ind all values x = a where the function is discontinuous. For each value of x, give the limit of the function as x approaches a. Be sure to note when the limit 4 +x - x ( X - 3 ) Select the choice below and, if necessary, fill in the answer box(es) within your choice. (Use a comma to separate answers as needed.) O A. The function f is discontinuous at the single value x = The limit is OB. The function f is discontinuous at the single value x = The limit does not exist and is not co or - co. C. The function f is discontinuous at the two values x = The limit for the smaller value is . The limit for the larger value is O D. The function f is discontinuous at the two values x = The limit for the smaller value is The limit for the larger value does not exist and is not co or - co O E. The function f is discontinuous at the two values x = The limit for the smaller value does not exist and is not co or - co. The limit for the larger value is OF. The function f is discontinuous over the interval The limit is (Type your answer in interval notation.) G. The function f is discontinuous over the interval |. The limit does not exist and is not co or - co. (Type your answer in interval notation.) H. The function f is continuous for all values of x. 1. The function f is discontinuous at the two values x = The limits for both values do not exist and are not co or - co. esc C @ N W 5 7 tab q W e t y U Q a S d -h g h