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95.36 Sequences of averages revisited

Published online by Cambridge University Press:  23 January 2015

Nick Lord
Nick Lord*
Affiliation:
Tonbridge School, Kent TN9 1JP
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Information
The Mathematical Gazette , Volume 95 , Issue 533 , July 2011 , pp. 314 - 317
Copyright
Copyright © The Mathematical Association 2012

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References

1. Gowers, J., Davis, G. and Miles, E., Sequences of averages, Math. Gaz. 70 (October 1986) pp. 200203.CrossRefGoogle Scholar
2. Problem 72.B, Problem Corner, Math. Gaz. 72 (October 1988) pp. 232233.Google Scholar
3. Sanders, P.. Averaging sequences, Math. Gaz. 78 (November 1994) pp. 326328.CrossRefGoogle Scholar
4. Flanders, H., Averaging sequences again, Math. Gaz. 80 (March 1996) pp.219222.Google Scholar
5. MacKinnon, N., Centre of mass by linear transformation, Math. Gaz. 72 (March 1988) pp. 3436.Google Scholar
6. Lord, N., An n-dimensional vector proof for Σ r2 , Math. Gaz. 72 (March 1988) pp. 3334.Google Scholar
7. Bentin, J., Regular simplicial distances, Math. Gaz. 79 (March 1995) p. 106.Google Scholar