Kullanıcı:Srt/deneme

${\displaystyle \left(p_{b}-k\Delta p_{b},p_{b}+k\Delta p_{b}\right)}$

${\displaystyle \Delta p_{b}={\sqrt {\frac {p_{b}(1-p_{b})}{N}}}}$

${\displaystyle \left(p_{b}f+{\frac {k^{2}}{2N}}f-kf{\sqrt {{\frac {p_{b}(1-p_{b})}{N}}+{\frac {k^{2}}{4N^{2}}}}},p_{b}f+{\frac {k^{2}}{2N}}f+kf{\sqrt {{\frac {p_{b}(1-p_{b})}{N}}+{\frac {k^{2}}{4N^{2}}}}}\right)}$

${\displaystyle \Pr(\left|p_{true}-L/N\right|>k\sigma )\leq {\frac {1}{k^{2}}}}$

${\displaystyle \sigma ={\sqrt {\frac {p_{true}(1-p_{true})}{N}}}}$

${\displaystyle {\sqrt {p(1-p)}}}$

${\displaystyle std={\sqrt {{\frac {1}{(N-1)}}\sum _{i=1}^{N}(x_{i}-{\overline {x}})^{2}}}}$

${\displaystyle mean={\overline {x}}={\frac {1}{N}}\sum _{i=1}^{N}x_{i}}$

${\displaystyle \sum _{i=1}^{N}(x_{i}-{\overline {x}})^{2}=\left(\sum _{i=1}^{N}x_{i}^{2}\right)-N{\overline {x}}^{2}}$

${\displaystyle std={\sqrt {{\frac {1}{(N-1)}}\left[\left(\sum _{i=1}^{N}x_{i}^{2}\right)-N{\overline {x}}^{2}\right]}}}$

${\displaystyle stderr={\frac {std}{\sqrt {N}}}}$

${\displaystyle {\overline {x}}}$

${\displaystyle {\hat {x}}_{1},{\hat {x}}_{2},\ldots {\hat {x}}_{i}}$

${\displaystyle \phi ={\frac {1}{2}}(1+{\sqrt {5}})}$

${\displaystyle \phi -{\frac {1}{\phi }}=1}$

${\displaystyle \phi ^{2}+{\frac {1}{\phi ^{2}}}=3}$

${\displaystyle \phi ^{3}-{\frac {1}{\phi ^{3}}}=4}$

${\displaystyle \phi ^{4}+{\frac {1}{\phi ^{4}}}=7}$

${\displaystyle \phi ^{5}-{\frac {1}{\phi ^{5}}}=11}$

The general form of this property is

${\displaystyle \ \phi ^{n}+(-\phi )^{-n}=L_{n}}$

where ${\displaystyle \ n=1,2,4,5,...}$ are the counting numbers and ${\displaystyle \ L_{n}}$ are the Lucas numbers.

${\displaystyle \ \phi ^{n}+(ijk\phi )^{-n}=L_{n}}$

${\displaystyle \ ijk=-1}$

${\displaystyle \ i^{2}=-1}$

${\displaystyle \ j^{2}=-1}$

${\displaystyle \ k^{2}=-1}$

The ${\displaystyle \ i,j,k}$ are the basis quaternions.

This connection is suggestive of a biquaternion (complex quaternion) ${\displaystyle \ q}$ that satisfies the (golden) condition

${\displaystyle \ q-{\frac {1}{q}}=1}$

${\displaystyle \ q-{\frac {1}{q}}=(z_{0}+z_{1}i+z_{2}j+z_{3}k)-{\frac {z_{0}-z_{1}i-z_{2}j-z_{3}k}{{z_{0}}^{2}+{z_{1}}^{2}+{z_{2}}^{2}+{z_{3}}^{2}}}}$

${\displaystyle \mathbb {H^{C}} =\{(z_{0},z_{1},z_{2},z_{3})\mid z_{0},z_{1},z_{2},z_{3}\in \mathbb {C} \}}$

${\displaystyle Q=\{\pm 1,\pm i,\pm j,\pm k\}}$

${\displaystyle \mathbb {H} }$

Let ${\displaystyle \ 1,i,j,k}$ be the basis for the quaternions, and let ${\displaystyle \ z_{0},z_{1},z_{2},z_{3}}$ be complex numbers, then

${\displaystyle \ q=z_{0}1+z_{1}i+z_{2}j+z_{3}k}$

is a biquaternion. The complex numbers ${\displaystyle \ z_{0},z_{1},z_{2},z_{3}}$ commute with the quaternion basis vectors, and the root of -1 in the complex numbers is distinct from all three of the quaternion basis vectors. The algebra of biquaternions ${\displaystyle \mathbb {H^{C}} =\{(z_{0},z_{1},z_{2},z_{3})\mid z_{0},z_{1},z_{2},z_{3}\in \mathbb {C} \}}$ is associative, but not commutative.

${\displaystyle \ q^{-1}={\bar {q}}(q{\bar {q}})^{-1}}$

${\displaystyle \ {\bar {q}}=z_{0}-z_{1}i-z_{2}j-z_{3}k}$

${\displaystyle \ q{\bar {q}}={z_{0}}^{2}+{z_{1}}^{2}+{z_{2}}^{2}+{z_{3}}^{2}}$

${\displaystyle \ {z_{0}}^{2}+{z_{1}}^{2}+{z_{2}}^{2}+{z_{3}}^{2}=-1}$

${\displaystyle \ q-{\frac {1}{q}}=2z_{0}}$

${\displaystyle \ {z_{1}}^{2}+{z_{2}}^{2}+{z_{3}}^{2}=-{\frac {5}{4}}}$