The international best-seller that makes mathematics a thrilling exploration.In twelve dreams, Robert, a boy who hates math, meets a Number Devil, who leads him to discover the amazing world of numbers: infinite numbers, prime numbers, Fibonacci The international best-seller that makes mathematics a thrilling exploration.
In twelve dreams, Robert, a boy who hates math, meets a Number Devil, who leads him to discover the amazing world of numbers: infinite numbers, prime numbers, Fibonacci numbers, numbers that magically appear in triangles, and numbers that expand without . As we dream with him, we are taken further and further into mathematical theory, where ideas eventually take flight, until everyone-from those who fumble over fractions to those who solve complex equations in their heads-winds up marveling at what numbers can do.
Hans Magnus Enzensberger is a true polymath, the kind of superb intellectual who loves thinking and marshals all of his charm and wit to share his passions with the world. In The Number Devil, he brings together the surreal logic of Alice in Wonderland and the existential geometry of Flatland with the kind of math everyone would love, if only they had a number devil to teach it to them. ...Continua Nascondi
Letto da bimba, ripreso in mano da grandicella e l'ho trovato ancora delizioso. Mette voglia di approfondire a chi ha curiosità e interesse per la matematica, ma un bimbetto poco invogliato si disorienta e scappa, secondo me.
1. What did you like about the book?I liked how the main character in the book was a boy who had no interest in math whatsoever and had trouble in math class. Through hard work and lots of studying (with help from the number devil in his dreams) he1. What did you like about the book? I liked how the main character in the book was a boy who had no interest in math whatsoever and had trouble in math class. Through hard work and lots of studying (with help from the number devil in his dreams) he eventually became good at math. I also liked how at the end of each chapter, there was a problem for the reader to solve. Also, I liked how they related number concepts to other things. For example, the Bonacci numbers were related to finding the number of rabbits.
2. What did you dislike about the book? At certain points in the book, the main character had a bad attitude about math and the "number devil" agreed with him. This could potentially make the reader who has a bad attitude toward math keep that opinion instead of trying to change it. I also did not like some of the language in the book. There was one curse word and a couple of phrases that I would not have used.
3. What 3 connections did you make to the book? I remember when I had a teacher like Mr. Bockel who gave the class an extremely hard problem to solve and just let us try to figure it out on our own. It was frustrating and I felt like I didn't even want to try which is exactly how Robert felt about the pretzel problem. I also connected to the book simply because I have really strange dreams and I can connect with Robert because he is dreaming about far away lands and a number devil trying to teach him all about numbers. It made me want to keep reading the book to see what Robert would dream next. The book reminded me of an episode of a television show I watch. In an episode of One Tree Hill, the main character is having a problem with someone and while trying to find a solution, he falls asleep. In his dream he finds a solution and once he wakes up, uses it to resolve the conflict. This happens in a lot of tv shows where people find answers in their subconscious.
4.How will you integrate this book into your classroom? I would most likely not have the students read the entire book but certain chapters were very helpful. They would take a hard concept for students to understand and change it up so it would be more manageable. For example, when teaching students about raising a number to a power, I could have them read the chapter that discusses the "hopping" of a certain number. It could potentially be easier for them to think of exponents as "hopping". ...Continua Nascondi