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offices of proemland security public beautification projects ... I listen to your vision and learn about your business and your audience. I work with you to develop a solid plan-of-attack for your project within your price point ... custom tailored design solutions...
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www.additiveinverse.com/
www.additiveinverse.com/
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IN MATH: 1. n. opposite; the number which when added to another number yields zero, a number whose addition undoes the first number's addition. EX. Adding its opposite undoes adding the number: to undo adding a number, add its opposite. 2. n. on a number line, the number which is the ... IN ENGLISH: as defined above.
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www.mathnstuff.com/math/spoken/here/1words/a/a8.htm
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The sum of any number and its additive inverse is always a zero. To find the additive inverse of a number is simply finding the opposite of that number. Notice: when you are finding the additive inverse of a number, you are finding a number that if you add it to the given number the answer will be a zero.
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faculty.stcc.edu/zee/newpage112.htm
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additive inverse; The additive inverse of any number x is the number that gives zero when added to x. The additive inverse of 5 is -5.
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www.math.com/school/glossary/defs/additive_inverse.html
www.math.com/school/glossary/defs/additive_inverse.html
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Additive Inverse of a Number: The opposite of a number. For example, the additive inverse of 12 is -12. ... For example, the additive inverse of 12 is –12. The additive inverse of –3 is 3. Formally, the additive inverse of x is –x. Note: The sum of a number and its additive inverse is 0.
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www.mathwords.com/a/additive_inverse_number.htm
www.mathwords.com/a/additive_inverse_number.htm
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For all $a \in R$ , there exists $b \in R$ such that $a+b = 0$ (additive inverse) ... Attachments: uniqueness of additive inverse in a ring (Theorem) by alozano; zero times an element is zero in a ring (Theorem) by alozano; minus one times an element is the additive inverse in a ring (Theorem) by alozano;
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planetmath.org/encyclopedia/Ring.html
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In any ring $R$ , the additive identity is unique and usually denoted by $0$ . It is called the zero or neutral element of the ring and it satisfies the zero property under multiplication. The additive inverse of the zero must be zero itself.
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planetmath.org/encyclopedia/AdditiveInverseOfTheZeroInA...
planetmath.org/encyclopedia/AdditiveInverseOfTheZeroInARing.html
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minus(x,y) -- yields x-y, but see also difference.
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www.stanford.edu/~mluciano/M2-help/0211.html
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