e^x
The expression e^x represents the exponential function with base e (Euler’s number) raised to the power of x
The expression e^x represents the exponential function with base e (Euler’s number) raised to the power of x. In other words, e^x represents the value obtained by multiplying e by itself x number of times.
The value of e is approximately 2.71828, and it is an irrational number. It appears frequently in various fields such as mathematics, physics, and finance.
When we raise e to the power of x, it can result in a wide range of values depending on the value of x. Here are a few examples to demonstrate the exponential nature of e^x:
1. When x = 0:
e^0 = 1
This is because any number raised to the power of zero is equal to 1.
2. When x = 1:
e^1 = e
This is equal to the natural number e since any number raised to the power of 1 is equal to the number itself.
3. When x = 2:
e^2 ≈ 7.38906
This value is obtained by multiplying e by itself twice: e^2 = e * e ≈ 2.71828 * 2.71828 ≈ 7.38906.
4. When x = -1:
e^(-1) ≈ 0.36788
The negative exponent indicates the reciprocal of the base, so e^(-1) = 1 / e ≈ 0.36788.
As the value of x becomes larger, e^x increases exponentially. Similarly, as x becomes more negative, e^x approaches zero but never actually reaches it. The graph of e^x is always positive and continuously increasing.
The exponential function e^x plays a crucial role in various mathematical applications, including calculus, differential equations, and growth/decay processes. It is also used in financial mathematics for modeling compound interest, as well as in population growth models in biology and chemistry.
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