Modulhandbuch——德国留学申请化工类安全工程课程描述手册

1、ModulhandbuchSafety Engineering(B.Eng.)Beijing University of Chemical Technology1ModulverzeichnisModulbereich Mathematik4 .Modulbereich Kognitionswissenschaftliche Grundlagen 4Modulbereich Maschinenbau.；. .4Modulbereich Technische Mechanik. .：.5Modulbereich Grundlagen der Programmierung 5Modulbereic

2、h Forschungsmethodik5Modulbereich Materialwissenschaft.6.Modulbereich Thermodynamik 6Modulbereich Elektrotechnik und Schaltungstechnik . .6.Modulbereich Regelungs- und Messtechnik .6.Modulbereich Praktika.7Modulbereich Grundlagen der Sicherheitstechnik7Modulbereich Abwehrender Brandschutz 7Modulbere

3、ich Anwendungen der Sicherheitstechnik8KurskatalogKurs-NrKursbezeichnungSeite-Nr1Calculus I792Calculus II103Linear Algebra124Probability and Mathematical Statistics125General Physics I136General Physics II137Experiment of General Physics I138Experiment of General Physics II149Modern Engineering Grap

4、hics I1410Modern Engineering Graphics II1411Theory of Mechanism and Machine1412Tolerance Fit and Measurement1513Machinery Manufacturing Technology1514Project Design of Mechanism BasisP 1515Design of Machinery1616Theoretical Mechanics1617Mechanics of MaterialsP 1718Engineering Materials1719Electric C

5、ircuits and Electronic Technique I1720Electric Circuits and Electronic Technique IIr 1821Electrical Engineering and Electronic Practice1822Testing Technology1923Fundamental Measuring and Testing Techniquer 1924College Computer Fundamentals1925Programming Language C2026Visual Basic Programmingr 2027P

6、racticum in Applied Software2128Computer Aided Drawingkein29Metalworking Practice2130Acquaintance Practice2231Engineering Practice2232Social Practicekein33College Chemistry2234Hazardous Chemicals22i35Safety Engineering Primary Seminar2336Safety Psychology2337Mechanical and Electrical Safety Technolo

7、gy2338Safety Laws and Regulations and Supervise2339Pressure Vessel Safety Technology2440Project for Pressure Vessel Safety Technique2441Safety Systematic Engineering2542Practice for Safety Systematic Engineering2543Project for Safety Evaluation2644Safety Evaluation2645Safety Engineering Lecture Cour

8、seskein46Chemical Technology and Safety2747Loss prevention in fire and explosion2748Engineering Thermodynamics2849Unit Operations of Chemical Engineering2950Introduction to Safety Engineering3051Security Economics3052Document Retrieve3053Programming of Micro-controllers and Proteus simulation3154Eng

9、ineering Thermodynamik3132Erkl?rungI.Der Inhalt stammt aus der Univerwaltung meiner Universit? Aber Nicht alle Kurse haben eine Beschreibung aus der Univerwaltung. Deshalb gibt es keine Beschreibungen von den folgenden drei Kursen, n?rnlich Computer Aided Drawing, Safety Engineering Lecture Courses

10、und Social Practice. Um zu stempeln, kann man nicht den Inhalt aus der Univerwaltung ver? ndern. Aber man kann meiner Meinung nach durch den Name klar wissen, was man bei diesen Kursen lernt.2.Der Kurs Programming of Micro-controllers and Proteus simulation und der Kurs auf dem Transkript Foundation

11、 and Application of Micro-controller sind der gleiche Kurs.Modulbereich MathematikF?cher ibersichtErworbene LPKursartCalculus I6VorlesungCalculus II6VorlesungLinear Algebra3.5VorlesungProbability and Mathematical Statistics(Probability)3.5VorlesungGesamt erworbene LP: 19Modulbereich Kognitionswissen

12、schaftliche GrundlagenF?cher ibersichtErworbene LPKursartGeneral Physics I4VorlesungGeneral Physics II4VorlesungExperiment of General Physics I1.5LaborarbeitExperiment of General Physics II1.5LaborarbeitCollege Chemistry3VorlesungUnit Operations of Chemical Engineering4VorlesungGesamt erworbene LP:

