MATH1000 (v.1) Engineering Mathematics Specialist 1
Area: | Faculty of Science and Engineering |
---|---|
Credits: | 25.0 |
Contact Hours: | 5.0 |
TUITION PATTERNS: | The tuition pattern provides details of the types of classes and their duration. This is to be used as a guide only. Precise information is included in the unit outline. |
Lecture: | 3 x 1 Hours Weekly |
Computer Laboratory: | 1 x 2 Hours Fortnightly |
Workshop: | 1 x 2 Hours Fortnightly |
Equivalent(s): |
307535 (v.3)
Engineering Mathematics 110
or any previous version
|
Anti Requisite(s): |
307536 (v.4)
Engineering Mathematics 120
or any previous version
AND MATH1002 (v.1) Engineering Mathematics 1 or any previous version |
Prerequisite(s): |
Admission into
307808 (v.3)
Bachelor of Engineering (Honours)
or any previous version
OR Admission into 311721 (v.3) Bachelor of Engineering, Bachelor of Commerce or any previous version OR Admission into 132210 (v.3) Bachelor of Engineering (Electronic and Communication Engineering), Bachelor of Science (Computer Science) or any previous version OR Admission into 303763 (v.6) Bachelor of Engineering (Chemical Engineering), Bachelor of Science (Chemistry) or any previous version OR Admission into 304168 (v.3) Bachelor of Engineering (Chemical Engineering), Bachelor of Science (Extractive Metallurgy) or any previous version OR Admission into 307020 (v.2) Bachelor of Engineering (Civil and Construction Engineering), Bachelor of Science (Mining) or any previous version OR Admission into 132010 (v.3) Bachelor of Engineering (Computer Systems Engineering), Bachelor of Science (Computer Science) or any previous version OR Admission into 131510 (v.4) Bachelor of Science (Physics), Bachelor of Engineering (Electronic and Communication Engineering) or any previous version OR Admission into 177610 (v.9) Bachelor of Engineering (Mining Engineering) or any previous version OR Admission into BH-ENGR (v.1) Bachelor of Engineering (Honours) or any previous version OR Admission into BB-ENGCOM (v.1) Bachelor of Engineering, Bachelor of Commerce or any previous version OR Admission into BB-ECECMP (v.1) Bachelor of Engineering (Electronic and Communication Engineering), Bachelor of Science (Computer Science) or any previous version OR Admission into BB-CENCHM (v.1) Bachelor of Engineering (Chemical Engineering), Bachelor of Science (Chemistry) or any previous version OR Admission into BB-CENEXM (v.1) Bachelor of Engineering (Chemical Engineering), Bachelor of Science (Extractive Metallurgy) or any previous version OR Admission into BB-CSECMP (v.1) Bachelor of Engineering (Computer Systems Engineering), Bachelor of Science (Computer Science) or any previous version OR Admission into BB-CCEMIN (v.1) Bachelor of Engineering (Civil and Construction Engineering), Bachelor of Science (Mining) or any previous version OR Admission into BB-PHYECE (v.1) Bachelor of Science (Physics), Bachelor of Engineering (Electronic and Communication Engineering) or any previous version |
UNIT REFERENCES, TEXTS, OUTCOMES AND ASSESSMENT DETAILS: | The most up-to-date information about unit references, texts and outcomes, will be provided in the unit outline. |
Syllabus: | Mathematical logic and the principle of mathematical induction. Maple as a computational and graphical package. Engineering functions. Limits of functions. Derivatives and differentiation rules. Inverse functions, the logarithmic and exponential functions. Applications of differentiation. Optimisation problems. The tangent and normal line. Approximations using differentials. Linear and quadratic approximations. Integrals and integration by substitution. The definite integral. Fundamental theorem of calculus. Sequences. Infinite Series. Geometric series. Convergence/Divergence of series. Convergence/Divergence tests. Alternating series. Power series. Taylor series. Root finding algorithms. Fixed point iterations and Newton’s method. Matrix algebra. Identity and inverse. Elementary row operations; row echelon matrix; Solution of systems via Gaussian elimination; Rank of a matrix; Homogeneous linear systems; Determinants; Eigenvalues and Eigenvectors. Complex numbers: Cartesian and polar forms, modules, argument and principal value. Regions of the complex plane; Exponential form; De Moivre’s Theorem; Root extraction and roots of polynomials. |
Further Information: | Engineering Mathematics Specialist 1 is a unit designed for students that have studied elements of Calculus to a level deemed satisfactory by Engineering Foundation Year (EFY). |
Field of Education: | 010101 Mathematics |
Result Type: | Grade/Mark |
Availability
Year | Location | Period | Internal | Partially Online Internal | Area External | Central External | Fully Online |
---|---|---|---|---|---|---|---|
2016 | Bentley Campus | Semester 1 | Y |
Area External refers to external course/units run by the School or Department or offered by research.
Central External refers to external and online course/units run through the Curtin Bentley-based Distance Education Area
Partially Online Internal refers to some (a portion of) learning provided by interacting with or downloading pre-packaged material from the Internet but with regular and ongoing participation with a face-to-face component retained. Excludes partially online internal course/units run through the Curtin Bentley-based Distance Education Area which remain Central External
Fully Online refers to the main (larger portion of) mode of learning provided via Internet interaction (including the downloading of pre-packaged material on the Internet). Excludes online course/units run through the Curtin Bentley-based Distance Education Area which remain Central External
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