Resolver 2muM/sqrt{3+mu} | Microsoft Math Solver

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Pasos que usan a regra de derivada para cociente

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Algebra

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Copiado a portapapeis

\frac{\mathrm{d}}{\mathrm{d}\mu }(\frac{2\mu M\left(\sqrt{3}-\mu \right)}{\left(\sqrt{3}+\mu \right)\left(\sqrt{3}-\mu \right)})

Racionaliza o denominador de \frac{2\mu M}{\sqrt{3}+\mu } mediante a multiplicación do numerador e o denominador por \sqrt{3}-\mu .

\frac{\mathrm{d}}{\mathrm{d}\mu }(\frac{2\mu M\left(\sqrt{3}-\mu \right)}{\left(\sqrt{3}\right)^{2}-\mu ^{2}})

Considera \left(\sqrt{3}+\mu \right)\left(\sqrt{3}-\mu \right). A multiplicación pódese transformar na diferencia de cadrados mediante a regra: \left(a-b\right)\left(a+b\right)=a^{2}-b^{2}.

\frac{\mathrm{d}}{\mathrm{d}\mu }(\frac{2\mu M\left(\sqrt{3}-\mu \right)}{3-\mu ^{2}})

O cadrado de \sqrt{3} é 3.

\frac{\mathrm{d}}{\mathrm{d}\mu }(\frac{2\mu M\sqrt{3}-2\mu ^{2}M}{3-\mu ^{2}})

Usa a propiedade distributiva para multiplicar 2\mu M por \sqrt{3}-\mu .

\frac{\left(-\mu ^{2}+3\right)\frac{\mathrm{d}}{\mathrm{d}\mu }(2\sqrt{3}M\mu ^{1}+\left(-2M\right)\mu ^{2})-\left(2\sqrt{3}M\mu ^{1}+\left(-2M\right)\mu ^{2}\right)\frac{\mathrm{d}}{\mathrm{d}\mu }(-\mu ^{2}+3)}{\left(-\mu ^{2}+3\right)^{2}}

Para dúas funcións diferenciables calquera, a derivada do cociente de dúas funcións é o denominador multiplicado pola derivada do numerador menos o numerador multiplicado pola derivada do denominador, e todo dividido polo denominador ao cadrado.

\frac{\left(-\mu ^{2}+3\right)\left(2\sqrt{3}M\mu ^{1-1}+2\left(-2M\right)\mu ^{2-1}\right)-\left(2\sqrt{3}M\mu ^{1}+\left(-2M\right)\mu ^{2}\right)\times 2\left(-1\right)\mu ^{2-1}}{\left(-\mu ^{2}+3\right)^{2}}

A derivada dun polinomio é a suma das derivadas dos seus termos. A derivada de calquera termo constante é 0. A derivada de ax^{n} é nax^{n-1}.

\frac{\left(-\mu ^{2}+3\right)\left(2\sqrt{3}M\mu ^{0}+\left(-4M\right)\mu ^{1}\right)-\left(2\sqrt{3}M\mu ^{1}+\left(-2M\right)\mu ^{2}\right)\left(-2\right)\mu ^{1}}{\left(-\mu ^{2}+3\right)^{2}}

Simplifica.

\frac{-\mu ^{2}\times 2\sqrt{3}M\mu ^{0}-\mu ^{2}\left(-4M\right)\mu ^{1}+3\times 2\sqrt{3}M\mu ^{0}+3\left(-4M\right)\mu ^{1}-\left(2\sqrt{3}M\mu ^{1}+\left(-2M\right)\mu ^{2}\right)\left(-2\right)\mu ^{1}}{\left(-\mu ^{2}+3\right)^{2}}

Multiplica -\mu ^{2}+3 por 2\sqrt{3}M\mu ^{0}+\left(-4M\right)\mu ^{1}.

\frac{-\mu ^{2}\times 2\sqrt{3}M\mu ^{0}-\mu ^{2}\left(-4M\right)\mu ^{1}+3\times 2\sqrt{3}M\mu ^{0}+3\left(-4M\right)\mu ^{1}-\left(2\sqrt{3}M\mu ^{1}\left(-2\right)\mu ^{1}+\left(-2M\right)\mu ^{2}\left(-2\right)\mu ^{1}\right)}{\left(-\mu ^{2}+3\right)^{2}}

Multiplica 2\sqrt{3}M\mu ^{1}+\left(-2M\right)\mu ^{2} por -2\mu ^{1}.

\frac{-2\sqrt{3}M\mu ^{2}-\left(-4M\right)\mu ^{2+1}+3\times 2\sqrt{3}M\mu ^{0}+3\left(-4M\right)\mu ^{1}-\left(2\sqrt{3}M\left(-2\right)\mu ^{1+1}+\left(-2M\right)\left(-2\right)\mu ^{2+1}\right)}{\left(-\mu ^{2}+3\right)^{2}}

Para multiplicar potencias da mesma base, suma os seus expoñentes.

\frac{\left(-2\sqrt{3}M\right)\mu ^{2}+4M\mu ^{3}+6\sqrt{3}M\mu ^{0}+\left(-12M\right)\mu ^{1}-\left(\left(-4\sqrt{3}M\right)\mu ^{2}+4M\mu ^{3}\right)}{\left(-\mu ^{2}+3\right)^{2}}

Simplifica.

\frac{2\left(\sqrt{3}-6\right)M\mu ^{2}+6\sqrt{3}M\mu ^{0}}{\left(-\mu ^{2}+3\right)^{2}}

Combina termos semellantes.

\frac{2\left(\sqrt{3}-6\right)M\mu ^{2}+6\sqrt{3}M\times 1}{\left(-\mu ^{2}+3\right)^{2}}

Para calquera termo t agás 0, t^{0}=1.

\frac{2\left(\sqrt{3}-6\right)M\mu ^{2}+6\sqrt{3}M}{\left(-\mu ^{2}+3\right)^{2}}

Para calquera termo t, t\times 1=t e 1t=t.