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The number e is a mathematical constant approximately equal to 2.71828 that is the base of the natural logarithm and exponential function.
Learn about e, the irrational number that is the base of the natural logarithms and appears in many mathematical formulas. Find out how to calculate, remember and use e in various contexts, such as exponential growth, area and compound interest.
The number e is an irrational number; that is, it cannot be expressed as the ratio of two integers. It is also a transcendental number, meaning that it is not the root of any nonzero polynomial with rational coefficients. The constant e is used throughout mathematics and the sciences.
Liczbę Eulera (zwaną również pod nazwą liczby Nepera) oznaczamy krótko literą \ (e\). Wartość tej liczby można określić w przybliżeniu: \ [e = 2,71828182845904523536028747135266249775724709369995...\] Liczbę \ (e\) można definiować na wiele różnych sposobów.
The number \( e\) is thought of as the base that represents the growth of processes or quantities that grow continuously in proportion to their current quantity. This is why \(e\) appears so often in modeling the exponential growth or decay of everything from bacteria to radioactivity.
2 cze 2024 · Euler's number (e) is an irrational constant that forms the base of natural logarithms and appears in various fields of mathematics. Learn how it was discovered, what it represents, and how it relates to trigonometry, compound interest, and Euler's identity.
Learn the definition, properties and applications of e, the base of the natural logarithm. See how e can be calculated from the limit of (1 + 1/n) n and its relation to other functions.
