Consider the differential equation: -35t²y''+14t(t+5)y'-14(t+5)y=0, t>0.

a. Given that y₁(t)=5t is a solution, apply the reduction of order method to find another solution y₂ for wich y₁ and y₂ form a fundamental solution set. 

i. Starting with y_1, solve for w in y₁w'+(2y'₁+p(t)y₁)w=0 so that w(1)=2

ii. Now solve for u'=w so that u(1)=3.

iii. Finially, write down y₂ using the u that you found

b. Find the particular solution corresponding to the initial conditions y(1)=-5 and y'(1)=0