Transformations are sometimes called mappings. We will refer to the initial set of points as the pre-image and the final set of points as the image. In reflections, translations, and rotations, the image is always congruent to the pre-image. Because of this fact, each of these three transformations is known as a congruence transformation. Sep 09, 2016 · Which transformation would not always proudce an image that would be congruent to the original figure? (2) dilation. A dilation will change the size of an image, so it will not be congruent. The others only change the orientation. 3. If an equilateral triangle is continuously rotated around ones of its medians, which 3-dimensional object is ... Investigation: Congruent Figures using Transformations In middle school, you were introduced to concepts about congruence. You learned that a figure is congruent to another if the second can be obtained from the first by a sequence of rotations, reflections, and translations. Dear Deontae Jones. The answer is correct because the translation is isometric transformation, hence it preserves the distances, angles, and the image will be a congruent figure. The reflection and the rotation are other examples of transformations which produce a congruent figure. Reference: Isometric Transformations. 19) Which one of the following transformations would not always produce an image that would be congruent to the original figure? A) translation B) dilation C) reflection D) rotation 20) The image of ∆DEF is ∆D′E′F′. Under which transformation will the triangles not be congruent? A) a reflection over the line y = x Create your account. View this answer. The type of transformation that will always produce a congruent figure is called an isometry. Because of this property of isometries, these types of... See ... Mar 06, 2012 · Considering translation , you slide and the figure stays the same. Parallelism is a figure that moves in a parallel direction but keeps its shape. Angle Measure is just a movement with a congruent... 19) VAIich one of the following transformations would not always produce an image that would be congruent to the original figure? A) translation B) dilation C) reflection D) rotation 20) The image of ADEF is ADE'F. Un&r which transformation will the triangles not be congruent? A) a reflection over the line y — x B) a reflection through the origin Which transformation could be used to show that figure A is congruent to figure B? A. Add 5 to each x – coordinate B. Multiply each y – coordinate by -1 C. Multiply each x – coordinate by -1 D. Rotate the figure 90 degrees about the origin 4. Which of the following transformations always preserves the dimensions of a figure? Which transformation will always produce a congruent figure? (X, (X, (X, (X, (x + 2,2y) Point p' is the image of point P after a counterclockwise rotation of 900 about the origin. If the coordinates of point p' are ( —7, 3) , what are the coordinates of point P? A B c D Which of the following transformations will never produce a congruent figure? A. rotation B. reflection C. translation D. dilation . MATH HELP ASAP. Adjacent angles are _____ congruent A- always B- sometimes C- never D- none of these HELP ASAP . math. 1. Which is a set of collinear points? J,H,I L,H,J J,G,L L,K,H 2. In options B, C and D, rotation, translation and reflection takes place. Therefore, they are all congruent to the original figure. In option A, translation of 4 units to the right followed by a dilation of 2 takes place. So, it changes the size of the original figure and hence it is not congruent to the original figure. Hence, the correct option is A. Correct answers: 1 question: Name a transformation that does not always produce an image that would be congruent to the original figure Which of the following transformations will never produce a congruent figure? A. rotation B. reflection C. translation D. dilation . MATH HELP ASAP. Adjacent angles are _____ congruent A- always B- sometimes C- never D- none of these HELP ASAP . math. 1. Which is a set of collinear points? J,H,I L,H,J J,G,L L,K,H 2. May 20, 2009 · what transformation does not always produce an image that is congruent to the original figure?? Answer Save. 2 Answers. Relevance. ballet423. 