BRAVO!!! I wish all math teachers elaborated math like you, LOL, & as hot as you are! :)) Positive that I'll ace my quiz tomorrow. Thank you very much. I'm surprised this video does not have much views.
Thank you! This is the video I've been looking for! I was looking to find information on how adding z0 to the equation of z(t)=re^it makes it a circle with center point z0
The parametrization for C2 should read , C2 : z(t)=(1-t)(-R)+t(-r)
while for C4 : z(t)=(1-t)(r)+t(R), where ( 0
Your welcome! Note that parametrizations of curves are not unique. Both mine and yours are correct - the preference depends on the application.
BRAVO!!! I wish all math teachers elaborated math like you, LOL, & as hot as you are! :)) Positive that I'll ace my quiz tomorrow. Thank you very much. I'm surprised this video does not have much views.
Thank you! This is the video I've been looking for! I was looking to find information on how adding z0 to the equation of z(t)=re^it makes it a circle with center point z0
Very clear and easy to follow.
Great teacher .👏❤
Thank you! This is the video I've been looking for!
Thank you for these two videos. Definitely cleared up this topic for me.
Very good, thank you!!! 👏👏
These videos are great! Keep it up! :)
Billiant. Thanks.
Thnk u so much sir god bless u
Explained! Thanks!!!
This same thing is in the book but without explanations 💓
@LeavingCertMaths You're welcome! - Bob
Thanks for uploading this
Thanks!
thank you :D
this just doesn't make sense in the textbook for me
Parametrizing curves is art form - here I'm only doing the basics.