STATEMENT-1 : If a, b, c are distinct p...

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

Statemant-1 is True , Statement-2 is True, Statement -2 is a correct explanation for Statement-1

Statemant-1 is True , Statement-2 is True, Statement -2 is NOT a correct explanation for Statement-1

Statement-1 is True, Stetement-2 is False.

Statement-1 is False, Statement-2 is True

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If a, ,b c, are in G.P., then log_(a) n, log_(b) n, log_(c) n are in

A.P.

G.P.

H.P.

None of these

If a,b,c are in G.P., then log_(a)n,log_(b)n,log_(c)n are in

A.P.

G.P.

H.P.

None

If a.b.c are in GP then log_(a)n. log_(b)n. log_(c) n are in

A.P.

G.P.

H.P.

not

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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

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If a, ,b c, are in G.P., then log_(a) n, log_(b) n, log_(c) n are in

If a,b,c are in G.P., then log_(a)n,log_(b)n,log_(c)n are in

If a.b.c are in GP then log_(a)n. log_(b)n. log_(c) n are in

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AAKASH INSTITUTE-SEQUENCES AND SERIES -Assignment (SECTION - E) Assertion-Reason

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