Minimum value of `(b+c)//a+(c+a)//b+(a+b)//c` (for real positive numbers `a ,b ,c)` is (a)`1` (b)`2` (c)`4` (d)`6`

Let a,b,c be positive numbers,then the minimum value of (a^(4)+b^(4)+c^(2))/(abc)

If a,b,c are three distinct positive real numbers prove that (a+b)^(6)+(b+c)^(6)+(c+a)^(6)>192(abc)^(2)

If a,b,c and d are four positive real numbers such that abcd =1, what is the minimum value of (1+a)(1+b)(1+c)(1+d)

If a, b, c are positive real numbers, then the least value of (a+b+c)((1)/(a)+(1)/(b)+(1)/( c )) , is

If a, b and c are positive real numbers such that a

If a,b,c,d are four positive real numbers such that abcd=1 then least value of (a+4)(b+4)(c+4)(d+4) is

If a+b+c=1 and a, b, c are positive real numbers such that (1-a)(1-b)(1-c)gelambda" abc, then "lambda =

If a,b,c are the sides of a triangle,then the minimum value of (a)/(b+c-a)+(b)/(c+a-b)+(c)/(a+b-c) is equal to (a)3(b)6(c)9(d)12