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....limoncello....
There are sin, cos etc
There are sinh, cosh etc (hyperbolic)
But we need sins, coss (square), sint, cost (triangle)!
Can you help me to create this animations?
The origin of the animation
Hi,
Undoubtedly it is an interesting topic, but, I'm sorry, I can not, I'm already busy with other jobs.
Greetings
FM
@-MFra- wrote:
Hi,
Undoubtedly it is an interesting topic, but, I'm sorry, I can not, I'm already busy with other jobs.
Greetings
FM
Hi,
Undoubtedly it is an interesting topic, but, I'm sorry, I can not, I'm already busy with other jobs.
Greetings
Val
@ValeryOchkov wrote:
@-MFra- wrote:
Hi,
Undoubtedly it is an interesting topic, but, I'm sorry, I can not, I'm already busy with other jobs.
Greetings
FMHi,
Undoubtedly it is an interesting topic, but, I'm sorry, I can not, I'm already busy with other jobs.
GreetingsVal
Hmmm ? Must we be afraid nowadays to simply say "me too" ?
@ValeryOchkov wrote:
There are sin, cos etc
There are sinh, cosh etc (hyperbolic)
But we need sins, coss (square), sint, cost (triangle)!
Can you help me to create this animations?
We sure don't need any sins or sint functions 🙂
Are you really looking for something like this?
No lemon, but maybe you can try to play around to get a decent Batman symbol
But rotation of the two must not necessarily be of the same speed:
And furthermore the rotation must not be counter clockwise for both and the center of rotation must not necessarily be the center of the regular polygon:
And at last, we don't have to use regular polygons at all:
In the" unusual" mechanism of Verner two hinges of the hinged quadrilateral
move along the sides of two polygons, and the other two draw graphs. I also want to show the "unusual" (cam mechanism) made in Smath Studio.
Today in Russia, a day off is a women's day. We have almost no women at the forum, alas. But my congratulations are also my congratulations!
Я поздравляю всех наших дам с 8 марта.
Мое поздравление математическое!
При создании этой анимации пришлось решать систему нелинейных алгебраических уравнений.
Женщинам тоже приходится решать много житейских уравнений - дома, на работе, с подругами, с друзьями...
А уравнение - это некий баланс, равновесие, лад, учет своих и чужих интересов, прав и обязанностей...
Пожелаем же нашим милым дамам чувства баланса, равновесия лада... Без этого счастливая жизнь невозможна.
One more fine animation
Fine too... A Bike. But rotations in different directions...
Here are a few more.
With a little imagination you can see a clown face here and there.
And here's the rest of it
Thank you, Werner.
I woke up in the morning, looked and my eyes became square from wailing and admiration ...
PS
There is a triangle, there is a quadrangle (a square for example), there is a polygon, there is an... infiniteangle (a circle or an ellipse), and there is... a twoangle:
But now I am going to do so!
The weather in Moscow is fine for it!
The sky run was fine!
But I thought not about the fine weather, not about the optimal temperature for sky (minus 7 grad), not about...
But about how many links, knots, traces of knots has this SnowLineMakersMachine (one German word for Werner) haben?
Can we draw all of them?
Help us Werner and all!
First but not main part
One more main but not quit correct (not steam but gas) part
But about how many links, knots, traces of knots has this SnowLineMakersMachine (one German word for Werner) haben?
Guess its called a snowcat or a snow groomer (in german: Pistenraupe)
@Werner_E wrote:
But about how many links, knots, traces of knots has this SnowLineMakersMachine (one German word for Werner) haben?
Guess its called a snowcat or a snow groomer (in german: Pistenraupe)
See please
Werner!
Send me please your cost, sint, coss and sins functions!
I would like to compare its with my ones!
Thanks Fridel!
But sorry!
It is not SMath but Mathcad forum.
One my student can create in C++ very interesting animation!
@ValeryOchkov wrote:
Werner!
Send me please your cost, sint, coss and sins functions!
As already written we don't need such functions.
I simply let a beam rotate with constant velocity and calculate the intersection with all segments of the guidance polygon and use the one nearest to the center of rotation. While being pretty inefficient it calculates quick enough and so I can use whatever kind of odd polygon I want. There are a lot of restrictions at the moment, though. Center has to be inside the polygon but no error check is done. And it does not work well for non-convex polygons as I forgot to check if the point of intersection lies within the linesegment or outside. It was just a quick hack anyway.
Maybe some day I correct those flaws and post the cleaned up sheet here.