Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Night 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Night 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Night 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Night 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Night 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Night 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)