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PURE MATHEMATICIAN! Regular visitors to the site will know this character...  but we had no idea she really exists AND she has even found a useful role to play in the community by being a maths teacher!  Big respect and thanks to the wonderful Pam Garnett of Wolfreton School for letting us use her photo! |
Welcome! This is where our Pure Mathematicians experiment on little bits of maths and try to answer some big questions. 73f6j
* HINT: Don't ask us if 1 is a prime number. Been there, done that, got nowhere, gave up, came home and put the kettle on.
* Also please DON'T ask us to do long sums that you could do yourself on a calculator!
Sorry! 6f269We're not allowed to do your maths homework for you. Obviously we'd like to, but we get into trouble. So don't ask. Thanks. 6d2t7 |
Obviously you can work out the area by subtracting the area of the little circle from the area of the big circle, and to work out these areas you need to know the radii of both circles.
HOWEVER... it's possible to get the area of the red bit with just one measurement! We thought you might like to think about how to do this before you look at... the area of an anulus answer!
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It took a while but we think we've got it: 3j1c39 |
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And what's more... we can prove it! If you square it, you get i. Look: 492x51 |
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There are actually two more cube roots of i, and one of them is just -i!
If you work out (-i)3 you get (-i)×(-i)×(-i) = -(i×i×i) = -(-1×i) = i.
Thanks to GOSHKO for telling us this!
Then it got silly. People then demanded to know what is the FOURTH root of i. Here it is and it serves you right...
And yes, we were even asked for the fifth root of i. There are a few answers to this (including 0.951056516 + 0.309016994i) but because i5 = i there is one very simple answer: i.
However if you're not squaring the "-" then you're working out -(i)2 and that makes +1.
To understand this you need to know about e and angles measured in radians, which means that an angle of π = 180º .
The special case where θ = π gives us eiπ = cosπ + i sinπ but cosπ = -1 and sinπ = 0 so we end up with the utterly lovely equation ...
Euler's Identity: eiπ = -1
PI = 4[ARCTAN(1/2)+ARCTAN(1/3)]. Easy! (You have to work this out in radians by the way, not degrees.)
ARCTAN is the inverse of TAN, which comes up in trigonometry and is a way of turning fractions into angles. If you put TAN 45o into a calculator you should get the answer 1. Or, you can put this the other way round, if you put the inverse of TAN 1 (or SHIFT TAN 1) into a calculator you get 45o. You can also say the ARCTAN of 1 is 45o.
You can also have ARCSIN and ARCCOS. E.g. SIN 30o=0.5 so ARCSIN 0.5=30o
How to work out Square Roots without a calculator
Notice that the point of the pyramid (called "the apex") doesn't have to be directly above the middle of the base. It can be leaning over a bit if you want, just so long as you measure the perpendicular height correctly.
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| If the green sides all measure "1" then the blue sides measure sqroot2 and the red sides measure sqroot3. |
Fibonacci's Series This is a row of numbers, and each number in the row equals the last two numbers added together. If the first two numbers in the series are 1 and 1, then the next number is 1+1=2. The next number is 1+2=3 then 2+3=5 and so on. The series starts 1 1 2 3 5 8 13 21 34 55 89 144 ... How to get the series from Pascal's Triangle! 3s3l3j |
To get each number in the Fibonacci series you have to add the last two numbers together - but suppose you want to know the 47th number, do you have to work out ALL the first 46 numbers? The answer is NO - thanks to a formula which uses the magic of Phi.
If you want the 47th Fibonacci number, you just put 47 in place of n and work it out. In case you think this is too ugly, here we've replaced the Phi sign with its value:
There are two things to know about this formula...
There's more about this strange series on our Fibonacci and Nature page
It's not too surprising that Pascal's Triangle produces the Fibonacci series in some strange way. After all, each number on the triangle equals the two numbers above it added together and each number in the series are the two numbers before it added together.
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Of course you can make other patterns with six squares, but they won't fold together to make a cube!
While we're talking about nets, LOADS of people keep asking us:
Pssst... we have to it, that answer makes us feel rather pleased with ourselves!
