Assume the following axioms.undefined terms: point, line, contain, lie onAxiom 1. There are at least three points.Axiom 2. Each line contains at least 2 points.Axiom 3. Each point lies on exactly two distinct lines.Determine whether Statement 1 is consistent or inconsistentwith the first three axioms. Then, determine whetherStatement 2 is independent or dependent from the first threeaxioms. Briefly justify your answers.Statement 1. There exists a point that is on a single line only.Statement 2. There are at least three lines.

Answered: Image /qna-images/answer/535830fa-f7a2-4fec-b92b-998c15364e5b.jpg

Answered: Assume the following axioms. undefined…

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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Activity 1.6 Conclude Me! Write the possible conclusion (q) on second statement based on the first statement. 1 a. Students who are good in Mathematics are smart. b. If Josiah is good in mathematics, then 2. a. Young actresses are health conscious. b. If Liza is a young actress, then 3. a. Two points determine a line. b. If there are two points then it will 4. a. Parallel lines do not intersect. b. If line m and line n are parailel lines then they 5. a. A triangle is a polygon with 3 sides. b. If it is a triangle then "Great! Now, let's see if you can rewrite a statement into a conditional statement. Do the Activity 1.7 Rewritten! Write the following statements in the if-then form then identify the hypothesis and 1. Perpendicular lines form right angles.
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Explain mathematically or create your own illustration about the Axioms and Postulates. AXIOMS 1. If equals are added to equals, then the wholes are equal. POSTULATES 1. A finite straight line can be produced continuously in a straight line.
Determine whether the given specification is consistent or not. 1. The student either has undergraduate courses or post-graduate courses, but not both. The student does not have undergraduate courses unless he does not have a bachelor's degree. The student has a bachelor's degree only if he has post-graduate courses. The student has undergraduate courses. a. Translation: b. Solution using Rules of Logical Equivalences:

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