if `b_(1),b_(2),b_(3)(b_(1)gt0)` are three successive terms of a G.P. with common ratio `r`, the value of for which the inequality `b_(3)gt4b_(2)-3b_(1)`, holds is given by

If a_(1),a_(2),a_(3)(a_(1)gt0) are three successive terms of a GP with common ratio r, the value of r for which a_(3)gt4a_(2)-3a_(1) holds is given by

If a_(1), a_(2), a_(3)(a_(1)gt 0) are in G.P. with common ratio r, then the value of r, for which the inequality 9a_(1)+5 a_(3)gt 14 a_(2) holds, can not lie in the interval

Let a_(1),a_(2),a_(3) , be three positive numbers which are G.P. with common ratio r. The inequality a_(3) gt a_(2) + 2a_(1) do not holds if r is equal to

If b_(1),b_(2),b_(3) are three consecutive terms of an arithmetic progression with common difference dgt0, then what is the value of d for which b(2)/(3)=b_(2)b_(3)+b_(1)d+2?

If the sides a, b, c, of a triangle ABC form successive terms of G.P.with common ratio r(gt1) then which of the following is correct ?

If a,b,c form a G.P.with common ratio r such that 0