Sr – 2, r< 0, {:+2, r20 9. Let f : R → R be defined by f(x)3= then f-(]1,3[) (the inverse image of the interval ]1, 3[ under f) is (a) ]3,5[U] – 1, 1[ (b) (0, 1[ (c) ] – 1, 1[ (d) None of the above

Sr – 2, r< 0, {:+2, r20 9. Let f : R → R be defined by f(x)3= then f-(]1,3[) (the inverse image of the interval ]1, 3[ under f) is (a) ]3,5[U] – 1, 1[ (b) (0, 1[ (c) ] – 1, 1[ (d) None of the above

College Algebra (MindTap Course List)

12th Edition

ISBN:9781305652231

Author:R. David Gustafson, Jeff Hughes

Publisher:R. David Gustafson, Jeff Hughes

Chapter3: Functions

Section3.5: Inverse Functions

Problem 6SC: Find the inverse of f when its domain is restricted to the interval 0,. fx=x2+3

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Sa – 2, r< 0,
{+2, 220
9. Let f: R R be defined by f(x)3=
then f-(]1, 3[) (the inverse image of the
interval ]1, 3[ under f) is
(a) ]3, 5[U] – 1, 1[
(b) (0, 1[
(c) ] – 1, 1[
(d) None of the above

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