The prototypical Boolean algebra; i.e. the Boolean algebra defined over the Boolean domain, has two elements in it: 0 and 1. For more information about Boolean algebra, please refer to the related link below.
Boolean Algebra is a type of math in which the values of the variables are true and false. The algebra is the basis for digital logic, computer programming and mathematical logic.
Algebra is a very broad topic covering all sorts of things, including Boolean algebra. Boolean algebra in itself is the study of a variable called "Boolean." This variable can only take two values: true and false. See 'related links' for more information.
Boolean algebra generally deals with design of h/w circuits forms a basis of the computer scientists,since computers can understand only machine level language which is of zeros and one so understanding of boolean algebra is important i think.more over boolean algebra also deals with minimalization of the logic design which has considerably reduced the size of hardware so according to me each and every computer scientist shouldhave a basic understanding of boolean algebra.
Boolean algebra is an area of algebra in which variables are replaced with 1 or 0 to indicate true or false. This form of algebra became the basis for binary computer programming used in digital electronic development.
Boolean algebra is the very basis for all of computing. Boolean algebra results in only 2 answers, true or false. To computers, these are represented by 0 and 1. This creates the binary system, which is how all computers operate.
J. Kuntzmann has written: 'Fundamental Boolean algebra' -- subject(s): Algebra, Boolean, Boolean Algebra
AND, OR, and NOT are the basic operators in Boolean Algebra.
Most likely it is called BOOLEAN ALGEBRA I.
A. G. Pinus has written: 'Boolean constructions in universal algebras' -- subject(s): Algebra, Boolean, Algebra, Universal, Boolean Algebra, Universal Algebra
George Boole invented Boolean algebra.
Chris A. Theodore has written: 'Boolean algebra and digital computers' -- subject(s): Algebra, Boolean, Boolean Algebra, Logic circuits