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exp^(x+a)-y=0 la ecuación

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Solución numérica:

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Solución

Ha introducido [src] 
 x + a        
E      - y = 0
ea+xy=0e^{a + x} - y = 0
Simplificar
Gráfica
Suma y producto de raíces [src] 
suma
                    re(a) + re(x)      re(a) + re(x)                   
cos(im(a) + im(x))*e              + I*e             *sin(im(a) + im(x))
iere(a)+re(x)sin(im(a)+im(x))+ere(a)+re(x)cos(im(a)+im(x))i e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \sin{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} + e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \cos{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} 
=
                    re(a) + re(x)      re(a) + re(x)                   
cos(im(a) + im(x))*e              + I*e             *sin(im(a) + im(x))
iere(a)+re(x)sin(im(a)+im(x))+ere(a)+re(x)cos(im(a)+im(x))i e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \sin{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} + e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \cos{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} 
producto
                    re(a) + re(x)      re(a) + re(x)                   
cos(im(a) + im(x))*e              + I*e             *sin(im(a) + im(x))
iere(a)+re(x)sin(im(a)+im(x))+ere(a)+re(x)cos(im(a)+im(x))i e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \sin{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} + e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \cos{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} 
=
 I*(im(a) + im(x)) + re(a) + re(x)
e
ei(im(a)+im(x))+re(a)+re(x)e^{i \left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)}\right) + \operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} 
exp(i*(im(a) + im(x)) + re(a) + re(x))
Respuesta rápida [src] 
                         re(a) + re(x)      re(a) + re(x)                   
y1 = cos(im(a) + im(x))*e              + I*e             *sin(im(a) + im(x))
y1=iere(a)+re(x)sin(im(a)+im(x))+ere(a)+re(x)cos(im(a)+im(x))y_{1} = i e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \sin{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} + e^{\operatorname{re}{\left(a\right)} + \operatorname{re}{\left(x\right)}} \cos{\left(\operatorname{im}{\left(a\right)} + \operatorname{im}{\left(x\right)} \right)} 
y1 = i*exp(re(a) + re(x))*sin(im(a) + im(x)) + exp(re(a) + re(x))*cos(im(a) + im(x))
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