6.4 IN-DEPTH PATH calculations with letters

Theory

Like terms

Like terms are "things" which are alike (the same).

Pears are the same --> They are like terms

The letter P is the same --> They are like terms

There are a couple of rules:

* You may only add and subtract like terms.

* You may always multiply.

* 3 ^.3 = 3², x ^.x = x², a ^.a = a²

Test yourself exercise

You really need to understand this theory in order to understand the new theory about the Fibonacci sequence. Therefore, you are going to test yourself with this exercise.

Simplify

5ab + 6a + 7b + 3ab + 2a ^.-3b + 4a ^.8a

Answer

Fibonacci sequence & Lucas sequence

Extra learning objectives

At the end of this paragraph you are able to...

...explain what the Fibonacci sequence is.

...explain what the Lucas sequence is.

...calculate with the Fibonacci sequence.

...calculate with the Lucas sequence.

...use letters instead of numbers with the Fibonacci sequence.

...explain what the golden ratio is.

...explain where you can see the golden ratio.

The Fibonacci sequence

The Italian mathematician Leonardo of Pisa, now known as Fibonacci, was the first to introduce the Fibonacci sequence.

The Fibonacci sequence appeared when he was finding a solution for a problem:

" A man puts a pair of rabbits in a place surrounded by walls. They wanted to know how many pairs of rabbits could be produced from that certain pair in a year. It was supposed that every month each pair would become a new pair, which after two months would become productive."

Fibonacci found the resulting sequence: 0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, ... as answer. He could explain his sequence by the picture underneath.

A picture of the rabbit problem and its solution is shown above. After month 5 the sequence continues.

The Fibonacci sequence starts with a 0, 1 and you need to add the latest two to get the next one.

Now have a look at the pattern of the Fibonacci sequence.

The Lucas sequence

The Lucas sequence is a sequence named after the mathematician François Édouard Anatole Lucas. Lucas was studying the Fibonacci sequence and that is when he found a similar series occur:

2, 1, 3, 4, 7, 11, 18, ...

Instead of beginning with 0,1 Lucas starts with 2,1. The pattern is still the same as the Fibonacci sequence, you need to add the latest two terms to get the next one.

The golden ratio

There is a link between the Fibonacci numbers and the Golden ratio.

The Fibonacci numbers:

0 + 1 = 1

1 + 1 = 2

1 + 2 = 3

2 + 3 = 5

3 + 5 = 8

5 + 8 = 13

8 + 13 = 21

13 + 21 = 34

21 + 34 = 55

34 + 55 = 89

55 + 89 = 144

89 + 144 = 233

etc...

You can calculate the ratio by dividing the two immediately previous terms.

Examples:

8 : 5 = 1.6

13 : 8 ≈ 1.6

21 : 13 ≈ 1.6

34 : 21 ≈ 1.6

21 : 34 ≈ 1.6

34 : 55 ≈ 1.6

etc...

The answers are each time approximately 1.6. Actually, the number is each time 1.61803398875..... and it is called phi. Phi is a never ending number and that's why we call it phi instead of 1.618033.....

Phi is the golden ratio or the golden number.