Let f x -cos -11- x 2 sin -11- x - x - x 3- x -0- where x denotes fractional part of x - Thencorrect answer - 1 - wrong answer - 0-25 A- If f 0-2- then f x is continuous at x -0B- If f 0-2 -2- then f x is continuous at x -0C- If f 0-4- then f x is continuous at x -0D- f x is a discontinuous function-

The correct option is D f(x) is a discontinuous function.Given : f(x)=cos^ 1(1 {x}^2)sin^ 1(1 {x}){x} {x}^3,x≠0 Finding R.H.L. = lim_x → 0^+cos^ 1(1 x^2)sin^ 1 ...

You visited us 1 times! Enjoying our articles? Unlock Full Access!

Byju's Answer

Standard XII

Mathematics

Continuity of a Function

Let f x =cos ...

Question

Let $f (x) = \frac{{cos}^{- 1} (1 - {x}^{2}) {sin}^{- 1} (1 - {x})}{{x} - {x}^{3}}, x \neq 0$ , where ${x}$ denotes fractional part of $x$ . Then
(correct answer + 1, wrong answer - 0.25)

f (0) = \frac{π}{4},

then

f (x)

is continuous at

x = 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

f (0) = \frac{π}{\sqrt{2}},

then

f (x)

is continuous at

x = 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

f (0) = \frac{π}{2 \sqrt{2}},

then

f (x)

is continuous at

x = 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

f (x)

is a discontinuous function.

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

Open in App

Solution

The correct option is D $f (x)$ is a discontinuous function.
Given : $f (x) = \frac{{cos}^{- 1} (1 - {x}^{2}) {sin}^{- 1} (1 - {x})}{{x} - {x}^{3}}, x \neq 0$
Finding $R . H . L .$
$= lim x \to 0^{+} \frac{{cos}^{- 1} (1 - x^{2}) {sin}^{- 1} (1 - x)}{x - x^{3}} = lim x \to 0^{+} \frac{{cos}^{- 1} (1 - x^{2})}{x} \times \frac{{sin}^{- 1} (1 - x)}{(1 - x^{2})} = lim x \to 0^{+} \frac{{cos}^{- 1} (1 - x^{2})}{x} \times \frac{π}{2}$
Using L'Hospital's Rule,
$= \frac{π}{2} \times lim x \to 0^{+} \frac{- \frac{- 2 x}{\sqrt{1 - (1 - x^{2})^{2}}}}{1} = \frac{π}{2} \times lim x \to 0^{+} \frac{2}{\sqrt{- x^{2} + 2}} = \frac{π}{\sqrt{2}}$

Finding $L . H . L .$
$= lim x \to 0^{-} \frac{{cos}^{- 1} (1 - (1 + x)^{2}) {sin}^{- 1} (1 - (1 + x))}{(1 + x) - (1 + x)^{3}} = lim x \to 0^{-} \frac{{cos}^{- 1} (- 2 x - x^{2}) {sin}^{- 1} (- x)}{(1 + x) [1 - (1 + x)^{2}]} = lim x \to 0^{-} \frac{{cos}^{- 1} (- 2 x - x^{2}) {sin}^{- 1} (- x)}{(1 + x) (2 + x) (- x)} = lim x \to 0^{-} \frac{{sin}^{- 1} (- x)}{- x} \times \frac{π}{4} = \frac{π}{4}$

As $L.H.L \neq R.H.L$ , therefore no value of $f (0)$ can make $f (x)$ continuous at $x = 0$ .

Suggest Corrections

Similar questions

Q. If

f (x) = {\begin{matrix} x s i n x, & w h e n 0 < x \leq \frac{π}{2} \frac{π}{2} s i n (π + x), & w h e n \frac{π}{2} < x < π \end{matrix}, t h e n

Q. Let

f (x) = {(sin x)}^{\frac{1}{π - 2 x}}, x \neq \frac{π}{2}

. If

f (x)

is continuous at

x = \frac{π}{2}

then

f (\frac{π}{2})

Q. If

f (x) = {\begin{matrix} x s i n x, & w h e n 0 < x \leq \frac{π}{2} \frac{π}{2} s i n (π + x), & w h e n \frac{π}{2} < x < π \end{matrix}, t h e n

Q. Let

f (x) = \frac{1 - tan x}{4 x - π}

x \neq π / 4

x \in [0, \frac{π}{2}]

. If

f (x)

is continuous in

[0, \frac{π}{2}]

then

f (\frac{π}{4})

is?

f (x) = ⎧ ⎪ ⎪ ⎪ ⎪ ⎪ ⎪ ⎪ ⎨ ⎪ ⎪ ⎪ ⎪ ⎪ ⎪ ⎪ ⎩ \begin{matrix} \frac{1 - {sin}^{2} x}{3 {cos}^{2} x}, a, \frac{b (1 - sin x)}{{(π - 2 x)}^{2}} \end{matrix} \begin{matrix} x < \frac{π}{2} x = \frac{π}{2} x > \frac{π}{2} \end{matrix}

,
then

f (x)

is continuous at

x = \frac{π}{2}

, if

Join BYJU'S Learning Program

Let f(x)=cos−1(1−{x}2)sin−1(1−{x}){x}−{x}3,x≠0, where {x} denotes fractional part of x. Then (correct answer + 1, wrong answer - 0.25)

Let $f (x) = \frac{{cos}^{- 1} (1 - {x}^{2}) {sin}^{- 1} (1 - {x})}{{x} - {x}^{3}}, x \neq 0$ , where ${x}$ denotes fractional part of $x$ . Then
(correct answer + 1, wrong answer - 0.25)