Today, we’re going to focus on using an ammeter. Can anyone tell me where we should connect it in a circuit?

Close, but actually, an ammeter should be connected in series. Why do you think that is?

Exactly! This way, it measures the total current that passes through it. Remember, an ideal ammeter has very low internal resistance to avoid affecting the circuit. Let’s say we have an ammeter with a resistance of 0.2 ohms connected to an external load of 100 ohms and reads 0.1 A. What would be the true current?

Very good! Let’s calculate it. The true current, I, can be calculated using this formula: I = V / (R_ext + R_i). Here, R_ext is the external resistance, and R_i is the internal resistance of the ammeter. If we assume V is the voltage across the circuit, you'll find that the effect of R_i is negligible, leading to the true current being approximately the same.

Next, let's discuss voltmeters. Where should we connect a voltmeter in our circuit?

Correct! A voltmeter is connected in parallel and has high internal resistance. Does anyone remember why this is important?

Precisely! Let’s say we want to measure voltage across a 2 kΩ resistor with a source voltage of 12 V. If our voltmeter has a resistance of 10 kΩ, can someone calculate the equivalent resistance when we connect them in parallel?

Yes! And we can use this to find the total current and subsequently calculate the voltage reading measured across the resistor. Be careful, though, since loading effects can change the voltage reading.

Finally, let’s tackle uncertainty propagation. This helps us understand the accuracy of our measurements. Can anyone tell me the relationship between voltage, current, and resistance?

Right! Now, when measuring, if we have uncertainties in both I and R, how do we quantify uncertainty in voltage?

Exactly! This formula captures the propagation of errors. For example, if we have I = 0.05 ± 0.001 A, and R = 220 ± 2 Ω, we can plug these values into calculate ΔV.

Exactly, great summary of what we discussed today on uncertainty propagation!