Character Sequence |
Symbol |
Character Sequence |
Symbol |
Character Sequence |
Symbol |
---|---|---|---|---|---|
\alpha |
α |
\upsilon |
υ |
\sim |
~ |
\beta |
β |
\phi |
Φ |
\leq |
≤ |
\gamma |
γ |
\chi |
χ |
\infty |
∞ |
\delta |
δ |
\psi |
ψ |
\clubsuit |
♣ |
\epsilon |
ɛ |
\omega |
ω |
\diamondsuit |
♦ |
\zeta |
ζ |
\Gamma |
Γ |
\heartsuit |
♥ |
\eta |
η |
\Delta |
Δ |
\spadesuit |
♠ |
\theta |
Θ |
\Theta |
Θ |
\leftrightarrow |
↔ |
\vartheta |
ϑ |
\Lambda |
Λ |
\leftarrow |
← |
\iota |
ι |
\Xi |
Ξ |
\uparrow |
↑ |
\kappa |
κ |
\Pi |
Π |
\rightarrow |
→ |
\lambda |
λ |
\Sigma |
Σ |
\downarrow |
↓ |
\mu |
µ |
\Upsilon |
ϒ |
\circ |
º |
\nu |
ν |
\Phi |
Φ |
\pm |
± |
\xi |
ξ |
\Psi |
Ψ |
\geq |
≥ |
\pi |
π |
\Omega |
Ω |
\propto |
∝ |
\rho |
ρ |
\forall |
∀ |
\partial |
∂ |
\sigma |
σ |
\exists |
∃ |
\bullet |
• |
\varsigma |
ς |
\ni |
∍ |
\div |
÷ |
\tau |
τ |
\cong |
≅ |
\neq |
≠ |
\equiv |
≡ |
\approx |
≈ |
\aleph |
ℵ |
\Im |
ℑ |
\Re |
ℜ |
\wp |
℘ |
\otimes |
⊗ |
\oplus |
⊕ |
\oslash |
∅ |
\cap |
∩ |
\cup |
∪ |
\supseteq |
⊇ |
\supset |
⊃ |
\subseteq |
⊆ |
\subset |
⊂ |
\int |
∫ |
\in |
∈ |
\o |
ο |
\rfloor |
ë |
\lceil |
é |
\nabla |
∇ |
\lfloor |
û |
\cdot |
· |
\ldots |
... |
\perp |
⊥ |
\neg |
¬ |
\prime |
´ |
\wedge |
∧ |
\times |
x |
\0 |
∅ |
\rceil |
ù |
\surd |
√ |
\mid |
| |
\vee |
∨ |
\varpi |
ϖ |
\copyright |
© |
\langle |
∠ |
\rangle |
∠ |
\bar{x} | |
\acute{\eta} | \check{\alpha} | \grave{\eta} | |||
\breve{a} | \ddot{y} | \dot{x} | |||
\hat{\alpha} | \tilde{\iota} | ||||
sintheta | costheta | tantheta | |||
arcsinfrac{L}{r} | arccosfrac{T}{r} | arctanfrac{L}{T} | |||
sinh g | cosh h | tanh i | |||
operatorname{sh}j | operatorname{argsh}k | operatorname{ch}h | |||
operatorname{argch}l | operatorname{th}i | operatorname{argth}m | |||
k'(x)=lim_{Delta xto 0}frac{k(x)-k(x-Delta x)}{Delta x} | limsup S | limsup S | liminf I | liminf I | |
max H | min L | inf s | inf s | ||
sup t | sup t | exp!t | ln X | ||
lg X | log X | log_alpha X | |||
ker x | ker x | deg x | gcd(T,U,V,W,X) | ||
Pr x | Pr x | det x | hom x | hom x | |
arg x | arg x | dim x | dim x | lim_{tto n}T | |
pmod{m} | (mod m) | a bmod b | amod b | ||
nabla | partial x | mathrm{d}x | |||
dot x | ddot y | bigsqcup | |||
forall | exists | empty | |||
in | ni | notin | |||
subseteq | supset | supseteq | |||
cup | bigcup | biguplus | |||
sqsupset | sqsupseteq | sqcap | |||
emptyset | varnothing | notin | |||
subset | cap | bigcap | |||
sqsubset | sqsubseteq | sqcup | |||
p | p | land | wedge | ||
bar{q} to p | lor | vee | |||
lnot | neg q | setminus | |||
bigwedge | bigvee | smallsetminus | |||
sqrt{3} | sqrt[n]{3} | \sqrt{3}\approx1.732050808\ldots |
|||
x\ne A | t\propto v | (x-y)^2\equiv(-x+y)^2\equiv x^2-2xy+y^2 |
|||
\pm | \mp | \sin\!\frac{\pi}{3}=\sin60^\operatorname{\omicron}=\frac{\sqrt{3}}{2} |
|||
\cong | \simeq | \gg |
|||
> |
\geqq |
\ll |
|||
< |
MATLAB中输出直观公式
猜你喜欢
转载自blog.csdn.net/weixin_42005898/article/details/100009213
今日推荐
周排行