The function 't' which maps temperature in degree Celsius into temperature in degree Fahrenheit is defined by `t(C)=(9C)/(5)+32`
Find the value of C, when t(C)=212.

In an experiment, a solution of hydrochloric acid is to be kept between 30° and 35° Celsius. What is the range of temperature in degree Fahrenheit if conversion formula is given by C= (5)/(9) (F-32) , where C and F represent temperature in degree Celsius and degree Fahrenheit, respectively.

In countries like USA and Canada temperature is measured in Fahrenheit where as in countries like India, it is measured in Celsius. Here is a linear equation that converts Fahrenheit to Celsius F = (9/5)C + 32 If the temperature is 30°C, what is the temperature in Fahrenheit?

In countries like USA and Canada temperature is measured in Fahrenheit where as in countries like India, it is measured in Celsius. Here is a linear equation that converts Fahrenheit to Celsius F = ( 9/5 )C + 32 If the temperature is 95°F, what is the temperature in Celsius?

In countries like USA and Canada temperature is measured in Fahrenheit where as in countries like India, it is measured in Celsius. Here is a linear equation that converts Fahrenheit to Celsius F = (9/5)C + 32 Is there a temperature that has numerically the same value in both Fahrenheit and Celsius? If yes find it?

Represent the following statement with suitable integer. Temperature of 14 degrees below 0^@ C .

A+G = C+T, then it is

The absolute temperature (Kelvin scale) T1s related to the temperature t_(c) on the Celsius scale by t_(c) = T - 273.15 Why do we have 273.15 in this relation, and not 273.16 ?