Class 12th
Get insights from 11.9k questions on Class 12th, answered by students, alumni, and experts. You may also ask and answer any question you like about Class 12th
Follow Ask QuestionQuestions
Discussions
Active Users
Followers
New answer posted
a year agoContributor-Level 10
14. Given f(x) =
For (c) = c < 0,
f(c) = 2c.
f(x) = 2x = 2c = f(c)
So, f is continuous at x 0
For x = c > 1,
f(c) = 4c
f(x) = 4x = 4c = f(c)
So, f is continuous at x> 1.
For x = 0
L.H.L. = f(x) = . 2x = 2 (0) = 0
R.H.L. = f(x) = . 0 = 0.
f(0) = 0.
∴ L.H.L. = R.H.L. = f(0).
So, f is continuous at x = 0.
For x = 1.
L.H.L. = f(x) = . 0 = 0
R.H.L. = f(x) = . 4x = 4 (1) = 4.
∴ L.H.L. R.H.L.
So, f is discontinuous at x = 1.
New answer posted
a year agoContributor-Level 10
13. Given, f(x) =
For x = c such that
f(c) = 3
f(x) = 3 = 3 = f(c)
So, f is continuous in [0, 1].
For x = c = 1,
L.H.L. = f(x) = 3 = 3.
R.H.L. f(x) = 4 = 4
∴ L.H.L R.H.L.
f is discontinuity at x = 1
for x = c such that
f(c) = 4
f(x) = 4 = 4 = f(c)
So, f is continuous in
For x = c = 3
L.H.L. f(x) = 4 = 4
R.H.L. f(x) = 5 = 5.
So, f is discontinuous at x = 3.
For x = c such that
f (c) = 5.
f(x) = 5 = 5 = f(c)
So, f is continuous in
New answer posted
a year agoContributor-Level 10
12. Given, f(x) =
For x = c < 1.
F (c) = c + 5
f(x) = f x + 5 = c + 5
∴ f(x) = f(c)
So, f is continuous at x 1.
For x = c > 1
F (c) = c 5
f(x) = x 5 = c 5.
f(x) = f(c)
So, f is continuous at x 1.
For x = 1
L.H.L. = f(x) = x + 5 = 1 + 5 = 6.
R.H.L. = f(x) = x 5 = 1 5 = 4.
L.H.L. R.H.L.
f is not continuous at x = 1
So, point of discontinuity of f is at x = 1.
Discuss the continuity of the function , where is defined by
New answer posted
a year agoContributor-Level 10
11. Given, f (x) =
For x = c < 1.
f (c) = f (x) = c10 1.
So, f is continuous for x 1.
For x = c > 1.
f (c) = f (x) = c2
So, f is continuous for x 1.
For x = c = 1,
L.H.L = f (x) = x10 1 110 1 = 0.
R.H.L. = f (x) = x2 = 12 = 1.
∴ L.H.L R.H.L.
So, f is not continuous at x = 1.
Hence, f has point of discontinuity at x = 1.
New answer posted
a year agoContributor-Level 10
10. Given f (x) =
For x = c < 2,
f (c) = c3 3
f (x) = x3 3 = c3 3.
So f is continuous at x 2.
For x = c > 2
f (c) = x2 + 1 = c2 + 1
f (x) = x2 + 1 = c2 + 1 = f (c)
So, f is continuous at x 2.
For x = c = 2, f (2) = 23 3 = 8 3 = 5.
L.H.L. f (x) = x3 3 = 23 3 = 5.
R.H.L. f (x) = x2 + 1 = 22 + 1 = 5
∴ R.H.L. = L.H.L. = f (2).
So, f is continuous at x = 2
Hence f has no point of discontinuity.
New answer posted
a year agoContributor-Level 10
9. Given, f (x) =
For x = c < 1,
f (x) = x2 + 1 = c2 + 1
∴ f (x) = f (c)
So f is continuous at x = c < 1.
For x = c > 1,
F (c) = c + 1
f (x) = x + 1 = c + 1
∴ f (x) = f (c)
So, f is continuous at x = c > 1.
For x = c = 1, + (1) = 1 + 1 = 2
L.H.L. = f (x) = x2 + 1 = 12 + 1 = 2.
R.H.L. = f (x) = x + 1 = .1 + 1 = 2
∴ L.H.L = R.H.L. = f (1)
So, f is continuous at x = 1.Hence f has no point of discontinuity.
New answer posted
a year agoContributor-Level 10
8. Given, f(x) =
For x = c < 0,
f(c) = 1
f(x) = 1 = 1
∴f(c) = f (x)
f is continuous at x 0.
For x = c > 0,
F (c) = 1
f(x) = = 1.
∴f(c) = f(x)
f is continuous at x > 0.
For x = c 0.
L.H.L. = f(x) = ( 1) = 1
R.H.L. f(x) = 1 = 1
∴ L.H.L. R.H.L.
is now continuous at x = 0, point of discontinuity of f is at x = 0.
New answer posted
a year agoContributor-Level 10
7. Given, f(x) =
For x =
f ( 3) = e + 3 (∴x< 3, )
f(x) =
∴ f(x) = f(c)
So, f is continuous at x = c < 3.
For x = c > 3
f(3) = 6.3 + 2 = 18 + 2 = 20
f(x) = 6x + 2 = 18 + 2 = 20
∴ f(x) = f(c).So f is continuous at x = c > 3.
For. C = 3,
f ( 3) = ( 3) + 3 = 6.
f(x) = .x + 3 = ( 3) + 3 = 6.
f(x) = ( 2x) = 2 ( 3) = 6.
∴ f(x) = f(x) = f( 3)
So, f is continuous at x = c = 3.
For c = 3,
f(3) = 6.3 + 2 = 18 + = 20.
f(x) = 2x = 2 (3) = 6
f(x) = (6x + 2) = 6.3 + 2 = 20
∴ f(x)
New answer posted
a year agoContributor-Level 10
6. Given f(x) =
For x = c < 2,
F (c) = 2c + 3
f(x) = 2x + 3 = 2c + 3
∴ f (x) = f(c)
So f is continuous at x 2.
For x = c > 2.
F (c) = 2c 3
f(x) = 2x 3 = 2c 3
∴ f(x) = f(c)
So f is continuous at x 2.
For x = c = 2,
L.H.L. = f(x) = .2x + 3 = 2. 2 + 3 = 4 + 3 = 7.
R.H.L. = f(x) = 2x 3 = 2. 2 3 = 4 3 = 1.
∴ LHL RHL
∴ f is not continuous at x = 2.i e, point of discontinuity
New answer posted
a year agoContributor-Level 10
5. Given, f (a) =
At x = 0,
(0) = 0
f (x) = x = 0
∴ f (x) = f (0)
So, f is continuous at x = 0.
At x = 1,
Left hand limit,
L.H.L = f (x) = x = 1.
Right hand limit,
R. H. L. = f (x) = 5 = 5.
L.H.L. R.H.L.
So, f is not continuous at x = 1.
At x = 2,
f (2) = 5.
f (x) = 5 = 5
(x) = f (2)
So f is continuous at x = 2.
Find all points of discontinuity of f, where f is defined by
Taking an Exam? Selecting a College?
Get authentic answers from experts, students and alumni that you won't find anywhere else
Sign Up on ShikshaOn Shiksha, get access to
- 66k Colleges
- 1.2k Exams
- 705k Reviews
- 1850k Answers
