(a) u=(u_1,u_2,u_3,u_4) So that u is orthogonal to a: u \cdot a=0 \Rightarrow u_1-3u_2+u_4=0 \ \ \ (1) So that u is orthogonal to b: u \cdot b=0 \Rightarrow u_1+2u_2-u_4=0 \ \ \ (2) ...

Lemma. Let T:\mathbb{C}\to\mathbb{C} be \mathbb{R}-linear (considering \mathbb{C} as an \mathbb{R}-vector space just by restricting the scalar multiplication). Then the following are ...

Using this identity to express the hypergeometric function as a Gegenbauer function, and this identity which gives the value of the Gegenbauer function evaluated at 1, the hypergeometric ...

1.\;Since \{v,w\} is a basis, any vector y in \mathbb{C}^2 can be expressed uniquely in terms of this basis. Let y=Aw, then we can write y=Aw = \alpha v+\beta w for unique \alpha and \beta ...

This depends on which metric you define. Possible metrics would, for example, result in converting the a:b:c to a vector \left( \begin{matrix}a\\b\\c\end{matrix} \right) And using some ...

Quantifiers are needed. No truth-value can be assigned to "a-b=b-a" as it stands. The sentence \forall a \forall b\;(a-b=b-a) is false. The sentence \exists a \exists b\;(a-b=b-a) is true. A ...