Which of the following functions have finite number of points of discontinuity in R ([•] represents the greatest integer function)?

Question

Which of the following functions have finite number of points of discontinuity in R ([•] represents the greatest integer function)? (A) tan x (B) x [x] (C) (|x|/x) (D) sin [π x]

Tardigrade Admin · Accepted Answer

f (x) = tan x is discontinuous when x=(2n+1) π/2, n ∈ z f (x) = x [x] is discontinuous when x=k, k ∈ z f (x)=sin [n π x] is discontinuous when n π x=k, k ∈ z Thus, all the above functions have infinite number of points of discontinuity But f (x) =(|x|/x) is discontinuous when x = 0 only

Q. Which of the following functions have finite number of points of discontinuity in R ([•] represents the greatest integer function)?

$t an x$

$x [x]$

$\frac{∣ x ∣}{x}$

$s in [π x]$

Q. Which of the following functions have finite number of points of discontinuity in R ([•] represents the greatest integer function)?

tanx

x[x]

x∣x∣​

sin[πx]

f(x)=tanx is discontinuous when x=(2n+1)π/2, n∈z f(x)=x[x] is discontinuous when x=k, k∈z f(x)=sin[nπx] is discontinuous when nπx=k,k∈z Thus, all the above functions have infinite number of points of discontinuity But f(x)=x∣x∣​ is discontinuous when x=0 only

$t an x$

$x [x]$

$\frac{∣ x ∣}{x}$

$s in [π x]$