Evaluate the following integrals:
To Find :
Now , consider 
= 
=
= 
= 
Let x + 
= y 
dx = dy
Hence 
becomes 
Formula Used: 
= 
log |x +
|+ C
Now consider 
which is in the form of 
with change in variable.
= 
log |y +
|+ C
= 
log |y +
|+ C
Since x + 
= y and dx = dy
= 
log |
+
|+ C
Now , 
= 
log |
+
|+ C
Therefore,
= 
log |
+
|+ C
1