Calculate shear modulus (G) from stress/strain or elastic constants. Includes bulk modulus and material comparison table.
The **Shear Modulus Calculator** computes the shear modulus (G), also called the modulus of rigidity, which measures a material's resistance to shear deformation. You can calculate G from a measured shear stress and strain, or from the elastic modulus (E) and Poisson's ratio (ν) using the fundamental relationship G = E / [2(1+ν)].
The shear modulus is one of the three primary elastic constants (along with Young's modulus E and bulk modulus K) that fully characterize an isotropic elastic material. For metals, G is typically 35-40% of E. For rubber and polymers with Poisson's ratios near 0.5, G drops to about E/3. Understanding these relationships is essential for engineering design, particularly for shafts under torsion, bolted joints in shear, and seismic wave analysis.
The calculator includes a library of 12 common engineering materials, comparison tables of all elastic moduli, a visual bar chart showing the relationship between E, G, and K, and Poisson's ratio lookup tables. Both calculation modes output all related elastic constants for complete material characterization.
Engineers need the shear modulus whenever designing components subjected to torsion, shear, or combined loading. It directly determines torsional stiffness of shafts (GJ/L), shear deformation in beams, bolt joint behavior, and seismic wave propagation speeds. Material selection for machine components often requires comparing shear moduli across candidate materials.
The complete elastic constant output eliminates separate lookups — getting G, K, and the Lamé parameters from a single calculation saves time and reduces errors. The material comparison table is especially valuable for trade studies comparing structural metals, polymers, and ceramics.
From stress/strain: G = τ / γ From elastic constants: G = E / [2(1 + ν)] Bulk modulus: K = E / [3(1 − 2ν)] Lamé first parameter: λ = Eν / [(1+ν)(1−2ν)] P-wave modulus: M = λ + 2G Relationships: E = 2G(1+ν) = 3K(1−2ν) Variables: G = shear modulus, E = Young's modulus, ν = Poisson's ratio, K = bulk modulus, τ = shear stress, γ = shear strain
Result: 76.9 GPa shear modulus
For structural steel: E = 200 GPa, ν = 0.3. G = 200 / [2(1 + 0.3)] = 200/2.6 = 76.9 GPa. This is 38.5% of E. Bulk modulus K = 200/[3(1−0.6)] = 200/1.2 = 166.7 GPa.
For isotropic linear elastic materials, only two independent elastic constants exist. All others can be derived from any two. The common constants are: Young's modulus (E, tensile stiffness), shear modulus (G, shear stiffness), bulk modulus (K, volumetric stiffness), Poisson's ratio (ν, lateral/axial strain ratio), and the Lamé parameters (λ and μ, where μ ≡ G). The relationships form a closed system — specifying E and ν determines everything.
For anisotropic materials like composites and single crystals, up to 21 independent elastic constants may be needed to fully characterize the material. The isotropic assumption is valid for polycrystalline metals, glass, and many polymers.
Seismic shear waves (S-waves) travel at speed v_s = √(G/ρ). Since G and density vary with depth in the Earth, S-wave velocity profiles reveal subsurface structure. Critically, S-waves cannot propagate through liquids (G = 0 for fluids), which is how geophysicists identified the liquid outer core — S-waves are blocked by it while P-waves (which depend on K + 4G/3) pass through.
When designing components that primarily resist shear — bolts, pins, keys, rivets, web panels in I-beams — the shear modulus and shear strength are the governing material properties. The shear yield strength is approximately 0.577 times the tensile yield strength (von Mises criterion) for ductile metals. Selecting materials with high G-to-density ratios optimizes stiffness while minimizing weight.
For all materials with positive Poisson ratio (ν > 0), G = E/[2(1+ν)] < E/2 < E. Since virtually all real materials have 0 < ν < 0.5, the shear modulus is always between E/3 and E/2. Materials resist stretching (E) more than shearing (G).
Poisson ratio ν is the ratio of lateral contraction to longitudinal extension when a material is pulled in tension. A rubber band (ν ≈ 0.5) narrows significantly when stretched; cork (ν ≈ 0) barely changes width. Most metals have ν between 0.25 and 0.35.
Common methods include: torsion testing of cylindrical specimens (measure torque and twist angle), ultrasonic pulse-echo (measure shear wave velocity), resonant frequency methods (vibrating beam or plate), and nanoindentation. Torsion testing is the most direct and common method.
Not for thermodynamically stable materials. Negative G would mean the material expands under shear stress — mechanically unstable. Some exotic metamaterials are designed with effective negative moduli at specific frequencies, but these are engineered structures, not bulk material properties.
The bulk modulus K measures resistance to uniform compression (hydrostatic pressure). It equals the pressure increase needed to cause a unit decrease in volume: K = −V(dP/dV). Incompressible materials have K → ∞. It is related to E and ν by K = E/[3(1−2ν)].
Shear modulus decreases with increasing temperature for almost all materials. Metals lose about 2-5% of their room temperature G per 100°C increase. Near the melting point, G drops rapidly. This is why high-temperature applications require superalloys and ceramics.