Can I burn pressure-treated lumber?

No. Burning pressure-treated lumber is unsafe because it can release toxic chemicals into the air, which may harm health and the environment.

What is the volume of 10 boards measuring 2 m × 0.3 m × 0.05 m?

The total volume is 0.3 cubic meters. One board is 2 × 0.3 × 0.05 = 0.03 m³, and 0.03 m³ × 10 boards = 0.3 m³.

How do I calculate lumber volume?

Measure the length, width, and thickness of the lumber, then multiply them to get the volume of one piece. Multiply by the quantity to get the total volume.

How do I use a lumber calculator?

Enter the length, width, thickness, and number of pieces. The calculator will show total volume and total length. If there is a price section, enter the price per piece to get the total cost.

What is a board foot?

A board foot is a unit of volume. One board foot equals one square foot that is one inch thick (144 cubic inches, or 1/12 cubic foot).

How do I calculate board feet?

Use the board foot formula: board feet = length (feet) × width (inches) × thickness (inches) ÷ 12. Keep the units exactly as shown.

How do I estimate wood weight for a load of lumber?

Find the wood density for the species and moisture condition, calculate the lumber volume, then multiply density × volume to get weight per piece. Multiply by the number of pieces to get total load weight.

Why does green lumber weigh more than kiln-dried boards?

Green lumber has higher moisture content and water content, which increases its overall weight compared to kiln-dried boards.

Beam Load Calculator

Simply supported • US customary inputs • Real-time results

Span Length *

Distance between supports (feet).

Beam Size (Rectangular) *

Actual width & depth (inches), not nominal.

Material (Modulus E) *

Stiffness value used for deflection (psi).

psi

Uniform Load Input *

Choose psf + tributary width or direct plf.

psf

Floor/roof load intensity.

Width supported by this beam.

plf

Total uniform load per foot of beam.

Optional Point Load at Midspan

Enter 0 if none (common for a single heavy item).

Results

Uniform load (w)—

Max shear (Vmax)—

Max moment (Mmax)—

Max deflection (Δmax)—

Bending stress (fb)—

Shear stress (τmax)—

Deflection Checks

Limit L/360—

Limit L/240—

Status—

Assumptions & formulas

Beam is simply supported, linear-elastic, small deflection.
Rectangular section: I = b·h³/12, S = b·h²/6.
UDL: M = wL²/8, V = wL/2, Δ = 5wL⁴/(384EI).
Midspan point load: M = PL/4, V = P/2, Δ = PL³/(48EI).
Stresses: fb = M/S, τmax ≈ 1.5V/(b·h).

Educational estimate only — if this is safety-critical, confirm with a licensed structural engineer.

Beam Load Calculator

Safety / code note: This page is for planning and learning. For real projects, confirm loads, member sizing, and connections with a qualified engineer and your local code (AISC / CSA / Eurocode / AS).

A Beam Load Calculator helps you calculate support reactions (the forces at the supports) for a simply-supported beam under vertical point loads. I use this as a fast checking step on site before deeper structural work like beam deflection or full beam load capacity design.

What this calculator does (and doesn’t)

Does

Finds support reactions at each end (often RA and RB) for point loads.
Supports uplift by entering a negative value (example: -500 lbf).

Doesn’t

It does not complete full wood beam design or steel sizing by itself.
It does not replace a beam deflection calculator (use that for deflection).
If you need span sizing, use a wood beam span calculator or a capacity tool.

Inputs and outputs (quick view)

What you enter (inputs)	What you get (outputs)
input span / span of the beam / beam_span	support reaction values (RA, RB)
number of loads (up to up to 10 point loads)	total reaction check
point loads (each magnitude / load magnitude)	each load’s effect on reactions
distances from support A (xi — distance)	correct moment arms
optional upward load using negative value	uplift-ready reactions

What is a support reaction?

A support reaction is the “push back” from a support when a load pushes on a beam. Newton’s third law of motion explains it: every action has an equal and opposite reaction. If you push a wall, it pushes back—same phenomena with beams and columns.

On a beam, reactions occur at each end, typically labeled RA and RB. Imagine a beam supported in place by two columns. The weight pushes down, and the columns provide an equivalent opposite reacting force back into the beam. That’s the interaction at the points where they meet.

If more load sits at a closer distance to one support, that support sees more force and a greater reaction, so reactions can be equal or different values depending on applied loads.

Real framing example: a door header is the beam; the door header rests on jack studs (the supporting structures / vertical studs). That’s why a door header size calculator is useful when you’re designing a header for a roof opening.

Pro tip: dealing with wind uplift

If you’re designing for wind and uplift, you can enter an upward load by using a negative value for the load magnitude, like -500 lbf.
If a result comes out as a negative reaction, the support must hold the beam down—think anchor bolt, not a support that only pushes up. This matters for cantilever and counter-balance setups where upward forces can “lift” the beam.

How to calculate support reactions in a beam

The clean way to solve reactions is to treat the system as being in equilibrium. That means the beam is not moving, and the sum of forces and the sum of moments equal zero.

Before math, draw a diagram (a simple free body diagram) with:

supports at left and right (support A and support B)
all point loads marked with their distance x (or xi) from support A
consistent sign convention (don’t mix up downward forces positive and upward forces negative)

One-line formulas (easy to extract)

If the span is span (or length of the beam), and loads are Fi at distances xi from A:

RB (reaction at support B):
RB = [(F1 × x1) + (F2 × x2) + (F3 × x3) + … + (Fn × xn)] /span
RA (reaction at support A):
RA = ΣFi − RB
(same idea as RA = ΣFi − RB and ΣFi = RA + RB)

Why moments work (simple explanation)

Moments are like torque: force × distance. When you take a summation of moments about support A, you can isolate RB because RA has zero moment arm about A. Keep the opposite direction signs consistent.

