Through Geogebra (or any other geometry application): Start with three arbitrary points, O, G, and A.Construct points B and C so that O becomes the circumcenter of triangle ABC and G is the centroid.
Through Geogebra (or any other geometry application): Start with three arbitrary points, O, G, and A.Construct...
Through Geogebra (or any other geometry application): Beginning with two points A and B such that the length of AB = 1, construct a segment of length 4√5 using AB and geometry.
Let ∆ABC be a triangle with circumcenter O, centroid G, and orthocenter H. Let ϕ be a similarity. Show that the triangle ϕ(∆ABC) = ∆ϕ(A)ϕ(B)ϕ(C) has... (a) circumcenter ϕ(O). (b) centroid ϕ(G). (c) orthocenter ϕ(H)
pls use the geogebra application to answer question 2 for me QUESTION 2 Verify whether f(x) is a probability density function (pdf) by going through the following steps. a. Enter the entries in the table into the spreadsheet view in GeoGebra b. Plot all pairs of points (x,f(x)) and fit an appropriate curve or polynomial to the points. c. Show, by shading, the region corresponding to the area under f(x) for the range of x values 0 SXS 4. d....
6. Start with the three points (a) Find the least squares line through the points. (b) Find the best curve of the form. I, C + D2r through the points. (c) Sketch the points, the least squares line, and the curve you found in part graph. Which gives a better fit, the line or the curve? (b) on the same 6. Start with the three points (a) Find the least squares line through the points. (b) Find the best curve...
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...
(JAVA) Implement a Triangle class. Any triangle can be represented by its THREE sides. Therefore, your class will have THREE private member variables → side1, side2 and side3. Use the double data type to represent the triangle sides. In addition, please provide public methods that perform the following FIVE tasks: ▪ An input method that obtains the appropriate values for the three sides from the user. While entering the values of the three sides, please remember the triangle property that...
28 Consider (O:OAOB) an orthonormal system in space. Let G be the center of gravity of triangle ABC. 1° Calculate the coordinates of G 2°Consider the points A' (2 ;0:0) ,B, (0:2:0) and C" (0:0,3). a) Verify that these three points define a plane. b) Write a system of parametric equations of the plane (A'BC'). 3 Write a system of parametric equations of line (AC). 4° Verify that K (4:0-3) is the trace of the line (AC) with the plane...
3 8 16 (0 complete) This Q Plot each point and form the triangle ABC. Show that the triangle ABC is a right triangle. Find its area. A (-2,11); B (5,7); C ( 1,0) Choose the correct graph below that shows points A, B, C, and triangle ABC. O A. O B. O C. OD. -14 14 Ha Show that the triangle ABC is a right triangle. Select the correct choice below and fill in the answer boxes to complete...
G(s) = K(s + 2) (s2 + 9)/(s-2)(s+6) For the system above, find the following through calculations: a) Sketch the root locus by hand, labeling all relevant points on your plot. a. Open Loop Poles and Zeros. b. Centroid (if there are any) c. Asymptotes (if there are any) d. Break away points (if there are any). e. Location where the poles cross into the Right Half Plane b) Discuss the stability of the system as the gain changes (i.e. does the system ever become unstable?). Find the...
part (g) a) Find the reactions(10 points) b) Draw the shear diagram (10 points) c) Draw the moment diagram(15 points) d) Calculate the moment of Inertia of the cross-section about its x-x neutral axis using the parallel axis theorem and compare this to the Onesteel value. Do the two values agree? (20 points) e) Determine the maximum tensile bending stress and indicate its location in the section (15 points) f) Calculate the maximum shearing stresses in the cross-section and draw...