Solve `lim_(xto0)["sin"(|x|)/x]`, where `e[.]` denotes greatest integer function.

lim_(xto0)[(-2x)/(tanx)] , where [.] denotes greatest integer function is

Solve (i) lim_(xto1) sin x (ii) lim_(xto0^(+))[(sinx)/x] (iii) lim_(xto0^(-))[(sinx)/x] (where [.] denotes greatest integer function)

The value of lim_(xto0)(sin[x])/([x]) (where [.] denotes the greatest integer function) is

Solve (i) lim_(xto0^(+))[(tanx)/x] (ii) lim_(xto0^(-))[(tanx)/x] (where [.] denotes greatest integer function)

Prove that [lim_(xto0) (sinx)/(x)]=0, where [.] represents the greatest integer function.

lim_(xto1) (xsin(x-[x]))/(x-1) , where [.] denotes the greatest integer function, is equal to

Given lim_(x to 0)(f(x))/(x^(2))=2 , where [.] denotes the greatest integer function, then

If l=lim_(xto1^(+))2^(-2^(1/(1-x))) and m=lim_(xto1^(+))(x sin (x-[x]))/(x-1) (where [.] denotes greatest integer function). Then (l+m) is ………….

Evaluate : [lim_(x to 0) (sin x)/(x)] , where [*] represents the greatest integer function.

lim_(xto0) [(sin(sgn(x)))/((sgn(x)))], where [.] denotes the greatest integer function, is equal to