![Roman Numerals I to MM: Liber De Difficillimo Computando Numerum](https://d3525k1ryd2155.cloudfront.net/f/213/153/9780618153213.IN.0.m.jpg)
Roman Numerals I to MM: Liber De Difficillimo Computando Numerum
por Geisert, Arthur
- Novo
- Brochura
- Condição
- Novo
- ISBN 10
- 0618153217
- ISBN 13
- 9780618153213
- Livreiro
-
San Diego, California, United States
Formas de pagamento
Sobre este item
HMH Books for Young Readers, 2001-09-24. Paperback. New. New. In shrink wrap. Looks like an interesting title!
Sinopse
With a farm of pigs as his abacus, Arthur Geisert uses elements of a search and count game to bring Roman numerals to life in this unintimidating math-concept book. First, the seven Roman numerals are equated with the correct number of piglets. Then the reader may practice counting other itemshot-air balloons, gopher holes, and moreas the remarkable adventure unfolds. (And yes, there are one thousand pigs in the etching for M!)
Avaliações
(Entrar ou Criar uma conta primeiro!)
Detalhes
- Livreiro
- GridFreed LLC
(US)
- Nº do estoque do livreiro
- Q-0618153217
- Título
- Roman Numerals I to MM: Liber De Difficillimo Computando Numerum
- Autor
- Geisert, Arthur
- Formato/Encadernação
- Brochura
- Estado do livro
- Novo
- Quantidade Disponível
- 1
- ISBN 10
- 0618153217
- ISBN 13
- 9780618153213
- Editorial
- HMH Books for Young Readers
- Local de publicação
- Boston, Massachusetts, U.s.a.
- Data de publicação
- 2001-09-24
Termos da venda
GridFreed LLC
30 day return guarantee, with full refund including original shipping costs for up to 30 days after delivery if an item arrives misdescribed or damaged.
Sobre o Vendedor
GridFreed LLC
Membro de Biblio desde 2021
San Diego, California
Sobre GridFreed LLC
We sell primarily non-fiction, many new books, some collectible first editions and signed books. We operate 100% online and have been in business since 2005.
Glossário
Alguns termos que podem ser usados ??nesta descrição incluem:
- New
- A new book is a book previously not circulated to a buyer. Although a new book is typically free of any faults or defects, "new"...