Resolver N
N=\frac{125\sqrt{16253}Cϕ}{846558m^{2}}
C\neq 0\text{ and }m\neq 0
Resolver C
\left\{\begin{matrix}\\C\neq 0\text{, }&\text{unconditionally}\\C=\frac{846558\sqrt{16253}Nm^{2}}{2031625ϕ}\text{, }&m\neq 0\text{ and }N\neq 0\text{ and }ϕ\neq 0\end{matrix}\right.
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Copiado a portapapeis
ϕ=555120NC^{-1}\times 10^{-4}m^{2}\cos(\arctan(\frac{18.5\times 10^{-2}m}{\frac{122}{2}\times 10^{-2}m}))
Multiplica 4500 e 123.36 para obter 555120.
ϕ=555120NC^{-1}\times \frac{1}{10000}m^{2}\cos(\arctan(\frac{18.5\times 10^{-2}m}{\frac{122}{2}\times 10^{-2}m}))
Calcula 10 á potencia de -4 e obtén \frac{1}{10000}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{18.5\times 10^{-2}m}{\frac{122}{2}\times 10^{-2}m}))
Multiplica 555120 e \frac{1}{10000} para obter \frac{6939}{125}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{18.5\times \frac{1}{100}m}{\frac{122}{2}\times 10^{-2}m}))
Calcula 10 á potencia de -2 e obtén \frac{1}{100}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{200}m}{\frac{122}{2}\times 10^{-2}m}))
Multiplica 18.5 e \frac{1}{100} para obter \frac{37}{200}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{200}m}{61\times 10^{-2}m}))
Divide 122 entre 2 para obter 61.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{200}m}{61\times \frac{1}{100}m}))
Calcula 10 á potencia de -2 e obtén \frac{1}{100}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{200}m}{\frac{61}{100}m}))
Multiplica 61 e \frac{1}{100} para obter \frac{61}{100}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{\frac{37}{200}}{\frac{61}{100}}))
Anula m no numerador e no denominador.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{37}{200}\times \frac{100}{61}))
Divide \frac{37}{200} entre \frac{61}{100} mediante a multiplicación de \frac{37}{200} polo recíproco de \frac{61}{100}.
ϕ=\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{37}{122}))
Multiplica \frac{37}{200} e \frac{100}{61} para obter \frac{37}{122}.
\frac{6939}{125}NC^{-1}m^{2}\cos(\arctan(\frac{37}{122}))=ϕ
Cambia de lado para que todos os termos variables estean no lado esquerdo.
\frac{6939\cos(\arctan(\frac{37}{122}))m^{2}}{125C}N=ϕ
A ecuación está en forma estándar.
\frac{\frac{6939\cos(\arctan(\frac{37}{122}))m^{2}}{125C}N\times 125C}{6939\cos(\arctan(\frac{37}{122}))m^{2}}=\frac{ϕ\times 125C}{6939\cos(\arctan(\frac{37}{122}))m^{2}}
Divide ambos lados entre \frac{6939}{125}C^{-1}m^{2}\cos(\arctan(\frac{37}{122})).
N=\frac{ϕ\times 125C}{6939\cos(\arctan(\frac{37}{122}))m^{2}}
A división entre \frac{6939}{125}C^{-1}m^{2}\cos(\arctan(\frac{37}{122})) desfai a multiplicación por \frac{6939}{125}C^{-1}m^{2}\cos(\arctan(\frac{37}{122})).
N=\frac{125\sqrt{16253}Cϕ}{846558m^{2}}
Divide ϕ entre \frac{6939}{125}C^{-1}m^{2}\cos(\arctan(\frac{37}{122})).
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