COSIB. 
75 
receptacles excluding the air, can appreciate the value of 
such an arrangement. 
“There are only three possible figures of the cells,” says 
Dr. Reid, “ which can make them all equal and similar, 
■nuthout any useless spaces between them. These are tho 
equil.ater.al triangle, the square, and the regular hexagon. 
It is well knou-n to mathematicians, that there is not a 
fourth way possible in which a pkane may be cut into lit¬ 
tle spaces that shall be equal, similar, and regular, with¬ 
out leaving any interstices.” 
An equilateral triangle would have made a very uncom¬ 
fortable tenement for an insect with a round body; and a 
square cell would have been but little better. A cir.-’.e 
seems to be the best shape for the development of 1 .e 
larvte; but such a figure would have caused a needl ss 
saci ifice of space, materials, and strength ; while the horn y, 
which adheres so admirably to the many angles of 1 lo 
six-sided cell, would have been much more liable to i an 
out. The body of the immature insect, as it undergoes 
its changes, is charged with a superabundance of moisture, 
Avhich passes off through the reticulated cover of its 
cell; may not a hexagon, therefore, while ai)proaching so 
nearly to the shape of a circle, as not to incommode the 
young bee, furnish, in its six corners, the necessary vacan¬ 
cies for a more thorough ventilation ? 
Is it credible that these little insects can unite so many 
requisites in the construction of their cells, either by chance, 
or because they are profoundly versed in the most intricate 
mathematics? Are we not compelled to acknowledge 
that the mathematics by which they construct a shaj)e so 
complicated, and yet the only one which can unite so many 
desirable requirements, must be referred to the Ci eator, 
and not to his puny creature ? To an intelligent and can- 
