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CONTINUITY The man-in-the-street understanding of a continuous process is something that proceeds smoothly, without breaks or interruptions. Consequently,

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Presentation on theme: "CONTINUITY The man-in-the-street understanding of a continuous process is something that proceeds smoothly, without breaks or interruptions. Consequently,"— Presentation transcript:

1 CONTINUITY The man-in-the-street understanding of a continuous process is something that proceeds smoothly, without breaks or interruptions. Consequently, for a function to be called “continuous”, we would expect its graph to be a smooth line, without breaks or interruptions.

2 Let’s look at some graphs we would definitely not call continuous ; the best way to define “day” is to think of “night”, “happy” is meaningless unless you know “sad”, most concepts are better understood via their opposites ! Here is a function whose graph you would definitely not call continuous, it jumps at every integer! The formal definition of is

3 (The notation is somewhat different from the textbook’s, it means the greatest integer ≤ ) Here is the graph

4 There’s a break at every integer! What’s the trouble? Here is another

5 A break at 3 again! Two more graphs.

6 A hole at 2 ! On the right the hole has been incorrectly filled. The next example is the messiest.

7

8 Talk about not smooth! A little better:

9 What do these pictures tell us about our intuitive notion of a continuous graph? There should be: No holes No jumps No uncertainties. To a mathematician these mean:

10 (the order is mixed up.) These three are condensed in: And formally:

11 CONTINUITY AT Definition. The function is said to be continuous at if (all three previous conditions are assured by this statement.) Now by application of the three statements

12 No. 1 If, where and are polynomials, and then we get that every rational function is continuous at every point where it is defined. No. 2 (usual caveat about n) gives us that

13 radicals of continuous functions are continuous wherever the are defined. Finally, from No.3 We get that All trigonometric functions are continuous wherever they are defined. Finally, if and are continuous at then so are,, and if

14 What about the composition ? A look at this picture tells us that If is continuous at and is continuous at then is continuous at

15 Intermediate Value Theorem Probably the most important (useful) property of continuous functions is the following Theorem. If is continuous at every, then for every number between and there is at least one such that A picture will help:

16 Here is the situation:

17 You can’t join the two red dots “continuously without crossing the blue dotted line.

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