e^x
e^x
The symbol e represents a mathematical constant that is equal to approximately 2.71828. When e is raised to a power x, the resulting function is commonly written as e^x. This function is commonly used in many areas of mathematics, science, and engineering.
The graph of e^x is an exponential function that always increases as x increases. It also has the property that e^0 = 1, which means that the function passes through the point (0, 1) on the coordinate plane.
In calculus, e^x is important because it is its own derivative and integral. This means that if you take the derivative of e^x, you get e^x back, and if you take the integral of e^x, you also get e^x back. This makes e^x a useful function for solving differential equations and other calculus problems.
Overall, e^x is a fundamental mathematical function that appears in many different areas of mathematical study.
More Answers:
The Secant Function In Trigonometry: Properties And ApplicationsThe Sine Function: Definition, Graph, Values And Identities – A Comprehensive Guide.
Exponentiation: Definition And Examples.