Let ℝ∗ be a multiplicative group of non zero real numbers and let ? = ℝ − {−1} be the group under the operation a ∘ b = a + b + ab. Define the mapping f: ℝ∗ → S by f(r) = r − 1. Show that ℝ∗ is isomorphic to S.
Let ℝ∗ be a multiplicative group of non zero real numbers and let ? = ℝ − {−1} be the group under the operation a ∘ b = a + b + ab. Define the mapping f: ℝ∗ → S by f(r) = r − 1. Show that ℝ∗ is isomorphic to S.
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Let ℝ∗ be a multiplicative group of non zero real numbers and let ? = ℝ − {−1}
be the group under the operation a ∘ b = a + b + ab. Define the mapping
f: ℝ∗ → S by f(r) = r − 1. Show that ℝ∗
is isomorphic to S.
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