Add Papers Marked0
Paper checked off!

Marked works

Viewed0

Viewed works

Shopping Cart0
Paper added to shopping cart!

Shopping Cart

Register Now

eKönyvtár library
FAQ
 

Great deal: today with a discount!

Regular price:
1 430 Ft
You save:
184 Ft
Discounted price*:
1 245 Ft
Purchase
Add to Wish List
ID number:556637
Author:
Evaluation:
Published: 04.01.2006.
Language: English
Level: College/University
Literature: n/a
References: Not used
Extract

Ptolemy's Theorem
This theorem was proved by Giovanni Ceva (1648-1734).
Ptolemy's theorem states that given a cyclic quadrilateral (i.e. one that can be inscribed in a circle) the product of the diagonals equals the sum of the products of opposite sides.

On the diagonal BD locate a point M such that angles BCA and MCD are equal. Since angles BAC and MDC subtend the same arc, they are equal. (why?) Therefore, triangles ABC and DMC are similar.

Thus we get CD/MD = AC/AB, or AB·CD = AC·MD.

Since angles BCA and MCD are equal, then angle BCM=BCA+ACM equals angle ACD=ACM+MCD. So triangles BCM and ACD are similar which leads to
BC/BM = AC/AD, or BC·AD = AC·BM. …

Author's comment
Load more similar papers

Send to email

Your name:

Enter an email address where the link will be sent:

Hi!
{Your name} suggests you to check out this eKönyvtár paper on „Ptolemy's Theorem Demonstration”.

Link to paper:
https://eng.ekonyvtar.eu/w/556637

Send

Email has been sent

Choose Authorization Method

Email & Password

Email & Password

Wrong e-mail adress or password!
Log In

Forgot your password?

Facebook

Not registered yet?

Register and redeem free papers!

To receive free papers from eKönyvtár.com it is necessary to register. It's quick and will only take a few seconds.

If you have already registered, simply to access the free content.

Cancel Register