1 decade ago. Transformations are sometimes called mappings. We will refer to the initial set of points as the pre-image and the final set of points as the image. In reflections, translations, and rotations, the image is always congruent to the pre-image. Because of this fact, each of these three transformations is known as a congruence transformation. Mar 01, 2015 · Which of the following transformations will always produce a congruent figure? A.reflection B.expansion C. contraction D.dilation REFLECTION will always produce a congruent figure. Which transformation could be used to show that figure A is congruent to figure B? A. Add 5 to each x – coordinate B. Multiply each y – coordinate by -1 C. Multiply each x – coordinate by -1 D. Rotate the figure 90 degrees about the origin 4. Which of the following transformations always preserves the dimensions of a figure? Which of the following transformations will always produce a congruent figure? A. reflection B. dilation C. expansion D. contraction Which of the following transformations will produce a similar, but not congruent figure? A. dilation B. translation C. reflection D. rotation The following table shows examples of congruence and transformation of figures: translation, rotation, and reflection. Scroll down the page for more examples and solutions. Congruence (8.G.2) Two figures are congruent if you can translate, rotate, and/or reflect one shape to get the other. Show Step-by-step Solutions The following table shows examples of congruence and transformation of figures: translation, rotation, and reflection. Scroll down the page for more examples and solutions. Congruence (8.G.2) Two figures are congruent if you can translate, rotate, and/or reflect one shape to get the other. Show Step-by-step Solutions Dear Deontae Jones. The answer is correct because the translation is isometric transformation, hence it preserves the distances, angles, and the image will be a congruent figure. The reflection and the rotation are other examples of transformations which produce a congruent figure. Reference: Isometric Transformations. Dec 06, 2016 · 21. Three transformations will be performed on triangle ABC. Which set of transformations will always produce a congruent triangle? A. dilation, rotation, translation B. re ection, dilation, translation C. rotation, re ection, dilation D. rotation, translation, re ection page 10 Transformations Worksheet Which of the following transformations will always produce a congruent figure? A. expansion B. contraction C. dilation D. reflection 11. Three transformations will be performed on triangle ABC. Which set of transformations will always produce a congruent triangle? A. dilation, rotation, translation B. re ection, dilation, translation C. rotation, re ection, dilation D. rotation, translation, re ection 12. The vertices of ^ABC are A(2;1), B(3;4), and C(1;3). Which algebraic representation shows the effect that a reflection over the x-axis will have on the coordinates of a figure? Transformation and Angle Relations DRAFT 8th grade The figure shows two similar triangles PQR and P’Q’R’. Triangle P’Q’R’ is a dilation of triangle PQR. We say that triangle PQR is transformed onto triangle P’Q’R’ by a dilation with center at O and scale factor . The following diagrams show the triangle ABC dilated with different scale factors. 11. Three transformations will be performed on triangle ABC. Which set of transformations will always produce a congruent triangle? A. dilation, rotation, translation B. re ection, dilation, translation C. rotation, re ection, dilation D. rotation, translation, re ection 12. The vertices of ^ABC are A(2;1), B(3;4), and C(1;3). A transformation that "slides" each point of a figure the same distance in the same direction. Rotation A transformation that turns a figure about a fixed point at a given angle and a given direction. The following table shows examples of congruence and transformation of figures: translation, rotation, and reflection. Scroll down the page for more examples and solutions. Congruence (8.G.2) Two figures are congruent if you can translate, rotate, and/or reflect one shape to get the other. Show Step-by-step Solutions Dear Deontae Jones. The answer is correct because the translation is isometric transformation, hence it preserves the distances, angles, and the image will be a congruent figure. The reflection and the rotation are other examples of transformations which produce a congruent figure. Reference: Isometric Transformations. 18. Three transformations will be performed on triangle ABC. Which set of transformations will always produce a congruent triangle? A. dilation, rotation, translation B. re ection, dilation, translation C. rotation, re ection, dilation D. rotation, translation, re ection 19. Use shape J to answer the following question 19) VAIich one of the following transformations would not always produce an image that would be congruent to the original figure? A) translation B) dilation C) reflection D) rotation 20) The image of ADEF is ADE'F. Un&r which transformation will the triangles not be congruent? A) a reflection over the line y — x B) a reflection through the origin

Which of the following transformations will always produce a congruent figure? A. expansion B. contraction C. dilation D. reflection