Lim f(x) does not exist when

lim_(x rarr c)f(x) does not exist when: (A) f(x)=[[x]]-[2x-1],c=3

lim_(xtoc)f(x) does not exist when where [.] and {.} denotes greatest integer and fractional part of x

lim_(xtoc)f(x) does not exist when where [.] and {.} denotes greatest integer and fractional part of x

lim_(xtoc)f(x) does not exist when where [.] and {.} denotes greatest integer and fractional part of x

LIMITS 3. Show that lim 1 does not exist x 0 x 4. Show that lim e 1/ x does not exist x 0 5. Show that lim [xl [xl 6. Let fx) be a function defined by f(x) Show that lim f(x) does not exist. 7. Evaluate lim f(x) (if it exists), where f(x) 8. Show that lim sin does not exist. 9. Find lim [x].

Statement - I: if lim_(x to 0)((sinx)/(x)+f(x)) does not exist, then lim_(x to 0)f(x) does not exist. Statement - II: lim_( x to 0)(sinx)/(x)=1

Statement 1: If lim_(x rarr00)(f(x)+(sin x)/(x)) does not exist then lim_(x rarr00)f(x) does not exists. Statement 2:lim_(x rarr o)(sin x)/(x) exists and has value 1.

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

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

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