Limits of Accuracy

1. Limits of Accuracy

2. What are they? • Any measurement we make is rounded to some degree of accuracy or other • Nearest metre • Nearest litre • The degree of rounding gives the possible values of the measurement before rounding

3. For example 77 A lighthouse is 76m tall, measured to the nearest metre 75.5 ≤ Height < 76.5 76.49999999999999999….. 76.5 Limits of Accuracy 76 75.5 75

4. Example 2 A car is 2.6m long, measured correct to 1 decimal place The range of values between the Upper & Lower Bounds is often referred to as the rounding error 2.55 ≤ Length < 2.65 2.50 2.6 2.60 2.70 2.55 2.65 Lower Bound Upper Bound

5. Problems involving accuracy • When we calculate an area or a volume, the errors in the measurements will give an even larger error For example, a room is measured as 6.4 x 4.3 metres, measured to 1 decimal place. Calculate the Limits of Accuracy of the area of the room

6. 6.35m 6.4m 6.45m 4.35m 4.3m 4.25m MINIMUM AREA 6.35 x 4.25 = 26.9875m2 = 26.99m2 (2 dp)

7. Limits of Accuracy 6.35m 6.4m 6.45m 26.99 ≤ Area < 28.06 m2 4.35m 4.3m 4.25m MAXIMUM AREA 6.45 x 4.35 = 28.0575 m2 = 28.06 m2 (2 dp)

8. Val is in training for a 400 metre race. He states that he can run 400 metres in 44 seconds. Both of these measurements are given to two significant figures. Find his maximum speed. 400 m 395 m 400 m 405 m 43.5 s 44 s 44.5 s Max speed = Greatest distance Shortest Time speed = 405 43.5 speed = distance time speed = 9.3103… m/s Max speed is the Greatest distance in the Shortest Time speed = 9.3 m/s (1 dp)