If `f(x)=min.(1,x^2,x^3),` then

If f(x) min(x,x^(2),x^(3)) , then

Check the differentiability if f(x) = min. {1, x^(2), x^(3)} .

Let f(x)=min{4x+1,x+2,-2x+4}. then the maximum value of f(x) is

Let f(x)=min(x+1,x,1-x). Then f(2) equals

If f(x)={min(x,x^(2)),x<=0 and min(2x,x^(2)-1),x<0 ,then find the number of non-differentiable points of f(x)

Let f:R rarr[0,1) ,where f(x)=min.({x},{-x}) ,then function

" If "f(x)=min{|x^(2)-1|,|x|}," then number of extremums of "f(x)" in "(-0.9,1.1)" is "

If f(x)=min.{-|2x-4|,x^(2)-4}, then maximum value of f(x) is

If f(x)=min.{-|2x-4|,x^(2)-4}, then maximum value of f(x) is