# 3/8 As A Decimal

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3/8 As A Decimal – In this article I will explain how to change some fractions to decimals. The fractions you are solving are 3/8, 5/8 and 7/8.

Changing any number to a decimal number is not difficult, as long as you know the trick to get the answer. First, to convert any fraction into decimal form, we must divide its numerator by its denominator. That way you will be able to get the correct answer

## 3/8 As A Decimal 3/8 is the same as 3 ÷ 8. As I said before, 8 is the divisor, that is, 8 is the denominator that will divide 3.

### Dividing By Decimals Warm Up Problem Of The Day

8 in 40 is 5. You don’t need to add the zero again at this point because there is no memory.

5/8 is the same as 5 ÷ 8. As I said before, 8 is a divisor, which means that 8 is the denominator that will divide 5.

7/8 is the same as 7 ÷ 8. As I said before, 8 is the divisor, that is, 8 is the denominator that will divide 7.

8 in 40 is 5. You don’t need to add a new zero at this point because there is no remainder.

### What Is 3/8, 5/8, 7/8 As A Decimal [solved] » Servantboy

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Do this division, give a decimal equivalent to 3/8 So 3/8 as a decimal is 3 ÷ 8 = 0.375 To change any fraction to a decimal, we always divide the vertex (numerator) by the denominator.

So, to convert a fraction to decimals, we divide the numerator (top) by the denominator (bottom) by 3/8 because the decimal is 3 ÷ 8 = 0.375 Convert these fractions to decimals 1. 3/5 6. 5/ 8 2 1 /8 7 1/4 3. 4/5 8. 1/5 4. 3/4 9. 2/5 5. 7/8 10. 1/2 So, to change the fraction to a decimal, we divide the numerator (above) by the denominator (below) by 5/8 because the decimal is 5 ÷ 8 = 0.625 Change these fractions to decimals 1. 3/5 = 0.6 6 .5/ 8 = 0.625 2. 1/8 = 0.125 7. 1/4 = 0.25 3. 4/5 = 0.8 8. 1/5 = 0.2 4. 3/4 = 0.75 9. 2/5 = 0.4 5. 7/8 = 0.875 10. 1/2 = 0.5

## The Fraction 31frac {3}{8} Converted To Decimal Is(a) 24.125 (b) 24.625 (c) 31.375 (d) 31.675

Sometimes the decimal continues. Here’s an example: 1 ÷ 3 = …. We show that this is a repeating decimal by putting a dot on the repeating number like this: 1/3 = …  1/3 = 0.3 The dot above the three tells us that the 3 repeats.

Here is another example showing the conversion of 1/6 to a decimal: 1 ÷ 6 = … 1/6 = 0.16 The dot above the three tells us that it is a repeating 6.

When, for example, we convert 1/7 to a decimal then 1 ÷ 7 = … We show that this is a repeating decimal by putting two dots on the numbers that are recalled like this: … = 1/7 =

Change these fractions to decimals. Write all the numbers on the calculator screen 1. 2/3 6. 5/13 2. 4/9 7. 3/7 3. 4/11 8. 8/9 4. 5/7 9. 9 /11 5 12 /7 10. 27/41

#### As A Fraction Is 3/8

1. 2/3 = 6. 5/13 = 2. 4/9 = 7. 3/7 = 3. 4/11 = 8. 8/9 = 4. 5/7 = 9. 9/11 = 5. 7/12 = 10. 27/41 =

1. 2/3 = 0.6 6. 5/13 = 2. 4/9 = 0.4 7. 3/7 = 3. 4/11 = 0.36 8. 8/9 = 0.8 4. 5/7 = 9. 9/ 11 = 0.81 5. 7/12 = 0.583 10. 27/41 =

Let x be equal to the repeating decimal x = …  10x = … If we multiply both sides of the equation by 10, we have… What fraction will have a repeating decimal equivalent…? The same decimal x = …  10x = … Above the first equation from the second  9x = 7 10x – x = 9x 7.7777… … = 7

## Decimals That Total 10 Worksheet

What fraction will have a repeating decimal equivalent…? x = …  10x = … Now we can find the value of x as a fraction  9x = 7  x = 7/9 Check x = 7 ÷ 9 x = …

Let x be equal to the repeating decimal x = …  100x = … If we multiply both sides of the equation by 100, we have…

What fraction will have a repeating decimal equivalent…? The same decimal x = …  100x = … Above the first equation from the second  99x = 24 100x – x = 99x … … = 24

What fraction will have a repeating decimal equivalent…? x = …  100x = … Now we can find the value of x as a fraction  99x = 24  x = 24/99 Check x = 24 ÷ 99 x = …

#### Pod 2 Basic Advanced 3 ÷ 8 = 15 ÷ 12 =.

What fraction will have a repeating decimal equivalent…? That x is equal to the repeating decimal x = …  1000x = … This time we have to multiply both sides of the equation by This gives …

What fraction will have a repeating decimal equivalent…? The same decimal x = …  1000x = … Therefore, we subtract the first equation from the second  999x = 123 1000x – x = 999x … … = 123

What fraction will have a repeating decimal equivalent…? x = …  1000x = …  999x = 123 Now we can find the value of x as a fraction  x = 123/999 Check x = 123 ÷ 999 x = … X = …  10x = …  9x = 2.5  x = 2.5/9 Let x be equal to the repeating decimal. Multiply both sides of the equation by the required power of 10. In this case x 100 Find x as a fraction Subtract the first equation from the second

#### Solved х 4 2 5 3 8 6 17 7 20 Y 9 х х 0 0 0 0 0 0 10 10 1)

X = …  10x = …  9x = 2.5  x = 2.5/9  x = 5/18 We want a fraction with whole numbers so multiply the top and bottom by 2 to get… Check x = 5 ÷ 18 x = …

1. … = 4/9 6. … = 31/99 2. … = 17/99 7. … = 11/45 3. … = 475/999 8. … = 8/45 4. … = 125/999 9 … = 8/15 5. … = 58/99 10. … = 13/18

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