Sr Examen

Lang:

z=xln(2x-3y) la ecuación

El profesor se sorprenderá mucho al ver tu solución correcta😉

Ha introducido [src]

z = x*log(2*x - 3*y)

$$z = x \log{\left(2 x - 3 y \right)}$$

Simplificar

Gráfica

Respuesta rápida [src]

z1 = I*im(x*log(-3*y + 2*x)) + re(x*log(-3*y + 2*x))

$$z_{1} = \operatorname{re}{\left(x \log{\left(2 x - 3 y \right)}\right)} + i \operatorname{im}{\left(x \log{\left(2 x - 3 y \right)}\right)}$$

z1 = re(x*log(2*x - 3*y)) + i*im(x*log(2*x - 3*y))

Suma y producto de raíces [src]

suma

I*im(x*log(-3*y + 2*x)) + re(x*log(-3*y + 2*x))

$$\operatorname{re}{\left(x \log{\left(2 x - 3 y \right)}\right)} + i \operatorname{im}{\left(x \log{\left(2 x - 3 y \right)}\right)}$$

I*im(x*log(-3*y + 2*x)) + re(x*log(-3*y + 2*x))

$$\operatorname{re}{\left(x \log{\left(2 x - 3 y \right)}\right)} + i \operatorname{im}{\left(x \log{\left(2 x - 3 y \right)}\right)}$$

producto

I*im(x*log(-3*y + 2*x)) + re(x*log(-3*y + 2*x))

$$\operatorname{re}{\left(x \log{\left(2 x - 3 y \right)}\right)} + i \operatorname{im}{\left(x \log{\left(2 x - 3 y \right)}\right)}$$

I*im(x*log(-3*y + 2*x)) + re(x*log(-3*y + 2*x))

$$\operatorname{re}{\left(x \log{\left(2 x - 3 y \right)}\right)} + i \operatorname{im}{\left(x \log{\left(2 x - 3 y \right)}\right)}$$

i*im(x*log(-3*y + 2*x)) + re(x*log(-3*y + 2*x))