f(x)=`{cos^(-1){cotx)`,xpi/2 where `[dot]` represents the greatest function and `{dot}` represents the fractional part function. Find the jump of discontinuity.

Draw the graph of y={|x|} , where {.} represents the fractional part function.

Draw the graph of |y|={x} , where {.} represents the fractional part function.

Draw the graph of f(x) = {sin x}, where {*} represents the fractional part function.

Draw the graph of y^(2)= {x} , where {*} represents the fractional part function.

Draw the graph of y= 2^({x}) , where {*} represents the fractional part function.

Draw the graph of f(x) ={2x} , where {*} represents the fractional part function.

[2x]-2[x]=lambda where [.] represents greatest integer function and {.} represents fractional part of a real number then

f(x)={([sinpix] ,, 0lt=x<1),(sgn(x-5/4)x{x-2/3} ,, 1lt=xlt=2):} where [.] denotes the greatest integer function and {.} represents the fractional part function. At what points should the continuity be checked? Hence, find the points of discontinuity.

f(x) = {{:(cos^(-1){cot x} " ," x Where [ ] denotes greatest integer and { } denotes fractional part function, Then value of jump of discontinuity is:

lim_(xrarrc)f(x) does not exist for wher [.] represent greatest integer function {.} represent fractional part function