Which integration technique may involve identifying the limit of a function's sum for definite integration?

The technique that involves identifying the limit of a function's sum for definite integration is the Limit of a Sum. This approach is foundational to understanding definite integrals, as it connects the concept of integration to the idea of approximating the area under a curve using the sums of the values of a function at discrete points.

In calculus, the definite integral of a function over an interval can be defined as the limit of a Riemann sum as the partition of the interval becomes finer and finer. Specifically, as the number of subintervals increases and their width approaches zero, the sum of the areas of the rectangles formed under the curve converges to the exact area under the curve, which is the value of the definite integral.

While the Method of Riemann Sums is also critical in the process of approximating integrals, it does not explicitly denote the concept of taking a limit in the way that the Limit of a Sum does. The term Definite Integrals Method is not a standard term in calculus, and Transcendental Functions pertain more to types of functions rather than integration techniques. Thus, identifying the limit of a function's sum directly addresses the essence of calculating definite integrals.