MATH 160 Survey of Calculus*

This course is designed for students with business, social science and life science majors. It covers functions, limits, continuity, derivative, maxima-minima, applications of the derivative, exponential and logarithmic functions, functions of several variables, maxima and minima of functions of several variables, integration, and applications of the integral.

Credits

4 Credits

Prerequisite

MATH 143 or MATH 147.

General Education Competency

Mathematical Ways of Knowing

MATH 160Survey of Calculus*

Please note: This is not a course syllabus. A course syllabus is unique to a particular section of a course by instructor. This curriculum guide provides general information about a course.

I. General Information

Department

Mathematics & Engineering

II. Course Specification

Course Type

General Education

General Education Competency

Mathematical Ways of Knowing

Credit Hours Narrative

4 Credits

Prerequisite Narrative

MATH 143 or MATH 147.

Grading Method

Letter grade

Repeatable

N

III. Catalog Course Description

This course is designed for students with business, social science and life science majors. It covers functions, limits, continuity, derivative, maxima-minima, applications of the derivative, exponential and logarithmic functions, functions of several variables, maxima and minima of functions of several variables, integration, and applications of the integral.

IV. Student Learning Outcomes

Upon completion of this course, a student will be able to:

  • Demonstrate and understanding of the limiting process as it applies to functions, continuity, derivatives, and integrals.
  • Demonstrate an understanding of the concept of the derivative including its geometric and physical interpretations, apply it to calculate derivatives of functions using rules of differentiation, and solve applied problems.
  • Demonstrate an understanding of the concept of the integral including its geometric and physical interpretations, apply it to calculate indefinite and definite integrals, and solve applied problems.

V. Topical Outline (Course Content)

a. Functions: real numbers, inequalities, sets, intervals, Cartesian plane, lines, slopes, exponents, domain, range, quadratic, polynomial, rational, exponential, piecewise and composite functions, shifting, difference quotient, applications b. Derivatives: limits, continuity, average and instantaneous rate of change, secant and tangent lines, definition of derivative, power rule, product rule, quotient rule, chain rule, higher-order derivatives, velocity, acceleration, nondifferentiable functions, business applications c. Applications of Derivative: relative extreme points, critical numbers, graphing, first- derivative test, concavity, inflections points, second-derivative test, absolute extreme values, applications of optimization, implicit differentiation, related rates d. Exponential & Logarithmic Functions: graphing, compound interest, the number e, exponential growth, natural logarithms, applications of logarithms, derivatives of logarithmic and exponential functions, applications of derivatives e. Integration: antiderivatives, indefinite integrals, integration rules, area under a curve, definite integral, Fundamental Theorem of Integral Calculus, applications of integrals, average value of a function, area between curves, applications of area, integration by substitution, differentials f. Integration Techniques and Differential Equations: integration by parts, integral tables, improper integrals, numerical integration, trapezoidal approximation and error, Simpson's Rule and error, differential equations, general and particular solutions, separation of variables, applications of differential equations g. Calculus of Several Variables: functions of two variables, graphing, relative extreme points and saddle points, partial derivatives, functions of three or more variables, higher-order partial derivatives, optimizing functions of several variables, critical points, second-derivative test, applications, least squares, fitting exponential curves with least squares, Lagrange Multipliers, total differentials and approximate changes, multiple integrals.

VI. Delivery Methodologies

Required Text

Brief Applied Calculus, Berresford, Geoffrey C. and Andrew M. Rockett, sixth edition, Brooks/Cole – Cengage Learning, 2013.