Let three positive real numbers a,b,c are in A.P. If abc=4 and the minimum value of b is 2k, then the value of 6k is
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Solution
Let the common difference be d b=a+d⇒a=b−dc=b+d
Now, abc=4 ⇒(b−d)b(b+d)=4⇒b(b2−d2)=4
As b2≥b2−d2, ⇒b×b2≥b×(b2−d2)⇒b3≥4⇒b≥22/3
Therefore, the minimum of b is 22/3.
Hence, 6k=4