If `2^(1-x) + 2^(1+x), f(x), 3^x + 3^(-x)` are in AP. Then minimum value of `f(x)` is

Let F:R to R be such that F for all x in R (2^(1+x)+2^(1-x)), F(x) and (3^(x)+3^(-x)) are in A.P., then the minimum value of F(x) is:

f(x)=((x-2)(x-1))/(x-3), forall xgt3 . The minimum value of f(x) is equal to

The minimum value of f(x)=|3-x|+|2+x|+|5-x| is

if f(x)=(x^(3))/(3)-x^(2)+(1)/(5) find maximum and minimum value of f(x)

If f(x)=cos^(-1)(x^((3)/(2))-sqrt(1-x-x^(2)+x^(3))),AA 0 le x le 1 then the minimum value of f(x) is

The maximum and minimum values of f(x)=(x-1)(x-2)(x-3) are

Minimum value of f(x) =x^(3) +(3)/(x)+1 is

Let f(x)=5-[x-2]g(x)=[x+1]+3 If maximum value of f(x) is alpha& minimum value of f(x) is beta then lim_(x rarr(alpha-beta))((x-3)(x^(2)-5x+6))/((x-1)(x^(2)-6x+8)) is

Let f(x)=|x^(2)-3x-4|,-1<=x<=4 Then f(x) is monotonically increasing in [-1,(3)/(2)]f(x) monotonically decreasing in ((3)/(2),4) the maximum value of f(x) is (25)/(4) the minimum value of f(x) is 0