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- MTH322: Real Analysis II (Spring 2023)
- ude>atiq-notes-viewer.php}} ===Videos=== <HTML> <center> <div class="container-self"> <iframe class="re... crypted-media" allowfullscreen></iframe> </div> </center> </HTML> ====Resources for midterm ==== There wi
- MATH-300: Basic Mathematics for Chemist
- H-300: Basic Mathematics for Chemist ====== <WRAP center round box 70%> //Without mathematics the sciences... ve fitting. ===== Sample Problems ===== <HTML> <center> </HTML> ^**Sample Problems 1** | [[https://www.d... Chemist.pdf?dl=1|Download PDF]] (149KB) <HTML> </center> </HTML> ===== Related material ===== <WRAP center round tip 80%> * http://en.wikipedia.org/wiki/Numbe
- MTH604: Fixed Point Theory and Applications (Fall 2022)
- metric space and let $B(x_0,r)$ be open ball with center $x_0\in X$ and $r>0$. Suppose $F: B(x_0,r)\to X$
- MTH211: Discrete Mathematics (Spring 2022)
- >atiq-notes-viewer.php}} =====Videos===== <HTML> <center> <div class="container-self"> <iframe class="re... -media" allowfullscreen></iframe> </div> <HTML> </center> </HTML> =====Recommended book ===== - M.L. Li
- MTH322: Real Analysis II (Spring 2022)
- ude>atiq-notes-viewer.php}} ===Videos=== <HTML> <center> <div class="container-self"> <iframe class="re... -media" allowfullscreen></iframe> </div> <HTML> </center> </HTML> ===Online resources=== * https://www.
- MTH322: Real Analysis II (Fall 2021)
- ude>atiq-notes-viewer.php}} ===Videos=== <HTML> <center> <div class="container-self"> <iframe class="re... -media" allowfullscreen></iframe> </div> <HTML> </center> </HTML> ===Online resources=== * https://www.
- MATH-608: Research Methodology
- er" title="Book cover" class="mediaright" /><br> <center> </HTML> ===== Objectives of the course ===== Int
- MTH211: Discrete Mathematics (Fall 2020)
- >atiq-notes-viewer.php}} =====Videos===== <HTML> <center> <div class="container-self"> <iframe class="re... -media" allowfullscreen></iframe> </div> <HTML> </center> </HTML> =====Recommended book ===== - M.L. Li
- MTH604: Fixed Point Theory and Applications (Spring 2020)
- metric space and let $B(x_0,r)$ be open ball with center $x_0\in X$ and $r>0$. Suppose $F: B(x_0,r)\to X$
- MTH604: Fixed Point Theory and Applications
- sed ball and sphere with radius $\frac{1}{2}$ and center $1$. * Define fixed point with example. * Fin
- MTH321: Real Analysis 1 (Spring 2015)
- Integrals. Integral and Differentiation. <WRAP center round tip 60%> **Did you know?** * The develop
- MTH321: Real Analysis 1
- Integrals. Integral and Differentiation. <WRAP center round tip 60%> **Did you know?** * The develop
- MATH-731: Convex Analysis
- n, N.J., 1970. - Related research papers <WRAP center round tip 60%> //**Online Resources**// * SPDFI
- MTH231: Linear Algebra
- sc:notes:vector spaces handwritten notes]] <WRAP center round tip 80%> * Find determinant on wolframe a
- MATH-608: History of Mathematics
- ine" title="Time line" class="mediaright" /><br> <center> </HTML> ===== Course contents ===== History of ... and Gauss, The concept of limit, Laplace. <WRAP center round tip 60%> * [[:atiq:math-608:what is mathe