What is the difference between rational and irrational numbers?

AI Thread Summary
Rational numbers can be expressed as a fraction z = x/y, where x and y are integers, while irrational numbers cannot. A key characteristic of rational numbers is that their decimal expansion eventually repeats, such as 0.66666..., which can be represented as 2/3. In contrast, pi is classified as irrational because its decimal expansion does not repeat or terminate. The discussion also touches on the concept of bases, clarifying that the repeating decimal property holds true in any integer base. Understanding these distinctions is crucial for classifying numbers correctly.
VashtiMaiden
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Can someone pls help me on "rational and Irrational numbers". Esp. on Decimals. I can't classify if it is rational or irrational.
 
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If you can write z = x/y where x and y are integers, then z is rational. Otherwise z is irrational.
 
is pi rational?
 
is .66666... rational? why?
 
Is Pi rational? No. Not sure how to prove it though.
Is .66666... rational? Can you think of a fraction that gives .666666... ? I would hope you can.
 
ok, thanks nicksauce
 
for decimal form a useful fact is
a real nummber x is rational if and only if its decimal expansion at some point repeats.
let () be repeat this sequence
1/9=.(1) so rational
8134808921309.2872918752801(29148991280409) so rational

pi has no such patern, though this is not obvious
 
ah, ok,
 
lurflurf said:
for decimal form a useful fact is
a real nummber x is rational if and only if its decimal expansion at some point repeats.

Little off-topic, but here goes: I'm curious, is this not true in some integer base?
 
  • #10
If you mean "is it true in any integer base", yes.
 
  • #11
The question has been answered, but maybe I can help you grasp this a little easier. "Irrational" means that it cannot be expressed as a ratio (NOT that it is 'irrational' in the sense of not being reasonable.) Hence "irrational," or "un-ratio-expressable" if you will. A rational number, on the other hand, CAN be expressed as a ratio. It's "rational," or "ratio-expressable." Since a repeating decimal is given by the 'ratio' of two numbers, it is indeed rational (i.e. 'expressable as a ratio.')
 
  • #12
JohnDuck said:
Little off-topic, but here goes: I'm curious, is this not true in some integer base?

Sorry no
in base pi
pi which is irrational=10
4 which is rational=10.220122021

a problem with algebraic bases
in base root-2
root 2=10
2=100
 
  • #13
Did you miss the word "integer" in "integer base"?
 

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