If e = ?, what is the value approximated to two decimal places?

The value of ( e ), known as Euler's number, is an important mathematical constant that serves as the base for natural logarithms. It represents the limit of ( (1 + \frac{1}{n})^n ) as ( n ) approaches infinity or can be defined by the infinite series ( e = \sum_{n=0}^{\infty} \frac{1}{n!} ).

When approximating the value of ( e ) to two decimal places, the commonly accepted value is approximately 2.71828. When rounded to two decimal places, this value becomes 2.72.

Thus, the correct assessment of ( e ) being approximately 2.72 is confirmed through various methods of calculation and is widely accepted in mathematical literature and education. This consistent approximation provides a reliable estimate for applications involving exponential growth, compounding interest, and other areas where ( e ) is applicable.