1959 AHSME Problems/Problem 33

Given HP = $3$ $,$ $4$ $,$ $6$ \\ So, $\tfrac {1} {3}$,$\tfrac {1} {4}$,$\tfrac {1} {6}$ are in $AP$. \\ Then, common difference $(d)$ $=$ $\tfrac {1} {4}$ $-$ $\tfrac {1} {3}$ $=$ $\tfrac {1} {6}$ $-$ $\tfrac {1} {4}$ $=$ $-$ $\tfrac {1} {12}$ \\ Finding the fourth term of this $AP$ $=$ $\tfrac{1}{12}$ by $AP$ is trivial. \\ So, fourth term of Harmonic Progression $=$ $12$ $.$ \\ Now, $S_{4}$ $=$ $3$ $+$ $4$ $+$ $6$ $+$ $12$ $=$ $25$ $(B)$