In response to Greg's post concerning Neutral Plane locations, I made a quick sketch, that I hope shows how different stiffnesses, in tension and compression, can be seen graphically. This may be more useful to someone planning a composite limb or considering trapping. Neutral plane locations are simply matters of proportion.
Sketch 1 is a bow limb cross section
This would be for a wood that is considered to be of equal strength in tension as in compression. The neutral plane is shown in the center of the limb.
Sketch 2 is what is known as a "transformation". It would be what a limb, made from a wood that is twice as stiff in tension than compression, would look like, if drawn with consistent units of stiffness. The area above the neutral plane is the same as the area below, but because the width above is greater, the relative position of the NP has moved upward.
Sketch 3 is a limb cross section of a laminate or backed bow. lets assume that the backing is three times as strong as the belly.
Sketch 4 shows the laminate in it's tranformed state. That is, as if it was all the same wood. Once again, the area above the NA is equal to the area below, and the relative position of the NP is even higher.
Of course, the belly portion (that part below the axis) is getting thicker, and is at risk of being overpowered by the back.
Sketch 5 shows a hypothetical limb cross section with a rather extreme NA location. (Perhaps the bowyer wants to see what happens when he puts a 4x as stiff bamboo backing on some very soft wood? The detail to the right shows how the surface of the back will stretch approx 1/3 as much as the surface of the belly will compress. It's shown by the diagonal drawn through the neutral axis.Once again, just a proportion, dictated by the differences between the stiffness of the two different materials.
One can see that not only the choice of materiel's is important, but also the relative thickness (and/or width in the case of trapping) of each wood in the composite is important.
