Water is being heated in an electric kettle - Edexcel - A-Level Maths Pure - Question 5 - 2015 - Paper 3

Given $heta = 70$ when $t = 40$, we can substitute into the equation: $70 = 120 - 100 e^{- au}.$ Rearranging gives: $100 e^{- au} = 120 - 70$ $100 e^{- au} = 50$ $e^{- au} = 0.5.$ Now, applying natural logarithm: $- au = ext{ln }(0.5)$ au = - ext{ln }(0.5) = ext{ln }(2^{-1}) = -(-1) ext{ln }(2) = rac{ ext{ln } 2}{1}. Thus, $au$ can be expressed as rac{ ext{ln } 2}{1}.

To find $T$ when $heta = 100$, we use $100 = 120 - 100 e^{- au}.$ Rearranging gives: $100 e^{- au} = 120 - 100$ $100 e^{- au} = 20$ e^{- au} = rac{20}{100} = 0.2. Taking the natural logarithm: $- au = ext{ln }(0.2) ext{ or } au = - ext{ln }(0.2).$ Now, to find $T$, we know that $au = 40$, thus: $T = - au = - ext{ln }(0.2) ext{ or approximately } 93.$ Therefore, rounded to the nearest whole number, $T$ is $93$.