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Determine whether a figure with the given vertices is a parallelogram. Use the method indicated. A(4.5),...
QUESTION 1 Quadrilateral WXZY is a square. If the measure of angle XYZ = 4x + 15, find the value of x. 15 15 18.75 7.5 2 points QUESTION 2 Determine whether parallelogram JKLM with vertices J(-1, 1), K(4, 1), L(4, 6) and M(-1, 6) is a rhombus, square, rectangle or all three. rhombus square rectangle rhombus, square and rectangle 2 points QUESTION 3 In rectangle JKLM, JK is equal to 12 feet, and LN is equal...
1. Given the set of vertices, determine whether the quadrilateral is a rectangle, rhombus, or square:** Find the distance and slope or each line segment.A (−4,2), B (0,3), C (1,−1), D (−3,−2)This quadrilateral is a… A (Rhombus) B (Rectangle) C (square)
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...
Use the given transformation to evaluate the integral. -5x dx dy where R is the parallelogram bounded by the linesy-x+1, y-x +4 y#2x+2y»2x + 5 A) -5 B) 10 C)5 D)-10 32) y+ x where R is the trapezoid with vertices at (6,0), ,0).。. 6), (0.9) 45 45 B) ÷ sin l 45 C) sin 2 45 A) sin 2 Use the given transformation to evaluate the integral. -5x dx dy where R is the parallelogram bounded by the linesy-x+1,...
Complete the proof for proving that the diagonals of an isosceles trapezoid are congruent 19 Given: Trapezoid EFGH with FE = GH F-b, c) G(b, c) Prove: EG = HF E(-a, 0) 01 H(a,0) Proof: By the Distance Formula, EG = a. ? and HF = b._? By the transitive property of congruence, EG = HF. Therefore, EG = HF by the definition of congruence. Fill in the blank for space a. Proof: By the Distance Formula, EG = a....
3. Use Kuratowski's theorem to determine whether the given graph is planar. Construct the dual graph for the map shown. Then, find the number of colors needed to color the map so that no two adjacent regions have the same color. 4. a) b) CCE 5. Show that a simple graph that has a circuit with an odd number of vertices in it cannot be colored using two colors. 3. Use Kuratowski's theorem to determine whether the given graph is...
Quadrilateral TRAP is shown below. Which of the following could you use to show that TRAP is a trapezoid? Tl-b, R(b, Pl-a, 0) Ala, 0) A.Prove RA = TP B.Prove RA 1 AP C.Prove TR || PA D.Prove that there are no right angles formed by the line segments. Which formula or formulas are sufficient to prove that if the segments connecting the midpoints of each side of a trapezoid are joined, they form a parallelogram? Slope formula Distance Formula...
Parallelogram Program Write a program that prints the following parallelogram pattern given the the following two inputs. Here are the rules: Your program must work with any length greater than 1. Your program must use the character the user inputs to draw the parallelogram. Your program must not use global variables or global code other than a call to main(). Your program output must match my out exactly. I have provided you with the strings you need for the output...
6. Two sides and an angle of a triangle are given. Determine whether the measurements produce one triangle, two triangles, or no triangle. Solve each triangle that results. A. a = 30,C=20, A = 50° B. a = 6.1.c = 4, A = 162° C. a = 10.c = 30, A = 150° D. a = 7, c = 28, A = 12° E. a = 95, C = 125, A = 49° F. a = 1.4.c = 2.9, A...
Use your rules for translations and reflections to create a picture. You may do this on paper or using a computer program, such as Geogebra. Follow each step, in o 1. Graph a hexagon with vertices at (-4, 0), (-2, 0)·(-1,-1), (-2,-2), (-4,-2), and (-5,-1). 2. In the center of the hexagon, label it A. 3. Reflect hexagon A across the y-axis 4. Label the reflected hexagon A 5. Go bak to hexagon A, and translate it using the rule...