The following functions are undefined at x =0. For each determine if this point of discontinuity is removable or not If, so state the value for the function at x = 0 which allows for a continuous extension. (a) f(x) = 1 /(sin(x)) (b) f(x) = x sin(1/x) (c) f(x) = (|sin(x)|)/x (d)f(x) = (sin(2x))/x

Emilia Carpenter

Emilia Carpenter

Answered question

2022-12-01

The following functions are undefined at x =0. For each determine if this point of discontinuity is removable or not If, so state the value for the function at x = 0 which allows for a continuous extension.
(a) f ( x ) = 1 / ( sin ( x ) )
(b) f ( x ) = x sin ( 1 / x )
(c) f ( x ) = ( | sin ( x ) | ) / x
(d) f ( x ) = ( sin ( 2 x ) ) / x

Answer & Explanation

Desirae Wu

Desirae Wu

Beginner2022-12-02Added 10 answers

a_) We have f(x) = 1 sin x
lim x 0 f ( x ) = lim x 0 1 sin x , which does not exist. Hence the discontinuity is not able to be removed.
b) we have f ( x ) = x sin 1 x
lim x 0 f ( x ) = lim x 0 x sin 1 x = 0
since the limit exists at x=0 so the function has removable discontinuity at x=0.
By defining f(0)= 0 at x=0 the function becomes contiuous at 0
c)we have f ( x ) = | sin x | x lim x 0 f ( x ) = lim x 0 sin x x = 1 lim x 0 + f ( x ) = lim x 0 + sin x x = 1
The function has different left and right limits at 0, so the discontinuity is not able to be removed.
d) We have f ( x ) = sin 2 x x lim x 0 f ( x ) = lim x 0 sin 2 x x = 2
since the limit exists at x=0 so the function has removable discontinuity at x=0. Now by defining f(0)=2 at x=0 the function becomes continuious at 0
a)not removable
b)removable
c)not removable
d) removable

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