13、18Modulbereich MaschinenbauF?cher ibersichtErworbene LPKursartModern Engineering Graphics I3.5VorlesungModern Engineering Graphics II2.5VorlesungTheory of Mechanism and Machine3.5VorlesungTolerance Fit and Measurement1.5VorlesungMachinery Manufacturing Technology2.5VorlesungProject Design of Mechani

14、sm Basis4ProjektarbeitComputer Aided Drawing1VorlesungDesign of Machinery4VorlesungGesamt erworbene LP: 22.5Modulbereich Technische MechanikF?cher ibersichtErworbene LPKursartTheoretical Mechanics3.5VorlesungMechanics of Materials4.5VorlesungGesamt erworbene LP: 8Modulbereich Grundlagen der Programm

15、ierungF?cher ibersichtErworbene LPKursartCollege Computer Fundamentals2VorlesungProgramming Language C2.5VorlesungVisual Basic Programming2VorlesungPracticum in Applied Software1VorlesungProgramming of Micro-controllers and Proteus simulation3VorlesungGesamt erworbene LP: 10.5Modulbereich Forschungs

16、methodikF?cher ibersichtErworbene LPKursartDocument Retrieve1VorlesungProbability and Mathematical Statistics(Mathematical Statistics)2VorlesungGesamt erworbene LP: 3Modulbereich MaterialwissenschaftF?cher ibersichtErworbene LPKursartEngineering Materials2VorlesungGesamt erworbene LP:2Modulbereich T

17、hermodynamikF?cher ibersichtErworbene LPKursartEngineering Thermodynamics3.5VorlesungGesamt erworbene LP: 3.5Modulbereich Elektrotechnik und SchaltungstechnikF?cher ibersichtErworbene LPKursartElectric Circuits and Electronic Technique I2VorlesungElectric Circuits and Electronic Technique II3.5Vorle

18、sungElectrical Engineering and Electronic Practice1LaborarbeitGesamt erworbene LP: 6.5Modulbereich Regelungs- und MesstechnikF?cher ibersichtErworbene LPKursartTesting Technology2VorlesungFundamental Measuring and Testing Technique»2.5VorlesungGesamt erworbene LP: 4.5Modulbereich PraktikaF?cher

19、 ibersichtErworbene LPKursartMetalworking Practice4PraxisAcquaintance Practice2PraxisEngineering Practice4PraxisSocial Practice2PraxisGesamt erworbene LP: 12Modulbereich Grundlagen der SicherheitstechnikF?cher ibersichtErworbene LPKursartSafety Psychology2VorlesungSecurity Economics2VorlesungIntrodu

20、ction to Safety Engineering2VorlesungSafety Engineering Lecture Courses2VorlesungSafety Engineering Primary Seminar1VorlesungSafety Laws and Regulations and Supervise2VorlesungMechanical and Electrical Safety Technology2VorlesungGesamt erworbene LP: 13F?cher ibersichtErworbene LPKursartLoss preventi

21、on in fire and explosion3VorlesungChemical Technology and Safety2.5VorlesungHazardous Chemicals2VorlesungGesamt erworbene LP: 7.5ModulbereichAbwehrenderrandschutzModulbereichAnwendungen der SicherheitstechnikF?cher ibersichtErworbene LPKursartSafety Evaluation2.5VorlesungProject for Safety Evaluatio

22、n2VorlesungSafety Systematic Engineering2.5VorlesungPractice for Safety Systematic Engineering1ProjektarbeitPressure Vessel Safety Technology2.5VorlesungProject for Pressure Vessel Safety Technique2ProjektarbeitGesamt erworbene LP:12.51. Calculus I1. Function, Limit and Continuity1.1 Understand the

23、concept of function.1.2 Understand the following characteristics of a function: odd/even, monotonicity, periodicity and boundedness.1.3 Understand the concepts of composite function and inverse function.1.4 Master the properties and graph of a basic primitive function.1.5 Be skilful in building func

24、tion relationship about practical problem.1.6 Understand the concept of limits.1.7 Master the law for four basic operations of limits.1.8 Understand the two principals for existence of limits; be able to utilize the two important limits.1.9 Understand the concept of the infinitesimal small and the i

