It's 40 years since I did this stuff but can't you integrate in terms of dt
So:
yt+c +3y=xt+d where c and d are constants
so
yt+3y= xt+d-c= xt+w (where w is a constant)
so
y(t+3)= xt+w
so y= (xt+w)/(t+3)

On reflection I'm sure my answer is wrong . Have we got enough info?
Do we know whether x is a constant or a function of y or t? And is y a function of just t (f(t))or of t and x (f(x,t))?

I suspect that we have been asked the impossible here.
It's doubtful whether the question could be done even if it were dy/dx much less dy/dt.

Hello Arshad,

Derrynoose and I are sure this can't be solved without more info on whether y is also a function of x and whether x is a function of t.
Are you sure the question is printed correctly on AB?
What was the actual question posed- maybe there's an error in your working before this point?

In what context has this equation arisen?

We want to help but need more info.

So are you saying that the equation is basically:
y+3dy/dt=1
If so, then the answer is correct.
Starting with teh answer and working back:

if y= 1 - exp^(-t/3)
then dy/dt=(t/3)exp^(-t/3)
[since the general rule is d(e^kx)/dx=ke^kx]

Substituting these values into [y+3dy/dt-1] we get
1-e^(-t/3)+te^(-t/3)=1, which is true, showing solution works

To solve it without knowing the answer you could try the general solution y= a+ be^(kx). This will lead you to the answer

If y + 3dy/dt = 1
3dy/dt = 1-y
dy/1-y = dt/3
Integrate
-ln(1-y) = t/3 + C
-t/3 =ln(1-y) + C Let C = lnk where k is a constant.
-t/3 = ln(1-y) + lnk
-t/3 = lnk(1-y)
exp(-t/3) = k(1-y)
exp(-t/3)/k = 1-y
y = 1 -exp(-t/3)/k = general solution, if my keyboarding hasn't let me down!

y=1-e^-t/3/k

damn!!!!