When less is more visualizing basic inequalities /
The proofs in When Less is More are in the spirit of proofs without words, though most require at least a few words. The first inequalities presented in the book, such as the inequalities between the harmonic, geometric, and arithmetic mean, are familiar from analysis, but are given geometric proofs...
-д хадгалсан:
| Үндсэн зохиолч: | |
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| Байгууллагын зохиогч: | |
| Бусад зохиолчид: | |
| Формат: | Цахим Цахим ном |
| Хэл сонгох: | англи |
| Хэвлэсэн: |
[Washington, D.C.] :
Mathematical Association of America,
c2009.
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| Цуврал: | Dolciani mathematical expositions ;
no. 36 |
| Нөхцлүүд: | |
| Онлайн хандалт: | An electronic book accessible through the World Wide Web; click to view |
| Шошгууд: |
Шошго нэмэх
Шошго байхгүй, Энэхүү баримтыг шошголох эхний хүн болох!
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| Тойм: | The proofs in When Less is More are in the spirit of proofs without words, though most require at least a few words. The first inequalities presented in the book, such as the inequalities between the harmonic, geometric, and arithmetic mean, are familiar from analysis, but are given geometric proofs. The second and largest set of inequalities are geometric both in their statements and in their proofs. Toward the end of the book some inequalities are more analytical in their statements as well as their proofs--From publisher description. |
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| Биет тодорхойлолт: | xix, 181 p. : ill., ports. |
| Номзүй: | Includes bibliographical references (p. 171-177) and index. |