Let A = (6, -2, 4). Find two vectors C and D which are parallel to A.

1 answer

To find vectors C and D that are parallel to vector A, we can simply multiply vector A by a scalar.

Let's take vector C = 2A.
C = 2 * (6, -2, 4)
C = (12, -4, 8)

Now let's take vector D = -3A.
D = -3 * (6, -2, 4)
D = (-18, 6, -12)

Therefore, vectors C = (12, -4, 8) and D = (-18, 6, -12) are parallel to vector A = (6, -2, 4).
Similar Questions
  1. For what value of t are these two vectors parallel?a) r = 4i + tj and s = 14i - 12j What I Know: vectors are parallel if one is
    1. answers icon 3 answers
  2. two vectors are defined as a=2i+xj and b=i-4j. find value of x ifa) the vectors are parallel b) the vectors are perpendicular
    1. answers icon 0 answers
  3. two vectors are defined as a=2i+xj and b=i-4j. find value of x ifa) the vectors are parallel b) the vectors are perpendicular
    1. answers icon 1 answer
  4. Find the vectors and whose initial and terminal points are given, Determine whether the located vectors and are parallel. (a) ,
    1. answers icon 1 answer
more similar questions