Interesting mathematical statements (2 Viewers)

leehuan

Well-Known Member
Joined
May 31, 2014
Messages
5,805
Gender
Male
HSC
2015
A must know for the Ext 2 student:

Fundamental Theorem of Algebra
 

leehuan

Well-Known Member
Joined
May 31, 2014
Messages
5,805
Gender
Male
HSC
2015
This has appeared elsewhere on this forum before:

Expressions for the Golden Ratio


 

leehuan

Well-Known Member
Joined
May 31, 2014
Messages
5,805
Gender
Male
HSC
2015
Very famous result on what e actually is:



Still famous but not as famous result on what e is, esp amongst HSC students:

 

leehuan

Well-Known Member
Joined
May 31, 2014
Messages
5,805
Gender
Male
HSC
2015
Tbh isn't the first statement really just a Taylor series?
 

InteGrand

Well-Known Member
Joined
Dec 11, 2014
Messages
6,109
Gender
Male
HSC
N/A
Tbh isn't the first statement really just a Taylor series?
Yeah, but sometimes it's actually more convenient to define functions by their power series representation and then prove other things about them.
 

Paradoxica

-insert title here-
Joined
Jun 19, 2014
Messages
2,556
Location
Outside reality
Gender
Male
HSC
2016
Yeah, but sometimes it's actually more convenient to define functions by their power series representation and then prove other things about them.








The first and second statements are nearly equivalent down to the family of solutions for any differential equation.

The third statement is somewhat convoluted.
 

dan964

what
Joined
Jun 3, 2014
Messages
3,479
Location
South of here
Gender
Male
HSC
2014
Uni Grad
2019
987654321 is divisible by 9
987654312 is divisible by 8 (this particular one gives 123456789 btw)
987654213 is divisible by 7
987653214 is divisible by 6
987643215 is divisible by 5
987543216 is divisible by 4
986543217 is divisible by 3
976543218 is divisible by 2
876543219 is divisible by 1

0123456789 * 2 = 246913578 (a permutation of 0123456789)
And likewise up to 100; excluding multiples of 3
 

Soulful

HSC Hipster
Joined
Jul 20, 2013
Messages
332
Gender
Undisclosed
HSC
2015
There is approximately a 50% chance of two people sharing the same birthday in a room of 23 people
 

Paradoxica

-insert title here-
Joined
Jun 19, 2014
Messages
2,556
Location
Outside reality
Gender
Male
HSC
2016
There is approximately a 50% chance of two people sharing the same birthday in a room of 23 people
This is, of course, assuming that every birthday date is identically probable, and that leap years do not exist, and that birthdays are treated as truly random. Under these conditions, a group of 70 people have a 99.9% chance of two people sharing a birthday.
 

AAEldar

Premium Member
Joined
Apr 5, 2010
Messages
2,246
Gender
Male
HSC
2011
Certainly not a pure mathematician, but Cauchy's Integral Formula stands out for me.

Then I moved to stats.
 

Paradoxica

-insert title here-
Joined
Jun 19, 2014
Messages
2,556
Location
Outside reality
Gender
Male
HSC
2016
Certainly not a pure mathematician, but Cauchy's Integral Formula stands out for me.

Then I moved to stats.
That's not a bad thing, there are unsolved problems in stats applicable to the real world such as p-values, error values, correlation vs. causation, interpolation of data, etc.
Most of these are relevant to the sciences, as statistical methods are required for collecting any information. Even the medical fields and the humanities require it.

But I digress.



 

braintic

Well-Known Member
Joined
Jan 20, 2011
Messages
2,137
Gender
Undisclosed
HSC
N/A
There is a lot of highly theoretical mathematics here.
Does anyone have more real-world mathematical statements?
(The birthday problem was a good one)
 

Paradoxica

-insert title here-
Joined
Jun 19, 2014
Messages
2,556
Location
Outside reality
Gender
Male
HSC
2016
There is a lot of highly theoretical mathematics here.
Does anyone have more real-world mathematical statements?
(The birthday problem was a good one)
The Kakeya Needle Problem: What is the smallest area of a parking lot in which you can have a needle of length 1 turn around 180 degrees and return to its starting position, pointing in the other direction?

Answer: The area can be made arbitrarily small through a series of divisions and transformations of the shape required for the needle to turn around. Hence, no smallest area exists.
 

InteGrand

Well-Known Member
Joined
Dec 11, 2014
Messages
6,109
Gender
Male
HSC
N/A
The Kakeya Needle Problem: What is the smallest area of a parking lot in which you can have a needle of length 1 turn around 180 degrees and return to its starting position, pointing in the other direction?

Answer: The area can be made arbitrarily small through a series of divisions and transformations of the shape required for the needle to turn around. Hence, no smallest area exists.
This isn't very "practical" though, since the car / needle needs to be made arbitrarily thin if you want the area to be arbitrarily small. For anyone interested, there is a Numberphile video on the Kakeya Needle Problem: www.youtube.com/watch?v=j-dce6QmVAQ

 
Last edited:

Paradoxica

-insert title here-
Joined
Jun 19, 2014
Messages
2,556
Location
Outside reality
Gender
Male
HSC
2016
This isn't very "practical" though, since the car / needle needs to be made arbitrarily thin if you want the area to be arbitrarily small. For anyone interested, there is a Numberphile video on the Kakeya Needle Problem: www.youtube.com/watch?v=j-dce6QmVAQ
Well the problem never stated any width. It is a mathematical solution, after all.





 

InteGrand

Well-Known Member
Joined
Dec 11, 2014
Messages
6,109
Gender
Male
HSC
N/A
Well the problem never stated any width. It is a mathematical solution, after all.





Haha yeah, it is an interesting result, I just meant that it's not really real-world as braintic wanted.
 

Users Who Are Viewing This Thread (Users: 0, Guests: 2)

Top