SOLUTION: please help me answer this question: The differential equation governing current flow, i(t), in a series RL circuit, is given by: {{{ iR + L(di/dt)=t }}}, t ≥ 0, i(0)

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Question 1115564: please help me answer this question:
The differential equation governing current flow,
i(t), in a series RL circuit, is given by:
+iR+%2B+L%28di%2Fdt%29=t+, t ≥ 0, i(0) = 0
When R and L are constants. Use an appropriate technique to find i(t)

Answer by math_helper(2461) About Me  (Show Source):
You can put this solution on YOUR website!

please help me answer this question:
The differential equation governing current flow,
i(t), in a series RL circuit, is given by:
+iR+%2B+L%28di%2Fdt%29=t+, t ≥ 0, i(0) = 0
When R and L are constants. Use an appropriate technique to find i(t)
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As worded, this question does not make sense. The left hand side has units of voltage (Volts), while the right hand side has units of time (seconds). You may have meant V(t) on the right hand side, but I will wait for you to revise & repost.