Chi-Ming Tang

Associate Professor of Mathematics
South Hall 326B
585-245-5480
tang@geneseo.edu

Chi-Ming Tang has been a member of the Geneseo faculty since 1979.

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Office Hours

  • MWF 10:30 - 11:30
  • Thurs. 11:00 - Noon
  • or by appointment

Curriculum Vitae

Education

  • B.S., Tamkang College of Arts and Sciences, China

  • M.A., Ph.D., University of New Mexico; 1979

Classes

  • MATH 221: Calculus I

    Topics studied are limits and continuity; derivatives and antiderivatives of the algebraic, exponential, logarithmic, trigonometric, and inverse functions; the definite integral; and the fundamental theorem of the calculus.

  • MATH 361: Statistics

    Sampling distributions, point and interval estimation, and tests of hypothesis. Topics also include: regression and correlation, the analysis of variance, and nonparametric statistics.

  • MATH 376: Financial Mathematics-Lec

    The goal of this course is to provide the student interested in Actuarial Science, an understanding of the fundamental concepts of financial mathematics, and how those concepts are applied in calculating present and accumulated values for various streams of cash flows as a basis for future use in: reserving, valuation, pricing, asset/liability management, investment income, capital budgeting, and valuing contingent cash flows. Students will also be given an introduction to financial instruments, including derivatives, and the concept of no-arbitrage as it relates to financial mathematics.

  • MATH 376: Financial Mathematics-Lab

    The goal of this course is to provide the student interested in Actuarial Science, an understanding of the fundamental concepts of financial mathematics, and how those concepts are applied in calculating present and accumulated values for various streams of cash flows as a basis for future use in: reserving, valuation, pricing, asset/liability management, investment income, capital budgeting, and valuing contingent cash flows. Students will also be given an introduction to financial instruments, including derivatives, and the concept of no-arbitrage as it relates to financial mathematics.