Since the random walk problem was first presented by Pearson in 1905,
the shape of a walk which is either completely random or self-avoiding
has attracted the attention of generations of researchers working in
such diverse fields as chemistry, physics, biology and statistics. Amo
ng many advances in the field made in the past decade is the formulati
on of the three-dimensional shape distribution function of a random wa
lk as a triple Fourier integral plus its numerical evaluation and grap
hical illustration. However, exact calculations of the averaged indivi
dual principal components of the shape tensor for a walk of a certain
architectural type including an open walk have remained a challenge. H
ere we provide an exact analytical approach to the shapes of arbitrary
random walks in two dimensions. Especially, we find that an end-loope
d random walk surprisingly has an even larger shape asymmetry than an
open walk.