COMPUTER SOFTWARE ENGINEERING - NBTE
COMPUTER SOFTWARE ENGINEERING - NBTE
COMPUTER SOFTWARE ENGINEERING - NBTE
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NID in Software Engineering (Draft)<br />
)<br />
expansion. Lecture Notes understanding of the<br />
concepts covered by<br />
solving examples<br />
10 3.4 State the binomial theorem<br />
for a rational number.<br />
3.5 State the properties of<br />
binomial coefficients<br />
11 3.6 Apply binomial expansion<br />
in approximations (simple<br />
examples only).<br />
4.2 Define the special matrixes<br />
of zero matrixes e.g. zero<br />
matrix, identity matrix,<br />
square matrix, and<br />
triangular matrix,<br />
symmetric matrix.<br />
13 4.3 State examples for each of<br />
the matrixes in 4.2 above<br />
Explain and discuss the<br />
concepts covered<br />
Explain and discuss the<br />
concepts covered<br />
Textbooks<br />
Lecture Notes<br />
Textbooks<br />
Lecture Notes<br />
• Demonstrate<br />
understanding of the<br />
concepts covered by<br />
solving examples<br />
• Demonstrate<br />
understanding of the<br />
concepts covered by<br />
solving examples<br />
assess student work<br />
Week GENERAL OBJECTIVE 4: UNDERSTAND THE ALGEBRAIC OPERATIONS OF MATRIXES AND DETERMINANTS<br />
12 4.1 Define Matrix<br />
Explain and discuss the Textbooks<br />
concepts covered<br />
4.4 State the laws of addition<br />
and multiplication of<br />
matrixes.<br />
Explain and discuss the<br />
concepts covered<br />
Lecture Notes<br />
Textbooks<br />
Lecture Notes<br />
• Demonstrate<br />
understanding of the<br />
concepts covered by<br />
solving examples<br />
• Demonstrate<br />
understanding of the<br />
concepts covered by<br />
solving examples<br />
Explain and supervise<br />
student exercises and<br />
assess student work<br />
Explain and supervise<br />
student exercises and<br />
assess student work<br />
Explain and supervise<br />
student exercises and<br />
assess student work<br />
Explain and supervise<br />
student exercises and<br />
assess student work<br />
Lecture Notes<br />
Textbooks<br />
Lecture Notes<br />
Textbooks<br />
Lecture Notes<br />
Textbooks<br />
Lecture Notes<br />
Textbooks<br />
Lecture Notes<br />
4.5 Illustrate the commutative,<br />
associative and distributive<br />
nature of the laws stated in<br />
4.4 above.<br />
4.6 Define the transpose of a<br />
matrix.<br />
4.7 Determine a determinant the<br />
minors and cofactors 2 by 2<br />
43