Rational Numbers
... written as a fraction is a rational number. Mixed numbers, integers, and many decimals can be written as fractions. ...
... written as a fraction is a rational number. Mixed numbers, integers, and many decimals can be written as fractions. ...
Full text
... xzn-i(x)tzn-2MFifty-four identities are derived which solve the problem for all cases except when both b amd m are odd; some special cases are given for that last possible case. Since fn(1)= Fn and zn(1)= Ln,thenth Fibonacci and Lucas numbers respectively, all of the identities derived here automati ...
... xzn-i(x)tzn-2MFifty-four identities are derived which solve the problem for all cases except when both b amd m are odd; some special cases are given for that last possible case. Since fn(1)= Fn and zn(1)= Ln,thenth Fibonacci and Lucas numbers respectively, all of the identities derived here automati ...
Rational Numbers
... second number, the sum is equal to the second number (example : 4 + 0 = 4) Multiplicative Identity – A number such that when you multiply it by a second number, the product is equal to the second number (example: 4 x 1 = 4) Additive Inverse – Two numbers are additive inverses if their sum is the ...
... second number, the sum is equal to the second number (example : 4 + 0 = 4) Multiplicative Identity – A number such that when you multiply it by a second number, the product is equal to the second number (example: 4 x 1 = 4) Additive Inverse – Two numbers are additive inverses if their sum is the ...
Document
... This is fundamentally different from demonstrating that if a statement S is true then a contradiction exists, which means that S must be false. In the case of Cantor's Proof we assume that the set of reals can be arranged into a list that contains all the members of the list. Then we assume that a v ...
... This is fundamentally different from demonstrating that if a statement S is true then a contradiction exists, which means that S must be false. In the case of Cantor's Proof we assume that the set of reals can be arranged into a list that contains all the members of the list. Then we assume that a v ...
Class Notes Mathematics Physics 201-202.doc
... A) Scalar: Specified by a single real number: time, temperature, mass, volume, energy B) Vector: An ordered n-tupe of real numbers: (x, y, z) or (x1, x2, x3) eg (1,-5,0) 1) The dimensionality of a space is the number of numbers needed to specify a point. 2) A vector in that space has exactly that ma ...
... A) Scalar: Specified by a single real number: time, temperature, mass, volume, energy B) Vector: An ordered n-tupe of real numbers: (x, y, z) or (x1, x2, x3) eg (1,-5,0) 1) The dimensionality of a space is the number of numbers needed to specify a point. 2) A vector in that space has exactly that ma ...
