« Page:Gauss - Méthode des moindres carrés, trad. Bertrand, 1855.djvu/149 » : différence entre les versions
mAucun résumé des modifications |
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0 {}={} &{}-{}& 183''{,}93 &{}+{} 0{,}79363 \, \mathrm{d}L + 143{,}66 \, \mathrm{d}\tau + 0{,}39493 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 183''{,}93 &{}+{} 0{,}79363 \, \mathrm{d}L + 143{,}66 \, \mathrm{d}\tau + 0{,}39493 \, \mathrm{d}\pi\\ |
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&&&{}+{} 0{,}95920 \, \mathrm{d}\varphi - 0{,}18856 \, \mathrm{d}\text{☊} |
&&&{}+{} 0{,}95920 \, \mathrm{d}\varphi - 0{,}18856 \, \mathrm{d}\text{☊} |
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+ 0{,}17387 \, \mathrm{d}i \\ |
+ 0{,}17387 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 6''{,}81 &{}-{} 0{,}02658 \, \mathrm{d}L + 46{,}71 \, \mathrm{d}\tau + 0{,}02658 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 6''{,}81 &{}-{} 0{,}02658 \, \mathrm{d}L + 46{,}71 \, \mathrm{d}\tau + 0{,}02658 \, \mathrm{d}\pi\\ |
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&&&{}-{} 0{,}20858 \, \mathrm{d}\varphi + 0{,}15946 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}20858 \, \mathrm{d}\varphi + 0{,}15946 \, \mathrm{d}\text{☊} |
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+ 1{,}25782 \, \mathrm{d}i \\ |
+ 1{,}25782 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 0''{,}06 &{}+{} 0{,}58880 \, \mathrm{d}L + 358{,}12 \, \mathrm{d}\tau + 0{,}26208 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 0''{,}06 &{}+{} 0{,}58880 \, \mathrm{d}L + 358{,}12 \, \mathrm{d}\tau + 0{,}26208 \, \mathrm{d}\pi\\ |
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&&&{}-{} 0{,}85234 \, \mathrm{d}\varphi + 0{,}14912 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}85234 \, \mathrm{d}\varphi + 0{,}14912 \, \mathrm{d}\text{☊} |
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+ 0{,}17775 \, \mathrm{d}i \\ |
+ 0{,}17775 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 3''{,}09 &{}+{} 0{,}01318 \, \mathrm{d}L + 28{,}39 \, \mathrm{d}\tau - 0{,}01318 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 3''{,}09 &{}+{} 0{,}01318 \, \mathrm{d}L + 28{,}39 \, \mathrm{d}\tau - 0{,}01318 \, \mathrm{d}\pi\\ |
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&&&{}-{} 0{,}07861 \, \mathrm{d}\varphi + 0{,}91704 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}07861 \, \mathrm{d}\varphi + 0{,}91704 \, \mathrm{d}\text{☊} |
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+ 0{,} |
+ 0{,}54365 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 0''{,}02 &{}+{} 1{,}73436 \, \mathrm{d}L + 1846{,}17 \, \mathrm{d}\tau - 0{,}54603 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 0''{,}02 &{}+{} 1{,}73436 \, \mathrm{d}L + 1846{,}17 \, \mathrm{d}\tau - 0{,}54603 \, \mathrm{d}\pi\\ |
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&&&{}-{} 2{,}05662 \, \mathrm{d}\varphi - 0{,}18833 \, \mathrm{d}\text{☊} |
&&&{}-{} 2{,}05662 \, \mathrm{d}\varphi - 0{,}18833 \, \mathrm{d}\text{☊} |
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- 0{,}17445 \, \mathrm{d}i \\ |
- 0{,}17445 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 8''{,}98 &{}-{} 0{,}12606 \, \mathrm{d}L - 227{,}42 \, \mathrm{d}\tau + 0{,}12606 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 8''{,}98 &{}-{} 0{,}12606 \, \mathrm{d}L - 227{,}42 \, \mathrm{d}\tau + 0{,}12606 \, \mathrm{d}\pi\\ |
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&&&{}-{} 0{,}38939 \, \mathrm{d}\varphi + 0{,}17176 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}38939 \, \mathrm{d}\varphi + 0{,}17176 \, \mathrm{d}\text{☊} |
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- 1{,}35441 \, \mathrm{d}i \\ |
