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Could you perhaps give us a better equation to work with? I fully agree that the current equation is too simple.Pierce89 wrote:Wow! As a person working on a double major in mechanical and aeronautical engineering, I'm really uncomfortable in this thread. You people are just slinging half truths and downright incorrect assertions all over. A lift generating wing of infinite AR will still produce induced drag because of the pressure differences on each side.
I actually posted that very same link on either the first or second page of this topic. But again, they say it there; "For a wing, the total drag coefficient, Cd is equal to the base drag coefficient at zero lift Cdo plus the induced drag coefficient Cdi."turbof1 wrote:Yeah I was in a hurry. Do we have a good drag formula for conventional aerofoils? From an other website, there's this very simple formula:
http://www.propdesigner.co.uk/assets/im ... rag204.gif
Again, very simple and very theoritical (duh, as we are speaking about infinity in the first place). Again, the whole formula is getting devided by consequent A.R. .
(Of course again this isn't relevant to real life wings and relevant to the discussion at hand, doesn't count in induced drag by wing tip.)
There's also this that looks like a very interesting article:
http://www.grc.nasa.gov/WWW/k-12/airplane/induced.html
Again the theory falls short on the fact that the wing tip produces induced drag too. What I think is that moving the A.R. to infinity, wingtip induced drag becomes a constant for a given chord.
Your point about an infinite AR wing still producing induced drag is what I have been trying to say.Pierce89 wrote:Wow! As a person working on a double major in mechanical and aeronautical engineering, I'm really uncomfortable in this thread. You people are just slinging half truths and downright incorrect assertions all over. A lift generating wing of infinite AR will still produce induced drag because of the pressure differences on each side.
Mostly from the people arguing against you on various matters. It seems you're one of the people actually worth reading.trinidefender wrote:Your point about an infinite AR wing still producing induced drag is what I have been trying to say.Pierce89 wrote:Wow! As a person working on a double major in mechanical and aeronautical engineering, I'm really uncomfortable in this thread. You people are just slinging half truths and downright incorrect assertions all over. A lift generating wing of infinite AR will still produce induced drag because of the pressure differences on each side.
I am curious though. What other "half truths and downright incorrect assertions" do you see?
Just to be clear: Cdo is friction drag + form drag right? Which isn't induced drag.trinidefender wrote:I actually posted that very same link on either the first or second page of this topic. But again, they say it there; "For a wing, the total drag coefficient, Cd is equal to the base drag coefficient at zero lift Cdo plus the induced drag coefficient Cdi."turbof1 wrote:Yeah I was in a hurry. Do we have a good drag formula for conventional aerofoils? From an other website, there's this very simple formula:
http://www.propdesigner.co.uk/assets/im ... rag204.gif
Again, very simple and very theoritical (duh, as we are speaking about infinity in the first place). Again, the whole formula is getting devided by consequent A.R. .
(Of course again this isn't relevant to real life wings and relevant to the discussion at hand, doesn't count in induced drag by wing tip.)
There's also this that looks like a very interesting article:
http://www.grc.nasa.gov/WWW/k-12/airplane/induced.html
Again the theory falls short on the fact that the wing tip produces induced drag too. What I think is that moving the A.R. to infinity, wingtip induced drag becomes a constant for a given chord.
"Cd = Cdo + Cdi"
I said he same thing just in more lengthy terms, "The way you can think about it is induced drag is only zero (in any direction) if the lifting force is also zero. The moment you introduce a lifting force (on an aircraft through the action of increasing angle of attack on the wings) induced drag starts to take effect."
So yes I guess the real conclusion we have come to is that by having an infinite wingspan there is obviously no spanwise flow. With no spanwise flow and the theoretical infinite wingspan it becomes almost impossible, especially with our limited resources, to accurately model theoretical physics. (Reading that in my head made me laugh a little that we have even reached theoretical physics). Do you guys, and girls, agree with me on that?
Now an interesting thing and to bring this full circle back to F1 is, if you look at it, the closest thing to an F1 wing in aviation is a closed loop wing. Here is a link with some pictures of a working plane that has a wing like that http://englishrussia.com/2009/03/05/ellipse-wings/
If anybody is up for a bit of reading take a look at this, http://aero.stanford.edu/reports/VKI_nonplanar_Kroo.pdf
I didn't finish it yet but it is about closed loop wings and it may help us to understand the dynamics of the rear wing better.
It isn't that you stepped in at in at an inopportune time. It is that you didn't read the thread in its entirety, yes I know it is long. If you did and read the sources provided you will understand more. You seem to be stuck in the same trap that many others are in thinking that induced drag is only created at the wingtips.NoDivergence wrote:I may have stepped in here at an inopportune time, but has anyone actually looked at the CDi equation?
AR -> infinity means no induced drag. Think of it this way. The entire culmination of vorticity is accumulated and then shed at the wingtip. With a wall there, high pressure region cannot escape to the low pressure region.
Yes, I got that. I just want to make sure this doesn't include induced drag anymore, but since induced drag is 'induced' by lift, Cdo is just a sum of all kinds of other types of drag.turbof1 read the sentence above the formula that I quoted. "base drag coefficient at zero lift Cdo" therefore Cdo is all drag created that isn't created in the production of lift, or in Formula 1's case, downforce.
Yes I am.What I think you are asking is. Is there a formula you can use to find the lift and drag forces FOR A DEFINED SECTION of an infinite wingspan wing? Is that what you are asking? If so, then no I do not have a formula for that. Pierce might.
You're not getting it. By definition, induced drag can only be determined for a finite wing. When you conduct vortex lattice method, you have two trailing vortices and a bound vortex in between to make a horseshoe vortex for each panel, and the span must be FINITE.trinidefender wrote:This is for finite wings but applies to what we are talking about, not the infinite wingspan part, and explains a lot about drag, induced drag, lift vectors, vortices, various laws and theories used in aerodynamics and their respective equations. Give it a read guys and girls.
http://www.tongji.edu.cn/~zyjin/aerodyn ... apter5.pdf
Some downwash is from a wingtip. If have a flat wing set at an angle to the airflow it will change the direction of the airflow. Is this change in direction not downwash? While you aren't really incorrect in a lot of what you say, the fact remains that we have gone into the realm of theoretical physics. I have been trying to bring this thread back on topic of induced drag and how it relates to real wings.NoDivergence wrote:You're not getting it. By definition, induced drag can only be determined for a finite wing. When you conduct vortex lattice method, you have two trailing vortices and a bound vortex in between to make a horseshoe vortex for each panel, and the span must be FINITE.trinidefender wrote:This is for finite wings but applies to what we are talking about, not the infinite wingspan part, and explains a lot about drag, induced drag, lift vectors, vortices, various laws and theories used in aerodynamics and their respective equations. Give it a read guys and girls.
http://www.tongji.edu.cn/~zyjin/aerodyn ... apter5.pdf
With infinite aspect ratio, you are talking about aerodynamics that relates to a 2D airfoil. You do not get downwash without a finite wing. I mean jeez, even the source you cite here (which I have read several years ago), mentions that downwash w is from wingtip trailing vortices (and the resultant downwash between them and upwash on the outside of them). This downwash is what changes the effective angle of attack, giving the force vector of induced drag.
Look at Prandtl's classical lifting line eq. Guess what happens when b goes to infinity? w goes to 0.
Sure, you can get a sectional lift from a rho Vinf gamma(y0), but to get lift for a wing you need to integrate across the span.