Translate \(QUAD\) to the left 3 units and down 7 units. Translate \(\Delta DEF\) to the right 5 units and up 11 units. Find the translation rule that would move \(A\) to \(A′(0,0)\), for #16.If \(\Delta A′B′C′\) was the preimage and \(\Delta ABC\) was the image, write the translation rule for #15.If \(\Delta A′B′C′\) was the preimage and \(\Delta ABC\) was the image, write the translation rule for #14.What can you say about \(\Delta ABC\) and \(\Delta A′B′C′\)? Can you say this for any translation? 00:12:12 Draw the image given the rotation (Examples 5-6) 00:16:41 Find the coordinates of the vertices after the given transformation (Examples 7-8) 00:19:03 How to describe the rotation after two repeated reflections (Examples 9-10) 00:26:32 Identify rotational symmetry, order, and.Find the lengths of all the sides of \(\Delta A′B′C′\).Find the lengths of all the sides of \(\Delta ABC\).Use the triangles from #17 to answer questions 18-20. Therefore, the translated figure for the given coordinate is : Translation Example. For D(2, 3), the translated coordinate will be (x-0, y-5) (2-0, 3-5) Hence, (2, -2) is a translated coordinate. Notation for this composite transformation is: ry axi 1. In Geometry, the four basic translation or transformations are: Translation Reflection Rotation. The second reflection in the y -axis to produce the figure A B C. The first transformation is a translation of 1 unit to the left and 5 units down to produce A B C. In questions 14-17, \(\Delta A′B′C′\) is the image of \(\Delta ABC\). There are two transformations shown in the diagram. Find the vertices of \(\Delta A′B′C′\), given the translation rules below. The transformation f(x) (x+2) 2 shifts the parabola 2. This pre-image in the first function shows the function f(x) x 2. We can apply the transformation rules to graphs of quadratic functions. (x,y) (x-8, y-3) Transformation of Quadratic Functions. The vertices of \(\Delta ABC\) are \(A(−6,−7)\), \(B(−3,−10)\) and \(C(−5,2)\). This translation can algebraically be translated as 8 units left and 3 units down. Use the translation \((x,y)\rightarrow (x+5, y−9)\) for questions 1-7. What if you were given the coordinates of a quadrilateral and you were asked to move that quadrilateral 3 units to the left and 2 units down? What would its new coordinates be?
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