Maximizing Power Delivery: Impedance Matching Proof

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The discussion focuses on deriving the proof that maximum power is delivered to a load when the load resistance equals the output resistance. The voltage across the load is expressed as Ul = Us(Rl/(Rs+Rl)), leading to the power delivered to the load as P = Ul²/Rl = (Us²*Rl)/(Rs+Rl)². To find the maximum power, the derivative dP/dRl is set to zero, resulting in the equation dp/dRl = (Us²*(Rs-Rl))/(Rs+Rl)³. Setting this derivative to zero confirms that maximum power occurs when Rs equals Rl. This proof illustrates the principle of impedance matching in power delivery systems.
Beautucker
[SOLVED] impedence matching

I am having some trouble deriving a proof that the max power deliveredto the load is arrived at when load resistance = output resistance. Can anyone help?
 
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ok, I think it was going like this...

the source has a voltage of Us, and an internal resistance of Rs. The load has a resistance of Rl.
the voltage on the load is Ul = Us(Rl/(Rs+Rl))
the power delivered to the load is P = Ul2/Rl = (Us2*Rl)/(Rs+Rl)2
if you want to know the maximum power delivered to the load you have to do dP/dRl = 0 and that yields (if I did it correctly)
dp/dRl = (Us2*(Rs-Rl))/(Rs+Rl)3
so for this to be 0 means that Rs = Rl
 

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