Greenwood press
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book-20600
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MATRICES
63 Transformation matrices and robotics Viewing objects in computer graphics ▲ ▼ ▲ PERIMETER The distance around an object, or perimeter, is used for many purposes. The concept is used by construction workers to determine the amount of trim needed to seal the intersection between the drywall and ground, and drywall and ceiling in each room when building a house. Artists use perimeter to determine the amount of material they will need to put a frame around their pictures. Homeowners use perimeter to determine the amount of fencing they would need for their back yard, or railroad ties to surround an outdoor patio. In an open field, a farmer can determine that the most ideal arrangement for building a rec- tangular pen for animals is to place his fencing in the form of a square. Suppose the farmer has 80 meters of fencing. In a rectangular pen, the unknown dimen- sions of the length and width can be represented by variables, l and w, respec- tively. The perimeter of the rectangular pen can be written as 80 = 2l + 2w. The equation can be reduced to l + w = 40 by dividing both sides of the equa- tion by 2. Ideally, the farmer would like to build the largest pen so that his animals have the greatest amount of space to move around in. Thus the farmer needs to determine the dimensions that would produce a maximum area. The area, a, can be represented by the equation a = lw. Substituting the perimeter relationship l = 40 − w, the area equation can be rewritten as a = (40 − w)w = 40w − w 2 . A graph of this function shows that the area attains a maximum value when the Download 1.81 Mb. Do'stlaringiz bilan baham: 
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