Daily Archives: July 11, 2019

260 posts

Partial Fraction Decomposition – Example 2

Partial Fraction Decomposition – Example 2

Thanks to all of you who support me on Patreon. You da real mvps! $1 per month helps!! 🙂 https://www.patreon.com/patrickjmt !! Partial Fraction Decomposition – Example 2. In this video, I do a partial fraction decomposition where the denominator factors as a product of LINEAR factors.

Partial Fraction Decomposition – Example 4

Partial Fraction Decomposition – Example 4

Thanks to all of you who support me on Patreon. You da real mvps! $1 per month helps!! 🙂 https://www.patreon.com/patrickjmt !! Partial Fraction Decomposition – Example 4. Partial Fraction Decomposition – Example 1. In this video, I do a partial fraction decomposition where the denominator factors as a product of LINEAR and QUADRATIC factors.

Herman Yeung – Calculus –  Integration (Volume by shell method)11 積分求體積(外殼法)11

Herman Yeung – Calculus – Integration (Volume by shell method)11 積分求體積(外殼法)11

Note Download︰https://hermanutube.blogspot.hk/2016/01/youtube-pdf.html 中第23點 —————————————————————————— Calculus 微積分系列︰ https://www.youtube.com/playlist?list=PLzDe9mOi1K8o2lveHTSM04WAhaGEZE7xB 適合 DSE 無讀 M1, M2, 但上左 U 之後要讀 Calculus 的同學收睇 由最 basic (中三的 level) 教到 pure maths 的 level, 現大致已有以下內容︰ (1) Concept of Differentiation 微分概念 (2) First Principle 基本原理 (3) Rule development 法則證明 (4) Trigonometric skills 三角學技術 (5) Limit 極限 (6) Sandwiches Theorem 迫近定理 (7) Leibniz Theorem 萊布尼茲定理…

The Triangle Inequality for vectors is |a+b|≤|a|+|b|. (a) Give a geometric

The Triangle Inequality for vectors is |a+b|≤|a|+|b|. (a) Give a geometric

The Triangle Inequality for vectors is |a+b|≤|a|+|b|. (a) Give a geometric interpretation of the Triangle Inequality. (b) Use the Cauchy­-Schwarz Inequality from Exercise 61 to prove the Triangle Inequality. Leave a tip for good service: https://paypal.me/jjthetutor Student Solution Manuals: https://amzn.to/2WZrFnD More help via http://jjthetutor.com Download my eBooks via http://payhip.com/jjthetutor, paperback via http://amazon.com/author/jjthetutor.

Use a scalar projection to show that the distance from a point P1(x1, y1) to the line

Use a scalar projection to show that the distance from a point P1(x1, y1) to the line

Use a scalar projection to show that the distance from a point P1(x1, y1) to the line ax+by+c=0 is (|ax1+by1+c|)/sqrt(a^2+b^2). Use this formula to find the distance from the point (-2, 3) to the line 3x-4y+5=0. Leave a tip for good service: https://paypal.me/jjthetutor Student Solution Manuals: https://amzn.to/2WZrFnD More help via http://jjthetutor.com Download my eBooks via…