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Unlocking the Mystery of Fractions: From Fractions to Decimals and Back Again

Have you ever wondered how fractions and decimals are related? They might seem like different creatures, but under the surface, they're just two sides of the same coin – both representing parts of a whole. And the magic key to switching between them? Division!

Let's say you have a delicious pie cut into four equal slices. You eat one slice. You've just eaten 1/4 of the pie! That's a fraction, telling you one out of four parts. Now, how would you express that same amount as a decimal?

This is where our trusty friend, division, comes in. Remember, a fraction is just a division problem in disguise. The top number (numerator) gets divided by the bottom number (denominator). So, to convert 1/4 to a decimal, you simply divide 1 by 4. Grab your calculator, and you'll get 0.25. That's the decimal equivalent of 1/4!

But what if you don't have a calculator handy? Don't worry, you can still conquer those fractions! Let's break down the process step-by-step:

Converting Fractions to Decimals: The Long Division Way

Let's try converting 3/4 to a decimal:

  1. Set up the division: Write it out as a long division problem, with 3 (numerator) inside the division symbol and 4 (denominator) outside.

  2. Add a decimal and zeros: Since 4 doesn't go into 3 evenly, add a decimal point and a zero after the 3, making it 3.0.

  3. Divide: Now, think of it as 30 divided by 4. 4 goes into 30 seven times (7 x 4 = 28).

  4. Continue dividing: Subtract 28 from 30, leaving you with 2. Add another zero after the decimal point in your dividend, bringing it down to make it 20.

  5. Final step: 4 goes into 20 five times (5 x 4 = 20). Since there's no remainder, you've reached your answer!

  6. Place the decimal: Remember to place the decimal point in your answer directly above where it is in your dividend. The answer is 0.75.

Those Tricky Repeating Decimals

Sometimes, you'll encounter fractions that turn into decimals that go on forever! These are called repeating decimals.

For example, 1/3, when divided, gives you 0.33333... The 3s just keep repeating. To represent this, you can write it as 0.3 with a bar over the 3, indicating that it repeats infinitely.

Memorizing Common Conversions

While knowing how to convert any fraction to a decimal is super helpful, some conversions are so common that it's worth memorizing them:

  • 1/4 = 0.25
  • 1/3 = 0.3333...
  • 1/2 = 0.5
  • 2/3 = 0.6666...
  • 3/4 = 0.75

Fractions and Decimals: A Powerful Duo

Understanding how to convert between fractions and decimals opens up a world of mathematical possibilities. You can easily compare values, solve equations, and navigate real-life situations involving measurements, money, and more! So, embrace the power of division, and let those fractions and decimals work their magic!

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