Atrast N
N=\frac{5\sqrt{37946}Cϕ}{1693116m^{2}}
C\neq 0\text{ and }m\neq 0
Atrast C
\left\{\begin{matrix}C=\frac{846558\sqrt{37946}Nm^{2}}{94865ϕ}\text{, }&m\neq 0\text{ and }N\neq 0\text{ and }ϕ\neq 0\\C\neq 0\text{, }&m\neq 0\text{ and }ϕ=0\text{ and }N=0\end{matrix}\right,
Koplietot
Kopēts starpliktuvē
ϕ=55512000NC^{-1}\times 10^{-4}m^{2}\cos(\arctan(\frac{185\times 10^{-2}m}{\frac{122}{2}\times 10^{-2}m}))
Reiziniet 4500 un 12336, lai iegūtu 55512000.
ϕ=55512000NC^{-1}\times \frac{1}{10000}m^{2}\cos(\arctan(\frac{185\times 10^{-2}m}{\frac{122}{2}\times 10^{-2}m}))
Aprēķiniet 10 pakāpē -4 un iegūstiet \frac{1}{10000}.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{185\times 10^{-2}m}{\frac{122}{2}\times 10^{-2}m}))
Reiziniet 55512000 un \frac{1}{10000}, lai iegūtu \frac{27756}{5}.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{185\times \frac{1}{100}m}{\frac{122}{2}\times 10^{-2}m}))
Aprēķiniet 10 pakāpē -2 un iegūstiet \frac{1}{100}.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{20}m}{\frac{122}{2}\times 10^{-2}m}))
Reiziniet 185 un \frac{1}{100}, lai iegūtu \frac{37}{20}.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{20}m}{61\times 10^{-2}m}))
Daliet 122 ar 2, lai iegūtu 61.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{20}m}{61\times \frac{1}{100}m}))
Aprēķiniet 10 pakāpē -2 un iegūstiet \frac{1}{100}.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{20}m}{\frac{61}{100}m}))
Reiziniet 61 un \frac{1}{100}, lai iegūtu \frac{61}{100}.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{20}}{\frac{61}{100}}))
Saīsiniet m gan skaitītājā, gan saucējā.
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{37}{20}\times \frac{100}{61}))
Daliet \frac{37}{20} ar \frac{61}{100}, reizinot \frac{37}{20} ar apgriezto daļskaitli \frac{61}{100} .
ϕ=\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{185}{61}))
Reiziniet \frac{37}{20} un \frac{100}{61}, lai iegūtu \frac{185}{61}.
\frac{27756}{5}NC^{-1}m^{2}\cos(\arctan(\frac{185}{61}))=ϕ
Mainiet puses tā, lai visi mainīgie locekļi atrastos pa kreisi.
\frac{27756\cos(\arctan(\frac{185}{61}))m^{2}}{5C}N=ϕ
Vienādojums ir standarta formā.
\frac{\frac{27756\cos(\arctan(\frac{185}{61}))m^{2}}{5C}N\times 5C}{27756\cos(\arctan(\frac{185}{61}))m^{2}}=\frac{ϕ\times 5C}{27756\cos(\arctan(\frac{185}{61}))m^{2}}
Daliet abas puses ar \frac{27756}{5}C^{-1}m^{2}\cos(\arctan(\frac{185}{61})).
N=\frac{ϕ\times 5C}{27756\cos(\arctan(\frac{185}{61}))m^{2}}
Dalīšana ar \frac{27756}{5}C^{-1}m^{2}\cos(\arctan(\frac{185}{61})) atsauc reizināšanu ar \frac{27756}{5}C^{-1}m^{2}\cos(\arctan(\frac{185}{61})).
N=\frac{5\sqrt{37946}Cϕ}{1693116m^{2}}
Daliet ϕ ar \frac{27756}{5}C^{-1}m^{2}\cos(\arctan(\frac{185}{61})).
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