25、nfinitesimal large; master the method of comparing the infinitesimal small.1.10 Understand the concept of continuity.1.11 Comprehend the concept of points of discontinuity; be able to determine the types of points of discontinuity.1.12 Understand the continuity of primitive functions; understand the

26、 properties and application of continuous functions on a closed interval.2. One-variable Function Differentiation2.1 Understand the concept of derivatives and differentiability. Understand the concept of derivatives from geometric. Understand the relationship between differentiability and continuity

27、.2.2 Be able to describe the physical concept with derivatives.2.3 Master the operational principles of four basic operations with respect to derivatives and differentiability. Master the derivative formula for primitive functions.2.4 Comprehend the concept of the higher-order derivative.2.5 Be able

28、 to obtain the high order derivative for simple functions.2.6 Comprehend the methods of finding the first-order and second-order derivatives of the implicit function and the function of the parameter equation. Comprehend the correlation rate of change.2.7 Understand and utilize the Roll theorem, Lag

29、range theorem, Cauchy theorem and Taylor theorem.2.8 Understand the concept of extreme. Solve minimum and maximum value of a function.2.9 Be able to determine the convexity and concavity of a function using derivatives and to solve the inflection point and asymptotic lines as well as to make graphs

30、for simple functions. Master the applied problems about the minimum and maximum value.2.10 Grasp skilled the LHospital.s Method.2.11 Comprehend the concepts of the degree of curvature and curvature radius.2.12 Comprehend the procedure for Newton3. One-variable Integration3.1 Understand the concept a

31、nd properties of indefinite and definite integrals.3.2 Be familiar with the basic formula of indefinite integrals; master the methods of change of variables and integration by part for both indefinite and definite integrals.3.3 Be able to solve the relatively simple integral for rational functions.3

32、.4 Understand the definite integral as a function of its integration limits and its derivative theorem; be familiar with the Newton-Leibniz formula.3.5 Comprehend the concept of general integration.3.6 Know numerical integration methods (trapezoidal and parabolic approximation).3.7 Be able to use de

33、finite integral to represent a certain geometric and physics quantities (such as area, volume, arc, work, gravity, etc.)4. Vector Algebra and Analytical Geometry4.1 Understand the concept of vector.4.2 Master vector operations (linear operation, cross product and vector product); know the conditions

34、 for perpendicularity and parallel of two vectors; understand the mixed product.4.3 Be familiar with the unit vector, direction cosine and the coordinate representation of vector; be able to conduct vector operations using coordinate representation.4.4 Be familiar with the equation for a plane and a

35、 line and their solutions.4.5 Understand the concept of curved surface; know the equations of commonly used quadratic curved planes and their graphs; know the equations of rotational curved surface with coordinate axis as its pivot and the equations of cylinder surface whose primary line is parallel

36、 to the coordinate axis.4.6 Know the parametric and general equations for spatial curves.4.7 Know the projection of the line of intersection between two curved planes onto thecoordinate surface.2. Calculus II1. Multivariate Differentiation1.1 Understand the concept of multivariate function.1.2 Know

37、the concept of limit and continuity for multivariate functions; know the properties of continuous function on a closed bounded set.1.3 Understand the concept of partial derivative and total differentiation; know the sufficient and necessary condition for existence of total differentiation.1.4 Know t

38、he concept of directional derivatives and gradient and their computing methods.1.5 Master the method to compute the first order and second order partial derivative for composite functions.1.6 Be able to solve the partial derivative for implicit functions (include the implicit functions determined by

39、 a set of equations).1.7 Understand the concepts of tangent lines and tangent planes of a curve and curved surface; be able to solve their equations.1.8 Understand the concept of extreme value and conditional extreme value of a multivariate function; be able to solve the extreme value of a multivari

40、ate function; know the Legrand ' multiplier method; be able to solve some simple maximum an minimum value problems in practice.2. Multivariate Integration2.1 Understand the concepts of double and triple integrals and their properties.2.2 Master the method to calculate the double integrals (under

41、 Euclidean and polar coordinate system); know the method to calculate the triple integrals (under Euclidean, Cylindrical, and spherical coordinate system).2.3 Understand the concepts of two types of integrals on a curve and their properties.2.4 Be able to calculate the two types of integrals on a cu

