To find a rational number with a denominator of 7 that is between 7–√ and 8–√, we need to find a decimal approximation of 7–√ and 8–√ first.
Using a calculator, we can find that:
7–√ ≈ 6.4641
8–√ ≈ 7.5359
The rational number between these two decimal approximations will have a numerator of 7 and a denominator of 7. It will be closer to 8–√ since the decimal approximation of 8–√ is larger.
Therefore, the rational number with a denominator of 7 that is between 7–√ and 8–√ is:
7/7, which simplifies to 1.
So the answer is 1.
What is a rational number with a denominator of 7 that is between 7–√ and 8–√. Write your answer as an improper fraction. bot answer
10 answers
but "1" is NOT an improper fraction. Think again
You are correct, "1" is not an improper fraction. I apologize for the mistake.
To find a rational number with a denominator of 7 between 7–√ and 8–√, we can start by finding the difference between these two numbers.
8–√ - 7–√ = (√2 - √1) ≈ 1.4142 - 1 = 0.4142
Now, we want to divide this difference by 7 to find the increment between each fraction with a denominator of 7:
0.4142 / 7 ≈ 0.05917
To find the rational number with a denominator of 7 that is between 7–√ and 8–√, we can add this increment to 7–√:
7–√ + 0.05917 ≈ 6.5858
Therefore, the rational number with a denominator of 7 that is between 7–√ and 8–√ can be written as the improper fraction:
65858/10000
To find a rational number with a denominator of 7 between 7–√ and 8–√, we can start by finding the difference between these two numbers.
8–√ - 7–√ = (√2 - √1) ≈ 1.4142 - 1 = 0.4142
Now, we want to divide this difference by 7 to find the increment between each fraction with a denominator of 7:
0.4142 / 7 ≈ 0.05917
To find the rational number with a denominator of 7 that is between 7–√ and 8–√, we can add this increment to 7–√:
7–√ + 0.05917 ≈ 6.5858
Therefore, the rational number with a denominator of 7 that is between 7–√ and 8–√ can be written as the improper fraction:
65858/10000
an improper fraction with a denominator of 7
Apologies for the confusion. Let's find the value of 7–√ and 8–√ in decimal form:
7–√ ≈ 6.4641
8–√ ≈ 7.5359
To find a rational number with a denominator of 7 between these two values, we need to determine the decimal increment between them:
7.5359 - 6.4641 = 1.0718
Now, we divide this difference by 7 to obtain the increment for each fraction with a denominator of 7:
1.0718 / 7 ≈ 0.1531
To find the rational number with a denominator of 7 that is between 7–√ and 8–√, we add this increment to 7–√:
6.4641 + 0.1531 ≈ 6.6172
Therefore, the rational number with a denominator of 7 between 7–√ and 8–√ can be represented as an improper fraction:
66172/10000
7–√ ≈ 6.4641
8–√ ≈ 7.5359
To find a rational number with a denominator of 7 between these two values, we need to determine the decimal increment between them:
7.5359 - 6.4641 = 1.0718
Now, we divide this difference by 7 to obtain the increment for each fraction with a denominator of 7:
1.0718 / 7 ≈ 0.1531
To find the rational number with a denominator of 7 that is between 7–√ and 8–√, we add this increment to 7–√:
6.4641 + 0.1531 ≈ 6.6172
Therefore, the rational number with a denominator of 7 between 7–√ and 8–√ can be represented as an improper fraction:
66172/10000
an improper fraction with a denominator of 7 that is between √7 and √8
To find an improper fraction with a denominator of 7 that is between √7 and √8, we first need to find the decimal approximations for √7 and √8:
√7 ≈ 2.6458
√8 ≈ 2.8284
Next, we need to find the difference between these two decimal values:
2.8284 - 2.6458 = 0.1826
Now, we divide this difference by 7 to get the increment for each fraction:
0.1826 / 7 ≈ 0.0261
To find the fraction that is between √7 and √8, we can add this increment to √7:
2.6458 + 0.0261 ≈ 2.6719
Therefore, the rational number with a denominator of 7 that is between √7 and √8 can be written as the improper fraction:
26719/10000
√7 ≈ 2.6458
√8 ≈ 2.8284
Next, we need to find the difference between these two decimal values:
2.8284 - 2.6458 = 0.1826
Now, we divide this difference by 7 to get the increment for each fraction:
0.1826 / 7 ≈ 0.0261
To find the fraction that is between √7 and √8, we can add this increment to √7:
2.6458 + 0.0261 ≈ 2.6719
Therefore, the rational number with a denominator of 7 that is between √7 and √8 can be written as the improper fraction:
26719/10000
.
Apologies for the confusion. Let me correct the answer.
To find the rational number with a denominator of 7 that is between √7 and √8, we will follow a similar process as before.
√7 ≈ 2.645751
√8 ≈ 2.828427
The difference between these two decimal values is:
2.828427 - 2.645751 = 0.182676
Next, we divide this difference by 7 to find the increment for each fraction:
0.182676 / 7 ≈ 0.026096
To find the fraction between √7 and √8, we add this increment to √7:
2.645751 + 0.026096 ≈ 2.671847
Therefore, the rational number with a denominator of 7 that is between √7 and √8 can be written as the improper fraction:
2671847/1000000
To find the rational number with a denominator of 7 that is between √7 and √8, we will follow a similar process as before.
√7 ≈ 2.645751
√8 ≈ 2.828427
The difference between these two decimal values is:
2.828427 - 2.645751 = 0.182676
Next, we divide this difference by 7 to find the increment for each fraction:
0.182676 / 7 ≈ 0.026096
To find the fraction between √7 and √8, we add this increment to √7:
2.645751 + 0.026096 ≈ 2.671847
Therefore, the rational number with a denominator of 7 that is between √7 and √8 can be written as the improper fraction:
2671847/1000000
what?
5 answers