Solucionario Resistencia De Materiales Schaum William Nash -

ΔT=30°C. Thermal strain ε = αΔT = 11.7e-6 30 = 3.51e-4. Stress = Eε = 200e9 3.51e-4 = 70.2 MPa (compressive). Chapter 4: Torsion (Circular Shafts) Key formulas: τ = Tr/J, θ = TL/(GJ), J = πd⁴/32 for solid, J = π(do⁴-di⁴)/32 for hollow.

σ_1,2 = (σ_x+σ_y)/2 ± √[((σ_x-σ_y)/2)² + τ_xy²] = 50 ± √[(30)²+30²] = 50 ± 42.43 → σ1=92.43 MPa, σ2=7.57 MPa. τ_max=42.43 MPa. Chapter 9: Columns (Buckling) Euler’s formula: P_cr = π²EI/(KL)².

Let F₁ = force in bronze, F₂ = force in steel. Equilibrium: ΣM = 0 → F₁ a + F₂ b = P*c (specific distances depend on figure; assume symmetrical so F₁+F₂ = P). Compatibility: δ₁ = δ₂ → (F₁L₁)/(A₁E₁) = (F₂L₂)/(A₂E₂). Solve simultaneously. solucionario resistencia de materiales schaum william nash

Steel column (E=200 GPa) solid circular d=40 mm, L=2 m, pinned ends (K=1). Find critical load.

Numerical solution: Let F₁+F₂=100 kN. Deformation equality: F₁ 1.5/(500e-6 100e9) = F₂ 1.2/(400e-6 200e9) → F₁ 1.5/(5e-5 1e11) = F₂ 1.2/(4e-4 2e11) → simplify → F₁/F₂ = 0.8 → F₁=0.8F₂. Then 0.8F₂+F₂=100 → 1.8F₂=100 → F₂=55.56 kN, F₁=44.44 kN. Formula: δ_T = αΔTL, thermal force = EAαΔT (if constrained). ΔT=30°C

Torque T = Power/ω = 150,000 / (2π 30) = 795.8 N·m. J = π (0.05)⁴/32 = 6.136×10⁻⁷ m⁴. τ_max = T r/J = 795.8 0.025/6.136e-7 = 32.4 MPa. θ = TL/(GJ) = 795.8 2 / (80e9 6.136e-7) = 0.0324 rad = 1.86°. Chapter 5: Shear and Moment in Beams Method: Draw shear and bending moment diagrams using relationships: dV/dx = -w(x), dM/dx = V.

Rectangular beam (b=100 mm, h=200 mm) with M=20 kN·m. Find max bending stress. Chapter 4: Torsion (Circular Shafts) Key formulas: τ

A solid steel shaft (d=50 mm, G=80 GPa) transmits 150 kW at 30 Hz (1800 rpm). Find maximum shear stress and angle of twist in 2 m length.