Towards the next lecture on Jan 24, 2012, the notes for this and the previous lecture. It will be completed and uploaded once the subject is treated in full, then the link will be replaced.
Monday, January 23, 2012
Sunday, January 22, 2012
תרגיל בית מס’ 4
שלום,
מצורף קישור לתרגיל בית רביעי ואחרון.
תאריך הגשה: 31 בינואר. הפעם לא יתקבלו איחורים.
בהצלחה,
דימה
Tuesday, January 17, 2012
Tuesday, January 10, 2012
Lectures 11-12, January 3, 10 (2012)
Properties of continuous functions. Basic notions of topology
The standard list of properties of functions, continuous on intervals, includes theorems on intermediate value, on boundedness, on attainability of extremal values etc.
We explain that these results are manifestations of the following phenomenon. There are several properties of subsets of 
The general principle then can be formulated (vaguely) as follows: the topological properties are preserved by continuous maps (or their inverses).
Wednesday, December 28, 2011
תרגיל בית מס’ 3
אין זמן למנוחה, ועל כן מוגש בפניכם תרגיל בית מס’ 3.
שימו לב כי יש לכם את כל הכלים לפתור את התרגיל, למרות שהוא עלול להיראות קשה ממבט ראשון.
תאריך אחרון להגשה: 10 בינואר.
בהצלחה!
Lecture 10, December 27, 2011
Continuity and limits of functions of real variable
In the first lecture we introduce the notion of continuity of a function at a given point in its domain and a very close notion of a limit at a point outside of the “natural” domain.
This notion is closely related to the notion of sequential limit as introduced earlier. This paves a way to generalize immediately all arithmetic and order results from numeric sequences to functions.
The novel features involve one-sided limits, limits “at infinity” and continuity of composition of functions.
The (unfinished) notes, to be eventually replaced by a more polished text, are available here: follow the updates, this temporary link will eventually be erased.
Lectures 8-9, December 13 and 20
Limits of sequences
We spend some time considering different flavors of “limit behavior”: stabilization, approximate stabilization etc. A sequence is called converging, if it 
To show that passing to a limit “respects” arithmetic operations, we need to work out a bit of “interval arithmetic” with a special attention to the division which may cause problems.
We discuss the weaker notion of a partial limit (accumulation point) and study under what assumptions a unique partial limit is the genuine limit.
Finally, we show that monotone bounded sequences always converge. This is one of the most powerful tools to show that the limit exists when it is not possible to compute it explicitly.
Tuesday, December 27, 2011
סיכום תירגולים בנושא סדרות והתכנסות
שלום לכולם,
מצורף קישור לקובץ בו תמצאו סיכום של הנושאים שלמדנו בשבועות האחרונים. כל הערה/תיקון יתקבלו בברכה רבה.
דימה
Tuesday, December 13, 2011
קובץ תרגילים לא להגשה
בקישור זה תוכלו למצוא שני תרגילים פשוטים בנושא שברים משובלים.
לא להגשה.
דימה
