![Worksheet 1.6 Signed Numbers](http://s1.studyres.com/store/data/014094820_1-c1b33e9dc986f6ffb02e9ab4c521a9f7-300x300.png)
0,1,2,3… - mrmulholland
... Find the prime factorization of the numbers being compared. Ex. 48 + 18. 48 = 24 x 3 18 = 2 x 32. They have one 2 and one 3 in common. GCF = 2 x 3 = 6. To factor out the GCF. Ex. Rewrite the following expression by factoring out the GCF, ...
... Find the prime factorization of the numbers being compared. Ex. 48 + 18. 48 = 24 x 3 18 = 2 x 32. They have one 2 and one 3 in common. GCF = 2 x 3 = 6. To factor out the GCF. Ex. Rewrite the following expression by factoring out the GCF, ...
8. Graphing Simple Rational Functions
... touch the dotted line. The dotted x = -4 line the branches never touch is called an ‘asymptote.’ ...
... touch the dotted line. The dotted x = -4 line the branches never touch is called an ‘asymptote.’ ...
Additive Inverses
... Same-Add-Keep 2) To add integers with different signs, subtract the smallest absolute value from the largest. Use the sign of the number with the largest absolute value and. (DSL) ...
... Same-Add-Keep 2) To add integers with different signs, subtract the smallest absolute value from the largest. Use the sign of the number with the largest absolute value and. (DSL) ...
Operations on Rational Numbers
... 21 is read “the first power of two” or just “two.” 22 is read “the second power of two” or just “two squared.” 23 is read “the third power of two” or just “two cubed.” 24 is read “the fourth power of two.” 25 is read “the fifth power of two.” b5 is read “the fifth power of b.” nth Power of a If a is ...
... 21 is read “the first power of two” or just “two.” 22 is read “the second power of two” or just “two squared.” 23 is read “the third power of two” or just “two cubed.” 24 is read “the fourth power of two.” 25 is read “the fifth power of two.” b5 is read “the fifth power of b.” nth Power of a If a is ...
Division by zero
In mathematics, division by zero is division where the divisor (denominator) is zero. Such a division can be formally expressed as a/0 where a is the dividend (numerator). In ordinary arithmetic, the expression has no meaning, as there is no number which, multiplied by 0, gives a (assuming a≠0), and so division by zero is undefined. Since any number multiplied by zero is zero, the expression 0/0 also has no defined value and is called an indeterminate form. Historically, one of the earliest recorded references to the mathematical impossibility of assigning a value to a/0 is contained in George Berkeley's criticism of infinitesimal calculus in The Analyst (""ghosts of departed quantities"").There are mathematical structures in which a/0 is defined for some a such as in Riemann spheres and real projective lines; however, such structures cannot satisfy every ordinary rule of arithmetic (the field axioms).In computing, a program error may result from an attempt to divide by zero. Depending on the programming environment and the type of number (e.g. floating point, integer) being divided by zero, it may generate positive or negative infinity by the IEEE 754 floating point standard, generate an exception, generate an error message, cause the program to terminate, or result in a special not-a-number value.