A point `P(x,y)` moves such that `[x+y+1]=[x]`. Where [.] denotes greatest intetger function and `x in (0,2)`, then the area represented by all the possible position of P , is

The function,f(x)=[|x|]-|[x]| where [] denotes greatest integer function:

Draw the graph of y=[|x|] , where [.] denotes the greatest integer function.

A point 'P' moves in xy plane in such a way that [|x|]+[|y|]=1 where [.] denotes the greatest integer function.Area of the region representing all possible positions of the point ' is equal to:

If [log_2 (x/[[x]))]>=0 . where [.] denotes the greatest integer function, then :

f(x)=1+[cos x]x, in 0<=x<=(x)/(2) (where [.] denotes greatest integer function)

f(x)=1+[cos x]x in 0<=x<=(pi)/(2) (where [.] denotes greatest integer function)

If [log_(2)((x)/([x]))]>=0, where [.] denote the greatest integer function,then

Area bounded by the curve [|x|]+[|y|]=3 where [.] denotes the greatest integer function