How to solve the ordinary differential equation using separation of variables? frac(dy)(dt)=frac(y+1)(t+1)

Reeves

Reeves

Answered question

2021-09-07

How to solve the ordinary differential equation using separation of variables?
dydt=y+1t+1

Answer & Explanation

Aniqa O'Neill

Aniqa O'Neill

Skilled2021-09-08Added 100 answers

Step 1
give that, the differential equation is dydt=y+1t+1
Step 2
Rewrite the differential equation as,
dydt=y+1t+1
dyy+1=dtt+1 Step 3
Integrate the above as,
dyy+1=dtt+1
ln(y+1)=ln(t+1)+lnc
ln(y+1)=lnc(t+1)
y+1=c(t+1)
y=c(t+1)1
Step 4
Therefore, the general solution is y=c(t+1)1

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