  Rank: Administration Groups: Administrators
Joined: 7/11/2008(UTC) Posts: 751   Was thanked: 218 time(s) in 120 post(s)
|
Title: Animation curve fitting using a hinged mechanism. Author: Fridel Selitsky Download: Lemniscate_mod.sm.  
|
 3 users thanked smath for this useful post.
|
on 11/6/2010(UTC), on 11/8/2010(UTC), on 10/2/2012(UTC)
|
|
|
  Rank: Advanced Member Groups: Registered, Advanced Member Joined: 6/23/2009(UTC) Posts: 1,094  Was thanked: 88 time(s) in 80 post(s)
|
Hello Andrey  , Nice example of how to simulate an animation using rfile, wfile and F9. Regards, Radovan
|
|
|
|
|
|
 Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100  Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
Chebyshev’s Lambda MechanismLambda mechanism is another four-bar straight line generator. Crank link can rotate 360 degrees while the coupler point moves on coupler curve. Curve has two characteristic motions. First part is straight line and second part is a quick return curve. By pressing key F9 the top point of a connecting rod on some site describes a trajectory close to a straight line. http://smath.info/wiki/G...aspx?File=mechanizm2.rar
|
2 users thanked Ber7 for this useful post.
|
on 4/26/2011(UTC), on 10/2/2012(UTC)
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
Video event capture on the screen. 
|
|
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
|
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
The movement of the walking mechanism  http://smath.info/wiki/GetFile....x?File=MoventWalking.rarEdited by user Saturday, June 11, 2011 6:09:55 PM(UTC)
| Reason: Not specified
|
1 user thanked Ber7 for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
|
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
1 user thanked Ber7 for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
Russian Walking Machines "Vos'minog", developed by and manufactured in VolgGTU (Volgograd). Have a four-or six-walking mechanism. 1.four links   http://smath.info/wiki/G...e.aspx?File=Vosminog.rar
|
|
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
|
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
The motion of the figure, consisting of circular arcs  http://smath.info/wiki/GetFile.aspx?File=Kruk.rar
|
1 user thanked Ber7 for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
2 users thanked Ber7 for this useful post.
|
on 1/21/2012(UTC), on 10/2/2012(UTC)
|
|
|
Rank: Advanced Member Groups: Registered, Advanced Member Joined: 6/23/2009(UTC) Posts: 1,094 Was thanked: 88 time(s) in 80 post(s)
|
Animations of Ber7 are amazing, no doubt  There should be a gallery of all these fantastic animations in one dedicated place. Regards, Radovan
|
|
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
2 users thanked Ber7 for this useful post.
|
on 2/4/2012(UTC), on 10/2/2012(UTC)
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
1 user thanked Ber7 for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
3 users thanked Ber7 for this useful post.
|
on 2/19/2012(UTC), on 2/19/2012(UTC), on 10/2/2012(UTC)
|
|
|
 Rank: Advanced Member Groups: Registered
Joined: 3/30/2011(UTC)
Posts: 205
Was thanked: 56 time(s) in 47 post(s)
|
Hi I've run into this site of a GUI inventor? an thought Ber7 might be interested. It seems to me very inspiring. http://worrydream.com/For example, look at the 'kill math' section and the concepts about 'interactive exploration of a dynamical system'
|
1 user thanked kilele for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
|
1 user thanked Ber7 for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
Kinematics of a Moving Point File Attachment(s): Ber7 attached the following image(s):
|
1 user thanked Ber7 for this useful post.
|
|
|
|
Rank: Advanced Member Groups: Registered
Joined: 7/15/2010(UTC) Posts: 100 Location: Beer-Sheva Was thanked: 133 time(s) in 67 post(s)
|
Whirls are figures constructed by nesting a sequence of polygons (each having the same number of sides), each slightly smaller and rotated relative to the previous one. The vertices form logarithmic spirals. The problem is taken from the site http://mathworld.wolfram.com/Whirl.htmlFile Attachment(s): Ber7 attached the following image(s):
|
3 users thanked Ber7 for this useful post.
|
on 12/24/2012(UTC), on 12/24/2012(UTC), on 12/28/2012(UTC)
|
|
|
Forum Jump
You cannot post new topics in this forum.
You cannot reply to topics in this forum.
You cannot delete your posts in this forum.
You cannot edit your posts in this forum.
You cannot create polls in this forum.
You cannot vote in polls in this forum.