- 1{,}35441 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 2''{,}31 &{}+{} 0{,}99584 \, \mathrm{d}L + 1579{,}03 \, \mathrm{d}\tau + 0{,}06456 \, \mathrm{d}\pi\\ |
0 {}={} &{}-{}& 2''{,}31 &{}+{} 0{,}99584 \, \mathrm{d}L + 1579{,}03 \, \mathrm{d}\tau + 0{,}06456 \, \mathrm{d}\pi\\ |
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&&&{}+{} 1{,}99545 \, \mathrm{d}\varphi - 0{,}06040 \, \mathrm{d}\text{☊} |
&&&{}+{} 1{,}99545 \, \mathrm{d}\varphi - 0{,}06040 \, \mathrm{d}\text{☊} |
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- 0{,}33750 \, \mathrm{d}i \\ |
- 0{,}33750 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}+{}& 2''{,}47 &{}-{} 0{,}08089 \, \mathrm{d}L - 67{,}22 \, \mathrm{d}\tau + 0{,} |
0 {}={} &{}+{}& 2''{,}47 &{}-{} 0{,}08089 \, \mathrm{d}L - 67{,}22 \, \mathrm{d}\tau + 0{,}08089 \, \mathrm{d}\pi\\ |
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&&&{}-{} 0{,}09970 \, \mathrm{d}\varphi - 0{,}46359 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}09970 \, \mathrm{d}\varphi - 0{,}46359 \, \mathrm{d}\text{☊} |
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+ 1{,}22803 \, \mathrm{d}i \\ |
+ 1{,}22803 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}+{}& 0''{,}01 &{}+{} 0{,}65311 \, \mathrm{d}L + 1329{,}09 \, \mathrm{d}\tau + 0{,}38994 \, \mathrm{d}\pi \\ |
0 {}={} &{}+{}& 0''{,}01 &{}+{} 0{,}65311 \, \mathrm{d}L + 1329{,}09 \, \mathrm{d}\tau + 0{,}38994 \, \mathrm{d}\pi \\ |
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&&&{}-{} 0{,}08439 \, \mathrm{d}\varphi - 0{,}04305 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}08439 \, \mathrm{d}\varphi - 0{,}04305 \, \mathrm{d}\text{☊} |
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+ 0{,}34268 \, \mathrm{d}i \\ |
+ 0{,}34268 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}+{}& 38''{,}12 &{}-{} 0{,}00218 \, \mathrm{d}L + 38{,}47 \, \mathrm{d}\tau + 0{,}00218 \, \mathrm{d}\pi \\ |
0 {}={} &{}+{}& 38''{,}12 &{}-{} 0{,}00218 \, \mathrm{d}L + 38{,}47 \, \mathrm{d}\tau + 0{,}00218 \, \mathrm{d}\pi \\ |
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&&&{}-{} 0{,}18710 \, \mathrm{d}\varphi + 0{,}47301 \, \mathrm{d}\text{☊} |
&&&{}-{} 0{,}18710 \, \mathrm{d}\varphi + 0{,}47301 \, \mathrm{d}\text{☊} |
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- 1{,}14371 \, \mathrm{d}i \\ |
- 1{,}14371 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}-{}& 317''{,}73 &{}+{} 0{,}69957 \, \mathrm{d}L + 1719{,}32 \, \mathrm{d}\tau + 0{,}12913 \, \mathrm{d}\pi \\ |
0 {}={} &{}-{}& 317''{,}73 &{}+{} 0{,}69957 \, \mathrm{d}L + 1719{,}32 \, \mathrm{d}\tau + 0{,}12913 \, \mathrm{d}\pi \\ |
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&&&{}-{} 1{,}38787 \, \mathrm{d}\varphi + 0{,}17130 \, \mathrm{d}\text{☊} |
&&&{}-{} 1{,}38787 \, \mathrm{d}\varphi + 0{,}17130 \, \mathrm{d}\text{☊} |
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- 0{,}08360 \, \mathrm{d}i \\ |
- 0{,}08360 \, \mathrm{d}i \, ; \\ |
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0 {}={} &{}+{}& 117''{,}97 &{}-{} 0{,}01315 \, \mathrm{d}L - 43{,}84 \, \mathrm{d}\tau + 0{,}01315 \, \mathrm{d}\pi \\ |
0 {}={} &{}+{}& 117''{,}97 &{}-{} 0{,}01315 \, \mathrm{d}L - 43{,}84 \, \mathrm{d}\tau + 0{,}01315 \, \mathrm{d}\pi \\ |
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&&&{}+{} 0{,}02929 \, \mathrm{d}\varphi + 1{,}02138 \, \mathrm{d}\text{☊} |
&&&{}+{} 0{,}02929 \, \mathrm{d}\varphi + 1{,}02138 \, \mathrm{d}\text{☊} |
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- 0{,}27187 \, \mathrm{d}i \\ |
- 0{,}27187 \, \mathrm{d}i. \\ |
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\end{alignat}</math>}} |
\end{alignat}</math>}} |
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