Let f be the function defined by f(x)= begincases(x2-1/x2-2|x-1|-1), x ≠ 1 1 / 2, x=1 endcases

Question

Let f be the function defined by f(x)= begincases(x2-1/x2-2|x-1|-1), x ≠ 1 1 / 2, x=1 endcases (A) The function is continuous for all values of mathrm x (B) The function is continuous only for mathrm x>1 (C) The function is continuous at mathrm x=1 (D) The function is not continuous at mathrm x=1

Tardigrade Admin · Accepted Answer

For x<1, f(x)=(x2-1/x2+2 x-3)=(x+1/x+3) ∴ lim limits x arrow 1- f(x)=(1/2) For x>1, f(x)=(x2-1/x2-2 x+1)=(x+1/x-1) ∴ lim limits x arrow 1+ f(x)=∞ ∴ The function is not continuous at x=1.

Q. Let $f$ be the function defined by
$f (x) = {\frac{x ^{2} - 1}{x ^{2} - 2∣ x - 1∣ - 1}, < b r / > 1/2, x \neq = 1 x = 1$

The function is continuous for all values of mathrm $x$

The function is continuous only for mathrm $x > 1$

The function is continuous at mathrm $x = 1$

The function is not continuous at mathrm $x = 1$

For $x < 1, f (x) = \frac{x ^{2} - 1}{x ^{2} + 2 x - 3} = \frac{x + 1}{x + 3}$
$∴ x \to 1^{-} lim f (x) = \frac{1}{2}$
For $x > 1, f (x) = \frac{x ^{2} - 1}{x ^{2} - 2 x + 1} = \frac{x + 1}{x - 1}$
$∴ x \to 1^{+} lim f (x) = \infty$
$∴$ The function is not continuous at $x = 1$ .

Q. Let f be the function defined by f(x)={x2−2∣x−1∣−1x2−1​,<br/>1/2,​x=1x=1​

The function is continuous for all values of mathrm x

The function is continuous only for mathrm x>1

The function is continuous at mathrm x=1

The function is not continuous at mathrm x=1