| ucf06-003 From a Fall 1982 exam of Professor Ribet: Suppose \( \epsilon \) is a number such that \( 0< \epsilon < 1 \). In terms of \( \epsilon \), find a positive number \( \delta \) such that \(|1/x - 1/2| < \epsilon \) is true whenever \( |x-2| < \delta \) is true. |
| ucf07-004
|
| ucf09-003 Calculate \( \lim_{ x \to 2} f(x) \) and \( \lim_{ x \to 0} f(x) \) for each of the following.
|
| ucf10-002
|
| ucf12-001 Quadratics
|
<—Previous 1 2 3 4 Next—>