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Carnot - Réflexions sur la métaphysique du calcul infinitésimal, 1860.djvu/155
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premier
quadrans
deuxième
quadrans
troisième
quadrans
quatrième
quadrans
sin
a
=
1
−
cov
a
⋯
{\displaystyle \sin a=1-\operatorname {cov} a\cdots }
sin
a
=
1
−
cov
a
⋯
{\displaystyle \sin a=1-\operatorname {cov} a\cdots }
sin
a
=
cov
a
−
1
⋯
{\displaystyle \sin a=\operatorname {cov} a-1\cdots }
sin
a
=
cov
a
−
1
{\displaystyle \sin a=\operatorname {cov} a-1}
cos
a
=
1
−
siv
a
⋯
{\displaystyle \cos a=1-\operatorname {siv} a\cdots }
cos
a
=
siv
a
−
1
⋯
{\displaystyle \cos a=\operatorname {siv} a-1\cdots }
cos
a
=
siv
a
−
1
⋯
{\displaystyle \cos a=\operatorname {siv} a-1\cdots }
cos
a
=
1
−
siv
a
{\displaystyle \cos a=1-\operatorname {siv} a}
tan
a
=
1
−
cov
a
1
−
siv
a
⋯
{\displaystyle \tan a={\frac {1-\operatorname {cov} a}{1-\operatorname {siv} a}}\cdots }
tan
a
=
1
−
cov
a
siv
a
−
1
⋯
{\displaystyle \tan a={\frac {1-\operatorname {cov} a}{\operatorname {siv} a-1}}\cdots }
tan
a
=
cov
a
−
1
siv
a
−
1
⋯
{\displaystyle \tan a={\frac {\operatorname {cov} a-1}{\operatorname {siv} a-1}}\cdots }
tan
a
=
cov
a
−
1
1
−
siv
a
{\displaystyle \tan a={\frac {\operatorname {cov} a-1}{1-\operatorname {siv} a}}}
cot
a
=
1
−
siv
a
1
−
cov
a
⋯
{\displaystyle \cot a={\frac {1-\operatorname {siv} a}{1-\operatorname {cov} a}}\cdots }
cot
a
=
siv
a
−
1
1
−
cov
a
⋯
{\displaystyle \cot a={\frac {\operatorname {siv} a-1}{1-\operatorname {cov} a}}\cdots }
cot
a
=
siv
a
−
1
cov
a
−
1
⋯
{\displaystyle \cot a={\frac {\operatorname {siv} a-1}{\operatorname {cov} a-1}}\cdots }
cot
a
=
1
−
siv
a
cov
a
−
1
{\displaystyle \cot a={\frac {1-\operatorname {siv} a}{\operatorname {cov} a-1}}}
sec
a
=
1
1
−
siv
a
⋯
{\displaystyle \sec a={\frac {1}{1-\operatorname {siv} a}}\cdots }
sec
a
=
1
siv
a
−
1
⋯
{\displaystyle \sec a={\frac {1}{\operatorname {siv} a-1}}\cdots }
sec
a
=
1
siv
a
−
1
⋯
{\displaystyle \sec a={\frac {1}{\operatorname {siv} a-1}}\cdots }
sec
a
=
1
1
−
siv
a
{\displaystyle \sec a={\frac {1}{1-\operatorname {siv} a}}}
csc
a
=
1
1
−
cov
a
⋯
{\displaystyle \csc a={\frac {1}{1-\operatorname {cov} a}}\cdots }
csc
a
=
1
1
−
cov
a
⋯
{\displaystyle \csc a={\frac {1}{1-\operatorname {cov} a}}\cdots }
csc
a
=
1
cov
a
−
1
⋯
{\displaystyle \csc a={\frac {1}{\operatorname {cov} a-1}}\cdots }
csc
a
=
1
cov
a
−
1
{\displaystyle \csc a={\frac {1}{\operatorname {cov} a-1}}}