In this series of webinars, Tim Brzezinski from GeoGebra Team explores a number of distance learning options and various other activities that can be accomplished with GeoGebra software:
Integrate GeoGebra activities into Google Classroom and other LMS's
Create your own GeoGebra activities and discovery lessons
Introduction to the entire platform
Explore Graphing Calculator and Geometry apps (Part 1)
Explore Graphing Calculator and Geometry apps (Part 2)
Explore 3D Calculator (Part 1)
Explore 3D Calculator (Part 2)
Explore 3D Calculator (Part 3)
We have, however, fully and natively integrated the GeoGebra Software and the Desmos Calculator into this forum. See them in action,
GeoGebra:
distance-learning-with-geogebra-6295?vi ... 754#p16754
Desmos Calculator:
distance-learning-with-geogebra-6295?vi ... 756#p16756
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Distance Learning with GeoGebra Software and Desmos Calculator
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Over 1500 mathematics resources:
https://docs.google.com/presentation/d/ ... sp=sharing
More resources:
https://phet.colorado.edu/en/simulations/category/html
https://docs.google.com/presentation/d/ ... sp=sharing
More resources:
https://phet.colorado.edu/en/simulations/category/html
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TSSFL -- A Creative Journey Towards Infinite Possibilities!
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TSSFL Stack is dedicated to empowering and accelerating teaching and learning, fostering scientific research, and promoting rapid software development and digital technologies
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TSSFL Stack is dedicated to empowering and accelerating teaching and learning, fostering scientific research, and promoting rapid software development and digital technologies
- Admin
- Site Admin
- Senior Expert Member
- Reactions: 56
- Posts: 383
- Joined: 10 years ago
- Has thanked: 38 times
- Been thanked: 32 times
- Contact:
TSSFL Stack is dedicated to empowering and accelerating teaching and learning, fostering scientific research, and promoting rapid software development and digital technologies
- Eli
- Senior Expert Member
- Reactions: 183
- Posts: 5334
- Joined: 9 years ago
- Location: Tanzania
- Has thanked: 75 times
- Been thanked: 88 times
- Contact:
\begin{multline}\Huge
\mathcal{F}_{\alpha \beta} = - \int({\rm ln} P)_{, \alpha \beta}P(x; \theta){\rm d}^{N}x \\
\Huge = - \mathbb{E}\left[ ({\rm ln} P)_{,\alpha \beta} \right] \\
\Huge = -\mathbb{E}\left[\dfrac{\partial^{2} {\rm ln} P}{\partial \theta_{\alpha} \partial \theta_{\beta}}\right].
\end{multline}
\mathcal{F}_{\alpha \beta} = - \int({\rm ln} P)_{, \alpha \beta}P(x; \theta){\rm d}^{N}x \\
\Huge = - \mathbb{E}\left[ ({\rm ln} P)_{,\alpha \beta} \right] \\
\Huge = -\mathbb{E}\left[\dfrac{\partial^{2} {\rm ln} P}{\partial \theta_{\alpha} \partial \theta_{\beta}}\right].
\end{multline}
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TSSFL -- A Creative Journey Towards Infinite Possibilities!
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