Let f(x)={x[1x]+x[x]if x≠00if x=0 where [⋅] denotes the greatest integer function, then which of the following is true?
f(x) has a removable discontinuity at x=1
f(x) has a non- removable discontinuity at x=2.
f(x) is discontinuous at all positive integers.
f(x)={x[1x]+x[x]if x≠00if x=0
RHLf(1+)=lima→1+(x[1x]+x[x])=limx→1(0)+x(1)
LHL=limx→1−(x[1x]+x[x])=limx→1−(1)+x(0)=1
f(1)=1[11]+1⋅1=2.
Removable Discounting at x=1
RHL=limx→2+x[1x]+x[x]=2(0)+2.2=4
LHL=limx→2−[1x]+x[x]=2(0)+2.1=2
LHL ≠ RHL. Limit does not exist.
Non removable at x=2