| 1. | _Bus routes are marked by simple poles with pink and blue stripes.
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| 2. | At s = 1 it has a simple pole with residue 1.
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| 3. | Certainly is not zero, since has a simple pole at 1 } }.
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| 4. | Since those other poles are simple poles, calculating these is a piece of cake.
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| 5. | Converts divergences of the sum into simple poles on the complex " s "-plane.
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| 6. | Observe that ? has only simple poles with integer residues.
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| 7. | There is a second problem with this simple pole design.
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| 8. | Similarly, the first term, } }, corresponds to the simple pole of the zeta function at 1.
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| 9. | Where the power series expansion for about follows because has a simple pole of residue one there.
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| 10. | It's got one singularity, a simple pole at the origin, and we have residue equal to " i ".
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