What is 3 5 as a fraction

Fraction to decimal converter ►

How to convert decimal to fraction

Conversion stages

1. Write the decimal fraction as a fraction of the digits to the right of the decimal period (numerator) and a power of 10 (denominator).
2. Find the greatest common divisor (gcd) of the numerator and the denominator.
3. Reduce the fraction by dividing the numerator and the denominator with the gcd.

Example #1

Convert 0.32 to fraction:

0.32 = 32/100

Find the greatest common divisor (gcd) of the numerator and the denominator:

gcd(32,100) = 4

Reduce the fraction by dividing the numerator and the denominator with the gcd:

0.32 = (32/4) / (100/4) = 8/25

Example #2

Convert 2.56 to fraction:

2.56 = 2+56/100

Find the greatest common divisor (gcd) of the numerator and the denominator:

gcd(56,100) = 4

Reduce the fraction by dividing the numerator and the denominator with the gcd:

2+56/100 = 2 + (56/4) / (100/4) = 2+14/25

Example #3

Convert 0.124 to fraction:

0.124 = 124/1000

Find the greatest common divisor (gcd) of the numerator and the denominator:

gcd(124,1000) = 4

Reduce the fraction by dividing the numerator and the denominator with the gcd:

0.124 = (124/4) / (1000/4) = 31/250

How to convert repeating decimal to fraction

Example #1

Convert 0.333333... to fraction:

x = 0.333333...

10x = 3.333333...

10x - x = 9x = 3

x = 3/9 = 1/3

Example #2

Convert 0.0565656... to fraction:

x = 0.0565656...

100x = 5.6565656...

100x - x = 99x = 5.6

990x = 56

x = 56/990 = 28/495

Decimal to fraction conversion table

Fraction to decimal conversion ►

See also

• Fraction to decimal conversion
• Decimal to percent conversion
• Percent to fraction coversion
• How to convert decimal to fraction
• Fractions calculator
• Simplifying fractions calculator
• Adding fractions calculator
• Subtracting fractions calculator
• Multiplying fractions calculator
• Dividing fractions calculator
• GCD calculator
• Fraction conversion
• Number conversion

3 over 5 as a decimal. Use this simple calculator to simplify (reduce) 3 / 5 and turn it into a decimal.

• Click here for the opposite conversion

Numerator

Denominator

What is 3 / 5 simplified?

3⁄5 is already simplified

What is 3 / 5 as a decimal?

0.6(exact)

What is 3 / 5 as a mixed number?

3⁄5 = 0 3⁄5

What is 3 / 5 spelled out?

three fifths

Video transcript

Let's see if we can write 3/5 as a decimal. And I encourage you to pause this video and think about if you can do it on your own. And I'll give you a hint here. Can we rewrite this fraction so, instead of it being in terms of fifths, it can be in terms of tenths? So I'm assuming you've given a go at it. Let's try to rewrite this as a fraction with 10 as the denominator. But let's just first visualize this. So we have fifths. So let's say that's 1/5. Actually, let me just copy and paste this. That is 2/5. That is 3/5, and that is 4/5. And that is 5/5, or this would be a whole now. So that is our whole. And we want to color in 3 of those 5, so we want to think about what 3/5 are. So let me get my magenta out. So that's 1/5. I can actually make this bigger even-- 2/5 and 3/5. There you go. Color that in. That is 3/5. Now, how could I write this in terms of tenths-- instead of 3/5, a certain number of tenths? Well, let's split this whole into tenths. And the easiest way to split this whole into tenths is to take each of those fifths and turn them into 2/10. So let's do that. So If we were to do this right over here, we now have twice as many sections. So another way of thinking about it, we are multiplying the number of sections by 2. We now have 10 sections. Each of these is a tenth. And the 3 of those sections are now going to be twice as many. What we have in magenta, we now have twice as many sections in magenta. So we're going to multiply that by 2 as well. Notice we just multiplied the numerator and the denominator by 2. But hopefully it makes conceptual sense. Every piece, when we're talking about fifths, we've now doubled so that instead of every 1/5 is now 2/10. You have a 1/10 now and a 1/10 now. And we could just keep writing 1/10 if we like. Each of these things right over here are a tenth. And then each of the 3 are now twice as many tenths. So the 3/5 is now 6/10. So let's write that down. So this is going to be equal to 6/10. Now why is this interesting? You can literally view this as 6/10-- let me write it this way-- 6 times 1/10. I'm going to do that in blue. 6 times 1/10. Well what's another way to represent 6/10 or 6 times 1/10? Well you can express that as a decimal, where we go to the tenths place. So when you write a decimal-- so let's see 0 point-- the place right to the right of the decimal, that is the tenths place. This right over here is the ones. That right over here is the tenths. That's the tenths place. So how many tenths do we have? We have six tenths. So we could write this as 0.6. So there you have it. Let me write that. This is equal to 0.6. And we're done. We've just expressed this as a decimal. 0.6 is the same thing as 6/10, which could be rewritten as 3/5 or vice versa.

What is 3/5 in the simplest form?

What is 3/5 in a whole number?