Homogeneous Differential Equations Explained with a Hilarious Twist
ฝัง
- เผยแพร่เมื่อ 4 ก.พ. 2025
- Introduction to Homogeneous differential equation1: #differentialequation #furtheracademy #calculus
This looks simple enough, but we find that we cannot express the RHS in the form of 'x-factors' and 'y-factors', so we cannot solve by the method of separating the variables.
In this case we make the substitution y = vx, where v is a function of x. So y = vx. Differentiate with respect to x (using the product rule): dy/dx = v+x(dv/dx)
then you substitute for y and dy/dx in the main equation thereby transforming the Equation in to separable type.
Note: dy/dx =(x+3y)/2x is an example of a #homogeneous #differential #equation. This is determined by the fact that the total degree in x and y for each of the terms involved is the same (in this case, of degree 1). The key to solving every homogeneous equation is to substitute y = vx where v is a function of x. This converts the equation into a form which we can solve by separating the variables.
I'm Indian. Nice explanation sir 👍 👏 👌 ❤
Thanks and welcome😄
Love to have you here✨
❤ from india
Happy to have you here 😊❤️
Thank you boss
❤
God Bless you ❤❤❤🎉
Amen Nd you too✨🙏🏿💙
Thank you!🔥
@FURTHERACADEMY Amen Bro
hello sir
Hi, welcome to FURTHER ACADEMY.