1) d ⇒ a1=(k-2) d ⇒ k ≠ 2 and d=(a1/(k-2)) as an=a1+(n-1) d ⇒ an=a1+((n-1/n-2)) a1 ⇒ a1+a2+a3+ ldots+an-2+an-1+an=a1 n+(n(n-1)/2) d ⇒ displaystyle∑i=1n a1=a1+((n-1)(k-2)+(n(n-1)/2)) d As 2019 is product of points (3) and (673) Hence k-2 =-1,1,3,673,2019

Q. Assuming all the terms of A.P [an​] are integers with a1​=2019 and for n∈I+these always exists positive integer m such that a1​+a2​+a3​+…+an−2​+an−1​+an​=am​, then find number of such sequences

Q. Assuming all the terms of A.P $[a_{n}]$ are integers with $a_{1} = 2019$ and for $n \in I^{+}$ these always exists positive integer $m$ such that $a_{1} + a_{2} + a_{3} + \dots + a_{n - 2} + a_{n - 1} + a_{n} = a_{m}$ , then find number of such sequences