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Homework question
My maths is not what it used to be. Need some assistance.
Q: Prove that the recurring decimal 0.25 = 25/99
Thanks
Mike
Q: Prove that the recurring decimal 0.25 = 25/99
Thanks
Mike
Answers
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For more on marking an answer as the "Best Answer", please visit our FAQ.In Nibble's answer, it is only by inference that we see that the division 25/99 poduces an infinitely recurring decimal and is therefore not a proof. Bamberger's proof seems incomplete and Hymie's, if correct, seems long winded.
The following is the classic way of proving this:
Let X = .2525252525... (1)
then 100X = 25.2525252525... (2)
Subract equation (2) from equation (1)
99X = 25, so X = 99/25
This works because we can see that for any position after the decimal point, the digit in each expression (1) and (2) is equal, so subtraction of one from the other leaves zero after the decimal point.
This proof can be used to find a fraction equal to any recurring decimal, using higher powers of 10 to match length of the repeating decimal. Where we used 100 above for .25 recurring, use 1000 for .258, 10000 for .2587 etc
Prove .25872587 recurring = 2587/99999
Let X = .25872587... (1)
then 10000X = 2587.25872587... (2)
Subtract (1) from (2)
9999X = 2587, so X = 2587/9999
The following is the classic way of proving this:
Let X = .2525252525... (1)
then 100X = 25.2525252525... (2)
Subract equation (2) from equation (1)
99X = 25, so X = 99/25
This works because we can see that for any position after the decimal point, the digit in each expression (1) and (2) is equal, so subtraction of one from the other leaves zero after the decimal point.
This proof can be used to find a fraction equal to any recurring decimal, using higher powers of 10 to match length of the repeating decimal. Where we used 100 above for .25 recurring, use 1000 for .258, 10000 for .2587 etc
Prove .25872587 recurring = 2587/99999
Let X = .25872587... (1)
then 10000X = 2587.25872587... (2)
Subtract (1) from (2)
9999X = 2587, so X = 2587/9999
Many schools now call themselves Colleges or Academies, and the word student is generally preferred to pupil.
Teaching is now called Teaching and Learning
At some school the heads are called the Lead Learner!
Departments are now called schools/colleges or even 'learning villages' i noticed in one advert
Teaching is now called Teaching and Learning
At some school the heads are called the Lead Learner!
Departments are now called schools/colleges or even 'learning villages' i noticed in one advert
hi heathfield- I think you are referring to the current Foundation level papers. These give grades of U, G, F, E, D or C. They are equivalent to the old CSE (for which a grade 1 was considered to be worth an 'O' level grade c/6. These papers do start with easier questons, some of which will indeed be similar to old 11 plus Maths questions
To find the equivalent of 'O' levels you need to look at Higher tier GCSE Maths papers. The bulk of what you and I covered at O level will still be on there, although a few newer topics are now on there (e.g. frequency densities, box plots) in place of a few things such as calculus. These papers bear little resemblance to old 11 plus questions
To find the equivalent of 'O' levels you need to look at Higher tier GCSE Maths papers. The bulk of what you and I covered at O level will still be on there, although a few newer topics are now on there (e.g. frequency densities, box plots) in place of a few things such as calculus. These papers bear little resemblance to old 11 plus questions
Let the original recurring decimal be n.
Multiply the recurring decimal by 100. It becomes 25.2525....
Subtract the orginal recurring decimal...................0.2525....
And the difference is 25 = 100n - n = 99n
Thus, n = 25/99
Hope I'm not too late and apologies if anyone else has already provided this solution.
Multiply the recurring decimal by 100. It becomes 25.2525....
Subtract the orginal recurring decimal...................0.2525....
And the difference is 25 = 100n - n = 99n
Thus, n = 25/99
Hope I'm not too late and apologies if anyone else has already provided this solution.