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Transcript
MPM 2D Unit #4 The Shortest Distance from the Origin to a Line Example: Determine the shortest distance from the origin to the line l1 : x - 5y + 11 = 0 Solution: The shortest distance from a point to a line would be the ____________________ distance. Step #1: Graph the given line and indicate the origin with its l1 : x - 5y + 11 = 0 coordinates (0,0). Then, draw the line from the origin to the given line. It should be ______________________ to the given line. Where the lines meet call that point A. Change the equation of the line to y=mx+b form to graph. m = _____ b = _____ Step #2: Find the equation of OA. Need: 1. ___________ 2. ___________ Therefore, the equation of OA is _____________________. 1 Step #3: Solve the Linear System. We need to find the coordinates of point A (the point of intersection). We can do this by solving the linear system mathematically by ____________ or ____________. The equations of the lines are: l1 : _________________ lOA : _________________ Therefore the coordinates of point A are ( ___ , ___ ). . 2 Step #4: Find the length of Line OA. O ( ___, ___) Using the length formula: A ( ___, ___) Therefore the shortest distance from the origin to the line is approximately ______ units. A quick way to remember the steps to find the shortest distance after you graph is: E________________ S________________ L ________________ Homework: page 103 # 2 a,c,e 3
