Equilateral and Equiangular Polygons

A polygon is a 2 dimensional geometric figure bound with straight sides. A polygon is called Equilateral if all of its sides are congruent. Common examples of equilateral polygons are a rhombus and regular polygons such as equilateral triangles and squares.  Now, a polygon is equiangular if all of its internal angles are congruent.  Some important facts to consider The only equiangular triangle is the equilateral triangle If P is an equilateral polygon that has more than three sides, it does not have to be equiangular. A rhombus with no right angle is an example of an equilateral but non-equiangular polygon.  Rectangles, including squares, are the only equiangular quadrilaterals Equiangular polygon theorem. Each angle of an equiangular n-gon is  $$\Bigg(\frac{n-2}{n}\Bigg)180^{\circ} = 180^{\circ} -   \frac{360^{\circ}}{n} $$ Viviani's theorem   Vincenzo Viviani (1622 – 1703) was a famous Italian mathematician. With his exceptional intelligence in math...
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Why this Blog?

About Me
I am no one special, just a 14 year old who just does what most kids my age do. I play a lot and goof a little. I love to hike, ski, and play a ton of soccer. I am one of the lucky few to get several vacations every year and memories of each of them have a very special place in my heart. I know Switzerland not from the Titlis mountain or the Jungfrau region, but from the miles and miles of hiking through the rolling hills, lush greenness, and the magnificence of the Matterhorn.

Norway blew my mind away when I experienced the 24 hour sun and the vastness of the Norwegian fjords. The Jurassic coast and the Roman baths in England replaced the London Eye for our to do list! I am thankful to my parents who have taught me to love to travel and hopefully, I can bring that forward.

Somewhere along my late elementary years, I was exposed to competition math. I won't say I am a born genius, however, I did enjoy pursuing some of the challenges. Its been over 5 years of these competitions. Some wins and some losses along the way were enough to make the journey exciting and worthwhile.

I hope to keep adding little math to this blog throughout my high school years. I also plan on posting my travel pictures along with my experiences to add some color to the blog. I hope you enjoy my writing and find it worth your time.

Why this Blog?
5 years and counting into math competitions, and I feel like I can help young kids put a structure around competitive math. The first time parents bring up competitive math, there is a lot of anxiety and a whole plethora of questions that arise in those young minds. In my experience, there are many resources when it comes to middle and high school competitions, but I rarely see anything geared towards the younger contestants. Competition math not only improves your analytical mindset, but can expose kids to pressures and the ability to deal with them early on in life. This blog is an attempt to introduce kids to resources for elementary and middle school competitions. I hope to make weekly updates to the blog and readers are encouraged to post any questions or leave comments or suggestions for future posts. I will try my best to answer them to your satisfaction. I will also be posting information about upcoming contests, eligibility, and registration guidelines. Hope you enjoy reading my posts and learn something in the process. 


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Popular posts from this blog

Equilateral and Equiangular Polygons

A polygon is a 2 dimensional geometric figure bound with straight sides. A polygon is called Equilateral if all of its sides are congruent. Common examples of equilateral polygons are a rhombus and regular polygons such as equilateral triangles and squares.  Now, a polygon is equiangular if all of its internal angles are congruent.  Some important facts to consider The only equiangular triangle is the equilateral triangle If P is an equilateral polygon that has more than three sides, it does not have to be equiangular. A rhombus with no right angle is an example of an equilateral but non-equiangular polygon.  Rectangles, including squares, are the only equiangular quadrilaterals Equiangular polygon theorem. Each angle of an equiangular n-gon is  $$\Bigg(\frac{n-2}{n}\Bigg)180^{\circ} = 180^{\circ} -   \frac{360^{\circ}}{n} $$ Viviani's theorem   Vincenzo Viviani (1622 – 1703) was a famous Italian mathematician. With his exceptional intelligence in math...
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Irrational Numbers

A number which cannot be written in the form $ \cfrac {p}{q}$  where $p$ and $q$ are integers and $ q $  $ \neq 0$. Example: $ \sqrt {2}$, $ \sqrt {3}$, $ \sqrt {6}$, $ \sqrt {7}$, $ \sqrt {8}$, $ \sqrt {10}$ Theorem: If $p$ divides $x^3$, then $p$ divides $x$, where $x$ is a positive integer and $p$ is a prime number.  Proof :  Let $x = p_{1} p_{2}...p_{n}$ where $p_{1}, p_{2}, p_{3}.....p_{n}$  are primes, not necessarily distinct.  $ \rightarrow x^3 = p_{1}^3 p_{2}^3.....p_{n}^3$ Given that $p$ divides $x^3$ By fundamental theorem, $p$ is one of the primes of $x^3$.  By the uniqueness of fundamental theorem, the distinct primes of $x^3$ are same as the distinct primes of $x$.  $ \rightarrow p$ divides $x$ Similarly if $p$ divides $x^2$, then $p$ divides $x$, where $p$ is a prime number and $x$ is a positive integer. Example: Prove that  $ \sqrt {2}$ is irrational.  Solution : Let us assume that  $ \sqrt ...
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Incenter/Excenter Lemma

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Given $\triangle ABC$ with incenter $I$, extend $AI$ to meet the circumcircle of $\triangle ABC$ at $L$. Then, reflect $I$ over $L$, and name this point $I_a$. Then:  $(i)$ $BICI_a$ is a cyclic quadrilateral with point $L$ as the center of the circumscribed circle.  $(ii)$ $BI_a$ and $CI_a$ bisect the exterior angles of $\angle B$ and $\angle C$,  respectively.  Proof $(i)$ Notice that the the question is equivalent to proving the distance from $L$ to points $B, I, C, I_a$ are equal. In other words, we need to show that  $$LB = LI = LC = LI_a$$ Firstly, it is obvious that $LI = LI_a$ because by definition, $I_a$ is the reflection of $I$ over $L$, and reflections preserve the length of the segment.  Now, we are left with proving that $LB=LI$, because similar calculations will provide $LI=LC$.  We see that most of our given information involves angles, so we focus on proving $\angle LBI = \angle LIB$. Firstly,  $$\angle LBC = \angl...
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