Kt Boldsymbols
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Transcript of Kt Boldsymbols
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8/13/2019 Kt Boldsymbols
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Ky thu .t nh,
o trong LATEXL .NH L `AM .M K Y T.U
,
V `A K Y HI .U
TRONG MI TRU,
O,
NG TO AN
Nguyn Hu,u i,
nKhoa Toan - Co
,
- Tin h .oc
HKHTN Ha N.i, HQGHN
M .uc l .uc
1 Gio,i thi .u 1
2 Nhu,ng l .nh lam d .m trong mi tru,o,ng toan 1
1 Gio,i thi .u
,
ch,
nh van b,
an trong LATEX cho d .ep co rt nhiu ky thu .t vvi .c nay, v d .u dung phng,
dung cac l .nh co san ho .ac xy d .u
,
ng l .nh d,
lam vi .c do cho thch h .o,
p. Lo .at bai noi v
ky thu .t trong LATEX ti tm toi va trnh by nhu
,
ng vn d nu bit th qua d khi lam cho
van b,
an d .ep. Ky thu .t qua do,
n gi,
an nhiu khi ngu,
o,
i dung khng d,
y va ap d .ung no.
2 Nhu,
ng l .nh lam d .m trong mi tru,
o,
ng toanNhu
,
ng l .nh lam d .m cac ky t .u,
va ky hi .u trong mi tru,
o,
ng toan la dung m .t s goi l .nh.
1. Chu,
a co tac d .ung c,
ua cac l .nh lam d .m
$abcdefghijklmnopqrstuvwxyz$ \\
$ABCDEFGHIJKLMNOPQRSTUVWXYZ$ \\
$\alpha\beta\gamma\delta\epsilon\varepsilon\zeta\eta
\theta\vartheta\iota\kappa\varkappa\lambda\mu\nu\xi o\pi
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\varpi\rho\varrho\sigma\varsigma\tau\upsilon\phi\varphi
\chi\psi\omega$\\
$\Gamma\Delta\Theta\Lambda\Xi\Pi\Sigma\Upsilon\Phi\Psi
\Omega$
abcde f ghi jklmnopqrstuvwxyz
ABCDE FG HI JKLM NO PQRS T UVW XY Z
o
2. Chu,
va ky hi .u Toan dung vo,
i amsmath.sty, amssymb.sty: L .nh\pmb
$\pmb{abcdefghijklmnopqrstuvwxyz}$ \\$\pmb{ABCDEFGHIJKLMNOPQRSTUVWXYZ}$ \\
$\pmb{\alpha\beta\gamma\delta\epsilon\varepsilon\zeta\eta
\theta\vartheta\iota\kappa\varkappa\lambda\mu\nu\xi o\pi
\varpi\rho\varrho\sigma\varsigma\tau\upsilon\phi\varphi
\chi\psi\omega}$\\
$\pmb{\Gamma\Delta\Theta\Lambda\Xi\Pi\Sigma\Upsilon\Phi\Psi
\Omega}$
abcde f ghijklmnopqrstuvwxyzabcde f ghijklmnopqrstuvwxyzabcde f ghi jklmnopqrstuvwxyz
ABCDE FG HI JKLM NO PQRS T UVW XY ZABCDE FG HI JKLM NO PQRS T UVW XY ZABCDE FG HI JKLM NO PQRS T UVW XY Zooo
3. Chu,
va ky hi .u Toan dung vo,
i amsmath.sty, amssymb.sty: L .nh\boldsymbol
$\boldsymbol{abcdefghijklmnopqrstuvwxyz}$ \\
$\boldsymbol{ABCDEFGHIJKLMNOPQRSTUVWXYZ}$ \\
$\boldsymbol{\alpha\beta\gamma\delta\epsilon\varepsilon\zeta\eta
\theta\vartheta\iota\kappa\varkappa\lambda\mu\nu\xi o\pi
\varpi\rho\varrho\sigma\varsigma\tau\upsilon\phi\varphi\chi\psi\omega}$\\
$\boldsymbol{\Gamma\Delta\Theta\Lambda\Xi\Pi\Sigma\Upsilon\Phi\Psi
\Omega}$
ab cde f ghi jkl mnopqrs tuvw xy z
ABC DE FGH I J K LMNOPQRSTUVW XY Z
o
4. Chu,
va ky hi .u Toan dung vo,
i amsmath.sty, amssymb.sty: L .nh\boldmath
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\boldmath $abcdefghijklmnopqrstuvwxyz$ \unboldmath \\
\boldmath $ABCDEFGHIJKLMNOPQRSTUVWXYZ$ \unboldmath\\\boldmath $ \alpha\beta\gamma\delta\epsilon\varepsilon\zeta\eta
\theta\vartheta\iota\kappa\varkappa\lambda\mu\nu\xi o\pi
\varpi\rho\varrho\sigma\varsigma\tau\upsilon\phi\varphi
\chi\psi\omega$ \unboldmath\\
\boldmath $\Gamma\Delta\Theta\Lambda\Xi\Pi\Sigma\Upsilon\Phi\Psi
