[tex]
\frac{|\mathbf{u\cdot v}|}{^{\|u\|^{2}}}\mathbf{u} = \frac{|\mathbf{u\cdot v}|}{^{\|v\|^{2}}}\mathbf{v}
[/tex]
Office_Shredder said:You can immediately see from
That u is a multiple of v (and vice versa). What do you think beyond that?
IniquiTrance said:That if one is larger/smaller than the other, the projections cannot be equivalent.
Vector projection is a mathematical operation that involves projecting one vector onto another. It is a way to find the component of one vector that is parallel to another vector.
Vector projection can be calculated using the formula projuv = (u dot v / v dot v) * v, where u is the vector being projected and v is the vector onto which u is being projected.
Yes, it is possible for projuv to equal projvu. This occurs when the two vectors being projected are parallel to each other. In this case, the projection of one vector onto the other will result in the same value regardless of which vector is being projected onto which.
The purpose of vector projection is to break down a vector into its components in a specific direction. This can be useful in various mathematical and scientific applications, such as calculating forces or determining the direction of motion in a given system.
Yes, vector projection can be used in three-dimensional space. The formula for calculating vector projection remains the same, but the vectors involved will have three components instead of two. The resulting projection will also be a three-dimensional vector.