The number 1, 5 and 25 can be three terms (not necessarily consecutive) of

The numbers 1, 4, 16 can be three terms (not necessarily consecutive) of no A.P. only on G.P. infinite number o A.P.’s infinite number of G.P.’s

The numbers 1, 4, 16 can be three terms (not necessarily consecutive) of a.no. A.P b.only one G.P c.infinite number of A.P's d.infinite nuber of G.P' s

The numbers 1, 4, 16 can be three terms (not necessarily consecutive) of

The numbers 1,4,16 can be three terms ( not necessarily consecutive ) of :

The numbers 1,4,16 can be three terms (not necessarily consecutive) of no A.P.only on G.P. infinite number o A.P.s infinite number of G.P.

Prove that the numbers sqrt2,sqrt3,sqrt5 cannot be three terms (not necessarily consecutive) of an AP.

Let x,y,z be three positive prime numbers. The progression in which sqrt( x) , sqrt( y ) , sqrt( z) can be three terms ( not necessarily consecutive ) is :

Prove that no GP can have three of its terms (not necessarily consecutive) as three consecutive nonzero integers.

There are infinite geometric progressions of for which 27,8 and 12 are three of its terms (not necessarily consecutive). Statement 2: Given terms are integers.

If x,y,z be three positive prime numbers. The progression in which sqrt(x),sqrt(y),sqrt(z) can be three terms (not necessarily consecutive) is