http://www
... that Z(p)* is a group under multiplication mod p. Sometimes the term "multiplicative group" is used. Since Z(p)* is a group under multiplication, it is also a group under exponentiation (taking powers), since the n-th power of a number is simply the multiplication of a number by itself n times. (Not ...
... that Z(p)* is a group under multiplication mod p. Sometimes the term "multiplicative group" is used. Since Z(p)* is a group under multiplication, it is also a group under exponentiation (taking powers), since the n-th power of a number is simply the multiplication of a number by itself n times. (Not ...
Mathematical Reasoning: Writing and Proof
... Students are introduced to a method to organize their thought processes when attempting to construct a proof that uses a so-called know-show table. (See Section 1.2 and Section 3.1.) Students use this table to work backward from what it is they are trying to prove while at the same time working forw ...
... Students are introduced to a method to organize their thought processes when attempting to construct a proof that uses a so-called know-show table. (See Section 1.2 and Section 3.1.) Students use this table to work backward from what it is they are trying to prove while at the same time working forw ...
with Floating-point Number Coefficients
... where are numbers so determined as not to generate abnormal sequence. The polynomial sequence calculated by (12) is not the polynomial remainder sequence, but it is free from numerical unstability and it allows us to calculate an approximate GCD. Sch\"onhage analized the time complexity of his algor ...
... where are numbers so determined as not to generate abnormal sequence. The polynomial sequence calculated by (12) is not the polynomial remainder sequence, but it is free from numerical unstability and it allows us to calculate an approximate GCD. Sch\"onhage analized the time complexity of his algor ...
enciclopedia matematica a claselor de numere întregi
... To make an introduction to a book about arithmetic it is always difficult, because even most apparently simple assertions in this area of study may hide unsuspected inaccuracies, so one must always approach arithmetic with attention and care; and seriousness, because, in spite of the many games base ...
... To make an introduction to a book about arithmetic it is always difficult, because even most apparently simple assertions in this area of study may hide unsuspected inaccuracies, so one must always approach arithmetic with attention and care; and seriousness, because, in spite of the many games base ...