An interesting mathematical property

AI Thread Summary
The discussion centers on the mathematical property where 3^3 can be expressed as a sum of differences between powers of 3, leading to the equation 27 = [27-9] + [9-3] + [3-1] + 1. This property is identified as a "collapsing sum," which some participants find unclear and seek further explanation on. The concept is compared to a telescoping series, which simplifies the understanding of such sums. Participants express confusion about the relevance of this property to game theory, with no clear connection established. The conversation highlights the mathematical curiosity surrounding the collapsing sum and its representation.
jaquecusto
Messages
12
Reaction score
0
3^3 = [3^3 - 3^2] +[3^2 - 3^1] + [3^1 - 3^0] + 3^0

Practical Demonstration:

27 = [27-9] + [9-3] + [3-1] + 1

27 = 18 +6+2+1

27 = 27

Is this property discussed in theory of games?
 
Mathematics news on Phys.org
I don't understand. What does this have to do with game theory?
 
I'm not sure how this has anything to do with game theory, but what you just found is what's called the collapsing sum.
 
gb7nash said:
I'm not sure how this has anything to do with game theory, but what you just found is what's called the collapsing sum.
What is that, exactly? I'm unclear on what the "interesting property" is. Obviously you can express any number as a sum of differences between a series of smaller numbers. I tried googling "collapsing sum" but found nothing helpful.
 
pmsrw3 said:
What is that, exactly? I'm unclear on what the "interesting property" is. Obviously you can express any number as a sum of differences between a series of smaller numbers. I tried googling "collapsing sum" but found nothing helpful.

I think he means a telescoping series: http://en.wikipedia.org/wiki/Telescoping_series of which the OP gave a (trivial) example.
 

Thread 'What Exactly is Dirac’s Delta Function? - Insight'

Insights auto threads is broken atm, so I'm manually creating these for new Insight articles. In Dirac’s Principles of Quantum Mechanics published in 1930 he introduced a “convenient notation” he referred to as a “delta function” which he treated as a continuum analog to the discrete Kronecker delta. The Kronecker delta is simply the indexed components of the identity operator in matrix algebra Source: https://www.physicsforums.com/insights/what-exactly-is-diracs-delta-function/ by...
View full post »

Thread 'Fermat's Last Theorem'

Fermat's Last Theorem has long been one of the most famous mathematical problems, and is now one of the most famous theorems. It simply states that the equation $$ a^n+b^n=c^n $$ has no solutions with positive integers if ##n>2.## It was named after Pierre de Fermat (1607-1665). The problem itself stems from the book Arithmetica by Diophantus of Alexandria. It gained popularity because Fermat noted in his copy "Cubum autem in duos cubos, aut quadratoquadratum in duos quadratoquadratos, et...
View full post »
Thread 'Imaginary Pythagorus'

Thread 'Imaginary Pythagorus'

I posted this in the Lame Math thread, but it's got me thinking. Is there any validity to this? Or is it really just a mathematical trick? Naively, I see that i2 + plus 12 does equal zero2. But does this have a meaning? I know one can treat the imaginary number line as just another axis like the reals, but does that mean this does represent a triangle in the complex plane with a hypotenuse of length zero? Ibix offered a rendering of the diagram using what I assume is matrix* notation...
View full post »

Similar threads

MHB Is a Number Divisible by 15 and 18 Also Divisible by 27?
Replies
2
Views
1K
MHB [ASK] Exponents and Roots Simplification problem
Replies
12
Views
2K
B Natural Numbers contain all the Primes
Replies
24
Views
3K
MHB 7.t.27 Write an equation for a sinusoidal graph with the following properties:
Replies
3
Views
2K
A new form of addition?
Replies
8
Views
1K
MHB If f(3x) = f(3) + f(x) , then prove that : f(1) = f(3) =f(9) = f(27) = f(81) = 0
Replies
6
Views
2K
MHB (Seemingly) Random Sequences
Replies
7
Views
2K
MHB Jason's calculus questions
Replies
4
Views
11K
I Geometry problem of interest with a 3-4-5 triangle
2
Replies
59
Views
2K
B A question regarding multiples of 3
Replies
6
Views
2K

Hot Threads

Recent Insights

Back
Top