Solids tend to expand when heated. The amount that a solid sample will expand with increased
temperature depends on the size of the sample, the material it is made of, and the amount of
temperature rise. The following formula relates linear expansion to temperature change:
                                                                        l = l0(1 + αT)
Where,
l = Length of material after heating
l0 = Original length of material
α = Coefficient of linear expansion
T = Change in temperature


Here are some typical values of α for common metals:
• Aluminum = 25 × 10−6 per degree C
• Copper = 16.6 × 10−6 per degree C
• Iron = 12 × 10−6 per degree C
• Tin = 20 × 10−6 per degree C
• Titanium = 8.5 × 10−6 per degree C


As you can see, the values for α are quite small. This means the amount of expansion (orcontraction) for modest temperature changes are almost too small to see unless the sample size (l0) is huge. We can readily see the effects of thermal expansion in structures such as bridges, where xpansion joints must be incorporated into the design to prevent serious problems due to changes in ambient temperature. However, for a sample the size of your hand the change in length from a cold day to a warm day will be microscopic.


One way to amplify the motion resulting from thermal expansion is to bond two strips of dissimilar  metals together, such as copper and iron. If we were to take two equally-sized strips of copper and iron, lay them side-by-side, and then heat both of them to a higher temperature, we would see the copper strip lengthen slightly more than the iron strip:

278                                        

If we bond these two strips of metal together, this differential growth will result in a bending motion greatly exceeding the linear expansion. This device is called a bi-metal strip:

279                                                     




This bending motion is significant enough to drive a pointer mechanism, activate an electromechanical switch, or perform any number of other mechanical tasks, making this a very simple and useful primary sensing element for temperature. Older home thermostats often usedthis principle to both indicate room temperature and to actuate electrical switches for controlling room temperature. Electric hot water heater units still use this type of device (usually in the form of a convex bi-metal disk) to sense over-temperature conditions and automatically shut off power to the heater if the water temperature exceeds a pre-set limit.
If a bi-metallic strip is twisted over a long length, it will tend to un-twist as it heats up. This twisting motion may be used to directly drive the needle of a temperature gauge. This is the operating principle of the temperature gauge shown in the following photograph:

280

Leave a Reply