If `a,b,c` be three positive numbers such that `abc^(2)` has the greatest value `(1)/(64)`, then

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 such that a + b + c = 1 , then prove that a/(b + c)+b/(c+a) + c/(a+b) >= 3/2

If a,b, and c are positive integers such that a+b+c le8 , the number of possible values of the ordered triplet (a,b,c) is

The value 64^(1/2) is :

If a,b and c are three consecutive positive integers such that 1/(a!)+1/(b!)=lambda/(c!) then find the value of root under lambda .

Statement 1 If a,b,c are three positive numbers in GP, then ((a+b+c)/(3))((3abc)/(ab+bc+ca))=(abc)^((2)/(3)) . Statement 2 (AM)(HM)=(GM)^(2) is true for positive numbers.

If a, b, c are three natural numbers in AP such that a + b + c=21 and if possible number of ordered triplet (a, b, c) is lambda , then the value of (lambda -5) is

If 2x^(3)+ax^(2)+bx+4=0 (a and b are positive real numbers) has three real roots. The minimum value of b^(3) is

If a, b and c are three vectors such that [a b c]=1, then find the value of [a+b b+c c+a]+[ atimesb btimesc ctimesa ]

If a,b are positive number and product of ab= 2500.The minimum value of a+b is