The mass, m tonnes, of a girder is 12.7, correct to 1 decimal place - OCR - GCSE Maths - Question 14 - 2017 - Paper 1

The length of the piece of wood is given as 8 metres, correct to the nearest metre. Therefore, the error interval for the piece of wood can be determined as follows:

• Lower limit = 8 - 0.5 = 7.5 metres
• Upper limit = 8 + 0.5 = 8.5 metres

Hence, the possible lengths for the piece of wood are between 7.5 metres and 8.5 metres, inclusive.

For the metal rod, whose length is given as 8.5 metres, correct to 1 decimal place, the error interval is:

• Lower limit = 8.5 - 0.05 = 8.45 metres
• Upper limit = 8.5 + 0.05 = 8.55 metres

Thus, the length of the metal rod ranges from 8.45 metres to 8.55 metres.

Now, comparing the intervals:

• The maximum length of the piece of wood is 8.5 metres.
• The minimum length of the metal rod is 8.45 metres.

Since the maximum length of the wood piece (8.5 metres) is equal to the maximum length of the metal rod (8.55 metres) but could also be less than that, we find that the piece of wood, when at its maximum length, could match but not exceed the metal rod.

However, there is a portion of the wood's interval (specifically its minimum of 7.5 metres) which has values that are definitely longer than the entire interval of the metal rod. Hence, it’s plausible that the piece of wood could indeed be longer than the metal rod.