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Jul 6th, 2003, 09:30 PM
#1
Thread Starter
Fanatic Member
irrational conjugate Theorem
Hi, I am looking for a reference to the irrational conjugate theorem on the net. unfortunately, i only found a discussion from dr. math and in the footnote of another page. i was wondering if anyone has some websites or info that formally states the theorem.
Massey RuleZ! ^-^__  Cheers!  __^-^ Massey RuleZ!
Did you know that...
The probability that a random rational number has an even denominator is 1/3 (Salamin and Gosper 1972)? This result is independently verified by me (2002)!
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Jul 6th, 2003, 09:49 PM
#2
Lively Member
Irrational Conjugate Theorem?
Do you mean, as you stated, "the Irrational Conjugate Theorem", or, as Dr. Math. states, "the Irrational Conjugate Roots Theorem"?
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Jul 6th, 2003, 10:21 PM
#3
Thread Starter
Fanatic Member
even less matches on google for the irrational conjugate roots theorem!!! but i think they are the same thing
Massey RuleZ! ^-^__  Cheers!  __^-^ Massey RuleZ!
Did you know that...
The probability that a random rational number has an even denominator is 1/3 (Salamin and Gosper 1972)? This result is independently verified by me (2002)!
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Jul 7th, 2003, 03:12 PM
#4
Lively Member
Irrational conjugate roots theorem
bugzpodder, you wrote:
“Hi, I am looking for a reference to the irrational conjugate theorem on the net. unfortunately, i only found a discussion from dr. math and in the footnote of another page. i was wondering if anyone has some websites or info that formally states the theorem.”
Ás to the last part of your statement, DrMath.com, at
http://mathforum.org/library/drmath/view/52607.html
states:
“The irrational conjugate roots theorem says: Let p(x) be any polynomial with rational coefficients. If a + b*sqrt(c) is a root of p(x), where sqrt(c) is irrational and a and b are rational, then another root is a - b*sqrt(c). “
Is this the “info that formally states the theorum” that you are looking for? If not, please describe in more detail what your real question is.
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Jul 8th, 2003, 07:24 PM
#5
Thread Starter
Fanatic Member
i dont think this is formal enough. a university website like an ****.edu or a site like mathworld is formal. okay, fine, can anyone prove it?
Massey RuleZ! ^-^__  Cheers!  __^-^ Massey RuleZ!
Did you know that...
The probability that a random rational number has an even denominator is 1/3 (Salamin and Gosper 1972)? This result is independently verified by me (2002)!
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