If the sum of first p term of an A.P. is q and the sum of q terms is pthen find the sum of p+q terms
Answers
Let the first term of the given AP be ‘a' and the common difference be ‘d'. Then, the sum of first ‘n' terms of the AP is given by:
S(n)= n/2 {2a+(n-1)d} …….(1)
Here, it is given that:
S(p)=q and S(q)=p
Using (1), we get:-
q=p/2 {2a+(p-1)d}
and p= q/2 {2a+(q-1)d}
i.e. 2a+(p-1)d = 2q/p …..(2)
and 2a+(q-1)d = 2p/q …..(3)
Subtracting (3) from (2), we get:
(p-1-q+1)d= 2q/p - 2p/q
So, d= 2(q^2-p^2)/pq(p-q)
i.e. d= -2(p+q)/pq
Now, substituting the value of ‘d' in eq.n (2), we get:
2a + (p-1){-2(p+q)/pq} = 2q/p
i.e. 2a= 2q/p + 2(p-1)(p+q)/pq
This gives:
a= (p^2+q^2-p-q+pq)/pq
So, we have
S(p+q)= (p+q)/2 { 2(p^2+q^2-p-q+pq)/pq - (p+q-1) 2 (p+q)/pq}
i.e. S(p+q)= (p+q)/pq { p^2+q^2-p-q+pq-p^2-pq-qp-q^2+p+q}
So, S(p+q) = -(p+q). Answer.........................!!
See above attachment for the answer....
