1 Determine the point at which the function f(x) = 9 is discontinuous and state the type of discontinuity: removable, jump, infinite, or none of these. v ? 1. Choose the type Removable Jump Infinite None of theseA function f (x) is said to have a removable discontinuity at x = a if: 1. f is either not defined or not continuous at I = a. 2. f(a) could either be defined or redefined so that the new function is continuous at z = a. 9 + -8x+18 if x / 0, 2 Let f(x) = x(2-2) ' 10, if x = 0 Show that f (x) has a removable discontinuity at a = 0 and determine what value for f(0) would make f() continuous at z = 0. Must redefine f(0) = Hint: Try combining the fractions and simplifying. The discontinuity at x = 2 is not a removable discontinuity, just in case you were wondering