Introduction To Contextual Maths In Chemistry .pdf -
Convert a rate constant ( k = 0.05 , \textL mol^-1 \texts^-1 ) to ( \textm^3 \textmol^-1 \texts^-1 ).
| Topic | Equation | Maths Operation | |--------|----------|------------------| | pH | ( \textpH = -\log_10[\textH^+] ) | Antilog for [H⁺] = (10^-\textpH) | | Arrhenius | ( k = A e^-E_a/(RT) ) | Linear form: ( \ln k = \ln A - \fracE_aR\cdot\frac1T ) | | First-order kinetics | ( \ln[N]_t = \ln[N] 0 - kt ) | Slope = -k | | Beer-Lambert | ( A = \varepsilon c l ) | ( c = A/(\varepsilon l) ) | | Nernst eqn (298 K) | ( E = E^\circ - \frac0.0591n\log 10 Q ) | Log Q term | Introduction to Contextual Maths in Chemistry .pdf