MHB Advanced Mathematics Assignment

hxns
Messages
1
Reaction score
0
Hi guys, I am in desperate need for help with my assignment in advanced maths. In my assignment, I am required to use geogebra to support in answering the given questions. If someone can help me, that will be greatly appreciated.View attachment 9041
 

Attachments

  • 61103097_1103313903208896_3342456056415518720_n.jpg
    61103097_1103313903208896_3342456056415518720_n.jpg
    10.2 KB · Views: 97
  • 61425639_386045348670419_8718288542884691968_n.jpg
    61425639_386045348670419_8718288542884691968_n.jpg
    10.2 KB · Views: 119
Mathematics news on Phys.org
Hi hxns and welcome to MHB.

I find those images too small to read.

The Introductions forum is for, well, introductions :o so I'm moving your thread to the Pre-University Algebra forum. If this is inappropriate let us know or, better still, post a larger image or type out your questions. (Please note that it is preferable that only a few questions are posted at a time to avoid lengthy posts and confusion).
 
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...
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...
I'm interested to know whether the equation $$1 = 2 - \frac{1}{2 - \frac{1}{2 - \cdots}}$$ is true or not. It can be shown easily that if the continued fraction converges, it cannot converge to anything else than 1. It seems that if the continued fraction converges, the convergence is very slow. The apparent slowness of the convergence makes it difficult to estimate the presence of true convergence numerically. At the moment I don't know whether this converges or not.
Back
Top