" Three non-zero numbers "a,b&c" are in A.P.increasing "a" by "1" or increasing "c" by "2" the numbers are in G.P.,then "b" is equal to "

Three non-zero numbers a,b, and c are in A.P.Increasing a by 1 or increasing c by 2, the numbers are in G.P.Then find b .

Three non-zero numbers a ,b , c are in A.P. Increasing a by 1 or increasing c by 2, the numbers are in G.P. Then find b-a

Three non-zero numbers a ,b ,a n dc are in A.P. Increasing a by 1 or increasing c by 2, the numbers are in G.P. Then find bdot

Three non-zero numbers a ,b ,a n dc are in A.P. Increasing a by 1 or increasing c by 2, the numbers are in G.P. Then find bdot

Three non zero numbers a, b, c are in A.P. Increasing a by 1 or increasing c by 2, the number become in G.P then b equals

Three numbers a, b, c, non-zero, form an arithmetic progression. Increasing a by 1 or increasing c by 2 results in a geometric progression. Then b equals :

Three Non-zero numbers a, b and c will be in G.P. If and only if ____.

"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=