To find the particular solution of the given differential equation
e‌=2x+1 with the initial condition
y=1 when
x=0, let's start by analyzing the differential equation:
The differential equation can be rewritten by taking the natural log of both sides (assuming that
‌ is in the range where
e‌ is defined and
2x+1>0 ). Hence, we take the logarithm:
‌=log(2x+1)We can now integrate both sides with respect to
x to find
y. Integrating the right-hand side:
y=∫log(2x+1)‌dxTo solve the integral, we make the following substitution:
Let
u=2x+1⇒du=2‌dx⇒dx=‌. Therefore, substituting this in, the integral becomes:
y=∫log‌u⋅‌du=‌‌∫log‌u‌d‌uThe integral of
log‌u is a well-known result:
∫log‌u‌d‌u=u‌log‌u−u+CSubstituting back for
u, we get:
Using the initial condition
y(0)=1, we substitute
x=0 into our equation:
1=(0+‌)‌log(1)−0−‌+C=−‌+CNow solving for
C :
C=1+‌=1.5Therefore, the solution becomes:
y=(x+‌)‌log(2x+1)−x−‌+1.5=(x+‌)‌log|2x+1|−x+1This matches with Option A:
y=(x+‌)‌log|2x+1|−x+1Thus, Option A is the correct answer.