STATEMENT-1 : The sum of reciprocals of first n terms of the series ` 1 + (1)/(3) + (1)/(5) + (1)/(7) + (1)/(9) + … "is" n^(2) ` and
STATEMENT-2 : A sequence is said to be H.P. if the reciprocals of its terms are in A.P.

" A sequence is in H.P (harmonic progression) if the reciprocals of its terms form "

Find the sum of first n terms and the sum of first 5 terms of the geometric series 1+(2)/(3)+

Prove that the sum of n terms of the reciprocals of the terms of the series a, ar, ar^(2),…" is "(1-r^(n))/(a(1-r)r^(n-1))

Find the sum of first n term of the A.P., whose nth term is given by (2n+1).

STATEMENT-1 : If a, b, c are distinct positive reals in G.P. then log_(a) n, log_(b) n, log_(c) n are in H.P. , AA n ne N and STATEMENT-2 : The sum of reciprocals of first n terms of the series 1 + (1)/(3) + (1)/(5) + (1)/(7) + (1)/(9) + ..... "is" n^(2) and

Show that the ratio of the sum of first n terms of a G.P. to the sum of terms from (n+1) to (2n) terms is (1)/(r^(n))

If the sum of first n terms of an A.P. is 3n^(2)-2n , then its 19th term is