User:Rajalakshmy/My Sandbox

$$Insert formula here$$This is a place where ihttp://wikieducator.org/skins/common/images/button_math.png experiment with the syntax. Matrix

$$\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}$$

$$\begin{bmatrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{bmatrix}$$

$$\begin{Bmatrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{Bmatrix}$$

$$\begin{vmatrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{vmatrix}$$

$$\begin{Vmatrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{Vmatrix}$$

Matrices

$$\begin{matrix}0 & 1 & 2\\3 & 4 & 5\end{matrix}$$

$$\begin{pmatrix}0 & 1 & 2\\3 & 4 & 5\end{pmatrix}$$

$$\begin{bmatrix}0 & 1 & 2\\3 & 4 & 5\end{bmatrix}$$

$$\begin{vmatrix}0 & 1 & 2\\3 & 4 & 5\end{vmatrix}$$

$$\begin{Vmatrix}0 & 1 & 2\\3 & 4 & 5\end{Vmatrix}$$

$$\triangle x\triangle p\geq \hbar$$

Maths mode accent

$$\hat{A}$$,   $$\vec{A}$$,   $$\bar{A}$$,   $$\tilde{A}$$

$$\pm2^0C\longleftrightarrow$$

$$Fe^{3+}$$

stackrel

$$A\stackrel{heat}{\longrightarrow}B$$

$$\bar{h}$$

$$\hbar$$

$$\triangle{x}\triangle{p}\geq\hbar$$

$$\nabla^2{x}$$

fraction- $$\sqrt{\frac{25}{5}}$$

Sigma $$\sum_{i=0}^{n}x_i=99$$

Integration $$\int x^{2}dx$$

Differentiation

$$\frac{dy}{dx}$$

$$\rightarrow$$

$$\leftarrow$$

$$\uparrow$$

$$\Rightarrow$$

$$\Leftarrow$$

Matrix

$$\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}$$

\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}

\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}

$$\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}$$

\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}

\begin{matrix}0 &1 &2\\45 &43 &0\\-1 &34 &48\end{matrix}

Kinky demand curve means

$$\alpha$$ $$\Lambda$$ $$\gamma$$

$$\alpha$$

$$\beta$$ $$\gamma$$,$$\pi$$,

$$\Lambda$$

$$\Pi$$, $$\lambda$$, $$\Lambda$$

Square root

$$\sqrt{x^2+y^3}$$

$$\sqrt[n]{x_1^2+y_1^2}$$

Fractions

$$\frac{x^3+z^5}{\sqrt{\omega}} $$

$$\frac{W_m}{W_f}$$

$$\frac{\alpha+\epsilon}{\lambda}$$

$$\frac{\alpha+\epsilon}{\lambda}$$

integrals

$$\int{x^2}dx$$

$$\int_0^4{x^3dx}$$

$$\iint{xydxdy}$$

$$\int_0^\infty\int_0^1xydxdy$$

$$\{abc\}$$

differentials

$$\frac{dy}{dx}$$

$$A\neq{B}$$

$$A\neq B$$

$$\pm$$$$Insert formula here$$

$$A \subset B$$

$$A \rightarrow B$$, $$A \uparrow B$$,$$A \Leftarrow B$$

$$\bigg \{\frac{W_m}{W_f}\bigg\}^*$$

$$\mathbf{A}\cdot\mathbf{B}$$,  $$\mathbf{A}\times\mathbf{B}$$

calligraphic letters

$$\mathcal{ANDCOLLEGE}$$

$$\mathcal{A~N~D~COLLEGE}$$

$$\frac{\partial y}{\partial x}$$