Let f :[-1,3] \Rightarrow R be defined as f(x)= \{ \table {|x|+[x]}{,},-1\leqx<1; x+[x]{,},1\leqx<2;x+[x]{,},2\leqx\leq3 where [t] denotes the greatest integer less than or equal to t. Then, f is discontinuous at: [8 Apr 2019 Shift 2]

Correct Answer is : only three points

Limits, Continuity and Differentiability Part 1

Section: Mathematics

Question : 34 of 100

Marks: +1, -0

Let f:[−1,3]⇒R be defined as f(x)={

where [t] denotes the greatest integer less than or equal to t. Then, f is discontinuous at:

[8 Apr 2019 Shift 2]

Go to Question:

Prev Question

Next Question