Difference between revisions of "The Cross Product"

From Department of Mathematics at UTSA
Jump to navigation Jump to search
Line 4: Line 4:
  
 
<math>\mathbf{w} = \textrm{det}\begin{vmatrix}
 
<math>\mathbf{w} = \textrm{det}\begin{vmatrix}
i & j & k\\
+
\mathbf{i} & \mathbf{j} & \mathbf{k}\\
 
u_1 & u_2 & u_3\\
 
u_1 & u_2 & u_3\\
 
v_1 & v_2 & v_3\\
 
v_1 & v_2 & v_3\\
 
\end{vmatrix} =
 
\end{vmatrix} =
(u_2v_3 - u_3v_2) - (u_1v_3 - u_3v_1) + (u_1v_2 - u_2v_1)
+
(u_2v_3 - u_3v_2)\mathbf{i} - (u_1v_3 - u_3v_1)\mathbf{j} + (u_1v_2 - u_2v_1)\mathbf{k}
 
</math>
 
</math>
  

Revision as of 17:30, 20 September 2021

Cross_product_parallelogram

The cross product is an operation between two 3-dimensional vectors that returns a third vector orthogonal (i.e., perpendicular) to the first two. For vectors and , the cross product of and (notated as ) is . One way to remember the cross product of and is to calculate it with the following determinant:

Resources