Physics · Fluids

Buoyancy and Archimedes' Principle

Simulation loading

Open Model Lab is preparing the live lab, controls, and graph surface for this concept.

Wrap-up

What you learned

Recommended next: Open concept testCheck whether the core ideas are ready without leaving this concept.
Read next: drag-and-terminal-velocityCompare buoyant support with velocity-dependent fluid drag

Key takeaway

Buoyant force follows the weight of displaced fluid, so displaced volume is the live quantity to watch.
A free-floating block settles where buoyant force equals weight, which turns into the density-ratio submerged fraction.
Denser fluid can support the same block with less submerged volume because each displaced volume unit weighs more.
Once a uniform block is fully submerged in a uniform fluid, moving deeper changes absolute pressure but not buoyant force.

Common misconception

Heavier objects always sink because buoyancy depends directly on mass.

Buoyant force depends on fluid density, gravity, and displaced volume, not on the object's mass alone.

Stay with this concept

Review, test, or free-play here when you want one more same-concept pass.

More practice optionsReview on the bench · Worked examples

Practice optionReview on the benchReplay the guided setup with the key controls and graphs in sight.
Practice optionWorked examplesCompare against solved walkthroughs after you try the setup yourself.
Practice optionFree play on the benchExperiment freely with the live controls before moving to another concept.

Reference and support

Use these calmer sections when you want a fuller explanation, examples, or accessibility support after the guided flow.

Return here when you want the slower reference pass.

Open reference and support

Equation snapshotPressure difference across the block · Archimedes' principleShow 3 equations

Start with the pressure difference, package it as displaced-fluid weight, then use the density ratio only for a freely floating balance.

Pressure difference across the block
$Δ P = ρ_{f} g Δ h$
The deeper bottom of the block feels more fluid pressure than the shallower top.
Archimedes' principle
$F_{b} = ρ_{f} g V_{disp}$
The buoyant force equals the weight of the displaced fluid.
Floating fraction at balance
$\frac{V _{disp}}{V _{obj}} = \frac{ρ _{obj}}{ρ _{f}}$
For a floating block, the submerged fraction is set by the density ratio.

Worked examples

Buoyancy worked examples

Open examples when you want to see the same idea walked through step by step.

Frozen walkthrough

Step through the frozen example

Frozen walkthrough

Use the live bench values. First find the buoyant force from displaced volume, then compare it with the block's weight to decide whether the current depth is a free-float balance.

Supporter unlocks saved study tools, exact-state sharing, and the richer review surfaces that support this guided flow.

View plans

Example 1 of 2

Frozen valuesUsing frozen parameters

For the current block with $ρ_{f} = 1 e 3 kg/ m^{3}$ , $g = 9.8 m/ s^{2}$ , and displaced volume $V_{disp} = 0.05 m^{3}$ , what buoyant force should Archimedes' principle predict?

ρ_{f}

Fluid density

1e3 kg/m³

g

Gravity

9.8 m/s²

V_{d i s p}

Displaced volume

0.05 m³

1. Read the displaced volume from the submerged part of the block

The block currently has

0.65 m

submerged, so the displaced-fluid column is showing

V_{disp} = 0.05 m^{3}

2. Use $F_b = \rho_f g V_{\mathrm{disp}}$

Using

F_{b} = ρ_{f} g V_{disp}

, the current state gives

F_{b} = 509.6 N

3. Interpret the result as the weight of the displaced fluid

That same

509.6 N

is the weight of the displaced fluid, which is why the displaced-fluid cue and the buoyant-force arrow stay synchronized.

Predicted buoyant force

F_{b} = 509.6 N, V_{disp} = 0.05 m^{3}

The block is only partly submerged, so pushing it deeper would increase the displaced volume and the buoyant force.

Archimedes checkpoint

A uniform block is already fully submerged in a uniform fluid. You pull it 0.5 m deeper without changing the fluid or the block's volume. What happens to its buoyant force?

Make a prediction before you reveal the next step.

Decide whether deeper means more buoyancy once the whole block is already underwater.

Check your reasoning against the live bench.

The buoyant force stays the same.

The top and bottom pressures both increase, but their difference stays the same because the fluid density and the block's height are unchanged. The displaced volume also stays the same, so the buoyant force does not change.

Quick test

Loading saved test state.

Connect buoyancy back to pressure

Keep this idea moving

Open the next concept, route, or track only when you want the current model to widen into a larger branch.

Review the pressure sourceFluids

Pressure and Hydrostatic Pressure

Use one piston-and-tank bench to connect force per area, pressure acting in all directions, and the way density, gravity, and depth build hydrostatic pressure.

Compare pressure changes in moving fluidsFluids

Bernoulli's Principle

Follow one steady ideal-flow pipe and see how pressure, speed, and height trade within the same Bernoulli budget while continuity keeps the flow-rate story honest.

Compare static and moving fluidsFluids

Continuity Equation

Keep one steady stream tube on screen and use Q = Av to connect cross-sectional area, flow speed, and the same volume flow rate through narrow and wide sections.

Bench tools and share links

Keep stable concept links and exact-state sharing tucked away until you actually need to relaunch or share the bench.

Try this setup

Jump to a named bench state or copy the one you are looking at now. Shared links reopen the same controls, graph, overlays, and compare context.

Current bench

Wood in water preset

This bench is currently showing one of the concept's authored presets.

Open default bench

Saved setups

Saved setups are a Supporter study tool. Stable concept links still work for everyone.

Checking saved setup access

Open Model Lab is resolving whether this bench can save locally, sync to an account, or open Supporter-only compare tools.

Copy current setup

Exact-state sharing is part of Supporter. Stable concept and section links still stay available.

Stable links

Progress and next steps

Keep progress signals, starter-track handoffs, and review prompts available without letting them compete with the live lesson flow.

Progress

Loading progress

Loading saved concept progress for this browser or synced account before showing completion status.

Starter track

Step 4 of 5

Fluid and Pressure

Buoyancy and Archimedes' Principle appears later in this track, so it is cleaner to start from the beginning first.

Previous step: Bernoulli's Principle

Start from track beginning