The number of point `f(x) ={{:([ cos pix],0le x lt1),( |2x-3|[x-2],1lt xle2):}` is discontinuous at Is ([.] denotes the greatest intgreal function )

f(x)={(x,0,le,x,le,1),(2x,-,1,1,lt,x,le,2):} then f'(1^(-)) is :

Number of points of discontinuity of f(x)=[sin^(-1)x]-[x] in its domain is equal to (where [.] denotes the greatest integer function) a. 0 b. 1 c. 2 d. 3

Consider two functions f(x)={([x]",",-2le x le -1),(|x|+1",",-1 lt x le 2):} and g(x)={([x]",",-pi le x lt 0),(sinx",",0le x le pi):} where [.] denotes the greatest integer function. The number of integral points in the range of g(f(x)) is

Given f(x) is a periodic function with period 2 and it is defined as " "f(x) = {{:([cos""(pix)/(2)]+1",",,0lt x lt 1), (2-x",",,1 le x lt 2):} Here [*] represents the greatest integer le x . If f(0)=1 , then draw the graph of the function for x in [-2, 2] .

f(x)={(x,0,le,x,le,2),(3x,-,1,2,lt,x,le,3):} then f'(2^(+)) is:

Draw the graph of the function f(x ) = {{:(1+x , -1 le x le 0),( 1-x, 0 lt x le 1):}

If f(x)={x+1/2, x<0 2x+3/4,x >=0 , then [(lim)_(x->0)f(x)]= (where [.] denotes the greatest integer function)

The number of points of discontinuity of f(x)=[2x]^(2)-{2x}^(2) (where [ ] denotes the greatest integer function and { } is fractional part of x) in the interval (-2,2) , is

Draw the graph and find the points of discontinuity f(x) = [2cos x] , x in [0, 2pi] . ([.] represents the greatest integer function.)