\Omega$ \unboldmath
ab cde f ghi jkl mnopqrs tuvw xy z
ABC DE FGH I J K LMNOPQRSTUVW XY Z
o
5. Chu,
va ky hi .u Toan dung vo,
i bm.sty: L .nh\bm
$\bm{abcdefghijklmnopqrstuvwxyz}$ \\
$\bm{ABCDEFGHIJKLMNOPQRSTUVWXYZ}$ \\
$\bm{\alpha\beta\gamma\delta\epsilon\varepsilon\zeta\eta
\theta\vartheta\iota\kappa\varkappa\lambda\mu\nu\xi o\pi
\varpi\rho\varrho\sigma\varsigma\tau\upsilon\phi\varphi
\chi\psi\omega}$\\
$\bm{\Gamma\Delta\Theta\Lambda\Xi\Pi\Sigma\Upsilon\Phi\Psi
\Omega}$
ab cde f ghi jkl mnopqrs tuvw xy z
ABC DE FGH I J K LMNOPQRSTUVW XY Z
o
6. L .nh kt h .o,
p
\begin{align*}
ABCdef\sigma \mu \sigma \quad\overbrace{abc}\sqrt{abc}
\quad A_n, V_n&\qquad \text{(\bs{}displaystyle)}\\
\boldsymbol{ABCdef\sigma \mu \sigma \quad\overbrace{abc}\sqrt{abc}}
\quad \boldsymbol{A}_n, \boldsymbol{V}_n&\qquad \text{(\bs{}boldsymbol)}\\
\bm{ABCdef\sigma \mu \sigma \quad\overbrace{abc}\sqrt{abc}}
\quad \bm{A}_n, \bm{V}_n&\qquad \text{(\bs{}bm.sty)}\\
\pmb{ABCdef\sigma \mu \sigma \quad\overbrace{abc}\sqrt{abc}}
\quad \bm{A}_n, \bm{V}_n&\qquad \text{(\bs{}pmb)}
\end{align*}
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ABCde f
abc
abc An, Vn (\displaystyle)
ABC de f
abc
ab c An, Vn (\boldsymbol)
ABC de f
abc
ab c An, Vn (\bm.sty)
ABCde f
abc
abcABCde f
abc
abcABCde f
abc
abc An, Vn (\pmb)
7. B,
ang chu,
cai Hy l .ap
upgreek.sty Ky hi .u amsmath.sty Ky hi .u txfonts.sty Ky hi .u
\bm\upalpha \bm\alpha \bm\alphaup \bm\upbeta \bm\beta \bm\betaup \bm\upgamma \bm\gamma \bm\gammaup \bm\updelta \bm\delta \bm\deltaup \bm\upepsilon \bm\epsilon \bm\epsilonup \bm\upzeta \bm\zeta \bm\zetaup \bm\upeta \bm\eta \bm\etaup \bm\uptheta \bm\theta \bm\thetaup \bm\upiota \bm\iota \bm\iotaup \bm\upkappa \bm\kappa \bm\kappaup \bm\uplambda \bm\lambda \bm\lambdaup \bm\upmu \bm\mu \bm\muup \bm\upnu \bm\nu \bm\nuup
\bmo o
\bm\upxi \bm\xi \bm\xiup \bm\uppi \bm\pi \bm\piup \bm\uprho \bm\rho \bm\rhoup \bm\upsigma \bm\sigma \bm\sigmaup \bm\uptau \bm\tau \bm\tauup
\bm\upupsilon \bm\upsilon \bm\upsilonup \bm\upphi \bm\phi \bm\phiup \bm\upchi \bm\chi \bm\chiup \bm\uppsi \bm\psi \bm\psiup \bm\upomega \bm\omega \bm\omegaup
\bm\upepsilon \bm\varepsilon \bm\varepsilonup \bm\upvartheta \bm\vartheta \bm\varthetaup \bm\upvarpi \bm\varpi \bm\varpiup \bm\upvarrho \bm\varrho \bm\varrhoup \bm\upvarsigma \bm\varsigma \bm\varsigmaup
\bm\upvarphi \bm\varphi \bm\varphiup
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8. M .t s l .nh dung goi l .nh sau dy
Goi l .nh V d .u Kt qu,
a
none $\alpha + b = \Gamma \div D$ + b = Dnone \mathbf{$\alpha + b = \Gamma \div D$} + b = Dnone \boldmath$\alpha + b = \Gamma \div D$ + b = Damsbsy $\pmb{\alpha + b = \Gamma \div D}$ + b = D + b = D + b = Damsbsy $\boldsymbol{\alpha + b = \Gamma \div D}$ + b = Dbm $\bm{\alpha + b = \Gamma \div D}$ + b = Dfixmath $\mathbold{\alpha + b = \Gamma \div D}$ + b = D + b = D + b = D
9. M .t kh,
a nang kt h .o,
p vit d .m va nghing la dung \mathversion
$\mathcal{X}^2+\sqrt{2\pi y}$ va{\mathversion{bold} $\mathcal{X}^2+\sqrt{2\pi y}$}
X2 +2y va X2 +
2y
$\mathbb{X}^2+\sqrt{2\pi y}$ va
{\mathversion{bold} $\mathbb{X}^2+\sqrt{2\pi y}$}
X2+2yva X2 +
2y