x+1 Let g(x) = Determine all values of x at which g is Enter your search term ach of these values of x, define g in such a manner as to remove the x - 3x- 4 discontinuity, if possible. g(x) is discontinuous at x = -1.,4 (Use a comma to separate answers as needed.) For each discontinuity in the previous step, explain how g can be defined so as to remove the discontinuity. Select the correct choice below and, if necessary, fill in the answer box(es) within your choice. O A. g(x) has two discontinuities. The lesser discontinuity can be removed by defining g to be at that value. The greater discontinuity can be removed by defining g to be at that value. 1 (Ch O B. g(x) has two discontinuities. The lesser discontinuity can be removed by defining g to be at that value. The greater discontinuity cannot be removed. 2 (Ch O C. g(x) has two discontinuities and neither can be removed. O D. g(x) has two discontinuities. The lesser discontinuity cannot be removed. The greater discontinuity can be removed by setting g to be at that value. 3 (Ch O E. g(x) has one discontinuity, and it cannot be removed. O F. g(x) has one discontinuity, and it can be removed by defining g to at that value. 4 (Ch
x+1 Let g(x) = Determine all values of x at which g is Enter your search term ach of these values of x, define g in such a manner as to remove the x - 3x- 4 discontinuity, if possible. g(x) is discontinuous at x = -1.,4 (Use a comma to separate answers as needed.) For each discontinuity in the previous step, explain how g can be defined so as to remove the discontinuity. Select the correct choice below and, if necessary, fill in the answer box(es) within your choice. O A. g(x) has two discontinuities. The lesser discontinuity can be removed by defining g to be at that value. The greater discontinuity can be removed by defining g to be at that value. 1 (Ch O B. g(x) has two discontinuities. The lesser discontinuity can be removed by defining g to be at that value. The greater discontinuity cannot be removed. 2 (Ch O C. g(x) has two discontinuities and neither can be removed. O D. g(x) has two discontinuities. The lesser discontinuity cannot be removed. The greater discontinuity can be removed by setting g to be at that value. 3 (Ch O E. g(x) has one discontinuity, and it cannot be removed. O F. g(x) has one discontinuity, and it can be removed by defining g to at that value. 4 (Ch
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter5: Inverse, Exponential, And Logarithmic Functions
Section5.1: Inverse Functions
Problem 18E
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