50 \displaystyle{\sqrt} 2 Explanation: 5 is a coefficient, so just multiply it. 10 groups of 5 \displaystyle{\sqrt} 2's make 50 \displaystyle{\sqrt} 2's.

Let the two vectors be \vec{a} and \vec{b}, let \theta be angle between them. \vec{a}\cdot\vec{b}=|\vec{a}||\vec{b}| cos(\theta)=8 .... 1 \vec{a}\times\vec{b}=|\vec{a}||\vec{b}| sin(\theta)=8\sqrt{3} ...

\displaystyle\sqrt{{3}}\sqrt{{6}}={\left({3}\sqrt{{2}}\right.} Explanation: Simplify: \displaystyle\sqrt{{3}}\sqrt{{6}} Apply rule: \displaystyle\sqrt{{a}}\sqrt{{b}}=\sqrt{{{a}{b}}} \displaystyle\sqrt{{3}}\sqrt{{6}}=\sqrt{{{3}\times{6}}}=\sqrt{{18}} ...

A nice example of such vectors would be a=(0,1,-1), b=(-1,0,1), c=(1,-1,0). In this case, a+b+c=0. Maybe this linear dependency holds for all such triples? Try to compute (a+b+c)\cdot (a+b+c).

Simplifying we get \frac{z+i}{z-i} = \frac{x^2+y^2-1+2xi}{x^2+(y-1)^2} Therefore \arg\left( \frac{z+i}{z-1} \right) = \arctan\left(\frac{2x}{x^2+y^2-1} \right) = \frac{\pi}{4} Or \frac{2x}{x^2+y^2-1} = 1 ...

Let m,n \in \mathbb Z. If m and n are relatively prime in \mathbb Z, then am+bn=1 for some a,b \in \mathbb Z. Let R be any subring of \mathbb C. Then \mathbb Z \subseteq R and so am+bn=1 ...