Show that no three consecutive binomial coefficients can be in (i) G.P., (ii) H.P.

Show that no three consecutive binomial coefficients can be in G.P.

Show that no three consecutive binomial coefficients can be in G.P.

Show that no three consecutive binomial coefficients can be in GP .

Statement 1:Three consecutive binomial coefficients are always in A.P. Statement 2: Three consecutive binomial coefficients are not in H.P. or G.P.

Statement 1: Three consecutive binomial coefficients are always in A.P.Statement 2: Three consecutive binomial coefficients are not in H.P.or G.P.

The ratio of three consecutive binomial coefficients in the expansion of (1+x)^n is 2:5:12 . Find n.

Statement 1:Three consecutive binomial coefficients are always in A.P. Statement 2: Three consecutive binomial coefficients are not in H.P.

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

If the square of differences of three numbers be in A.P., then their differences re in (A) A.P. (B) G.P. (C) H.P. (D) none of these