If `ax+b/x >= c` for all positive x, where ` a, b, c > 0,` then-

If ax+(b)/(x)>=c for all positive xa,b>0, then

If ax+(b)/(x)>=c for all positive x where a,b,>0, then ab =(c^(2))/(4) (c) ab>=(c)/(4) (d) none of these

If ax^(2)+(b)/(x)>=c for all positive x where a>0 and b>0, show that 27ab^(2)>=4c^(3).

If ax^(2)+b/x ge c, AA x gt0 , where agt0,bgt0 then

Domain of f(x) = - | x | is - ( a ) All positive real numbers ( b ) ( - ∞ , 0 ) (c ) ( - ∞, ∞ ) ( d ) none of these

If a,b,c are all positive and in HP,then the roots of ax^(2)+2bx+c=0 are

Statement-1: If a, b, c are distinct real numbers, then a((x-b)(x-c))/((a-b)(a-c))+b((x-c)(x-a))/((b-c)(b-a))+c((x-a)(x-b))/((c-a)(c-b))=x for each real x. Statement-2: If a, b, c in R such that ax^(2) + bx + c = 0 for three distinct real values of x, then a = b = c = 0 i.e. ax^(2) + bx + c = 0 for all x in R .

If ax+(b)/(x) ge c, AA a gt 0 and a,b,c are positive constant then