MATH – 20B.      Calculus

Summer, 2011

 MWF, 10:00am-11:50am, SOLIS 107.

NEWS      HOMEWORK     HANDOUTS

Instructor:      Professor Vladimir Rotar; office: APM-6454,  phone: 534-9074, e-mail: vrotar@math.ucsd.edu.

Office hours:  MWF, 3:20-4:20. If it is needed, office hours may be extended.  Some questions may be answered right before or after the lectures.

 Text:   Rogawski, Calculus: Early  Transcendentals, 1st edition, and

               The supplement to Rogawski’s book. (download here).

Examinations: There will be several quizzes, perhaps a midterm, and a final exam. Homework will be assigned each lecture and posted in this site. 

 

SYLLABUS

The list below is rather one of topics than of lectures: the real experience may dictate a slower or faster pace. A slight change of the order of exposition, and even of the contents, is also possible.

  1. Sec. 5.2-5.4: Review of the Fundamental Theorem of Calculus.  Sec. 5.5: Total change as the integral of a rate.
  2. Sec. 5.6: The substitution algorithm for integrals.  Sec. 6.1: Areas between curves.
  3. Sec.6.1. Areas between curves. Sec. 6.2-6.3: Volumes; average value of a function; the mean value theorem. The basic method is slicing a solid into pieces of known cross-sectional area; solids of revolution are a special case.
  4. Sec. 11.3-11.4: Polar coordinates; areas in polar coordinates.  Supp. 1–3: Complex numbers and complex exponentials: De Moivre’s theorem, complex roots, and Euler’s formula. 
  5. Sec. 7.1: Numerical integration. Sec. 7.2: Integration by parts. 
  6. Sec. 7.3, Trigonometric integrals, Sec. 7.4: Trigonometric substitution (may be omitted), Supp. 4-5, Sec. 7.6: The fundamental theorem of algebra; partial fractions and integration of rational functions using partial fractions.
  7. MIDTERM (can be replaced by quizzes).
  8. Sec. 7.7: Improper integrals.
  9. Sec. 10.1: Sequences: limits, convergence, and divergence. 
  10. Sec. 10.2: Series. Sec. 10.3: Series with positive terms: the integral and comparison tests.
  11. Sec. 10.4-10.5: Absolute convergence; the ratio and root tests. Sec. 10.6: Power series.
  12. Sec.10.7: Taylor series.
  13. Sec. 9.1-9.2: Solving differential equations; exponential models.