Homework #1: Decomposable Forms | oheric.com

Homework #1: Decomposable Forms

Let $\vec{u}$ be an ordinary vector in $\Re^3$ , so that

$\vec{u} = A\hat{i} + B\hat{j} + C\hat{k}$

Find $\vec{v}$ and $\vec{w}$ such that

$\vec{u} = \vec{v} \times \vec{w}$

We observe that the cross product is an alternating linear function, uniquely determined by its action on the basis,

$\begin{align*}<br /> \hat{j} \times \hat{k} &= \hat{i} \\<br /> \hat{k} \times \hat{i} &= \hat{j} \\<br /> \hat{i} \times \hat{j} &= \hat{k}<br /> \end{align*}$

and also that $\times$ is antisymmetric and distributive. Bring this all together, we can express $\vec{u}$ as a product of two vectors:

$\begin{align*}<br /> \vec{u} &= A\hat{j} \times \hat{k} + B\hat{k} \times \hat{i} + C\hat{i} \times \hat{j} \\<br /> &= A\hat{j} \times \hat{k} + (B\hat{k} - C\hat{j})\times \hat{i} \\<br /> &= (A + B) \hat{j} \times \hat{k} + B \hat{k} \times \hat{j} + (B\hat{k} - C\hat{j})\times \hat{i} \\<br /> &= -C \frac{(A + B)}{-C} \hat{j} \times \hat{k} + B \hat{k} \times \hat{j} + (B\hat{k} - C\hat{j})\times \hat{i} \\<br /> &= (B\hat{k} - C\hat{j})\times (\hat{i} + \hat{j} - \frac{(A + B)}{C}\hat{k}) \end{align*}$

Notice that if $C=0$ , the answer is undefined. One, of A,B,C must be nonzero, however, in which case a symmetric argument will suffice. $\square$

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Sun, 2007-02-11 23:24 | eric