Divisor: Difference between revisions
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imported>Robert Tito mNo edit summary |
imported>Sébastien Moulin (about 0 being a divisor) |
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Divisor ([[Number theory]]) | Divisor ([[Number theory]]) | ||
Given two [[integer]]s ''d'' and ''a'' | Given two [[integer]]s ''d'' and ''a'', d is said to ''divide a'', or ''d'' is said to be a ''divisor'' of ''a'', if and only if there is an integer ''k'' such that ''dk = a''. For example, 3 divides 6 because 3*2 = 6. Here 3 and 6 play the roles of ''d'' and ''a'', while 2 plays the role of ''k''. | ||
More examples: | More examples: | ||
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:2 '''does not''' divide 9 because there is no integer k such that 2*k = 9. Since 2 is not a divisor of 9, 9 is said to be an [[odd]] integer, or simply an [[odd]] number. | :2 '''does not''' divide 9 because there is no integer k such that 2*k = 9. Since 2 is not a divisor of 9, 9 is said to be an [[odd]] integer, or simply an [[odd]] number. | ||
*0 is never a divisor of any number. | *When ''d'' is non zero, the number ''k'' such that ''dk=a'' is unique and is called the exact [[quotient]] of ''a'' by ''d'', denoted ''a/d''. | ||
*0 is never a divisor of any number, except of 0 itself (because 0*k=0 for any k, but there is no k such that dk=0 if d is non zero). However, the quotient 0/0 is not defined, as any k would be convenient. Some authors require a divisor to be non zero in the definition in order to avoid this exception. | |||
[[Category:CZ Live]] | [[Category:CZ Live]] | ||
[[Category:Mathematics Workgroup]] | [[Category:Mathematics Workgroup]] |
Revision as of 03:39, 31 March 2007
Divisor (Number theory)
Given two integers d and a, d is said to divide a, or d is said to be a divisor of a, if and only if there is an integer k such that dk = a. For example, 3 divides 6 because 3*2 = 6. Here 3 and 6 play the roles of d and a, while 2 plays the role of k.
More examples:
- 6 is a divisor of 24 since 6*4 = 24. (We stress that 6 divides 24 and 6 is a divisor of 24 mean the same thing.)
- 5 divides 0 because 5*0 = 0. In fact, every integer except zero divides zero.
- 7 is a divisor of 49 since 7*7 = 49.
- 7 divides 7 since 7*1 = 7.
- 1 divides 5 because 1*5 = 5. In fact, 1 and -1 divide every integer.
- 2 does not divide 9 because there is no integer k such that 2*k = 9. Since 2 is not a divisor of 9, 9 is said to be an odd integer, or simply an odd number.
- When d is non zero, the number k such that dk=a is unique and is called the exact quotient of a by d, denoted a/d.
- 0 is never a divisor of any number, except of 0 itself (because 0*k=0 for any k, but there is no k such that dk=0 if d is non zero). However, the quotient 0/0 is not defined, as any k would be convenient. Some authors require a divisor to be non zero in the definition in order to avoid this exception.