| Mission 9 : Differentiation 微分 |
|
|
|
| Technique 1: |
Standard Differentiation |
標準微分法 |
| Technique 2: |
Higher Differentiation |
高階導數 |
| Technique 3: |
Leibniz’s Theorem |
萊布尼茲定理 |
| Technique 4: |
Mean-Value Theorem |
中值定理 |
| Technique 5: |
Curve Sketching |
曲線的描繪 |
| |
|
|
| Mission 10 : Integration 積分 |
|
|
|
| Technique 1: |
Standard Form |
標準模式 |
| Technique 2: |
Integration by substitution |
代換積分法 |
| Technique 3: |
Integration by part |
分部積分法 |
| Technique 4: |
Reduction Formula |
歸約公式 |
| Technique 5: |
Properties of Definite Integral |
定積分的特性 |
| Technique 6: |
Second Mean-Value Theorem |
第二中值定理 |
| Technique 7: |
Application of Integration |
積分法的應用 |
| Technique 8: |
Integration Technique |
積分必殺技 |
| |
|
|
| Mission 11 : Complex Number 複數 |
|
|
|
| Technique 1: |
Standard Form, Polar Form |
標準形式及模幅形式 |
| Technique 2: |
Conjugate |
共軛複數 |
| Technique 3: |
Locus |
軌跡 |
| Technique 4: |
Properties of Modulus and Argument |
模及幅角的特性 |
| Technique 5: |
De Moivre’s Theorem and its application |
棣美弗定理及應用 |
| |
|
|
| Mission 12 : Function 函數 |
|
|
|
| Technique 1: |
Injective, Surjective, Biijective |
內射、滿射、對射 |
| Technique 2: |
6 Functions Analysis |
六種函數分析 |
| |
|
|
