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37. There exists no positive integer x such that 3x < x <4x. If x is irrational and y is rational, then x•y is irrational. 38. %3D 39. There exists real numbers x and y such that Vx + Vy = Vx + y

37. There exists no positive integer x such that 3x < x <4x. If x is irrational and y is rational, then x•y is irrational. 38. %3D 39. There exists real numbers x and y such that Vx + Vy = Vx + y

Advanced Engineering Mathematics
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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There exists no positive integer x such that 3x < x² < 4x. If x is irrational and y is rational, then x•y is irrational. There exists real numbers x and y such that vx + Vy = Vx + y F 37. F 38. T F 39.
Transcribed Image Text:There exists no positive integer x such that 3x < x² < 4x. If x is irrational and y is rational, then x•y is irrational. There exists real numbers x and y such that vx + Vy = Vx + y F 37. F 38. T F 39.
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