Physics 151 Lab 6

Meters

Purpose

To use a galvanometer whose full-scale current is known and internal resistance is known with the proper additional resistances as calculated from Ohm's law to convert the galvanometer first to a 100 mA fullscale ammeter and then to a 5 V full-scale voltmeter.

Equipment

Galvanometer with a full scale reading of 500 m A (0.5 mA), a decade resistance box, resistance wire, standard ammeter and voltmeter, switch, wires and power supply.

Theory

A galvanometer is an instrument for detecting small currents. It consists essentially of a coil of fine wire mounted so that it can rotate in the field of a permanent magnet. When current flows through the coil, the resulting magnetic force on the coil windings creates a torque on the coil that makes it rotate until equilibrium is established between the torque on the coil and that exerted by a restoring spring. The angle of rotation of the coil thus will depend on the current flowing through coil and a needle attached to coil can be calibrated to give the current. (In many designs, the angle of rotation of the coil is linearly proportional to the current, but for the galvanometer used in this lab you will note that this is not quite the case.)

A typical analog ammeter consists of a sensitive galvanometer with a low resistance called a shunt connected in parallel with it. The shunt allows currents to flow through the ammeter that would otherwise burn out the galvanometer. The shunt also allows the ammeter to have a low resistance so that it will have a small effect on the circuit whose current is to be measured. (To use an ammeter the circuit must be broken and the ammeter inserted between the break.)

A typical analog voltmeter consists of a sensitive galvanometer connected in series with a resistance known as a multiplier. Since a voltmeter is placed in parallel with the voltage to be measured, it should have a high resistance so that it does not appreciably alter the circuit being measured.

The range or full-scale reading of an ammeter or voltmeter can be changed by changing the shunt or multiplier resistor. From a knowledge of the full-scale galvanometer current Ig, the galvanometer resistance Rg , and the desired range of the meter, the needed shunt or multiplier resistance can be easily calculated by means of Ohm's law.

Procedure

Part 0 Measure the resistivity of steel wire

Find the cross sectional area from the label and cut a certain length, then measure the resistance with a digital meter.

Part I Conversion of your galvanometer to an ammeter with a full scale reading of 100 mA.

In an ammeter the same voltage is across both the shunt resistor and the galvanometer. Use this fact and Ohm's law to calculate the value for a shunt resistor Rs that will make an ammeter with a full-scale reading of 100 mA.

Using resistance wire with linear resistance supplied by your instructor and cut a piece of wire long enough to give Rs plus a little extra to allow connections to be made at the galvanometer binding posts.

Wire your ammeter into the circuit shown in Figure 4.2. For your load resistor RL set the decade box to 40 W .

Slowly vary the power supply voltage from zero to a few volts (making sure you do not produce more amps than 100 mA) so that your ammeter reads from zero to 100 mA. Make a calibration curve for your ammeter by plotting the readings of your ammeter versus the readings of the standard Ammeter.

 

 

 

 

Part II Conversion of your Galvanometer to a voltmeter with a full-scale reading of 5 V.

Use Ohm's law to calculate the value of the multiplier resistor that must be in series with your galvanometer resistance Rg to give full-scale deflection, Ig, when the voltage applied to the series combination is 5 V.

Wire the circuit as in Figure 4.3, using a decade box for the necessary multiplier resistance, Rm:

By varying the applied voltage V of the power supply, plot a calibration curve as in Part II of your voltmeter versus the standard voltmeter.

Answer the following questions and include with your report (which should contain graphs, tables, the calculation of shunt and multiplier resistance, the description of how you made thems, the description and calculation of the resistivity and comments on the calibration curves:

1. What is the resistance for an ideal ammeter?

2. What would be the resistance of an ideal voltmeter?

3. Given an ammeter with a full-scale range of 1 Amp and an internal resistance of 100 W, what shunt resistance is needed to increase its range to 100 Amp?