`bb"Statement I"` The range of `log(1/(1+x^(2))) " is " (-infty,infty)`.
`bb"Statement II" " when " 0 lt x le 1, log x in (-infty,0].`

bb"Statement I" The range of f(x)=sin(pi/5+x)-sin(pi/5-x)-sin((2pi)/5+x)+sin((2pi)/5-x) is [-1,1]. bb"Statement II " cos""pi/5-cos""(2pi)/5=1/2

Statement - 1 : If x gt 1 then log_(10)x lt log_(3)x lt log_(e )x lt log_(2)x . Statement - 2 : If 0 lt x lt 1 , then log_(x)a gt log_(x)b implies a lt b .

f is a function defined on the interval [-1,1] such that f(sin2x)=sinx+cosx. bb"Statement I" If x in [-pi/4,pi/4] , then f(tan^(2)x)=secx bb "Statement II" f(x)=sqrt(1+x), forall x in [-1,1]

Statement-1: 0 lt x lt y rArr "log"_(a) x gt "log"_(a) y, where a gt 1 Statement-2: "When" a gt 1, "log"_(a) x is an increasing function.

Statement-1 : If x^("log"_(x) (3-x)^(2)) = 25, then x =-2 Statement-2: a^("log"_(a) x) = x,"if" a gt 0, x gt 0 " and " a ne 1

Show that the set of all x for which log(1+x) le x is equal to [0, infty]

Statement -1: The sum of the series (1)/(1!)+(2)/(2!)+(3)/(3!)+(4)/(4!)+..to infty is e Statement 2: The sum of the seies (1)/(1!)x+(2)/(2!)x^(2)+(3)/(3!)x^(3)+(4)/(4!)x^(4)..to infty is x e^(x)

The maximum value of |x log x| for 0 lt x le 1 is

The domain of the function f(x)=max{sin x, cos x} is (-infty, infty) . The range of f(x) is