Question:
The solution of
\[
\frac{dv}{dt} + \frac{k}{m} v = -g
\]
is:
The solution of
\[
\frac{dv}{dt} + \frac{k}{m} v = -g
\]
is:
Show Hint
For first-order linear differential equations, use the integrating factor method to find the solution.
Updated On: Jan 12, 2026
- \( v = c e^{-\frac{k}{m} t} + \frac{mg}{k} \)
- \( v = c e^{\frac{k}{m} t} - \frac{mg}{k} \)
- \( v = c e^{\frac{k}{m} t} + \frac{mg}{k} \)
- \( v = c e^{-\frac{k}{m} t} - \frac{mg}{k} \)
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The Correct Option is A
Solution and Explanation
Step 1: This is a first-order linear differential equation. The solution to such an equation is:
\[
v(t) = c e^{-\frac{k}{m} t} + \frac{mg}{k}.
\]
Step 2: The constant \( c \) is determined by initial conditions.
Final Answer: \[ \boxed{c e^{-\frac{k}{m} t} + \frac{mg}{k}} \]
Final Answer: \[ \boxed{c e^{-\frac{k}{m} t} + \frac{mg}{k}} \]
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