Mark Sanford is a retired communications specialist living in Austin, Tx. He and his wife both believe in the benefits of good mind and body through spiritual and physical exercise. Mark writes for AlphaLane.com.
My grandson posed an interesting problem to me the other day that involved geometry. He was trying to find the area between circles that touch each other at single points, sometimes called tangent circles. It has been a long time since I was in school and the same for studying geometry, so I went to the Internet to find a solution. At first glance, it seems to be a fairly involved problem since it involves partial curved areas. And the Internet solutions supported the point by showing rather involved geometric centered equilateral triangle solution with some calculus to handle the curved areas.
While studying these solutions, I kept thinking there is an easier way to find these areas; but I just can’t quite see it yet. You know how your brain seems to know things before you do, well some part of my brain was saying “Hey dummy do it like this, it’s easier!” So, after staring at this problem for some time, I finally realized the quick solution! What really surprised me is that I have not found this easy solution anywhere on the net! I know it is out there, but where it is I have no clue. So, I thought it would be worthwhile to compose an article about the solution. Maybe some college professor can show me what is wrong with my solution, but I can’t see anything wrong with it.
Anyway, here is the answer. If you inscribe ( place inside ) a circle in a square you will note that the height and width of the square is equal to the diameter of the circle. So, simply, subtract the area of circle, which is 3.14 x radius x radius or pi R ^ 2 from the area of the square ( diameter of the circle squared ) and you get the four little areas we are looking for! If you divide the answer by four, you get the area of one of these little leftovers.
(( 2R ) ^ 2 – pi x R^2) / 4 = 0.216R^2
Now, arrange any number of circles touching each other and encase them in squares to count the little areas. For instance, if you had four circles touching each other then you would have four little areas between them, so simply multiply our little area solution by four and you now have the total area between the circles. I think I came out with 4 x 0.216xR^2 = 0.864R^2. Simple, isn’t it.
I’m going to place this article on the net and my old head on the block for some math student or professor to say “Hey dummy you messed up!” Have fun!
- Related Videos
- Related Articles
- Ask / Related Q&A
- Math in Standardized Tests Like the Gmat
- Geometry Homework Help: Some Ways To Help Overcome Your Frustration With High School Geometry
- What is Ho Math
- Top5 Amazing Rapid Mental Math Methods
- Geometry: An Archetypal Form of Communication
- My Experience of Using Ho Math and Chess Teaching Set Vs. Traditional Chess Set
- Video and Computer Games That Sharpen Math Skills
- The Math Hidden In Your Living Room
Career in Advertising Part -1
By: anirban das | 24/12/2009India is improving with rapid speed and becoming one of the greatest growing business hubs of the world. Advertising is one of the Main sectors of any industry.A career in advertising is quite glamorous and very challenging because nowadays more and more advertising agencies are opening their setups in india.
Arrays Technosys – PHP Training Institute In Pune
By: Arrays Technosys | 24/12/2009Arrays Technosys is a prominent training institute providing custom-catered syllabus to improvise the learning patterns and to enhance the job opportunities for candidates.
Bungee Jumping Physics
By: Carlos Duarte | 24/12/2009Recently a consultant of the Fair of Sciences sent me a message requesting the solution of a proposed subject, in college entrance exam, by FURG 2007. Here is the proposed subject:
Central collision
By: Carlos Duarte | 24/12/2009Real solid is always lightly deformável. In atoms and molecules, without structure modification, the deformation is perfectly elastic; the same is admitted in macroscopic solids in ideal case.
I work and Energy Prat 2
By: Carlos Duarte | 24/12/20092 - a cable pulls a car mountain above, with the intensity force 4 x 103 newtons, to the speed of 5 m/s. The car takes 5 minutes to reach the top. the) What work is accomplished by the force in the cable to drive the car until the high of the mountain? b) What work would be accomplished to take the car until the same point, with speed of 2,5 m/s?
I work and Energy
By: Carlos Duarte | 24/12/2009IEnergy is a concept difficult to define, although it is family to all. A lot of times we are picked in circular definitions of work and energy, seemingly using the two have to describe the same thing
Gravitation I
By: Carlos Duarte | 24/12/2009The theme Gravitation, position for the first time to the student's of the medium Teaching understanding according to the traditional method is, mine to see, reinforced best when we presented to proceed, some basic questions, such as:
How To Extend The Use Of Your Computer With Extra Programs
By: Colon Bolden | 23/12/2009When you bought your personal computer, it came loaded with a selection of software. Each of these contains a number of programs that allow you to perform a range of functions, such as word processing and spreadsheet work. The software that comes with your computer is known as bundled software.
How To Measure Student Performance
By: Mark Sanford | 21/10/2009 | K-12 EducationIt has been the general rule since the inception of the school system that the true measure of a student’s grasp of subject matter lies in memory.
How To Find The Area Between Tangent Circles - The Easy Way
By: Mark Sanford | 16/10/2009 | College & UniversityWhen my grandson asked me to help him with a geometry problem, I searched the net for a solution to finding the area between tangent or touching circles. Finally, I came up with my own and it seems to be much easier. You be the judge.
To Click Or Not To Click
By: Mark Sanford | 16/06/2009 | AdvertisingIt has been brought to my attention that there is a growing misunderstanding in the Internet that it is a bad thing to click on ads! Why? Well, there is a host of hand me down ideas,...
How To Copyright Your Own Work
By: Mark Sanford | 10/06/2009 | CopyrightRecently, one of my articles was placed on a site without proper credits. It was brought to my attention by another article submission site. I had submitted my article to them for posting, when to my shock; they informed me that someone else was claiming ownership of my work!
How To Write
By: Mark Sanford | 29/03/2009 | WritingWriting, like any other discipline, requires practice and study. Avid readers tend to have the edge on non-readers when it comes to composing essays or articles. It only stands to reason that anyone with command of grammar and composition will have an edge on the average person. This is true, but writing starts with the imagination and everyone has that!
The Ai Function
By: Mark Sanford | 11/03/2009 | ScienceA Relationship Between Objects Can Always be Written, That Is, Everything That Exists Has Some Relationship With Everything Else. Whether That Relationship is Definable or not is Only Limited by Other Parameters. That Being Said, the Key to Any Artificial Intellect is to Design the System With the Ability to Take Any Set of Objects in Any Space and in Short Order Write Their True Mathematical Relationship.
How To Teach Mathematics
By: Mark Sanford | 16/02/2009 | EducationI once asked a math major what integration meant. The question must have caught her by surprise since she stopped, looked at me and said “I don’t really know, but I did get all A’s in Calculus.”
What Does God Really Want?
By: Mark Sanford | 17/01/2009 | ChristianityIf God truly wanted perfect people then He could have created them. So then, God doesn’t want perfect people! Why not? I thought perfection was what we are trying to achieve.