5ln(x)-14.82x=0

asked by guest
on Nov 29, 2024 at 11:46 am



You asked:

Solve the equation 5ln(x)14.82x=05 \ln\left( x \right) - 14.82 x = 0 for the variable xx.

MathBot Answer:

The solution is: x=250W(741250)7410.154576510.61326223ix = - \frac{250 W\left(- \frac{741}{250}\right)}{741} \approx -0.15457651 -0.61326223 i


WW is the Lambert WW function, defined as the multivalued inverse function of f(w)=wewf(w) = we^w for any complex number ww.