42、rve.2.5 Be familiar with the Green' sormula; be able to use condition that the planer integral is independent of its integration path.2.6 Understand the concept of two types of integrals on a curved surface, Gauss' s formula, and Stokes ' formula; be able to calculate the two types of in

43、tegrals on a curved surface.2.7 Know the concepts of divergence and curl; be able to calculate divergence and curl.2.8 Be able to use multiple integral, integral on a curve and integral on a curved surface to solve a certain geometric and physics quantities (such as volume, area of the curved plane,

44、 arc, mass, center of gravity, moment of inertia, gravity, etc.)3. Series3.1 Understand the concepts of convergence, divergence and summation of an infinite series; know the basic properties of an infinite series and the necessary condition for itsconvergence.3.2 Be familiar with geometric series an

45、d p-series and their convergence property.3.3 Understand the positive series. Master its comparison test, ratio test and root test.3.4 Understand the Leibniz theorem for alternate series; be able to estimate the truncation error.3.5 Know the concepts of absolute convergence and conditional convergen

46、ce of an infinite series and their relationship.3.6 Know the concept of a series of functions and its convergence region.3.7 Master the method to solve convergence interval of certain simple power series.3.8 Know the basic properties of power series on its convergence interval.3.9 Know the sufficien

47、t and necessary condition for expanding a function into Taylor series.3.10 Be able to use Maclaurin expansion of ex，而乂 cos 1n1 x) and(1 X)： toexpand some basic function in to power series.3.11 Know the simple application of power series in numeric analysis.3.12 Know the sufficient condition to expan

48、d a function into Fourier series; be able to expand a function that is defined on - 兀, 兀an-L L into Fourier series; be able to expand a function that is defined on 0, L into sine or cosine series.4. Ordinary Differential Equation4.1 Comprehend the concepts of differential equation, and its solution,

49、 general solution, particular solution and initial conditions.4.2 Master the separation of variables and the method to solve first order linear differential equations.4.3 Be able to solve the homogenous and Bernoulli differential equations; digest the idea of using change of variables to solve diffe

50、rential equations; be able to solve the total differential equations.4.4 Know the order reduction method to solveyn = f (x), y = f(x y) andy = f (y, y)4.5 Know the structure of a solution to a second order linear differential equation.4.6 Master the method to solve the second order homogenous linear

51、 differential equation with constant coefficients; know the method to solve higher order homogenous linear differential equation with constant coefficients.4.7 Be able to solve the second order non-homogenous linear differential equation with constant coefficients whose free term has a form ofR(x)e拜

52、 ande'x P(x) cosax + Pn (x) sinax .4.8 Comprehend the method of using power series to solve differential equations.4.9 Be able to use differential equation to solve some basic geometric and physics problems.3. Syllabus for Linear Algebra1. Matrix and Its Applications2. Determinant3. The same sol

53、ution set of Linear systems and rank of the matrix4. Vector space and structure of Linear Equations5. The eigenvalue and similar matrix6. Quadratic form4. Probability and Mathematical Statistics1. Random events and their probabilities2. Random variables and their distributions3. Moments of random va

54、riables4. Law of large numbers and central limit theorems5. Basic concepts of mathematical statistics6. Parameter estimation7. Hypothesis test8. General review5. General Physics I1. Mechanics1.1 Particle kinematics1.2 Newton Laws1.3 Momentum1.4 Work and Energy1.5 Fixed-axis rotation of rigid body2.

55、Kinetic theory of gases and Thermodynamics2.1 Kinetic theory of gases2.2 Thermodynamics3. Electromagnetism3.1 The vacuum electrostatic field3.2 The conductor and dielectric in the electrostatic field4. Modern physics foundation4.1 Special relativity foundation6.General Physics II1. Electromagnetism1.1 Steady current1.2 Steady magnetic field in vacuum1.3 Magnetic field in magnetic medium1.4 electromagnetic induction2. Vibration and fluctuations2.1 Mechanical Vibration2.2 Mechanical Wave3. Wave Optics3.1 Interference of Light3.2 Diffraction of Light3.3 Polarization