As I mentioned in post#8, it is statements like the following that I thought could be misleading and I also said the way Ryan stated it was fine.
"........it is worth noting that bridging cuts the resistance load or ohms in half; this can quickly cause your amplifier to overheat and shutdown. "
Reason:
Stating it that way may mislead less technically inclined people to believe the impedance of a load, whether it be a test resistor or a real loudspeaker, would somehow be changed by a bridged amplifiers. That would be false. The impedance characteristics of a loudspeakers does not change just because the amp is changed, or bridged with an identical amp.
Bridging two identical amps results in the output voltage being doubled, that is why the output power increases, not because the load impedance is halved (because it isn't magically halved). In fact, doubling the voltage would theoretically result in 4X (not in practical term) the power developed into the same 8 ohm load, where as halving the impedance of the load to the same amp without being bridge with a second one, with the same input signal, the amp (single, un-bridged) would deliver 2X the power developed into a 4 ohm load, i.e. half of 8 ohm. Of course in the real world, very few amps can "double down", and no bridged amp(s) can quadruple the output. The Benchmark amp apparently came close, rated 100 WPC, and 380 W bridged. It obviously has the power supply and output devices designed to take full advantage of the doubled output voltage due to bridging, and probably have very low output impedance. In either case, halving the impedance from 8 to 4 ohms without bridging, and bridging with the same 8 ohm load would result in roughly the same total output power. The bridged amp(s) can do better with higher impedance than 8 ohms but not with impedance below 4 ohms.
Note that when bridged the overall resulting load impedance, with the same test load should actually increase, not decrease, but very slightly, due to the increased output impedance of the two amps that are then wired in series.
Now a numerical example:
Consider two identical mono-block amps that are each rated to deliver 100 W into 8 ohms and 150 W into 4 ohms continuously, and are bridgeable to produce twice the output voltage for a load with impedance 8 ohms minimum.
Let's say the amp that has the following specs, similar to that of the Benchmark AHB2:
https://benchmarkmedia.com/products/benchmark-ahb2-power-amplifier
https://www.stereophile.com/content/benchmark-media-systems-ahb2-power-amplifier-measurements
Gain: 23 dB
Rated output: 100 W into 8 ohm load
At 2 V input, the output voltage will be approx. 14.14 V and power into an 8 ohm load is approx. 100 Watts.
Now if we bridge two such amps, the gain will increase to approx 29 dB and:
At the same 2 V input, but inverted for the second amp, the output voltage of the bridged amps that are now effectively wired in series will be doubled to 28.2832 V and power into the same 8 ohm load = 28.2832X28.2832/8 = 400 Watts Again, in real world, very few amps can double down from 8 to 4 ohms, or bridged to double the output into 8 ohms. Some, such as the AHB2 can come very close.
To summarize, "halving the impedance" from say 8 ohms to 4 ohms, all else being equal, have similar effects as bridging two amps/channels in terms of load current and total power output into an 8 ohm load, but that's because of the doubled voltage resulted from two amps/channels wired in series, while the load impedance remains unchanged, not halved. Obviously in the case of bridging, you need 4 amp channels for stereo.
I hope this help clarify my point. If not, maybe wordsmiths like
@lovinthehd or
@Steve81 wouldn't mind helping me out.
