" Let "h(x)=min{x,x^(2)}," for every real number of "x." Th "

Let h(x) = Min. (x, x^(2)) , for every real number x, then

Let f(x)=min{x,x^(2)}, for every x in R Then

Let f(x)=min{x,x^2} , for every x in R . Then

Let f(x)=min{x,(x-2)^(2)} for x>=0 then

Let h(x) =f(x)-a(f(x))^(3) for every real number x h(x) increase as f(x) increses for all real values of x if

Let h(x)=f(x)-(f(x))^(2)+(f(x))^(3) for every real number x. Then h is increasing whenever f is increasing h is increasing whenever f is decreasing h is decreasing whenever f is decreasing h is decreasing whenever f is decreasing nothing can be said in general

Let h(x)=f(x)-(f(x))^2+(f(x))^3 for every real number xdot Then (a) h is increasing whenever f is increasing (b) h is increasing whenever f is decreasing (c) h is decreasing whenever f is decreasing (d) nothing can be said in general

Let h(x)=f(x)-(f(x))^2+(f(x))^3 for every real number xdot Then (a) h is increasing whenever f is increasing (b) h is increasing whenever f is decreasing (c) h is decreasing whenever f is decreasing (d) nothing can be said in general

Let h(x)=f(x)-(f(x))^2+(f(x))^3 for every real number xdot Then h is increasing whenever f is increasing h is increasing whenever f is decreasing h is decreasing whenever f is decreasing nothing can be said in general