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20 I. R. Shafarevichgreatest degree
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22 I. R. Shafarevich3. A positive i
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2 I. R. Shafarevichof an integer. F
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4 I. R. Shafarevichg: c: d:(r k;1 r
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6 I. R. ShafarevichTHEOREM 3. The n
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10 I. R. ShafarevichSuch considerat
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12 I. R. ShafarevichWe shall now ca
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14 I. R. ShafarevichFrom the dnitio
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16 I. R. ShafarevichIn the general
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18 I. R. Shafarevichall binomial co
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20 I. R. Shafarevichsubstracting th
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22 I. R. ShafarevichTHEOREM 8. The
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24 I. R. Shafarevichthat if n is ve
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26 I. R. Shafarevichof the two term
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28 I. R. ShafarevichOn the other ha
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30 I. R. ShafarevichBernoulli's pol
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66 I. R. ShafarevichFig. 1only one
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68 I. R. ShafarevichTHEOREM 1. If t
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70 I. R. ShafarevichIntersections a
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72 I. R. Shafarevichfollows: if M =
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74 I. R. Shafarevichis v(M 2 l) see
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76 I. R. ShafarevichIn order to exp
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78 I. R. ShafarevichApplying the sa
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80 I. R. Shafarevich7. Find the num
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16 I. R. Shafarevichn(M 1 \ M 2 )+n
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18 I. R. ShafarevichThis formula co
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20 I. R. ShafarevichWe can now appl
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22 I. R. Shafarevichthat n(M i1 \\M
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