User:Jbergquist/Sandbox

$$ \begin{matrix}

\begin{array}{|c||c|c|c|} \hline x & f=\Delta^0 & \Delta^1 & \Delta^2 \\ \hline 1&\underline{2}& & \\ & &\underline{0}& \\ 2&2& &\underline{2} \\ & &2& \\ 3&4& & \\ \hline \end{array}

&

\quad \begin{matrix} f=\Delta^0 \cdot 1 +\Delta^1 \cdot \dfrac{(x-x_0)_1}{1!} + \Delta^2 \cdot \dfrac{(x-x_0)_2}{2!} \quad (x_0=1)\\ \\ =2 \cdot 1 + 0 \cdot \dfrac{x-1}{1} + 2 \cdot \dfrac{(x-1)(x-2)}{2} \\ \\ =2 + (x-1)(x-2) \\ \end{matrix}

\end{matrix} $$

Existing math wiki from Mathtype LaTeX translator:


 * $$ {\Delta _{j,0}} = {y_j},\quad \quad {\Delta _{j,k}} = \frac

\quad \mathrel\backepsilon  \quad \left\{ {k > 0,\;\;j \leqslant \max \left( j \right) - k} \right\},\quad \quad \Delta {0_k} = {\Delta _{0,k}}$$


 * $${P_0} = 1,\quad \quad {P_{k + 1}} = {P_k} \cdot \left( {\xi - {x_k}} \right)$$


 * $$f(\xi ) = \Delta 0 \cdot P\left( \xi \right)$$

Simplified wiki from Mathtype Wikipedia translator:


 * $$\Delta _{j,0}=y_j,\quad \quad \Delta _{j,k}=\frac{\Delta _{j+1,k-1}-\Delta _{j,k-1}}{x_{j+k}-x_j}\quad \ni \quad \left\{ k>0,\ \ j\le \max \left( j \right)-k \right\},\quad \quad \Delta 0_k=\Delta _{0,k}$$


 * $${P_0}=1,\quad \quad P_{k+1}=P_k\cdot \left( \xi -x_k \right)$$


 * $$f(\xi )=\Delta 0\cdot P\left( \xi \right)$$

Alternatives for such that,

\backepsilon : $$\backepsilon$$

\ni : $$\ni$$

NB: $$\ni$$ ( \ni ) is the "horizontal flip" of $$\in$$ ( \in ) which can be read as the "element" symbol. The such that symbol implies conditions placed on an expression which preceeds it. It seems to have been omitted from LaTeX. Logically, it is similar to "if" which falls under implication suggesting use of the $$\Leftarrow$$ symbol. Perhaps an extention will include such that someday. There are potential uses for it.

)

)

$$\text{abcd}$$

strikethrough{)} works in MathType but there is no LaTeX or Wikipedia translation. *arg*

Error message: "No translation available for Mid-line strike-through."

such that

There appears to be no dictionary entry for the phrase "such that". But consider,

such: being the person or thing or the person or things indicated; in such a way or manner

subject to: a., contingent or conditional upon (with to); v.i., to bring under the control or authority of.

trident n., A three-pronged spear somewhat resembling a pitchfork.