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Theorem 1-a Let be a sequence: L L a) converges to a real number L iff every subsequence of converge to L Illustrations 0 0.

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Presentation on theme: "Theorem 1-a Let be a sequence: L L a) converges to a real number L iff every subsequence of converge to L Illustrations 0 0."— Presentation transcript:

1

2 Theorem 1-a Let be a sequence: L L a) converges to a real number L iff every subsequence of converge to L Illustrations 0 0

3 Theorem 1-b L. If L is a limit of, then L is the only limit of. Illustrations

4 Example 1

5 Example 2

6 Example 3

7 Theorem 1-c c) If is eventually in Illustration

8 d) If is eventually in Illustration Theorem 1-d

9 Theorem 2 Let be a sequence: a)If is bounded from above and increasing then it converge to the supremum of the range of. Illustration 5 It is bounded from above & increasing It converges to the sup of its range, which is 5

10 Question

11

12 Theorem 2 b) If is bounded from below and decreasing then it converges to the infimum of the range of. Illustration 0 It is bounded from below & decreasing It converges to the inf of its range which is 0

13 Theorem 3 A convergent sequence is bounded

14 Operations On Convergent Sequences

15 Illustrations Find

16 Examples

17 Solutions

18 Solutionss

19

20

21 Question

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