Let D = time needed for David to complete the job, in hours, and
let J = time needed for Jodi  to complete the job.

According to the condition, 

D = J - 6.     (1)

David's rate-of-work is ; Jodi''s rate-of-work is .

Their combined rate-of-work is .

According to the condition, 

 = .   (2)     ( <---  = )

Now substitute (1) into (2) and simplify the right side in (2). You will get

 = .    (3)

To solve (3), multiply both sides by 40*J*(j-6). You will get

40J + 40*(J-6) = 3*J*(J-6).

Simplify and solve it:

 = ,

 = .

Apply the quadratic formula to get the roots.

They are  and .

Notice that the solution for Jody must be greater than 6 hours, in order J-6 was meaningful. 

It gives the only solution of 30 hours for Jody and D = J-6 = 24 hours for David.