Fibonacci，音標為["f?b??nɑ?tsi]，翻譯為“斐波那契”。速記技巧如下：

1. 諧音記憶：可以用“非飽呢吃”來幫助記憶。

2. 數字串記憶：Fibonacci數列的特點是以1和1開始，接下來的兩個數是1后面跟著的兩個連續的數字。

請注意，速記技巧僅供參考，建議根據個人習慣和喜好進行記憶。

Fibonacci序列的英文詞源可以追溯到意大利數學家斐波那契（Leonardo Fibonacci），他是一位著名的數學家和商人，也是阿拉伯數字的推廣者。

Fibonacci序列是一種數列，其中每個數字是前兩個數字的和。這個序列可以通過遞歸或迭代來生成。

變化形式：Fibonacci sequence (n.)/fibonacci sequence (n.)

相關單詞：

1. Fibonacci number (n.)：斐波那契數，指序列中的任何一個數字。

2. Fibonacci series (n.)：斐波那契數列，指一系列的斐波那契數。

3. Fibonacci sequence (adj.)：斐波那契序列的，指與斐波那契數列相關的。

4. Fibonacci-like sequence (n.)：類似于斐波那契的序列，指具有類似增長模式的序列。

5. Fibonacci-like process (n.)：類似于斐波那契過程的，指具有類似性質的過程。

6. Fibonacci-like function (n.)：類似于斐波那契函數的，指具有特定性質的函數。

7. Fibonacci-like sequence (n.)：類似于斐波那契序列的，指具有相似性質的序列。

8. Fibonacci-like tree (n.)：類似于斐波那契樹的圖形結構，通常用于描述分形結構。

9. Fibonacci-like pattern (n.)：類似于斐波那契模式的圖形結構或模式。

10. Fibonacci-like sequence of numbers (n.)：數字序列中類似于斐波那契的序列。

常用短語：

1. Fibonacci sequence

2. Fibonacci series

3. Fibonacci sequence analysis

4. Fibonacci sequence in finance

5. Fibonacci sequence in biology

6. Fibonacci sequence in computing

7. Fibonacci sequence in physics

例句：

1. The Fibonacci sequence is a mathematical series that can be used to predict patterns in nature.

2. The stock market"s Fibonacci retracements indicate potential support and resistance levels.

3. Fibonacci analysis can help us understand the relationship between different market indicators.

4. The golden ratio is often found in nature and is closely related to the Fibonacci sequence.

5. The Fibonacci sequence can be used to analyze the growth of organisms over time.

6. The Fibonacci sequence is a powerful tool for understanding the patterns in computing algorithms.

7. The Fibonacci sequence is a fundamental concept in physics that helps us understand the nature of space and time.

英文小作文：

The Fibonacci Sequence: A Mathematical Tool for Understanding Nature

The Fibonacci sequence, a mathematical series discovered by Leonardo Fibonacci in the 12th century, has become a powerful tool for understanding patterns in nature. From the growth of organisms to the structure of crystals, the Fibonacci sequence has been found to play a significant role in many natural phenomena.

The sequence consists of a series of numbers that are formed by adding the previous two numbers in the series together to produce the next number. This process continues indefinitely, generating a series of numbers that follow a mathematical pattern. The sequence is characterized by the phenomenon of "golden ratio," which refers to the ratio of the distance between two consecutive numbers to the distance between any two adjacent pairs of numbers in the sequence.

The Fibonacci sequence has been used in finance, biology, computing, and physics to analyze patterns and predict trends in various systems. In finance, for example, the sequence can be used to identify support and resistance levels in the stock market, while in biology it helps us understand the growth and development of organisms over time.

The Fibonacci sequence is a fundamental concept that goes beyond its immediate application and serves as a tool for understanding the beauty and orderliness of nature. It reminds us that mathematics is not just a set of formulas and algorithms, but rather a language that can be used to communicate patterns and relationships that exist throughout the universe.