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Chapter 02 - Sequence and Series @msc:real_analysis_notes_by_syed_gul_shah

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nded Sequence * Convergence of the Sequence * Theorem: A convergent sequence of real number has one and... the sequence is unique.) * Cauchy Sequence * Theorem: A Cauchy sequence of real numbers is bounded. * Divergent Sequence * Theorem: If $s_n<u_n<t_n$ for all $n\ge n_0$ and if both ... n the sequence $\{u_n\}$ also converges to s. * Theorem: If the sequence $\{s_n\}$ converges to //s// the

Chapter 03 - Limits and Continuity @msc:real_analysis_notes_by_syed_gul_shah

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imit of the function, examples and definition * Theorem: Suppose (i) $(X,{d_x})$ and $(Y,{d_y})$ be two m... \to\infty}{p_n}=p$. * Examples and exercies * Theorem: If $\lim_{x\to c}f(x)$ exists then it is unique. * Theorem: Suppose that a real valued function //f// is def... /t// are in $\left\{x:|x-c|<\delta \right\}$. * Theorem (Sandwiching Theorem): Suppose that //f//, //g//

Chapter 04 - Differentiation @msc:real_analysis_notes_by_syed_gul_shah

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tiation ====== * Derivative of a function * Theorem: Let //f// be defined on [//a//,//b//], if //f// ... //x//. (Differentiability implies continuity) * Theorem (derivative of sum, product and quotient of two functions) * Theorem (Chain Rule) * Examples * Local Maximum * Theorem: Let //f// be defined on [//a//,//b//], if //f// h

Chapter 01 - Real Number System @msc:real_analysis_notes_by_syed_gul_shah

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r System ====== ==== Contents & Summary ==== * Theorem: There is no rational //p// such that $p^2=2$. * Theorem: Let //A// be the set of all positive rationals /... nd (infimum). * Least upper bound property. * Theorem: An ordered set which has the least upper bound p... of axioms of real numbers. * Ordered field. * Theorems on ordered field. * Existence of real field.

Number Theory by Ms. Iqra Liaqat @msc:notes

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* Div and mod operators * Basic representation theorem * Greatest common divisor * Euclid's theorem * Sieve of eratosthenes * Twin primes * Mersenn num... ous fraction * Polynomial congruence * Factor theorem * Lagrange's theorem * Euler's theorem * Wilson's theorem </col> </grid> ==== Download ==== <callou

Fundamental of Complex Analysis: Viewer @msc:notes:fundamental_of_complex_analysis

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x-analysis/Solution-Ch05-Power-Series-and-Related-Theorems|Solutions of Chapter 05: Power Series and Related Theorems]] * [[mdoku>msc:notes:fundamental_of_complex_a