To calculate the Exponential Value:
\[ \text{Exp}(x) = e^x \]
Where:
Exp is a mathematical function that stands for exponentiation. It is often represented as \( e^x \) where \( e \) is a mathematical constant approximately equal to 2.71828, and \( x \) is the number to which \( e \) is raised. This function is widely used in various fields of mathematics, including calculus and complex analysis. It is also used in real-world applications such as calculating compound interest and population growth.
Let's assume the following value:
Step 1: Calculate the exponential value:
\[ \text{Exp}(2) = e^2 \approx 2.71828^2 \approx 7.3891 \]
So, the Exponential Value is approximately 7.3891.
Let's assume the following value:
Step 1: Calculate the exponential value:
\[ \text{Exp}(-1) = e^{-1} \approx 2.71828^{-1} \approx 0.3679 \]
So, the Exponential Value is approximately 0.3679.
