Given the following Axioms of four-point geometry, prove whether or not Axiom 3 is independent of...

Use models to show that each of the incidence axioms is independent of the other three....

Use models to show that each of the incidence axioms is independent of the other three. Axiom 1: There exists at least 3 distinct noncollinear points Axiom 2: Given any two distinct points, there is at least one line that contains both of them Axiom 3: Given any two distinct points, there is at most one line that contains both of them Axiom 4: Given any line, there are at least two distinct points that lie on it.

Refer the axioms below Ques For each part of the five axioms, decide whether it is...

Refer the axioms below Ques For each part of the five axioms, decide whether it is true or false for a cylinder. Explain how you know that it is true and/or exactly when and how it fails. Make sure that you consider each possible type of line and every possible configuration of points. Write down the best possible variation of the axiom which is true. Draw pictures where appropriate. Note: To test the plane separation axiom, try actually cutting the...

Prove that the axiomatic set for Fano's 7 point/line geometry is independent.

Prove that the axiomatic set for Fano's 7 point/line geometry is independent.

using these axioms ( finite affine plane ) : AA1 : there exists at least 4...

using these axioms ( finite affine plane ) : AA1 : there exists at least 4 distinct points , no there of which are collinear . AA2 : there exists at least one line with n (n>1) points on it . AA3 : Given two distinct points , there is exactly one line incident with both of them . AA4 : Given a line l and a point p not on l , there is exactly one line through p...

A projective plane is a plane (S,L ) satisfying the following four axioms. P1. For any...

A projective plane is a plane (S,L ) satisfying the following four axioms. P1. For any two distinct points P and Q there is one and only one line containing P and Q. P2. For any two distinct lines l and m there exists one and only one point P belonging to l∩m. P3. There exist three noncollinear points. P4. Every line contains at least three points. a)Give an example of a plane (S,L) that satisfies axioms P1, P2 and...

(Euclidean and Non Euclidean geometry) Consider the following statements: Given a line l and a point...

(Euclidean and Non Euclidean geometry) Consider the following statements: Given a line l and a point P not on the line: There exists at least one line through P which is perpendicular to l. There exists at most one line through P which is perpendicular to l. There exists exactly one line through P which is perpendicular to l. Prove each statement or give a counter-example E2 (Euclidean Plane), H2 , (Hyperbolic Plane)and the sphere S2 (Spherical Plane) ( Consider...

Consider the following axiomatic system: 1. Each point is contained by precisely two lines. 2. Each...

Consider the following axiomatic system: 1. Each point is contained by precisely two lines. 2. Each line is a set of four points. 3. Two distinct lines that intersect do so in exactly one point. True or false? There exists a model with no parallel lines.

For each of the following sets X and collections T of open subsets decide whether the...

For each of the following sets X and collections T of open subsets decide whether the pair X, T satisfies the axioms of a topological space. If it does, determine the connected components of X. If it is not a topological space then exhibit one axiom that fails. (a) X = {1, 2, 3, 4} and T = {∅, {1}, {1, 2}, {2, 3}, {1, 2, 3}, {1, 2, 3, 4}}. (b) X = {1, 2, 3, 4} and T...

In neutral geometry: Let R = rl ◦rm be a rotation given by reflection in a...

In neutral geometry: Let R = rl ◦rm be a rotation given by reflection in a line m followed by reflection in a line l (m and l are distinct lines). Let O = m∩l be the fixed point of R. Let θ = m AOR(A) for some point A not equal to O. Let X be a point distinct from O on the line m and let Y be a point distinct from O on the line l. Suppose...

Can you prove the following assertions using only Euclid's postulates and common notions? Explain your answer....

Can you prove the following assertions using only Euclid's postulates and common notions? Explain your answer. (a) Every line has at least two points lying on it (b) For every line there is at least one point that does not lie on the line (c) For every pair of points A not equal to B, there is only one line that passes through A and B.