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Final answer:Translational motion in geometry involves moving an object in a straight line without any rotation, retaining its orientation. Rotational motion, in contrast, involves an object moving in a circular path around a central point. The linear kinematic equations used to describe translational motion have their counterparts for rotational motion.Explanation:Your homework on transformations, particularly translations, is dealing with a specific type of movement in mathematics. The concept oftranslational motionrelates to how an object moves in a straight line from one position to another without rotating - it retains its orientation. This is typically dealt with in geometry, particularly when studying shapes or objects on a plane.In the context of geometry, a translation moves an object to a different location without changing its appearance in any other way. It involves shifting the object a certain distance in a certain direction. For instance, you might translate a square 5 units to the right and 3 units up. This is a pivotal concept in understanding the idea oftransformationin geometry.On the other hand,rotational motionis a movement of an object in a circular path around a central point. This is different from translation as it involves the object turning or spinning.Noteworthy to mention is that thelinear kinematic equationshave their rotational counterparts described in your text. This means that the equations used to describe translation can also describe rotation, but in different terms. These equations provide a way to understand and solve problems involving motion.Learn more about Translational motion here:brainly.com/question/32830349#SPJ11...