If `ab^(2) c^(3) , a^(2) b^(3)c^(4) , a^(3) b^(4) , c^(5)` are in A.P ( a,b,c `gt 0` ) then the minimum value of a+b+c is

If three positive real numbers a, b, c are in A.P. such that abc = 4, then the minimum value of b is

Suppose a ,b ,c are in A.P and a^(2) , b^(2) , c^(2) are in G.P. If a lt b lt c and a+b+c = (3)/(2) then the value of a is

If x^(2)+3x+5=0 and ax^(2)+bx+c= 0 have common root/roots and a,b, c in N then find the minimum value of a+b+c .

If a, b and c are distinct reals and the determinant |{:(a ^(3) +1, a ^(2) , a ),( b ^(3) +1, b ^(2) , b ),( c ^(3) +1, c ^(2), c):}|= 0, then the product abc is

Suppose that a, b, c are in A.P. Prove that 2b = a + c

If (a)/(b+c),(b)/(c+a),(c)/(a+b) are in AP, then

In a DeltaABC , if tan""(A)/(2)=(5)/(6),tan""(C )/(2)=(2)/(5) , then a)a, c, b are in AP b) a, b, c are in GP c)b, a, c are in AP d)a, b, c are in AP