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SEQUENCES OF REAL NUMBERS |
| Analysis | |
| 3. DEFINING A SEQUENCE OF REAL NUMBERS | |||||
| A sequence is an infinite
set of
real numbers (the
numbers which form the sequence are called
terms). All sequences have a first term and each term is followed by another. |
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4.- Look carefully at the sequence of fractions in the example.
5.- In your exercise book write down the 1st, 10th, 100th, 1,000th, 10,000th and 12,345th terms together with the terms that come before and after each one. Is there a final term? |
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| 4. EXPRESSING ANY TERM IN A SEQUENCE OF REAL NUMBERS | ||||||||
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This sequence can be denoted in a way which allows us to find the value of each term if we know its position in the sequence: |
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6.- Look at the following terms:
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| 5. THE GENERAL TERM OF A SEQUENCE OR NTH TERM | (an) |
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When a sequence can be represented by an algebraic expression (an) which allows us to work out its terms, as is the case in the example above, this expression is known as its general term or nth term. Most sequences you are going to work with will have a general term. |
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7.- In your exercise book write down the general term or nth term of the sequence in this window, the first ten terms of the sequence and the 23rd, 289th, 1,578th and 25,784th terms as well as its approximate decimal value. 8.- Do you know how to obtain any term? Write down how you would do it in your exercise book together with three examples. 9.- What would the last term in the sequence be? |
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| Juan Madrigal Muga | ||
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| Spanish Ministry of Education. Year 2002 | ||
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