Answer:
The solution of the given differential equation is:
[tex]y(x)=6e^{6x^{17}}[/tex]
Step-by-step explanation:
The given differential equation is in variable separable form and is solved as shown under
[tex]\frac{dy}{dx}=102\times x^{16}\times y\\\\\frac{dy}{y}=102x^{16}dx[/tex]
Integrating bot sides we get
[tex]\int \frac{dy}{y}=\int 102x^{16}dx\\ln(y)=102\times \frac{x^{17}}{17}+c\\\\ln(y)=6x^{17}+c\\\\y=e^{6x^{17}+c}\\\\y=e^{c}\cdot e^{6x^{17}}\\\\\therefore y=ke^{6x^{17}}[/tex]
where 'k' is a constant whose value can be found by the given condition that
y(0) = 6
[tex]y(0)=ke^{6\times 0^{17}}\\\\\therefore k=6[/tex]
The final solution is
[tex]y(x)=6e^{6x^{17}}[/tex]
