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Results

Metre per second squared
1
m/s^2 (SI base unit)
Unit name Converted value Symbol
Metre per second squared 1 m/s^2
Kilometre per hour per second 3.6 km/h/s
Gal 100 Gal
Foot per second squared 3.2808398950131 fps^2
Foot per minute per second 196.85039370079 fpm/s
Foot per hour per second 11,811.023622047 fph/s
Mile per second squared 0.00062137119224 mps^2
Mile per minute per second 0.03728227153424 mpm/s
Mile per hour per second 2.2369362920544 mph/s
Knot per second 1.9438444924406 kn/s
Standard gravity 0.10197162129779 g

What this calculator does

This tool converts a single acceleration value into eleven different acceleration units at once. Acceleration measures how quickly velocity changes over time, with the SI base unit being the metre per second squared (\(\text{m/s}^2\)). The same physical quantity can be expressed many ways: km/h/s, Gal, foot per second squared, mile per hour per second, knot per second, or in multiples of standard gravity (\(g\)). Because every conversion is a linear scaling, this tool applies identically everywhere and is not tied to any country.

Car speeding up shown by lengthening velocity arrows over time
Acceleration is the rate at which velocity changes over time.

How to use it

Enter your acceleration value, pick the unit it is currently expressed in, and choose how many significant digits you want in the results. The calculator first normalizes your value to SI, then re-expresses it in every supported unit. Negative values (deceleration) and zero work fine.

The formula explained

Each unit has a factor equal to how many of that unit make up one \(\text{m/s}^2\). To convert your input to SI, divide by the input unit's factor: $$a_{SI} = \frac{a_{in}}{f_{in}}$$ To express SI in any target unit, multiply: $$a_{out} = a_{SI} \times f_{out}$$ Key factors: km/h/s = 3.6, Gal = 100, \(\text{ft/s}^2\) = 3.2808398950131, \(\text{mi/s}^2\) = 6.2137119223733\text{e-}4, knot/s = 1.9438444924406, and \(g = 1/9.80665 = 0.101971621297793\) (since standard gravity \(g_0 = 9.80665\ \text{m/s}^2\) exactly).

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Hub-and-spoke diagram converting acceleration units through a common base unit
Each unit is converted by going through the SI base unit \(\text{m/s}^2\) using its conversion factor.

Worked example

Suppose you have 2 g. Normalize to SI: $$a_{SI} = 2 \times 9.80665 = 19.6133\ \text{m/s}^2$$ Then \(\text{km/h/s} = 19.6133 \times 3.6 = 70.60788\), \(\text{ft/s}^2 = 19.6133 \times 3.2808398950131 = 64.34810\), and \(\text{mph/s} = 19.6133 \times 2.2369362920544 = 43.87320\).

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Common Acceleration Values Compared

The following scenarios put acceleration figures in everyday and engineering context. Each value is shown in the SI unit (m/s²) alongside standard gravity (g), feet per second squared (ft/s²) and the rate of speed change in km/h per second (km/h/s). The reference for gravity is \(g_0 = 9.80665\,\text{m/s}^2\).

Scenario m/s² g ft/s² km/h/s
Standard gravity (free fall on Earth) 9.80665 1.0 32.17 35.30
Gentle elevator start/stop 1.0 0.102 3.28 3.6
Family car, 0–100 km/h in 10 s 2.78 0.283 9.11 10.0
Sports car, 0–100 km/h in 4 s 6.94 0.708 22.78 25.0
Hard emergency braking 8.0 0.816 26.25 28.8
Fighter jet sustained turn 88.3 9.0 289.6 317.7

The car-acceleration rows use the simple relation \(a = \Delta v / \Delta t\); for example, reaching 100 km/h (27.78 m/s) in 10 s gives \(27.78 / 10 = 2.78\,\text{m/s}^2\). The fighter-jet figure of 9 g reflects the sustained limit human pilots can typically tolerate with a g-suit.

FAQ

What is standard gravity? It is the conventional value of Earth's gravitational acceleration, defined exactly as \(9.80665\ \text{m/s}^2\). One \(g\) equals that value.

What is a Gal? A Gal (galileo) equals \(1\ \text{cm/s}^2\), so \(1\ \text{m/s}^2 = 100\ \text{Gal}\). It is common in geophysics and gravimetry.

Why are foot and mile results not perfectly round? They use exact definitions (1 ft = 0.3048 m, 1 mile = 1609.344 m) but display as rounded decimals.

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