If ` f(x): (25-x^4)^(1/4)` for `0< x< sqrt5` then `f(f(1/2))`=

If f(x) is continuous at x=0 , where f(x)=((4-3x)/(4+5x))^(1/x)", for " x!=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=((4-3x)/(4))^(8/x)", for " x!=0 , then f(0)=

If f:R rarr R such that f(x)=(4^(x))/(4^(x)+2) for all x in R then (A)f(x)=f(1-x)(B)f(x)+f(1-x)=0(C)f(x)+f(1-x)=1(D)f(x)+f(x-1)=1

Let f: R -{0} to R be defined by f(x) =x + 1/x , then range of g(x) = (f(x))^(4) - f(x^(4)) - 4(f(x))^(2) , is

If f(x) is continuous at x=0 , where f(x)=(4^(x)-e^(x))/(6^(x)-1) , for x!=0 , then f(0)=

Let f: R - {0} to R be defined by f(x) = x+ 1/x , then 7 + f((x))^(4) -f(x^(4)) - 4(f(x))^(2) is equal to……….

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

Let f(x)=|x^2-3x-4|,-1lt=xlt=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)i s(25)/4 the minimum value of f(x) is 0

Let f(x)=|x^2-3x-4|,-1lt=xlt=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)i s(25)/4 the minimum value of f(x) is 0