When you’re learning about fractions, one of the first things you might do is try to figure out what 3 divided by 1/8 looks like. Even if you can’t quite put your finger on it, you’ll eventually be able to see and understand it. In this blog post, we will help you learn more about fractions and how to visualize them with simple examples. By the end, you’ll have a better understanding of how fractions work and be able to put them to use in your everyday life.

## What is a fraction?

A fraction is a number that is divided into two parts. The numerator (top number) represents the amount that is larger than the denominator (bottom number). For example, 3/4 is a fraction because it is 3 greater than 1. Fractions can be written as a decimal (like 3.5), or as part of a larger number like 34.

## How to represent fractions on a calculator

To represent fractions on a calculator, you first need to divide one fraction by the other. Then, to find the answer for the numerator (top number), you add 1 to the bottom number. The answer for the denominator (bottom number) is what’s left over after you do that.

For example, if you wanted to find the answer to **3 divided by 1/8** on a calculator, you would first divide 3 by 8 and get 0.125. Next, you would add 1 to 0.125 and get 0.135. Finally, the answer for 3/8 would be 135/8 or 4

## Comparing fractions

One way to understand fractions is to compare them to other mathematical operations. For example, what is divided by can be thought of as the result of multiplying two smaller numbers.

Here are some examples:

– If someone divides 5 by 2, the answer is 2 because 5 ÷ 2 = 1.

– If someone divides 24 by 8, the answer is 4 because 24 ÷ 8 = 4.

– If someone divides 9 by 3, the answer is 3 because 9 ÷ 3 = 3.

## Representing fractions as decimals

One way to represent fractions as decimals is by using the point-to-point method. This is where each number in the fraction is represented by a single point on a coordinate plane. For example, if we were dividing 3quarters by 2, we would use points on the coordinate plane to represent these numbers.

The first number, 3 quarters, would be represented by the point located at (0, 0), the second number, 2, would be represented by the point located at (1, 1), and so on.

When working with fractions and decimals, it’s important to keep in mind that they are both numbers. That means that you can add them together like any other two numbers, and divide them like any other two numbers.

## The 3/8 Solution

The 3/8 Solution is a simple way to remember the order of operations: Parentheses, Exponents, Multiplication and Division (from left to right). The 3/8 solution is also known as the “ta-da!” solution because it can easily solve problems that require division or multiplication.

To solve a problem using the 3/8 solution, first determine the position of the decimal point. If the problem involves division or multiplication, place the decimal point in the middle of the number being divided or multiplied. If the problem involves addition or subtraction, place the decimal point at either end of the number being added or subtracted.

Now follow these steps:

Add 1 to each side of the equation

This will bring you to an equation with one less term than what you started with. In this case, it’s 2 on one side and 1 on the other side

So take away 1 from both sides (1 + 0 = 1) and you’ll get your answer!

In division problems, always divide by 100 first and then move the decimal point two places to the right. To multiply two numbers using this method, start by multiplying them both by 10 and then moving their decimal points two places to the right.

## Conclusion

In this article, we have looked at how to find the answer to what is 3 divided by 1/8 – visual fractions. By using a few simple tools, you can quickly and easily solve this problem. If you need help with more complex math problems or if you want to improve your understanding of fractions, then keep reading for more information. Thanks for reading!