STATEMENT-1: `3.6,12` are in `G.P.`, then `9.12.18` are in `H.P.` STATEMENT-2`:` If three consecutive terms of a `G.P.` are positive and if middle term is then resultant will be in `H.P.`

Statement 1 : 3,6, 12 are in GP, then 9, 12, 18 are in H. P.Statement 2: If three consecutive terms of a G.P. are positive and if middle term is added in these terms,then resultant will be in H.P(A)STATEMENT-1 is true, STATEMENT-2 is true and STATEMENT-2 is correct explanation forSTATEMENT-1STATEMENT-1 is true, STATEMENT-2 is true and STATEMENT-2 is not correct explanation forSTATEMENT-1STATEMENT-1 is true, STATEMENT-2 is falseSTATEMENT-1 is false, STATEMENT-2 is true(B)(C)(D)

If the product of 3 consecutive terms of G>P. is 27 , the find the middle term.

Find k such that k+9,k-6 and 4 from three consecutive terms of a G.P.

If a,a^(2)+2,a^(3)+10 be three consecutive terms of G.P., then the fourth term is

If a,a^(2)+2,a^(3)+10 be three consecutive terms of G.P., then the fourth term is

Find k such that k+9,\ k-6 and 4 form three consecutive terms of a G.P.

Find the value (s) of x so that 1, 3x-2, 1/9 are three consecutive terms of a G.P.

The sum of the first three consecutive terms of G.P. is 13 and the sum of their Squares is 91. Determine the G.P.

Statement 1 4,8,16, are in GP and 12,16,24 are in HP. Statement 2 If middle term is added in three consecutive terms of a GP, resultant will be in HP.

Statement 1 4,8,16, are in GP and 12,16,24 are in HP. Statement 2 If middle term is added in three consecutive terms of a GP, resultant will be in HP.