Which statement describes whether the function is continuous at x = β2?
The function is continuous at x = β2 because f(β2) exists.
The function is continuous at x = β2 because Limit as x approaches negative 2 plus f(x) = f(β2).
The function is not continuous at x = β2 because Limit as x approaches negative 2 f(x) β f(β2).
The function is not continuous at x = β2 because Limit as x approaches negative 2 f(x) does not exist.
