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The fibbonacci sequence is a sequence of numbers starting with one where each number is the sum of the two numbers before it. The sequence goes 1,1,2,3,5,8,13,21,34,55,89, and so in. The ratio of any number in the sequence to the number just before it (like 55/34, or 13/8) gets closer and closer to the golden ratio, 1.618033989.

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Q: What is the difference between the golden ratio and the Fibonacci sequence?
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Who uses the Fibonacci sequence today?

The Fibonacci sequence is actually one of the most used mathematical ideas in the world! This is because the differences between the terms of the sequence give birth to the Golden Ratio (which is about 1:1.62). This 'magic' ratio is often said to hold the key to beauty, and is found throughout the natural world - including in the ratio of sizes in a human face. Today it is most commonly used by architects, artists, fashion designers and the like - for anyone that looks to create beauty the Fibonacci Sequence and the Golden Ratio is vital because it tells you how the size you need to make things to make them visually appealing.


How are pentagrams related to Fibonacci numbers?

The pentagram is related to the golden ratio, because the diagonals of a pentagram sections each other in the golden ratio. The Fibonacci numbers are also related to the golden ratio. Take two following Fibonacci numbers and divide them. So you have 2:1, 3:2, 5:3, 8:5 and so on. This sequence is going to the golden ratio


What is the Fibonacci like sequence?

Well a like sequence would follow the same rule as the sequence itself: Each number (after the first two) is the sum of the previous two numbers. Thus the sequence begins 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, etc. The higher up in the sequence, the closer two consecutive "Fibonacci numbers" of the sequence divided by each other will approach the golden ratio (approximately 1 : 1.618 or 0.618 : 1).


What is Fibonacci sequence conclusion?

There is no conclusion to the Fibonacci sequence - it continues on infinitely. The conclusion is that successive terms tend to a constant ratio with one another. So if a is one term, the next is ar and the one after that is ar2. Then from the rule that any term is the sum of the previous two, ar2=ar +a, which means r2-r-1=0 so r =(1+sqrt5)/2 (the golden ratio). There is no end to this series.


What are some things in nature that have the Fibonacci sequence?

Obvious occurrences are in the number of "observable" spirals in the seeds of a sunflower, or on the outside of a pineapple, and in the number of leaves and petals on plants, for example clovers usually come with 3 leaves, daisies usually come with 55 petals. (3 & 55 are both Fibonacci numbers.) As the Fibonacci numbers increase, the ratio between them gets closer and closer to the "Golden Ratio" φ which is approx 1.618034 (exactly it is (1 + √5)/2). Each petal or leaf of a plant grows from primordia and if the reflex angle between successive primordia is measured it is approx 222.5°; the ratio of this to a full turn is 360/222.5 ≈ 1.618 - the Golden Ratio. In using this spacing it provides the densest packing (for example with the seeds in a sunflower) making it stronger than radial spokes; it also means that each successive primordium gets placed in the largest space available.

Related questions

Is the Fibonacci sequence the golden ratio?

No, but the ratio of each term in the Fibonacci sequence to its predecessor converges to the Golden Ratio.


What are the relations between the golden ratio and the Fibonacci series?

The ratio of successive terms in the Fibonacci sequence approaches the Golden ratio as the number of terms increases.


How is Lenardo Fibonacci discoverey used in science?

Your mind will be blown if you search Phi, The golden ratio, or the fibonacci sequence. It has to do with everything.


When and how is the Fibonacci Sequence used?

The Fibonacci sequence is used for many calculations in regards to nature. The Fibonacci sequence can help you determine the growth of buds on trees or the growth rate of a starfish.


A side of math where can you find the golden ratio?

The Fibonacci sequence can be used to determine the golden ratio. If you divide a term in the sequence by its predecessor, at suitably high values, it approaches the golden ratio.


What is the relationship between the golden ratio and the standard Fibonacci sequence?

The "golden ratio" is the limit of the ratio between consecutive terms of the Fibonacci series. That means that when you take two consecutive terms out of your Fibonacci series and divide them, the quotient is near the golden ratio, and the longer the piece of the Fibonacci series is that you use, the nearer the quotient is. The Fibonacci series has the property that it converges quickly, so even if you only look at the quotient of, say, the 9th and 10th terms, you're already going to be darn close. The exact value of the golden ratio is [1 + sqrt(5)]/2


For what purpose Fibonacci sequence numbers are used?

The Fibonacci sequence is a series of numbers in which each number is the sum of the two previous numbers. When graphed, the sequence creates a spiral. The sequence is also related to the "Golden Ratio." The Golden Ratio has been used to explain why certain shapes are more aesthetically pleasing than others.


What is the ratio of the sequence?

The answer depends on the sequence. The ratio of terms in the Fibonacci sequence, for example, tends to 0.5*(1+sqrt(5)), which is phi, the Golden ratio.


What is the next in this sequence 112358?

There are many possible answers. One obvious one is 13, the next number in the Fibonacci Sequence that yields the golden mean.


What does Fibonacci and the golden ratio have in common?

The ratio of dividing the larger Fibonacci number into the smaller Fibonacci number gives you the golden ratio (1.618 to 1). -------- The Golden Ratio is the number (1+sqrt(5))/2~=1.618 The Fibonacci sequence is 0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, ... . Skipping the first two terms, if you divide one term in this sequence by the previous term the resulting sequence converges to the Golden Ratio: 1.0000 2.0000 1.5000 1.6667 1.6000 1.6250 1.6154 1.6190 1.6176 1.6182 1.6180 Please see the link for more information.


Who uses the Fibonacci sequence today?

The Fibonacci sequence is actually one of the most used mathematical ideas in the world! This is because the differences between the terms of the sequence give birth to the Golden Ratio (which is about 1:1.62). This 'magic' ratio is often said to hold the key to beauty, and is found throughout the natural world - including in the ratio of sizes in a human face. Today it is most commonly used by architects, artists, fashion designers and the like - for anyone that looks to create beauty the Fibonacci Sequence and the Golden Ratio is vital because it tells you how the size you need to make things to make them visually appealing.


Why is the fibbonacci sequence special?

There is no fibbonacci sequence. The Fibonacci sequence was devised as a relatively simple growth sequence. It has the property that the ratio of the numbers of the sequence divided by the preceding number in the sequence tends towards phi, the Golden Ratio = [1 + √5]/2 which has important geometric properties.Also, there are very many instances in nature where the Fibonacci sequence may be found.