Anyone Good With Calculus 3?

1 ANSWERS

1. 
   

   Your initial position is 2i - 2j. You walk some distance in the direction of (4i + 2j). Then you move at a right angle to this direction for some distance, and end up at position 4i + 2j.
   
   A vector in the plane perpendicular to (4i + 2j) is (2i - 4j) (switch the components, and multiply one of them by -1 -- note that the dot product is zero). There are two choices; you can use a diagram to pick the correct one, or let the math do it for you.
   
   So we have
   
   2i - 2j + m(4i + 2j) + n(2i - 4j) = 4i + 2j
   
   where m and n are numbers (since the direction vectors aren't unit vectors, m and n are not the distances in each direction).
   
   This is equivalent to the two equations
   
   2 + 4m + 2n = 4
   
   -2 + 2m - 4n = 2
   
   or
   
   4m + 2n = 2
   
   2m - 4n = 4
   
   whose solution is m = 4/5, n = -3/5 (the negative value of n tells me that the second leg of the trip was in the direction -(2i - 4j), not (2i - 4j) as I arbitrarily chose it.)
   
   The coordinates of the point where you make the turn are
   
   2i - 2j + m(4i + 2j) = 2i - 2j + (4/5)(4i + 2j) = (26/5, -2/5)

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