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\[\sqrt{-g}= \sqrt{h}\]
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\[56(1986)1319\]
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\[n= \frac{n_2}{n_1-1}= \frac{n_3}{n_1-1}\]
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\[d^2x \sqrt{h(x)}\]
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\[4n= \frac{2n \times 2n}{n}\]
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\[\frac{| \sin \Delta|}{ \sin \Delta}\]
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\[z= \frac{1}{ \sqrt{2}}(x+iy)\]
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\[\theta=2 \alpha_1+4 \alpha_2+6 \alpha_3+5 \alpha 4+4_ \alpha 6+2_ \alpha 7+3 \alpha_5\]
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\[x \rightarrow-1\]
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\[\sqrt{1+z^2}\]
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\[z=x-iy\]
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\[\pm i \sqrt{2n}\]
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\[A^{-1}_{ \frac{3}{5}}A^{1}_{- \frac{3}{5}}\]
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\[m \geq \sqrt{ \frac{3}{2}}H\]
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\[\cos(kX)\]
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\[\frac{( k-i_1+1)(k-i_1+2)}{2}\]
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\[\int A_z\]
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\[129106\]
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\[\frac{30}{3072}\]
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\[b \geq \frac{1}{a-1}\]
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\[\cosk_nx^5\]
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\[3 \times 4+r-4\]
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\[v \leq x\]
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\[w=x^2+ix^3\]
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\[A^{-1}_{+ \frac{4}{5}}\]
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\[\lim_{r \rightarrow 0}f(r)= \sqrt{r}\]
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\[(- \frac{1}{4},- \frac{3}{4})\]
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\[p_{0}=(2n+1) \pi T= \frac{(2n+1) \pi}{ \beta}\]
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\[0<a+ \frac{1}{2}< \frac{1}{2}\]
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\[n!L_n^{(m-n)}(z)=(-z)^{n-m}m!L_m^{(n-m)}(z)\]
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\[- \pi \leqy \leq \pi\]
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\[- \frac{ \sin \alpha( \infty)}{2 \pi}\]
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\[v(z)=z^{n+1}-(-1)^nz^{-n+1}\]
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\[4+n\]
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\[(a+b)\]
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\[X=x_0(x-x_0)\]
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\[\phi_0=dx^{136}+dx^{235}+dx^{145}-dx^{246}\]
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\[\frac{1}{ \sqrt 3}\]
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\[\int^{ \infty}_{0} duV(u)u^{ \frac{d}{2}-2} \neq 0\]
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\[(x^6,x^7,x^8,x^9)\]
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\[b \rightarrow 1\]
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\[-0.998\]
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\[V(x)=v_px^p+v_{p-1}x^{p-1}+ \ldots\]
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\[j=|q|- \frac{1}{2}+p>|q|- \frac{1}{2}\]
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\[(x-1)^{2}-32x \gt0\]
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\[x^3=- \frac{1}{48} \frac{v^6}{ \alpha_1}\]
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\[any\]
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\[x^{ \prime}=(ax+b)(cx+d)^{-1}\]
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\[\cos2p \thetak\]
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\[z=x^2+ix^3\]
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\[( \frac{p2^{-p}}{1+p}+1)\]
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\[(x^1-x^2)\]
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\[c \times(a-b)\]
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\[\frac{1}{n!}\]
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\[m^2n^2+4mx_1^2x^3=-4y_1^2y_3\]
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\[x \pm iy\]
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\[(1+1)+(5 \times0)\]
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\[\frac{43}{9}\]
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\[y \rightarrow ky\]
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\[c= \frac{1}{2} \left(1- \frac{1}{2N} \right)\]
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\[(x^3+ix^6)\]
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\[3x_B=12x_A=4x_C\]
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\[- \frac{(3+z^2)^2}{16}\]
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\[b= \frac{1}{ \sqrt{2}}(A-B)\]
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\[\int d^2x\]
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\[(2k+1) \times(2k+1)\]
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\[f= \sum_{n=1}^{ \infty}a_n(f)q^n\]
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\[1^3+1^3+(-2)^3=-6\]
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\[s_{b}s_{ab}+s_{ab}s_{b}=0\]
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\[f=z^1( \cos \theta z^2+ \sin \theta z^1)\]
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\[u(x-y)\]
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\[\sum_{k=1}^{ \infty}(-1)^k \frac{1}{w^{2k+1}}=- \frac1w \frac1{1+w^2}\]
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\[h_{xx}=-h_{yy} \neq0\]
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\[(c-3) \times c\]
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\[1 \times(6-3-1)\]
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\[n \geq 9\]
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\[f=f_a+f_b+f_c\]
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\[x= \frac{2 \pi}{ \sqrt{2}}(n+ \frac{1}{2})\]
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\[\beta=2- \sqrt3\]
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\[[t^a,t^b]=if^{abc}t^c\]
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\[dx_{n}^2-dx_{n+1}^2\]
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\[2 \times7\]
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\[z=x_{21}x_{13}^{-1}x_{34}x_{42}^{-1}\]
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\[x^1 \ldots x^5\]
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\[x^{-n}\]
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\[(a-b)-(k-b-c) \times(a-b)=(a-k+c) \times(a-b)\]
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\[y=f(x)\]
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\[\frac{1}{2}(r-1)(r+1)(r+2)\]
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\[cab=(abc)^{c}\]
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\[e^{-2q^{ \prime}(1-y)}<e^{-2 \sqrt{v}(1-y)}\]
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\[(y_{12}^2)^{-p}(y_{13}^2)^{p}\]
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\[- \frac{1}{3}\]
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\[[3,- \frac{27}{4}, \frac{171}{14},- \frac{729}{40}, \frac{729}{70}]\]
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\[y(x)=a_i(x)\]
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\[r^2= \sum_iy^i y^i\]
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\[(n-1)+4=n+3\]
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\[n2^{n-1}+1-2^n\]
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\[\beta=y-x\]
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\[\alpha_3+2 \alpha_4+ \alpha_5+2 \alpha_6+ \alpha_7\]
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\[V(x)=v_px^p+v_{p-1}x^{p-1}+ \ldots\]
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