Find Sum of Collinear Vectors x, y, z

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To find the sum of non-zero vectors x, y, and z, where x+y is collinear with z and y+z is collinear with x, one must understand that collinear vectors lie along the same line. Collinearity occurs when one vector is a scalar multiple of another, meaning they are parallel. The discussion emphasizes the importance of recognizing the conditions of collinearity to solve the problem. Clarification on collinear vectors is provided, stating that they share a common direction. Understanding these concepts is crucial for determining the sum of the vectors in question.
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I couldn't solve this problem guys:

Let vectors x, y, z be non zero vectors, no two of which are collinear. Find their sum if x+y is collinear with z and if y+z is collinear with x.

Also, what does a collinear vector mean?
 
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Two vectors are collinear if they lie along the same line.

The easiest algebraic description of collinearity is that two vectors v and w are collinear if and only if one is a scalar multiple of the other. That is, there exists a number α such that:

v = α w
or
w = α v
 
Hurkyl said:
Two vectors are collinear if they lie along the same line.

The easiest algebraic description of collinearity is that two vectors v and w are collinear if and only if one is a scalar multiple of the other. That is, there exists a number α such that:

v = α w
or
w = α v

To be specific, vectors are collinear when their lines of action are parallel to each other.
 
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