Today, many professions require employees to possess quantitative and analytical skills. In truth, employers are seeking applicants who have more than factual knowledge; instead, they want applicants who possess good problem-solving skills, the ability to think and reason analytically, and the ability to continue to learn on the job. Because mathematics is rooted in logic and is a fundamental tool for many other fields, particularly those in the natural and social sciences, it is the ideal discipline to study in an effort to acquire these necessary skills and prepare for successful careers in an ever-changing society.
A degree in Mathematics can provide the foundation needed to launch a career in teaching, industry, government agencies, insurance companies, and many other fields. Majors may also go on to graduate programs in mathematics, statistics, actuarial science, law, and other areas.
In particular, recent LaGrange College Mathematics graduates have secured the following positions
LaGrange College Mathematics graduates have also successfully completed graduate programs in
The Mathematics Program supports the College’s commitment to the liberal arts education of its students by using mathematics as a means to improve students’ critical thinking, communicative, and creative abilities, through the exploration of abstract and applied mathematics, in a caring and supportive environment.
The Mathematics Program strives to provide
In addition, a survey is sent to recent graduates of the program during the Fall term of each year. The results of these surveys are considered and may result in changes to improve the program.
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Major Minor
B.S. in Mathematics B.A. in Mathematics Minor in Mathematics B.S. in Mathematics with a Concentration in Computational Mathematics Minor in Computational MathematicsAn introduction to algebra. Topics include instruction in real numbers, graphs, algebraic expressions, equations, and polynomials.
A study of sets, real numbers, operations, order, inequalities, polynomial factoring, functions, graphs, exponents, first- and second-degree equations, and systems of equations.
An introduction to probability and statistics. Topics include descriptive statistics, probability, normal probability, confidence intervals, hypothesis testing, and linear regression.
An introduction to finite mathematics, which is a collection of mathematical topics that are highly applicable in the real world, but do not involve the infinite processes of calculus. Topics include matrices and solutions to linear equations (including linear programming problems), elementary probability and applications, and applications to personal finance.
Individual and small-group problem solving geared toward real-life situations and nontraditional problems. The course focuses on a number of problem-solving strategies, such as drawing a diagram, eliminating possibilities, making a systematic list, looking for a pattern, guessing and checking, solving an easier related problem and sub-problems, using manipulatives, working backward, acting it out, unit analysis, using algebra and finite differences, and others. Divergent thinking and technical communication skills of writing and oral presentation are emphasized.
Mathematical techniques and computer methods with spreadsheets are used in the development of quantitative reasoning skills. These techniques are examined in the contexts of business and economics and of sustainability through managing one’s personal finances.
A study of calculus-oriented algebra and trigonometry. Topics include simplifying algebraic expressions, solving equations, exponential and logarithmic functions, applications of functions, graphs, and the trigonometric functions.
An introduction to differentiation and integral calculus. Topics include limits, differentiation and applications, integration, and the calculus of exponential and logarithmic functions.
A continuation of MATH 2221. Topics include the applications of integration, the calculus of inverse trigonometric functions, techniques of integration, indeterminate forms, improper integrals, sequence and series, and the parametric equations, and the polar coordinates.
A continuation of MATH 2222. Topics include vectors and vector-valued functions of several variables, multiple integration, and vector analysis.
An introduction to differential equations. Topics include the study of first and second-order differential equations, first-order systems, linear systems, Laplace transforms, and numerical methods.
A first course in mathematical programming in MATLAB that ranges from basic programming to the implementation of higher-level mathematics. Additional topics include learning a typesetting system (LaTeX) for producing technical and scientific documentation.
An introduction to the discipline of data science. Topics include data management, statistical analyses of data, estimation of model parameters to collected data, machine learning algorithms, and visualizations. Students will implement or employ computational tools to analyze real-world problems, draw meaningful conclusions, and report their findings.
A thorough introduction to mathematical modeling techniques. Topics include the quantification of physical processes, model predictions and natural systems, and model comparisons and results.
Topics include Fourier Series, the Wave Equation, the Heat Equation, Laplace's Equation, Dirichlet Problems, Sturm-Liouville Theory, the Fourier Transform, and Finite Difference Numerical Methods.
A study of the concepts of plane Euclidean geometry, with an introduction to coordinate geometry and non-Euclidean geometries. Offered on demand.
A study of topics in mathematics designed for future elementary school teachers that are aligned with current GACE standards. Teacher candidates will be expected to understand and apply knowledge in the following areas: counting and cardinality, operations and algebraic thinking, numbers and operations in base 10, fractions, measurement and data, and geometry.
An Introduction to probability theory. Topics include random variables, method of enumeration, conditional probability, Baye’s theorem, discrete distributions (binomial distribution, and Poisson distribution), continuous distributions (uniform distribution, exponential distribution, gamma distribution, chi-square distribution, and normal distributions), Multivariate distributions.
An introduction to the mathematical theory of statistics. Topics include estimation and maximum likelihood estimates, sampling distributions, confidence intervals, and hypothesis testing.
An introduction to linear algebra and matrix theory. Topics include vectors, systems of linear equations, matrices, eigenvalues, eigenvectors, and orthogonality.
An historical development of mathematical concepts.
An introduction to discrete mathematics. Topics include set theory, combinatorics, recurrence relations, linear programming, and graph theory.
A study of techniques used for constructing combinatorial designs. Basic designs include triple systems, Latin squares, and affine and projective planes.
An introduction to complex variables. Topics include complex numbers, analytic functions, elementary functions, complex integration, series representations for analytic functions, residue theory, and conformal mapping.
An introduction to modern abstract algebra.
A continuation of Modern Algebra I.
An introduction to Analysis.
A continuation of Analysis I.
A study of problem-solving techniques selected from the spectrum of Mathematics coursework required to complete a Mathematics major at LaGrange College. Topics come from a variety of areas, including algebra, trigonometry, geometry, calculus, discrete mathematics, probability and statistics, and mathematical reasoning and modeling.
An introduction to numerical analysis with computer solutions. Topics include Taylor series, finite difference, calculus, roots of equations, solutions of linear systems of equations, and least- squares. Offered on demand.
A second course in numerical analysis with computational solutions. Topics include solutions to ordinary and partial differential equations, higher-order quadratures, curve-fitting, and parameter estimation.
Internship.
This course allows students to pursue a special problem or topic beyond those encountered in any formal course. Course may be offered for variable credit.
This course allows students to pursue a second special problem or topic beyond those encountered in any formal course. This course may be taken for variable credit.
Special topics in Mathematics.