Statement-1 : lim(x to 0-) ("sin"[x])/(...

Statement-1 : `lim_(x to 0-) ("sin"[x])/([x]) = "sin" [x] != 0`, Where [x] is the integral part of x.
Statement-2 : `lim_(x to 0+) ("sin"[x])/([x]) != 0`, where [x] the integral part of x.

A

Statement - 1 isTurue, Statement-2 is True, Statement-2 is a correct explanation for statement-1

B

Statement-1 is True, Statement-2 is True, Statement-2 is Not a correct explanation for statement-1

C

Statement-1 is True, Statement-2 is False

D

Statement -1 is False, Statement-2 is True

Text Solution

Verified by Experts

The correct Answer is:

B

Promotional Banner

Promotional Banner

Topper's Solved these Questions

LIMITS AND DERIVATIVES
AAKASH INSTITUTE|Exercise Section - F|3 Videos
LIMITS AND DERIVATIVES
AAKASH INSTITUTE|Exercise Section - G|5 Videos
LIMITS AND DERIVATIVES
AAKASH INSTITUTE|Exercise Section - D|6 Videos
INVERSE TRIGONOMETRIC FUNCTIONS
AAKASH INSTITUTE|Exercise ASSIGNMENT (SECTION - J)(ANKASH CHALLENGERS QUESTIONS)|4 Videos
MATHEMATICAL REASONING
AAKASH INSTITUTE|Exercise Assignment (SECTION-D) (Assertion-Reason Type Questions)|15 Videos

Similar Questions

Explore conceptually related problems

lim_(x rarr0) [(sin^(-1)x)/(x)]

To show lim_( x to 0) "x sin" 1/x =0 .

Statement -1 : lim_( x to 0) (sin x)/x exists ,. Statement -2 : |x| is differentiable at x=0 Statement -3 : If lim_(x to 0) (tan kx)/(sin 5x) = 3 , then k = 15

lim_(x rarr0)(x-sin x)/(x^(3)) =

lim_(x rarr0)(sin x)/(x)=1

lim_(x rarr0)(sin(x^(2)-x))/(x)

lim_(x rarr0)(sin log(1-x))/(x)

AAKASH INSTITUTE-LIMITS AND DERIVATIVES -Section - E

Statement-1 : lim(x to 0) (sqrt(1 - cos 2x))/(x) at (x = 0). Right an...
Text Solution
|
Statement-1 : lim( x to 0) (sqrt(1 - cos 2x))/(x) does not exist St...
Text Solution
|
Statement-1 : lim(x to 0-) ("sin"[x])/([x]) = "sin" [x] != 0, Where [...
Text Solution
|
Statement-1 : lim(x to 0) (1 - cos x)/(x(2^(x) - 1)) = (1)/(2) log(2)...
Text Solution
|