Toronto Math Forum
Welcome,
Guest
. Please
login
or
register
.
1 Hour
1 Day
1 Week
1 Month
Forever
Login with username, password and session length
News:
Home
Help
Search
Calendar
Login
Register
Toronto Math Forum
»
APM346-2022S
»
APM346--Lectures & Home Assignments
»
Chapter 2
»
Transport Equation Derivation
« previous
next »
Print
Pages: [
1
]
Author
Topic: Transport Equation Derivation (Read 6264 times)
Yifei Hu
Full Member
Posts: 15
Karma: 0
Transport Equation Derivation
«
on:
January 18, 2022, 07:34:32 PM »
Can anyone help explain where does the Ut term in the second last line come from? Thanks
Logged
Victor Ivrii
Administrator
Elder Member
Posts: 2607
Karma: 0
Re: Transport Equation Derivation
«
Reply #1 on:
January 19, 2022, 05:06:34 AM »
It would be really helpfull if you explained where you took this from (if online TextBook--then section and equation number, if lecture then which lecture and which part).
Logged
Yifei Hu
Full Member
Posts: 15
Karma: 0
Re: Transport Equation Derivation
«
Reply #2 on:
January 23, 2022, 10:17:29 PM »
Hi Professor Ivrii, this comes from Christopher's lecture #3 when he discussed transport equation, directly from his lecture notes #3 on top of page 2 : )
Logged
Victor Ivrii
Administrator
Elder Member
Posts: 2607
Karma: 0
Re: Transport Equation Derivation
«
Reply #3 on:
January 24, 2022, 05:46:09 AM »
Then your best shot would be
either to ask during Prof Kennedy's Office hours
or to formulate the problem and define everything (that is $u, v, S, \tilde{S}$) here by yourself without screenshots
My guess that it is a
continuity condition
.
Logged
Print
Pages: [
1
]
« previous
next »
Toronto Math Forum
»
APM346-2022S
»
APM346--Lectures & Home Assignments
»
Chapter 2
»
Transport Equation Derivation