Final answer:
The Lower Control Limit (LCL) is typically calculated by subtracting three times the standard deviation from the mean. Given the mean of 377 and standard deviation of 35, the LCL would be 272.
Step-by-step explanation:
The question is about calculating the Lower Control Limit (LCL) for a given set of parameters, which are Upper Specification Limit (USL), Lower Specification Limit (LSL), standard deviation, and mean. The standard deviation and mean are provided, but without a specific formula or context such as Six Sigma or statistical quality control, we cannot calculate the LCL directly. However, we can demonstrate how the LCL could typically be calculated in a process control context. For example, if we were to use a control chart, the LCL could be calculated by taking the mean and subtracting three times the standard deviation (LCL = mean - 3 * standard deviation). Given the information, the LCL in this context would be 377 - 3*35 = 377 - 105 = 272.