Search
You can find the results of your search below.
Matching pagenames:
Fulltext results:
- MTH321: Real Analysis I (Spring 2023)
- ’ development. =====Resources for Terminal===== **Questions from Chapter 02** - A convergent sequence of re... {n\to \infty }{\mathop{\lim }}\,\,{{r}_{n}}=x$. **Questions from Chapter 03** - Prove that if $\sum\nolimi... convergent, but convers is not true in general. **Questions from Chapter 04** - Consider the function f:[...xistapointc\in (a,b)withf(c)=\lambda $. **Questions from Chapter 05** - Prove that a differentiabl
- MTH322: Real Analysis II (Spring 2023)
- m convergence. =====Resources for Terminal===== **Questions from Chapter 01** - Suppose that f∈...\int_{a}^{\infty }{f(x)g(x)dx}$ is convergent. **Questions from Chapter 02:** - A sequence of functions $\... to\infty} \int_{a}^{b} f_n(x) dx.\end{equation} **Questions from Chapter 03:** - Consider a sequence of fun... ====Resources for midterm ==== There will be two questions having three parts each. First part of each quest
- MATH-510: Topology
- Armstrong, Basic Topology, Springer, 2010. ===== Questions, assignments and presentation ===== ==== Brain t... hink! ==== <WRAP center round important 70%> Some questions are given below. These should be considered as sample and thousands of such questions can be created or constructed but if you understa... s then there is no problem to answer such type of questions. </WRAP> - Is it possible to construct a topolo
- MTH322: Real Analysis II (Spring 2019)
- h322?f=sp19-mth322-ch02|View Online]] * Sample Questions: Set 01 | {{ :atiq:sample-questions-set-01.pdf |Download PDF}} | VIEW [[:atiq:sp19-mth322?f=sample-questions-set-01|View Online]] * Sample Questions: Set 02 | {{ :atiq:sample-questions-set-01.pdf |Download PDF}} |
- MTH322: Real Analysis II (Fall 2016)
- == <callout type="info" icon="true"> Do you have questions or comments? Please use **Discussion** at the end... /atiq/fa16-mth322-ch03|View Online]] * {{ :atiq:questions-last-chapter.pdf |Exponential, Logarithmic and Trigonometric Functions: Sample Questions}} %%|%% [[viewer>_media/atiq/questions-last-chapter|View Online]] NEW ===Assignments:=== * {{ :atiq:fa16-
- MTH322: Real Analysis II (Spring 2017)
- == <callout type="info" icon="true"> Do you have questions or comments? Please use **Discussion** at the end... /atiq/sp17-mth322-ch02|View Online]] * {{ :atiq:questions-last-chapter.pdf |Exponential, Logarithmic and Trigonometric Functions: Sample Questions}} %%|%% [[viewer>_media/atiq/questions-last-chapter|View Online]] NEW ===Assignments:=== * {{ :atiq:sp17-
- MTH322: Real Analysis II (Fall 2017)
- tiq/fa17-mth322-ch02|View Online]] * {{ :atiq:questions-exp-trig-fa17.pdf |Questions: Exponential and Trigonometric Functions}} | [[viewer>_media/atiq/questions-exp-trig-fa17|View Online]] NEW ===Assignment===
- MTH321: Real Analysis I (Fall 2021)
- quiz-sample#online_view|View Online]] ====Sample Questions==== ===Chapter 01=== * 1.01- Define order on a ... frac{1}{4}u_nforalln\geq 1$. (consider other questions similar to this) * 2.29- The Fibonacci numbers ... }} ====Online resources==== * [[msc:mcqs_short_questions:real_analysis]] * http://en.wikipedia.org/wiki/
- MATH-510: Topology
- (1.6MB) | <HTML> </center> </HTML> ==== Selected questions ==== Selected questions from chapter 05 of [2], that is, Schaums Outline of General Topology. Starting from page 73. (total 36 questions) 01, 03, 04, 05, 07, 10, 11, 13, 14, 15, 17,
- MTH322: Real Analysis II (Spring 2016)
- a/atiq/sp16-mth322-ch03|View Online]] * {{:atiq:questions-last_chapter.pdf|Questions from last chapter}} | [[viewer>_media/atiq/questions-last_chapter|View Online]] =====Recommended Books=====
- MTH321: Real Analysis I (Spring 2020)
- 321-quiz-sample.pdf |Download PDF}} | ====Sample Questions==== ===Chapter 02=== * 2.01- Define sequence of... frac{1}{4}u_nforalln\geq 1$. (consider other questions similar to this) * 2.29- The Fibonacci numbers ... }} ====Online resources==== * [[msc:mcqs_short_questions:real_analysis]] * http://en.wikipedia.org/wiki/
- MCQs or Short Questions @atiq:sp15-mth321
- ====== MCQs or Short Questions ====== On this page, MCQs or short questions with out answers are given. Students need to find the answer th
- MTH321: Real Analysis I (Fall 2019)
- hp}} ===Online resources=== * [[msc:mcqs_short_questions:real_analysis]] * http://en.wikipedia.org/wiki/
- MTH611: Integral Inequalities (Fall 2019)
- unctions and applications. =====Notions & Sample Questions===== * Partition of closed interval * Bounded
- MTH424: Convex Analysis (Fall 2020)
- ss it properties. Here we give objective & sample questions lecture wise. All the recorded lectures are given