Show that the sequence given by `a_n= 3\ (2^n),\ ` for all `n in N ,` is a G.P. Also find its common ratio.

Show that the sequence given by T_(n)=(2xx3^(n)) for all n in N is a GP. Find its first term and the common ratio.

Show that the sequence t_(n) defined by t_(n)=(2^(2n-1))/(3) for all values of n in N is a GP. Also, find its common ratio.

Show that the sequence t_(n) defined by t_(n)=(2^(2n-1))/(3) for all values of n in N is a GP. Also, find its common ratio.

Show that the sequence t_(n) defined by t_(n)=(2^(2n-1))/(3) for all values of n in N is a GP. Also, find its common ratio.

Show that the sequence t_(n) defined by t_(n)=(2^(2n-1))/(3) for all values of n in N is a GP. Also, find its common ratio.

Show that the sequence t_(n) defined by t_(n)=(2^(2n-1))/(3) for all values of n in N is a GP. Also, find its common ratio.

Show that the sequence defined by a_n=2/(3^n),\ n in N\ is a G.P.

Show that the sequence defined by a_(n)=(2)/(3^(n)),n in N is a G.P.

Show that the sequence defined by a_n=3n^2-5 is not an A.P.

Show that the sequence defined by a_n=2n^2+1 is not an A.P.