Proofs  Problem 3  Vector Differentiation  Engineering Mathematics  4  Summary and Q&A
TL;DR
The video explains the proof of the third type of vector differentiation, specifically related to del log r.
Key Insights
 🧑💻 The video presents the third type of vector differentiation proof related to del log r.
 👀 It highlights the importance of solving the problem individually before watching the video for verification.
 ❣️ The proof involves differentiating log r with respect to x, y, and z.
 🤢 The equation del log r = r bar / r square is established through the differentiation steps.
 🕡 The concept of r bar, which is x i + y j + z k, is introduced in the proof.
 ❎ Taking the mod of r involves calculating the square root of the sum of squares of its components.
 🥴 The differentiation of log r with respect to x, y, and z is derived.
Transcript
hello friends in this video we'll be discussing vector differentiation type number three proof and this is our third proof welcome back friends this question is exactly similar to last two problems let's have a look on the given problem here we need to prove del log r is equal to r bar upon r square again r bar same story what is r bar r bar is x i... Read More
Questions & Answers
Q: What is the main concept being discussed in the video?
The video focuses on the proof of del log r = r bar / r square using vector differentiation.
Q: How can one approach solving this problem?
It is recommended to work through the steps of differentiation independently and then watch the video for verification and understanding.
Q: What is the difference between lhs and rhs in the proof?
The lhs represents the differentiation of log r with respect to x, y, and z, while the rhs simplifies to 1 / r square times r bar.
Q: Why is it important to practice solving this problem on your own?
Practicing the problem independently will help develop a better understanding of vector differentiation and strengthen problemsolving skills.
Summary & Key Takeaways

The video discusses the proof of del log r = r bar / r square, which involves vector differentiation.

It emphasizes the steps to solve the problem and suggests practicing it on your own.

The proof involves differentiating log r with respect to x, y, and z.