without actually performing the long division state whether 155 divided by 14 has a terminating decimal expansion or non-terminating repeating decimal expansion with solution please
Answers
Step-by-step explanation:
If the factors of denominator of the given rational number is of form 2ⁿ 5^m ,where n and m are non negative integers, then the decimal expansion of the rational number is terminating otherwise non terminating recurring.
SOLUTION:
(i) Given : 23/8
23/ 2³
Here, the factors of the denominator 8 are 2³ , which is in the form 2ⁿ 5^m .
So , 23/8 has terminating decimal expansion.
23/8 = 23 × 5³ /2³ × 5³ = 23 × 125 / (2×5)³
= 2875/10³ = 2875/1000 = 2.875
Hence, the decimal expansion of 23/8 is 2.875.
(ii) Given : 125/441
125 / 3² x 7²
Here, the factors of the denominator 441 are 3² × 7², which is not in the form 2ⁿ 5^m .
So , 125/441 has a non-terminating repeating decimal expansion.
(iii) Given : 35/50
It is not in the simplest form. We have to make it in the simplest form by taking the HCF of both the numbers and divide both the numbers by their HCF. HCF(35,50) = 5
35÷5 /50÷5 = 7/10
Now,7/10 is in the simplest form.
Here, the factors of the denominator 10 are 2× 5, which is in the form 2ⁿ 5^m .
So , 35/50 has a terminating decimal expansion.
35/50 = 7/10 = 0.7
Hence, the decimal expansion of 7/10 is 0.7
(iv) Given : 77/210
It is not in the simplest form. We have to make it in the simplest form by taking the HCF of both the numbers and divide both the numbers by their HCF. HCF(77,210) = 7
77÷7 /210÷7 = 11/30
Now,11/30 is in the simplest form.
Here, the factors of the denominator 30 are 2×3 × 5, which is not in the form 2ⁿ 5^m .
So , 77/210 has a non-terminating repeating decimal expansion.
(v) Given : 129/2² × 5^7 × 7^17
Here, the factors of the denominator are 2² × 5^7 × 7^17, which is not in the form 2ⁿ 5^m .
So , 129/2² × 5^7 × 7^17 has a non-terminating repeating decimal expansion.
(vi) Given : 987/10500
It is not in the simplest form. We have to make it in the simplest form by taking the HCF of both the numbers and divide both the numbers by their HCF. HCF(987,10500) = 21
987 ÷ 21 /10500 ÷ 21 = 47/500
Here, the factors of the denominator 500 are 5³ × 2², which is in the form 2ⁿ 5^m .
So , 987/10500 has terminating decimal expansion
987/10500 = 47/500 = 47× 2 / 5³ × 2² × 2¹
= 94/(5×2)³ = 94 /1000 = 0.094
Hence, the decimal expansion of 987/10500 is 0.094.
HOPE THIS ANSWER WILL HELP YOU…...
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Answer:
heyaa mate here is your answer
Step-by-step explanation:
- no it not terminating decimal.
- the rule states that if the denominator should be a product of 2 power n and 5 power m.
- as 14 cannot be expressed in this form,, it not a terminating decimal.
- here is the expansion of 14 ..
- it is 2*7
- so it it not terminating decimal
hope this helps...
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