0 2Cvf capmNvv3n ^ h DV0v1 hvVVplllllllllP%`'@=o?~Suppose V is a vector with its tail at point a and its head at b, and V0 is the same vector when its tail is at the origin. What is the relationship between the coordinates of V and those of V0? ? ferences of the coordinates of b `Png points a,àand vector V, and see how the cooKRPW% DV0v1 hvVVpA `#$Ud"""ldCB   DV0v1 hvVVpaC@ DV0v1 hvVVpbC z! DV0v1 hvVVp  W@[P 0/Coordinates of vectors roaming around the planene` [`8H )Y0|x(@<`ni8clPHY`x[ ޞhH6a`XW@|&Aa"  DV0v1 hvVVp`b ޞhma`a e4g If p0 is the head of V0 then the coordinates of p0 are the differences of the coordinates of b and a. Check it out!t!!ordinates change. (You can verify the arithmeta d use the gri^ a d oob,  DV0v1 hvVVp  p0m2JTry moving points a, b, and vector V, and see how the coordinates change. ange. (You can verify the arithmetic easier if you use the grid points).).@?HnNB/NNG  DV0v1 hvVVp  =@A2jUse Tabulate to make a list of the coordinates at various positions. See if you can figure out the rule. `L=@@`߄`N=NOKPB$ DV0v1 hv6VVpB`8X,@`CπB    DV0v1 hvVVpVC@C?NNA` DV0v1 hv VVpDՌllllllll0 C  DV0v1 hvVVpp(0)p{l:0}C@@ N N #HDV0v1 hv2V Vpt0@CB@R Sc DV0v1 hvVVpc1iesSystem Folder alias Translators Shut DownCA`?5%F?5%F QPg