If three positive real numbers a, b, c are in A.P. such that abc =4, then the minimum value of b is
22/3
Since a, b, c are in A.P., therfore, b−a=d and c−b=d, where d is the common difference of the A.P.
∴a=b−d and c=b+d
Now,
abc=4
⇒(b−d)b(b+d)=4
⇒(b(b2−d2))=4
But,
b(b2−d2)<b×b2
⇒b(b2−d2)<b3
⇒4<b3
⇒b3>4
⇒b>223
Hence, the minimun value of b is 223