Differential equations in function. Equations (1) : xy′+(1-x)y=1 let z=xy+1

Darius Miles

Darius Miles

Answered question

2022-09-22

Differential equations in function
Equations (1): x y + ( 1 x ) y = 1
determine and solve the differential equation (2) whose general solution is the function z .
determine the general solution of (1)

Answer & Explanation

soporoseun

soporoseun

Beginner2022-09-23Added 8 answers

Step 1
Compute z = y + x y = y + 1 ( 1 x ) y = z
So the general solution of the above equation (call it eqn (2)) is
z ( x ) = z ( 0 ) e x = e x
Step 2
because z ( 0 ) = 1. Solving then for y:
y ( x ) = z 1 x = e x 1 x
Gillian Cooper

Gillian Cooper

Beginner2022-09-24Added 3 answers

Step 1
If z = x y + 1 then
d z d x = d d x ( x y + 1 ) = y + x d y d x
Step 2
Now:
x d y d x + y x y = 1 x d y d x + y = 1 + x y d z d x = z
Now you solve this equation for z and then change back the variables to x and y at the end.

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