M athem atical analysis I
Course Name Semester Syllabus We
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Mathematical Analysis I Syllabus
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Course Name
Semester Syllabus We ek Topic details Total hours Lecture hours Practic e hours The algebra o f the limits, examples. Standard limits. Standard limits. Examples. Bounded sequences.' The N eper number. Example. 4 Lim its o f functions when x tends to infinity. Exam ples. Lim its o f functions for x\to-infty. Limits o f functions for x \to a. Examples. Powers, Exponentials, Hyperbolic functions and inverse hyperbolic functions. Com parison theorem . Limits and sequences. A lgebra o f limits. 10 6 4 5 Lim its o f elem entary functions. Examples. Limit Sin(x)/x, as x tends to 0. Fundamental limits and Landau symbols. The fundam ental lim its using the Landau symbols. O ther fundam ental limits. How to use the Landau symbols to com pute limits. Infinite and infinitesim al functions. 10 6 4 6 A symptotes. Examples. Continuity o f a function. The algebra o f continuous functions-Examples. Examples. Converging subsequences. M axim a and m inim a o f continuous functions on a closed interval. The W eierstrass theorem. The intermediate value theorem -Exam ples-Inverse o f continuous function. Examples and exercises. 10 6 4 7 T he derivative o f a function. Geometrical and kinem atical interpretation o f the derivative. Continuity o f differentiable functions. Basic rules o f the derivation. Derivative o f com posite functions. Derivatives o f elem entary functions. Derivative o f inverse trigonom etric and inverse hyperbolic functions. Rolle theorem and the mean value theorem. 10 6 4 8 Taylor theorem and its consequences. Examples. Taylor and M aclaurin expansions and their properties. Taylor expansions o f basic elem entary functions. Local m axim a and local minima. Critical points. Flex points with horizontal tangent lines. Characterizations o f critical points with derivatives. Examples. 10 6 4 9 Global m axim a and minim a o f differentiable functions on a closed interval. L ’hopital theorem. Examples. P ro o f o f L ’hopital theorem . Tangent line, 10 6 4 Page 7 |
