Jamie York's presentation which explains how each of the conic sections - ellipse, parabola, hyperbola - are generated by slicing a (mathematical) cone.
Maybe this professor didn't get the memo that the computers exist and that this can be visualized very easily. In fact one could find an existing video on yt depicting the animated conic sections.
Great hands on demonstration. Does his discussion of the slope of the cut correspond to the eccentricity of the conic section? I.e., clearly a horizontal cut (perpendicular to the axis of rotation of the cone) creates a circle with eccentricity 0, while a cut that is parallel to cone creates a parabola with eccentricity 1. Can ‘e’ be defined in general as a simple linear relationship concerning the slope of the cut or is it more complicated relationship for ellipses and hyperbolas?
Parabola was a little difficult to understand but once you said parallel to the surface of the cone its bang on.
Thank You it was an amazing visualisation!✨🌏🌍🌍
This is, How to a Mathematician plays with Clay and Develop a new amazing concept of Mathematics. 💓😊
I loved inagining what he said
What a wonderful explanation sir
I from India ✨
- THANKS U So MUCH sir
धन्यवाद सर प्रात्यक्षिकासह दर्शविल्याने समजले हीच एक अध्यापनाची सर्वोत्तम पद्धत आहे आनंददायी पद्धत आहे
Maybe this professor didn't get the memo that the computers exist and that this can be visualized very easily.
In fact one could find an existing video on yt depicting the animated conic sections.
love the explanation
Great hands on demonstration. Does his discussion of the slope of the cut correspond to the eccentricity of the conic section? I.e., clearly a horizontal cut (perpendicular to the axis of rotation of the cone) creates a circle with eccentricity 0, while a cut that is parallel to cone creates a parabola with eccentricity 1. Can ‘e’ be defined in general as a simple linear relationship concerning the slope of the cut or is it more complicated relationship for ellipses and hyperbolas?
Thanks!
wonderful explaining
thank you so much sir .
love from india
Amazing explaination...
Excellent
Good explanation sir
Thank u for this.
Amazing
Thank u sir🙏
Wow thanku sir
Prof.ha provato a sezionare un cilindro con un piano inclinato? Troverà una bella ellisse!
thanks 👍!!!
Nice
Jiggy
Wow
Wah
Jordan Peterson 2.0
Lmaoooo