Let f : [-1, 3] to R be defined as {...

Let `f : [-1, 3] to R ` be defined as
`{{:(|x|+[x]", "-1 le x lt 1),(x+|x|", "1 le x lt 2),(x+[x]", "2 le x le 3","):}`
where, [t] denotes the greatest integer less than or equal to t. Then, f is discontinuous at

Similar Questions

Explore conceptually related problems

If f(x)={{:(,x[x], 0 le x lt 2),(,(x-1)[x], 2 le x lt 3):} where [.] denotes the greatest integer function, then

If f(x)={{:(,x[x], 0 le x lt 2),(,(x-1)[x], 2 le x lt 3):} where [.] denotes the greatest integer function, then (x) is continuous at x=2

If f(x) = {{:(|1-4x^(2)|",",0 le x lt 1),([x^(2)-2x]",",1 le x lt 2):} , where [] denotes the greatest integer function, then

Let f (x)= {{:(x [x] , 0 le x lt 2),( (x-1), 2 le x le 3):} where [x]= greatest integer less than or equal to x, then: The number of integers in the range of y =f (x) is:

The number of points where f(x)={{:([cos pi x],"," 0 le x le 1),(|2x-3|[x-2],","1 lt x le 2):} ([x] is the greatest integer less than or equal to x) is discontinuous is

Let f (x)= {{:(x [x] , 0 le x lt 2),( (x-1), 2 le x le 3):} where [x]= greatest integer less than or equal to x, then: The number of values of x for x in [0,3] where f (x) is dicontnous is:

Let `f : [-1, 3] to R ` be defined as `{{:(|x|+[x]", "-1 le x lt 1),(x+|x|", "1 le x lt 2),(x+[x]", "2 le x le 3","):}` where, [t] denotes the greatest integer less than or equal to t. Then, f is discontinuous at

Similar Questions

Recommended Questions

Let `f : [-1, 3] to R ` be defined as
`{{:(|x|+[x]", "-1 le x lt 1),(x+|x|", "1 le x lt 2),(x+[x]", "2 le x le 3","):}`
where, [t] denotes the greatest integer less than or equal to t. Then, f is discontinuous at