DIFFERENTIAL EQUATION OF FIRST ORDER & FIRST DEGREE |S-2| ENGINEERING FIRST YEAR | SEM-2
Table of Contents
Title: Differential Equation of First Order & First Degree |S-2| Engineering First Year | Sem-2
Channel: SAURABH DAHIVADKAR
Description: A differential equation of first order and first degree can be written as f(x, y, dy/dx) = 0. For any differential equations, it is possible to find the general solution and particular solution. If in an equation, you can collect all the terms of x and dx on one side and all the terms of y and dy on the other side, then the variables are said to be separable. The general form of such an equation is f(x)dx = g(y)dy (or) f(x)dx + g(y)dy = 0. Contact for guest lectures, corporate training, motivational seminars, and career guidance.
Tutorial:
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Understanding Differential Equations: Start by understanding what a differential equation of first order and first degree is. It is represented as f(x, y, dy/dx) = 0.
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General and Particular Solutions: Learn how to find both the general solution and particular solution for any given differential equation.
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Separable Variables: If you can separate all the terms of x and dx on one side and all the terms of y and dy on the other side in an equation, then the variables are separable. The general form in such cases is f(x)dx = g(y)dy or f(x)dx + g(y)dy = 0.
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Contact for Further Assistance: If you need more help or guidance on engineering maths, differential equations, or any related topics, feel free to contact the channel for guest lectures, corporate training, motivational seminars, or career guidance.
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Engage on Social Media: Connect with the channel on various social media platforms like Facebook, Instagram, and Telegram for updates and additional resources.
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Good Luck: Wishing you all the best in your engineering studies and understanding of topics like differential equations in your first year.
By following these steps and understanding the concepts explained in the video, you will be able to grasp the fundamentals of first-order and first-degree differential equations in engineering mathematics.