Consider, `f(x)=(3x-2)/(x+1)`. The number of values of `x` in the interval `((1)/(2),4)` which satisfy the equation `f({x})=-1.2` ({} is the fractional part function)

The domain of the function f(x)=(1)/(sqrt({x}))-ln(x-2{x}) is (where {.} denotes the fractional part function)

The function f (x) satisfy the equation f (1-x)+ 2f (x) =3x AA x in R, then f (0)=

if F(x)=x^2-2x+3 then the set of values of x satisfying f(x-1)=f(x+1)

Consider the function f(x)=(cos^(-1)(1-{x}))/(sqrt(2){x}); where {.} denotes the fractional part function,then

In the interval (-1, 1), the function f(x) = x^(2) - x + 4 is :

The interval on which the function f(x)=-2x^(3)-9x^(2)-12x+1 is increasing is :

If f is an even function,then find the realvalues of x satisfying the equation f(x)=f((x+1)/(x+2))

If domain of the function f(x)=sqrt(10x-x^(2)) is A then possible value(s) of x in A satisfying (6{x}^(2)-5{x}+1)=0 is/are (where {-} denotes fractional part function)

consider the function f(x)=(x^(2))/(x^(2)-1) The interval in which f is increasing is

Consider the function f(x)=(x-1)^(2)(x+1)(x-2)^(3). What is the number of points of local minima of the function f(x)? What is the number of points of local maxima of the function f(x)?