Let `f:RRtoRR` be defined by `f(x)=-x^3+x,g:[-1,1] to RRand h:[-1,1] to RR` is defined by g(x) = min(fx),0), h(x) = max(f(x),0)
`f:RR to RR` will be___

Let f:RRtoRR be defined by f(x)=-x^3+x,g:[-1,1] to RRand h:[-1,1] to RR is defined by g(x) = min(fx),0), h(x) = max(f(x),0) Range of g(x) will be____

Let f:RRtoRR be defined by f(x)=-x^3+x,g:[-1,1] to RRand h:[-1,1] to RR is defined by g(x) = min(fx),0), h(x) = max(f(x),0) Which one will be both the odd and even function ?

Let f:RRtoRR be defined by f(x)=-x^3+x,g:[-1,1] to RRand h:[-1,1] to RR is defined by g(x) = min(fx),0), h(x) = max(f(x),0) Number of roots of the g(x)=-(1)/(2) is____

If the function f: R to R is defined by f(x) =(x^(2)+1)^(35) for all x in RR then f is

Let t the function f:RR to RR be defined by, f(x)=a^x(a gt0 ,a ne1). Find range of f

Let f:RR to RR be defined as f(x)=(x^2-x+4)/(x^2+x+4). Then the range of the function f(x) is____

Let, a in RR and let f:RR to RR be given by f(x)=x^(5)-5x-a . Then

If the function f:RR to RR is given by f(x) = x for all x inRR and the function g:RR-{0} to RR is given by g(x)=(1/x), "for all "x in RR-{0}, then find the function f+g and f-g.

Let RR be the set of real numbers and f : RR to RR be defined by f(x)=sin x, then the range of f(x) is-