Consider the relationship between temperature measured in degrees Celsius (°C) and degrees Fahrenheit (°F), which is given by °C = a °F + b. Find a and b, given that ice melts at 0 degrees Celsius and 32 degrees Fahrenheit, and water boils at 100 degrees Celsius and 212 degrees Fahrenheit. (Hint: When °C = 0, °F = 32 and when °C = 100, °F = 212. Use this information to find a and b, and thus, the linear relationship between °C and °F.)

Given:

The relationship between °C and °F is °C = a(°F) + b.

When °C = 0, °F = 32.

When °C = 100, °F = 212.

Substituting these values into °C = a(°F) + b, we get the following two equations:

0 = 32a + b …(i)

100 = 212a + b …(ii)

From equation (i): b = -32a

Substituting this into equation (ii):

100 = 212a + (-32a)

⇒ 100 = 212a - 32a

⇒ 100 = 180a

⇒ a = $\dfrac{100}{180}$

⇒ a = $\dfrac{5}{9}$

Substituting a = $\dfrac{5}{9}$ in b = -32a:

b = -32 × $\dfrac{5}{9}$

= $-\dfrac{160}{9}$

The linear relationship is:

°C = $\dfrac{5}{9}$ (°F) - $\dfrac{160}{9}$ = $\dfrac{5}{9}$ (°F - 32)

Hence, a = $\dfrac{5}{9}$, b = $-\dfrac{160}{9}$ and Linear relationship = $\dfrac{5}{9}$ (°F - 32)