Area bounded by f(x)=max.(sinx,cosx),`0<=x<=(pi)/(2)` and the co-ordinate axis is equal to

Sometimes functions are defined like f(x)=max{sinx,cosx} , then f(x) is splitted like f(x)={{:(cosx, x in (0,(pi)/(4)]),(sinx, x in ((pi)/(4),(pi)/(2)]):} etc. If f(x)=max{(1)/(2),sinx} , then f(x)=(1)/(2) is defined when x in

Sometimes functions are defined like f(x)=max{sinx,cosx} , then f(x) is splitted like f(x)={{:(cosx, x in (0,(pi)/(4)]),(sinx, x in ((pi)/(4),(pi)/(2)]):} etc. If f(x)=max{x^(2),2^(x)} ,then if x in (0,1) , f(x)=

Sometimes functions are defined like f(x)=max{sinx,cosx} , then f(x) is splitted like f(x)={{:(cosx, x in (0,(pi)/(4)]),(sinx, x in ((pi)/(4),(pi)/(2)]):} etc. If f(x)=min{tanx, cotx} then f(x)=1 when x=

Area bounded by the curve f(x)=cos x which is bounded by the lines x=0 and x=pi is

The area bounded by y=max(x^(2), x^(4)), y=1 and the y - axis from x=0" to "x=1 is

Find critical points of f(x) =max (sinx cosx) AA , X in (0, 2pi) .

The number of critical points of f(x)=max{sinx,cosx},AAx in(-2pi,2pi), is

Consider the function f(x)=max{|sinx|,|cosx|},AA"x"in[0,3pi]. if lamda is the number of points at which f(x) is non - differentiable , then value of (lamda^3)/5 is

The function f defined by f(x)=(4sinx-2x-xcosx)/(2+cosx),0lexle2pi is :

Examine the continuity of f, where f is defined by : f(x)={{:(sinx+cosx", if "xne0),(1", if "x=0):} .