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"If and only if" (1 Viewer)
- Thread starter Estel
- Start date
CrashOveride
Active Member
prove it under some conditions??
whats the actual question
whats the actual question
CrashOveride
Active Member
Estel: Post up the bloody question =p
kimmeh
Sleeping
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- Jul 5, 2003
- Messages
- 4,501
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- Female
- HSC
- 2004
thats what i interpret it as, iff, only under certain conditions
If and only if means that you need to prove it both ways.
Casting around desperately for an example I find my analysis lecture notes
"A monotone sequence converges if and only if it is bounded"
Now without worrying about what the words mean this means that:
if a monotone sequence is bounded it converges
AND
if a monotone sequence converges it is bounded
So to prove that x^2 = y iff something you need to prove that something implies x^2 = y and that x^2 = y implies something.
cheers,
Martin
Casting around desperately for an example I find my analysis lecture notes
"A monotone sequence converges if and only if it is bounded"
Now without worrying about what the words mean this means that:
if a monotone sequence is bounded it converges
AND
if a monotone sequence converges it is bounded
So to prove that x^2 = y iff something you need to prove that something implies x^2 = y and that x^2 = y implies something.
cheers,
Martin
kpq_sniper017
Member
- Joined
- Dec 18, 2003
- Messages
- 672
either way, asking for help is still cheatingOriginally posted by Estel
It's rather useless without the accompanying material... and I don't really want to be accused of cheating (it's for mathsearch). I just want to know a general answer for how to answer an 'if and only if' question.
well, i guess it's not "cheating in a sense", but then again, what's the point of getting a prize/certificate if u didn't do it according to the suggested rules.
just on that.....i handed mine in today: only did around 10 exercises - estel, did u do every exercise up to Ex 22??? coz i just didn't bother.....lol - had more important things to do. ah well.
I didn't get a chance to read martin's comment before handing it in this morning... ahh well... least I can say I obtained zero help for the entire project...
I attempted every question seriously- up to 26. Tho I didn't prove the converses for the 'if and only if' theorems, and hence I shall lose valuable marks there for 2 questions.
*Wants to go to NMSS*
*Doubts will make it*
There are probably better things to do but the Abstract Cubolinear System was pretty neat you have to admit...
I attempted every question seriously- up to 26. Tho I didn't prove the converses for the 'if and only if' theorems, and hence I shall lose valuable marks there for 2 questions.
*Wants to go to NMSS*
*Doubts will make it*
There are probably better things to do but the Abstract Cubolinear System was pretty neat you have to admit
...
KeypadSDM
B4nn3d
Best way to prove it.
Prove both of these:
A => B
and
~A => ~B
I love that method, so cool.
Prove both of these:
A => B
and
~A => ~B
I love that method, so cool.
velox
Retired
Read the cambridge book, i think it explains in there
KeypadSDM
B4nn3d
If you need to show that y = x^2 proves something, sub in y = x^2, show the answer comes out, then sub in y = x^2 + c, and show the answer doesn't come out unless c = 0
The ~ means "not"
So prove that A implies B and that not A implies not B
The ~ means "not"
So prove that A implies B and that not A implies not B