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(Created page with "'''Update 3''' * Explain linear approximation and the concept of the derivative being the best approximation of a function near a point * Conditions for differentiability * Polar coordinates * Parametric equations * Properties of limits * Notation of derivatives * Explains derivatives of higher orders * Chain rule * Where to add transcendental functions? * Explain the notation dy/dx (guidorizzi has it) * Limits at infinity, explain better than "Because x^2 grows without...") |
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* Explain the notation dy/dx (guidorizzi has it) | * Explain the notation dy/dx (guidorizzi has it) | ||
* Limits at infinity, explain better than "Because x^2 grows without limits" | * Limits at infinity, explain better than "Because x^2 grows without limits" | ||
* Properties of derivatives | |||
* Max and min | |||
Revision as of 18:36, 25 January 2022
Update 3
- Explain linear approximation and the concept of the derivative being the best approximation of a function near a point
- Conditions for differentiability
- Polar coordinates
- Parametric equations
- Properties of limits
- Notation of derivatives
- Explains derivatives of higher orders
- Chain rule
- Where to add transcendental functions?
- Explain the notation dy/dx (guidorizzi has it)
- Limits at infinity, explain better than "Because x^2 grows without limits"
- Properties of derivatives
- Max and min
