If a,b,c are positive real numbers such that `a+b+c=1`, then find the minimum value of `(1)/(ab)+(1)/(bc)+(1)/(ac)`.

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)

Ifa, b, c are positive real number such that ab^(2)c^(3) = 64 then minimum value of ((1)/(a) + (2)/(b) + (3)/(c)) is equal to

If a and b are positive real numbers such that a+b =c, then the minimum value of ((4 )/(a)+ (1)/(b)) is equal to :

If a, b, c are positive real numbers such that a+b+c=1 , then the greatest value of (1-a)(1-b)(1-c), is

If a,b, care positive real numbers such that ab^(2)c^(3)=64 then minimum value of (1)/(a)+(2)/(b)+(3)/(c) is equal to

" Let "a,b,c" are positive real number such that "a+b+c=10" .Then minimum value of "(1)/(a)+(9)/(b)+(36)/(c)" is "

If a b c are positive real numbers such that a+b+c=1 then the least value of ((1+a)(1+b)(1+c))/((1-a)(1-b)(1-c)) is

If a, b,c are three positive real numbers , then find minimum value of (a^(2)+1)/(b+c)+(b^(2)+1)/(c+a)+(c^(2)+1)/(a+b)

Suppose a,b,and care positive numbers such that a+b+c=1. Then the maximum value of ab+bc+ca is