Moment equilibrium about A looks like this:

∑ moments = Σ(moments due to load) − (moments due to support reactions) = zero
Load pattern: F1 × x1, F2 × x2, F3 × x3, …, Fn × xn
Reaction term: RB × span

So:

RB × span = (F1 × x1) + (F2 × x2) + (F3 × x3) + … + (Fn × xn)
Divide by span: /span

Then use force balance:

ΣFi = RA + RB
RA = ΣFi − RB

Sample calculation of how to find support reactions

This is the exact example style I use when training junior drafters.

We have a 4.0-meter (4-meter, 4.0-meter) simply-supported beam with:

10.0 kilonewtons (10 kN) point load at 2.0 meters from support A
another 3.5 kN at 1.5 meters from support B
span is 4.0 m

Step 1: calculate RB using moment equilibrium about support A

Use:

RB = (F1×x1)+(F2×x2)/span

Compute moments:

(10 kN×2.0 m) = 20 kN-m
distance of second load from A = (4.0 m − 1.5 meters)
(3.5 kN×(4.0 m−1.5 m)) = 8.75 kN-m

Total moment about A:

20 kN-m + 8.75 kN-m

Divide by span 4.0 m:

RB = 7.1875 kN (reaction at support B)

Step 2: calculate RA using force balance

Force sum form:

∑F=0
F1+F2−RA−RB=0

Substitute:

10+3.5−RA−7.1875=0
RA=10+3.5−7.1875
RA = 6.3125 kN

Sign reminder: Many examples treat downward forces positive and upward forces negative. What matters is consistency.

Real-world note about beam weight

In this example, the beam is weightless. On real jobs, beam weight matters. If you include it, treat it as another downward point load at the center (the centroid) and re-run the same steps to update reactions at supports.

Using our beam load calculator

On site, speed matters—but accuracy matters more. Here’s the practical workflow I follow when using our beam load calculator:

Enter the input span / span of the beam.
Add the number of loads (you can enter up to 10 point loads).
For each load, enter:
- magnitude / load magnitude
- distances from support A
For uplift, enter an upward load as a negative value.
Review the outputs and sanity check: reactions should roughly match total load.

Common mistakes (quick checks)

Mixing units (kN with lbf, or meters with feet). Pick one system and stick to it.
Measuring xi — distance from the wrong side (always confirm it’s from support A).
Forgetting self-weight (beam weight) when it matters.
Placing several loads close to one end and expecting reactions to stay “equal”—they won’t.
Confusing point loads with uniformly distributed load (UDL). If you need UDL, convert to an equivalent point load at its center, or use a tool that supports UDL directly.

FAQs / Frequently Asked Questions

What’s a simply supported beam?

A simply supported beam has two supports: a pinned support at one end and a roller support at the other. The pin allows one degree of freedom (usually rotation about the z-axis, perpendicular to the paper). The roller allows two degrees of freedom, including horizontal movement along the x-axis plus rotation.

How do I determine the support reactions on a simply supported beam?

Start with a free body diagram. Then:

Sum moments about pin support A:
Σ(Fi × xi) – RyB × beam_span = 0

Where:

Fi — vertical forces
xi — distance
RyB is the vertical reaction at B

Then sum vertical forces:

ΣFi − RyB − RyA = 0 (often shown using ΣFy)

If needed, sum horizontal forces to find RxA:

ΣFy = ΣFi – RxA = 0

What are the reactions of a 6 m simply supported beam with a UDL?

For a 6 m beam with a uniformly distributed load of 5 kN/m, total load is 30 kN, so:

RyB = 30 kN × 3 m/6 m = 15 kN
RyA = 30 kN – 15 kN = 15 kN
The horizontal reaction at support A is zero

What’s the importance of calculating the support reactions?

Because they control internal forces like internal shear forces and bending moments. Those drive stresses, deformations, and structural integrity. Knowing reactions is a required step before beam deflection checks (use a beam deflection calculator) and before comparing to Beam Load Capacity / section capacity.

How does capacity and “utility ratio” relate?

In capacity tools, you compare design loads to section capacity and get an overall utility ratio. Example:

22kip capacity
10kip applied load (from live loads + dead loads)
Design Load / Capacity = 10/22 = 0.455 (about 45.5%, often shown as overall utility 45%)

Capacity can differ by axis:

Shear Y on the strong axis might be high
shear in X on the weak axis might be lower (example: 2kip)

Which standard is used to determine capacity?

Standards (codes) define the design specifications and basis of calculation, such as:

AISC 360 Steel Design (AISC 360 Design Standards) from the American Institute of Steel Construction
They support LRFD (Load and Factor Resistance Design) and ASD (Allowable Stress Design), using factoring loads, factoring down material strengths, and a single factor of safety depending on method and project requirements.

Related tools (for topical coverage)

beam deflection calculator (deflection)
wood beam span calculator (span sizing / wood beam design)
capacity tools (if you offer them): Beam Capacity Load Calculator, I beam load calculator
structure context: Concrete Column Calculator, Eurocode 3 Steel Beam Calculator, ACI 360 Slab Design Software

What is beam load and how is it calculated?

How do you calculate beam span for structural beams?

What is beam deflection and why does it matter?

How do engineers calculate bending stress in beams?

What is dead load and live load in construction?

How do you calculate structural loads on beams?

What factors affect beam span and strength?