Answer:
[tex]\frac { dy }{ dt } =\frac { 8\cdot { 10 }^{ 6 } }{ 799{ t }^{ 2 } } \left\{ \frac { 5 }{ 10t-1 } -\frac { \ln { \left( t-\frac { 1 }{ 10 } \right) } }{ t } \right\} [/tex]
Workings below. Don't know if it could've have been simplified further.
I've made a "smooth criminal" version, just in case you like things compressed.
[tex]\frac { dy }{ dt } =\frac { n }{ { t }^{ 2 } } \left\{ \frac { 1 }{ t-k } -\frac { \ln { \left( { \left( t-k \right) }^{ 2 } \right) } }{ t } \right\} \\ \\ n=\frac { 4\cdot { 10 }^{ 6 } }{ 799 } ,\quad k=\frac { 1 }{ 10 } [/tex]
