p. 238 2. Verify the claim made in Example 6.5 that there is only one line...
Part III (3 pts) For cach of the property statement below, determine which geometry would BEST xhoi given property (choose only one!). Please use A. for Euclidean geometry, B. for hypere geometry, gcometry and D. for Neutral geometry for your identifications Example. A There is a triangle in which the sum of the measures of the interior angles is 180. a. The opposite sides of a parallelogram are congruent. b. Similar triangles may not be congruent. Lines perpendicular to the...
Part II. (4 pts) Given the axiom set for the Incidence Geometry as below: Undefined terms: point, line, on Definitions: 1. Two lines are intersecting if there is a point on both. 2. Two lines are parallel if they have no point in common. Axioms: I. Given any two distinct points, there is a unique line on both. II. Each line has at least two distinct points on it. III. There exist at least three points. IV. Not all points...
3) Let us build a geometry, S, using the three axioms of incidence geometry with one additional axiom added: Incidence Axiom l: For every point P and every point Q (P and Q not equal), there exists a unique line, I, incident with P and Q. Incidence Axiom 2: For every line / there exist at least two distinct points incident with Incidence Axiom3: There exist (at least) three distinct points with the property that no line is incident with...
3) Let us build a geometry, S, using the three axioms of incidence geometry with one additional axiom added: Incidence Axiom l: For every point P and every point Q (P and Q not equal), there exists a unique line, I, incident with P and Q. Incidence Axiom 2: For every line / there exist at least two distinct points incident with Incidence Axiom3: There exist (at least) three distinct points with the property that no line is incident with...
With the given notes from below, answer number one please Axiom 1: there exists at least one line. Axiom 2: every line has exactly 8 points incident (passes through) to it Axiom 3: not all points are incident to the same line Axiom 4: there is no line containing all points Axiom 5: there is at least two points on one line Axiom 6: there exists at least two lines Axiom 7: there is exactly on with incident with any...
2. (Section 4.2) Given f(x)-x on the interval [0,4], complete the following (a) Verify that the function satisfies the hypotheses of the Mean Value Theorem on the given interval. b) Find the number c that satisfies the conclusion of the meat value theorem on the given interval. (c) Sketch a neat, clearly labeled graph with the function, the secant line that goes through the end points, and the tangent line at (c./(c)) all on the same coordinate grid (d) Are...
2) (i) State the converse of the Alternate Interior Angle Theorem in Neutral Geometry. (ii) Prove that if the converse of the Alternate Interior Angle Theorem is true, then all triangles have zero defect. [Hint: For an arbitrary triangle, ABC, draw a line through C parallel to side AB. Justify why you can do this.] 5) Consider the following statements: I: If two triangles are congruent, then they have equal defect. II: If two triangles are similar, then they have...
8. True or false (in absolute geometry unless otherwise stated.) (a) If A and D are points on opposite sides of BC and LABC BCD, then AB II CD (b) If two lines are parallel, then they are equidistant from each other. (c) If oABCD is a quadrilateral with right angles at A, B, and C, then LD is also a right angle. (d) Euclid's Parallel Postulate is equivalent to the following statement: Every point in the interior of an...
Only need help on Question 1 a)
to h)
2) Let V- [ae" + bxe" | a, b are real numbers]. 3) Let V-[a sin x + b cosz + ce" | a, b, c are real numbers] 1) LetV [ae" + be2"a, b are real numbers ] Let(Df)(x) For each of the three vector spaces V listed in 12, 3 below show that: a) D:V → V and D is a linear transformation b) By differentiation prove the functions...
7. (10) Find the flaw in the following attempted proof of the parallel postulate by Wolfgang Bolyai (Hungarian, 1775 - 1856) (see Fig. 3). Given any point P not on a line l, construct a line 1' parallel to through P in the usual way: drop a perpendicular PQ to / and construct /" perpendicular to PQ. Let I" be any line through P distinct from l'. To see that /" intersects I, pick a point A on PQ between...