We are here with you hands in hands to facilitate your learning & don't appreciate the idea of copying or replicating solutions. Read More>>
MTH101 Online Quiz No. 02 Discussion and Solutions Due Date Dec 03, 2014
Quiz no. 2 Dated: Nov 21, 14
Dear students,
Quiz # 2 will be started on dated December 01, 2014 at 12:00 A.M and will be closed on December 03, 2014 at 11:59 P.M.
There is no bonus day for quiz.
(1) The quiz will be from 9th to 12th lectures.
(2) There will be multiple choice questions
(3) You have to solve the questions online; no quiz solution will be accepted through email.
(4) As you start solving the quiz and suddenly light switch off, the quiz will be started from that question where light will be off
Before starting QUIZ, Please read the following instructions carefully;
1) Quiz will be comprised of Multiple Choice Questions (MCQs).
2) You have to attempt the quiz online. You can start your attempt anytime within given duration of given time by clicking the link of Quiz on vulms.vu.edu.pk
3) The time to attempt the Quiz will be limited. Once you will login, the countdown will start and you have to complete the quiz in given time interval. So always keep an eye on the remaining time.
4) Attempting quiz is unidirectional. Once if you move forward to the next question, you can not go back to the previous one. Therefore before moving to the next question, make sure that you have selected the best option.
5) If for any reason, you lose access to internet (like power failure or disconnection of internet); you will be able to attempt the quiz again from the position where you left in last attempt. But remember that you have to complete the quiz before expiry of the deadline.
6) If any student failed to attempt the quiz in given time then no re-take or offline quiz will be held.
Tags:
+ Click Here To Join also Our facebook study Group.
.
+ http://bit.ly/vucodes (Vu Study Groups By Subject Codes Wise)Please all students related this subject Share your online Quizzes here to help each other.thanks
Please share the question and their answers of this quiz if anyone has done.
Thanks.
can anyone help for mth101
i will pay
prime ics
share please
answer num 10 is (option c) that is x-2
acha g
MTH101 2^{nd} Quiz
Date : 1 December 2014
Question # (01) x^2-9|=……….
|(x-3)^2|
|(x+3)^2|
|x-3||x+3|
|x+3||x+3|
Question # (02) Usually the number that signifies the idea of f(x) being as close to limit L as want to be must be a/an ……………
Integer
Natural number
Small positive number.
Small negative number.
Question # (03) A function f is said to be continuous on a closed interval [a, b] if f is continuous from the right at “a” and “f” is continuous from the left at “b” and “f” is continuous on
(a,b]
[a,b)
[a,b]
(a, b)
Question # (04) If f is continuous on [a, b], and if f(angel) and f(beer) have opposite signs, then there is …………………… one solution of the equation f(x) = 0 in the interval (a, b).
at most
exactly
at least
not more than
Question # (05) e (epsilon) used in the definition of limit can be a negative number.
True
False
Question # (06) If a function is differentiable at a point then it is continuous at that point. The converse is
False
True
Question # (07) If the function f and g are continuous at c, then f + g is ………… at c.
Discontinuous
Continuous
Question # (8)
If f is continuous on a closed interval [a, b] and C is any number between f(angel) and f(beer), inclusive, then there is at least one number x in the interval [a, b] such that ---------
f(x) is not equal to C
f(x) = C
f(x)>C
f(x)<C
Question # (9) |x-3| < 1 implies.....
-4 < x < 4
2 < x < 4
-2 < x < -4
x-3 < 1
Question # (10): If for any positive number e(epsilon) we can find d (delta) such that| (3x-5) - 1| < e ,if x satisfies 0< |x-2| < d Then f(x) =…………
3x-5- 1
x-2
3x-5
None of these
question no.9 ka answer ghalat hai
it will be 2 < X < 4...
Mona Cs Thank you so much
MTH101 2nd Quiz
Date : 1 December 2014
Question # (01) x^2-9|=……….
|(x-3)^2|
|(x+3)^2|
|x-3||x+3|
|x+3||x+3|
Question # (02) Usually the number that signifies the idea of f(x) being as close to limit L as want to be must be a/an ……………
Integer
Natural number
Small positive number.
Small negative number.
Question # (03) A function f is said to be continuous on a closed interval [a, b] if f is continuous from the right at “a” and “f” is continuous from the left at “b” and “f” is continuous on
(a,b]
[a,b)
[a,b]
(a, b)
Question # (04) If f is continuous on [a, b], and if f(angel) and f(beer) have opposite signs, then there is …………………… one solution of the equation f(x) = 0 in the interval (a, b).
at most
exactly
at least
not more than
Question # (05) e (epsilon) used in the definition of limit can be a negative number.
True
False
Question # (06) If a function is differentiable at a point then it is continuous at that point. The converse is
False
True
Question # (07) If the function f and g are continuous at c, then f + g is ………… at c.
Discontinuous
Continuous
Question # (8)
If f is continuous on a closed interval [a, b] and C is any number between f(angel) and f(beer), inclusive, then there is at least one number x in the interval [a, b] such that ---------
f(x) is not equal to C
f(x) = C
f(x)>C
f(x)<C
Question # (9) |x-3| < 1 implies.....
-4 < x < 4
2 < x < 4
-2 < x < -4
x-3 < 1
Question # (10): If for any positive number e(epsilon) we can find d (delta) such that| (3x-5) - 1| < e ,if x satisfies 0< |x-2| < d Then f(x) =…………
3x-5- 1
x-2
3x-5
None of these
© 2019 Created by + M.Tariq Malik. Powered by
Promote Us | Report an Issue | Privacy Policy | Terms of Service
We are user-generated contents site. All product, videos, pictures & others contents on vustudents.ning.com don't seem to be beneath our Copyrights & belong to their respected owners & freely available on public domains. We believe in Our Policy & do according to them. If Any content is offensive in your Copyrights then please email at m.tariqmalik@gmail.com or Contact us at contact Page with copyright detail & We will happy to remove it immediately.
Management: Admins ::: Moderators
Become a Team Member | Safety Guidelines for New | Site FAQ & Rules | Safety Matters | Online Safety | Rules For Blog Post