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Deriving the suvat Equations (AQA A Level Maths: Mechanics)
Revision Note
Deriving the suvat Equations
What is suvat?
- suvat is an acronym for the five quantities used when modelling motion in a straight-line with constant acceleration
- s – displacement (from the starting point)
- u – initial velocity
- v – final velocity
- a – acceleration
- t – time
- All except time are vector quantities and can be negative
- time is a scalar quantity
What are the suvat equations (for constant acceleration)?
- The five suvat equations for motion in a straight line are:
- The equations can only be used when the motion has constant acceleration
- All equations connect four of the five quantities
- Knowing any three allows a fourth to be found
- The equations are provided in the exam
How do I derive the suvat equations?
- The four equations that involve time can be derived from a velocity-time graph
- The velocity-time graph will be a straight line as the acceleration is constant
- The fifth equation can be found by choosing any two of the equations and eliminating the t variable (see the worked example)
- Two of the equations can also be derived using calculus
- Velocity is found by integrating acceleration
- Displacement is found by integrating velocity
Worked example
Use the constant acceleration equations
and
to show that
.
Examiner Tip
- If you are asked to derive one of the formulae then the question will likely give you a hint as to which method to use. They may provide a velocity-time graph. Make sure you show each step and state any reasons such as the gradient of the graph being the acceleration.
- If the question does not ask you to derive the formulae, then you can use them freely without proof.
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