THE NUMBER ZONE 2f2i2dWe get lots of questions about odd sums and things. Here are some of our favourites. TIM asked: Is there a fraction that turned into a decimal uses all the digits 0-9 repeating? Jonathan Mui asked: WHAT IS THE LOWEST NUMBER TO BE A PERFECT SQUARE AND A PERFECT CUBE? WILL asked: WHAT IS THE LOWEST NUMBER THAT DIVIDES EXACTLY BY EVERY NUMBER BETWEEN 1-20? So just to be difficult SONNY asked us: WHAT IS THE LOWEST NUMBER THAT DIVIDES EXACTLY BY EVERY NUMBER BETWEEN 1-100? |
JORDAN WATTS saw on our Perfectly Useless Facts Page that... 153, 370, 371 and 407 are all equal to the sums of the cubes of their digits. (e.g. 153 = 13 + 53 +33 = 1 + 125 + 27) So Jordan asked if there any numbers that are equal to the sums of the 4th powers of the digits? 205l2fHarry W told us we should be looking out for NARCISSISTIC NUMBERS. Suppose you have a number with N digits. If you put each digit to the Nth power and then add them up, you get the orginal number. There are 88 narcissistic numbers in total. 153, 370, 371 and 407 are the three-digit narcissisitic numbers. b1s39Many thanks to Steven Charlton, Thomas Gooderidge and Michael Jones who supplied these narcissistic numbers: 1,634 = 14 + 64 + 34 + 44 = 1 + 1296 + 81 + 256 54,748 = 55 + 45 +75 +45 + 85 = 3125 + 1024 + 16807 + 1024 + 32768 548,834 = 56 + 46 + 86 + 86 + 36 + 46 And then Michael got a bit carried away... 1,741,725 = 17 + 77 + 47 + 17 + 77 + 27 + 57 24,678,050 = 28 + 48 + 68 + 78 + 88 + 08 + 58 + 08 And then Steven Charlton got even MORE carried away. He designed his own computer programme to work out that... 146511208, 472335975, 534494836, 912985153 are all equal to sums of the 9th powers of their digits. ... and then Michael sent us the BIGGEST narcissistic number: 115,132,219,018,763,992,565,095,597,973,971,522,401 has 39 digits AND it is the sum of the 39th powers of its digits. And THEN, to make things even more exciting, Michael sent us something slightly different... 3,435 is equal to the sums of the digits raised to the powers of themselves i.e. 3,435 = 33 +44 +33 +55. About 5 years after we found out all the things you've just read, Kevin Wilson got in touch and told us that: 145 = 1! + 4! + 5! And Xende told us that: 33 + 43 + 53 = 63 FINALLY Kevin Wilson (again!) told us a cute thing about the numbers 89, 135 and 1306: 81 + 92 = 89 |
AREA OF POLYGON = ns2 / 4{tan(180/n)} o4f67 |
So if you have a regular hexagon that measures 4cm each side, you use s=4 and n=6. You get:
AREA = 6*4*4 / 4[tan(180/6)] = 24 / [tan(30)] = 24 / 0.577 = 41.569 sq cm.
There are two formulas for the volume depending on which measurements you've got.
R = the distance from the centre of the hole in the middle to the centre of the cylinder, and r = the radius of the cylinder. 442u4v |
a =the distance from the centre of the hole in the middle to the inside edge and b = the distance from the centre of the hole to the outside edge. 1a5t49 |
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We love these formulas because you get PI squared. It doesn't happen very often!
A factorial multiplies the number by all the smaller numbers down to 1. For example 4! = 4 x 3 x 2 x 1 = 24 3! = 3 x 2 x 1 = 6 2! = 2 x 1 =2 1! is just 1 (obviously) 1n5f6w |
In the book we showed how our first investigations went:
However this wasn't good enough for a supervillain known as "The Mathster". He challenged us to give a proper reason, and this is the best we came up with:
That was our best answer, but several other Murderous Maths fans sent in their answers. We especially liked this one:
GAIL WEISS says: 4! = 4x3x2x1 and 3!=3x2x1. Therefore 4!=4x3! In the same way 3!=3x2! and 2!=2x1! So it follows that 1!=1x0! Therefore 0! must =1 or 1! would be 0 and so 2! would be zero and then 3! would be zero...and so on.
Let us hope that The Mathster now stops bothering us with tough questions and blends back into his secret civilian identity which is being a Murderous Maths fan called David Small.
We had fun checking this one, but our final results are something like this:
If you have a bag containing 0 chips and share them between no people, how many do they each get?
Because anything x 0 = 0 therefore 0/0 can = anything.
Good one!
A regular solid is a lump that has all sides the same length, all faces the same shape and the same number of sides meeting at every corner. There are only five of them, you can see what they look like here: Vicious Circles. 3x4w36 |
The challenge was to find formulas for the other regular solids!
We've finally got the answers which are on their own special page: Regular Solid Volumes.
PRIME NUMBERS If you want to know what prime numbers are, it's all explained with a special prime number calculator and a good trick on our Prime Number Page 4m4b43 |
News of the BIGGEST prime number found so far!
So a NORMAL prime can be any prime number, but to be a Mersenne prime when you add 1 it must make a power of 2.
But what if you don't know the height or any angles? At first we thought it was impossible, but lots of people told us differently!
Here's the formula we finally worked out for the area of a trapezium where sides a and c are parallel:
As you'll be desperate to know how we got this amazing result, take a look at our special TRAPEZIUM AREA page!
And here's one that's too simple to bother with... 3q2i23THOMAS JOHNSON asks us: Is it possible to reconstruct the Maclaurin/Taylor series of successive derivatives to make it converge faster to evaluate "e" to a higher degree of accuracy? 4l5y46Don't patronise us, Thomas! |
Go to the Mailroom and ask YOUR question!
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