2. We define f: R→ R as a strictly increasing function if f(x) > f(y) whenever x > y, and x, y Є R. If f is a strictly increasing function as defined above, then it must be true that: a) f is injective (one-to-one) b) f is surjective (onto) c) f is bijective (one-to-one and onto) d) none of the above
2. We define f: R→ R as a strictly increasing function if f(x) > f(y) whenever x > y, and x, y Є R. If f is a strictly increasing function as defined above, then it must be true that: a) f is injective (one-to-one) b) f is surjective (onto) c) f is bijective (one-to-one and onto) d) none of the above
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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Transcribed Image Text:2.
We define f: R→ R as a strictly increasing function if f(x) > f(y) whenever x > y, and x, y Є R.
If f is a strictly increasing function as defined above, then it must be true that:
a) f is injective (one-to-one)
b) f is surjective (onto)
c) f is bijective (one-to-one and onto)
d) none of the above
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