Three nonzero a,b,c are in GP if `b^2=ac`.

"If the numbers "a,b,c" are in "A.P," then "2b=a+c" .If the numbers "a,b,c" are in G.P,then "b^(2)=ac" If "sin A,cos A,tan A" are in "GP" then "cot^(6)A-cot^(2)A=

three number a,b,c are in GP such that :(i)a+b+c=70 (ii) 4a,5b,4c are in AP if G=max{a,b,c} and L=min{a,b,c} than [(G)/(L)] is equal is :

Three distinct numbers a,b,c from a GP in that order and the numbers a-:b,b-:c,c-:a form an AP in that order.Then the common ratio of the GP is :

Three numbers a, b, c are lies between 2 and 18 such that their sum is 25. 2, a, b, are in A.P, and b, c, 18 are in G.P. Then abc =

Suppose a,b,c are in A.P and a^2,b^2,c^2 are in G.P If a

Three distinct numbers a, b, c form a GP in that order and the numbers a+b, b+c, c+a form an AP in that order. Then the common ratio of the GP is