To prove the statement: For any integers m and n, if mln then m² | n². We begin the proof by the following assumption. O Let m and n be any integers and let m² | n². O Let m and n be any integers. Also, let mån and m²| n². Let m and n be some integers where mk=n for some integer k. Let m and n be any integers and let ml n.
To prove the statement: For any integers m and n, if mln then m² | n². We begin the proof by the following assumption. O Let m and n be any integers and let m² | n². O Let m and n be any integers. Also, let mån and m²| n². Let m and n be some integers where mk=n for some integer k. Let m and n be any integers and let ml n.
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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Transcribed Image Text:To prove the statement: For any integers m and n, if mln then m² | n². We begin the
proof by the following assumption.
O
Let m and n be any integers and let m² | n².
O Let m and n be any integers. Also, let mån and m²| n².
Let m and n be some integers where mk=n for some integer k.
Let m and n be any integers and let ml n.
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