Concrete Beam
Beam reactions link to connected column and footing calculations automatically - change a load once and everything downstream updates. Design rectangular concrete beams to the current ACI 318-19 standard with customisable top and bottom reinforcement across unlimited spans; checks include flexural strength, shear capacity, and short- and long-term deflection. T-beam effective flange width per ACI 318-19 Cl 6.3.2.1 is supported.
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What it calculates
Design rectangular concrete beams to ACI 318-19 with customisable top and bottom reinforcement across unlimited spans. Checks include flexural strength, shear capacity, and short- and long-term deflection. Supports T-beams. Beam reactions link to connected column and footing calculations so changes propagate automatically.
Code standards
- ACI 318-19
How it calculates
The Concrete Beam (ACI 318-19) calculator designs rectangular and T-beam sections per ACI 318-19 using LRFD. The same fundamental approach as the ACI 318-14 version applies, with updated shear provisions.
Flexural capacity
Positive and negative moment capacities φMn use the ACI rectangular stress block at εcu = 0.003. For T-beams, the effective flange width per ACI 318-19 Cl 6.3.2.1 engages the slab in compression for positive moments, increasing Mn relative to a rectangular section of the same web width.
Mn = A_s × fy × (d - a/2) for singly reinforced rectangular sections
φ = 0.90 for tension-controlled sections (net strain εt ≥ 0.005).
Shear capacity (ACI 318-19 update)
ACI 318-19 introduced a table-based Vc (Table 22.5.5.1) that depends on three parameters: longitudinal reinforcement ratio ρw, the ratio of factored moment to shear at the critical section (Mu/Vud), and axial load Nu/Ag. This replaces the simpler simplified formula of 318-14 and can give different (higher or lower) Vc depending on the beam's reinforcement and loading.
φVn = φ(Vc + Vs) where Vs = Av × fy × d / s, and φ = 0.75.
The lightweight concrete modification factor λ is applied to Vc per ACI 318-19 Table 19.2.4.2.
Deflection
Cracked-section effective moment of inertia Ie = Ig × (Mcr/Ma)³ + Icr × [1 - (Mcr/Ma)³] is used for all three deflection checks: short-term, long-term (with creep/shrinkage multiplier), and simplified DL+(LL or SL). Results are checked against user-defined L/n deflection limits.
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Frequently asked questions
What design method and standard does this calculator follow?
What are the key inputs?
What checks does it perform?
How does ACI 318-19 shear differ from ACI 318-14?
Does it support T-beams?
Does this calculator support load linking with column and footing calculations?
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