• 沒有找到結果。

SyllabusClass Code:D-6521-03542Time:03:40 p.m.~ 05:30 p.m., Monday, Feb 2011 ~ Jun 2011Classroom:JSB 04 Textbook:

N/A
N/A
Protected

Academic year: 2022

Share "SyllabusClass Code:D-6521-03542Time:03:40 p.m.~ 05:30 p.m., Monday, Feb 2011 ~ Jun 2011Classroom:JSB 04 Textbook:"

Copied!
2
0
0

加載中.... (立即查看全文)

全文

(1)

Syllabus Class Code: D-6521-03542

Time: 03:40 p.m.~ 05:30 p.m., Monday, Feb 2011 ~ Jun 2011 Classroom: JSB 04

Textbook:

(for

2 semesters)

Sounds Good On track to listening success Student Book 4

by Ken Beatty

published by Pearson Longman Instructor: Daisy Hsiu

jin155@seed.net.tw

Date Unit Topic

2/14 7. Food

2/21

2/28 Holiday

3/7 8. Sports

3/14

3/21 9. Clothes

3/28

4/4 Holiday

4/11 Midterm Exam

4/18 10. Jobs

4/25 5/2

5/9 11. Natural disasters 5/16

5/23 12. Dilemmas

5/30

6/6 Holiday 6/13 Final Exam

Class Policies:

Bring your textbook to each class meeting.

Do not bring water or any other liquids into the lab.

Attendance Requirement:

A student will fail the course if he or she makes 6-hour absences, both

(2)

excused and unexcused. Being late for more than 30 minutes is counted as one-hour absence.

Grading:

Assignments 25%

Quiz 25%

Midterm Exam 25%

Final Exam 25%

Full attendance & active participation Bonus:2~5 points

參考文獻

相關文件

• P u is the price of the i-period zero-coupon bond one period from now if the short rate makes an up move. • P d is the price of the i-period zero-coupon bond one period from now

• P u is the price of the i-period zero-coupon bond one period from now if the short rate makes an up move. • P d is the price of the i-period zero-coupon bond one period from now

[r]

[r]

prUva, se U telemδ vel Uu UutrUs equipamentUs de cUmunicagaU electrδ nicUs cInitirein sinais sUnUrUS,UVigilanteir白

An n×n square is called an m–binary latin square if each row and column of it filled with exactly m “1”s and (n–m) “0”s. We are going to study the following question: Find

A finite group is nilpotent if and only if it’s a direct product of Sylow

The Hilbert space of an orbifold field theory [6] is decomposed into twisted sectors H g , that are labelled by the conjugacy classes [g] of the orbifold group, in our case