Geometrical Proof

Here is an interesting geometry problem-

Let A1A_1, A2  AnA_2 \ \cdots \ A_n be the vertices of a regular nn-sided polygon PP. Let XX be a random point on the incircle of PP.

Prove that i=1nAiX2=nR2[1+cos2(πn)]\displaystyle\sum_{i=1}^{n} \overline{A_iX}^2=nR^2\left[1+\cos^2\left(\dfrac{\pi}{n}\right)\right].

Note : Here, RR denotes the circumradius of PP.

#Geometry #Polygons #Circles

Note by Pratik Shastri
4 years, 8 months ago

No vote yet
1 vote

</code>...<code></code> ... <code>.">   Easy Math Editor

MarkdownAppears as
*italics* or _italics_ italics
**bold** or __bold__ bold

- bulleted
- list
  • bulleted
  • list

1. numbered
2. list
  1. numbered
  2. list
Note: you must add a full line of space before and after lists for them to show up correctly
paragraph 1

paragraph 2

paragraph 1

paragraph 2

[example link](https://brilliant.org)example link
> This is a quote
This is a quote
    # I indented these lines
    # 4 spaces, and now they show
    # up as a code block.

    print "hello world"
# I indented these lines
# 4 spaces, and now they show
# up as a code block.

print "hello world"
MathAppears as
Remember to wrap math in </span>...<span></span> ... <span> or </span>...<span></span> ... <span> to ensure proper formatting.
2 \times 3 2×3 2 \times 3
2^{34} 234 2^{34}
a_{i-1} ai1 a_{i-1}
\frac{2}{3} 23 \frac{2}{3}
\sqrt{2} 2 \sqrt{2}
\sum_{i=1}^3 i=13 \sum_{i=1}^3
\sin \theta sinθ \sin \theta
\boxed{123} 123 \boxed{123}

Comments

Sort by:

Top Newest

@KARAN SHEKHAWAT Here is the solution :

Let OO represent the center of the polygon.

Now, XAi=XO+OAiXAi2=XO2+OAi2+2(XOOAi)i=1nXAi2=n(r2+R2)+2i=1n(XOOAi)=n(r2+R2)+2XO(i=1nOAi)\begin{aligned}\vec{XA_i}&=\vec{XO}+\vec{OA_i}\\ |\vec{XA_i}|^2&=|\vec{XO}|^2+|\vec{OA_i}|^2+2(\vec{XO} \cdot \vec{OA_i})\\ \sum_{i=1}^{n} |\vec{XA_i}|^2&=n(r^2+R^2)+2\sum_{i=1}^{n}(\vec{XO} \cdot \vec{OA_i})\\ &=n(r^2+R^2)+2\vec{XO} \cdot \left(\sum_{i=1}^{n} \vec{OA_i}\right)\end{aligned} Since i=1nOAi=0\displaystyle\sum_{i=1}^{n} \vec{OA_i}=0, i=1nXAi2=i=1nAiX2=n(R2+r2)\sum_{i=1}^{n} |\vec{XA_i}|^2=\sum_{i=1}^{n} \overline{A_iX}^2=n(R^2+r^2)

All that's left to do is to express rr in terms of RR. That's a matter of simple trigonometry.

Note 1 : rr is the inradius of PP.

Note 2 : i=1n(XOOAi)=XO(i=1nOAi)\displaystyle\sum_{i=1}^{n}(\vec{XO} \cdot \vec{OA_i})=\vec{XO} \cdot \left(\sum_{i=1}^{n} \vec{OA_i}\right) due to the distributivity of the dot product over vector addition.

Pratik Shastri - 4 years, 8 months ago

Log in to reply

Awesome ! Thanks a lot ! It's is much better than complex number tecnique atleast for me :) You are genius !

Karan Shekhawat - 4 years, 8 months ago

Log in to reply

Can we use particular case of polygon in which vertex are n'th roots of of unity To prove it ?

Karan Shekhawat - 4 years, 8 months ago

Log in to reply

You could do that. We are to prove the general result which can also be, to my knowledge, proven that way.

Pratik Shastri - 4 years, 8 months ago

Log in to reply

I'm get stuck in that ! If you Don't mind Can you please Upload its solution So that we can learn from it ?

Thanks !

Karan Shekhawat - 4 years, 8 months ago

Log in to reply

@Karan Shekhawat Well, I didn't solve it using complex numbers, I used vectors.

Pratik Shastri - 4 years, 8 months ago

Log in to reply

@Karan Shekhawat Anyways I will upload it within a day or two.

Pratik Shastri - 4 years, 8 months ago

Log in to reply

×

Problem Loading...

Note Loading...

Set Loading...