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13 Nov 2019
2. (1 point) We can parameterize a line in three dimensions by writing equations for x, y, and z that depend on one variable, e.g. n(t) = t yi (t) = 4-2t zi (t) = 1 + t T2 (s)-34 28 y2(s) = 6 + 28 z2 (s) 8-28. f(t, s) (zi (t)-T2 (s) )2 + (n(t)-m(s))2 + (zl (t)-a(s))2 and The squared distance between points on the two lines is a function of t and s: 21(t) - 22(S Find the shortest distance between the two lines by locating the minimum of f(t, s).
2. (1 point) We can parameterize a line in three dimensions by writing equations for x, y, and z that depend on one variable, e.g. n(t) = t yi (t) = 4-2t zi (t) = 1 + t T2 (s)-34 28 y2(s) = 6 + 28 z2 (s) 8-28. f(t, s) (zi (t)-T2 (s) )2 + (n(t)-m(s))2 + (zl (t)-a(s))2 and The squared distance between points on the two lines is a function of t and s: 21(t) - 22(S Find the shortest distance between the two lines by locating the minimum of f(t, s).
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Jarrod RobelLv2
6 Jan 2019