Distributive property is quite a common part of math. It is quite simple to understand as the word distribute itself means to share smoothing, divide something or give something. These are the mathematical problems which include the process of distributing some value, numbers or fractions to others. Distributive property can be the distributive property with fractions or the distributive property with variables.

## 1. Left Hand Distribution Property

There are two significant categories of distributive property. These can be the left hand distributive property or right hand distribution property. All the examples of left hand distribution property can be solved through using the rational expression. For such kind of distribution property, the general expression is a*(b+c) = a*b +a*c.

## 2. Right Hand Distribution Property

The general expression that works well for the right hand distribution property is (a+b)*c = a*c + b*c. Distributive property calculators can solve both kinds of distributive property problems. It yields the answers with excellent accuracy and demands only the correct mentioning of expressions in it. Distributive property calculator intends to deal with the problems through using the basic distribution law.

## 3. Distributive Property with Fractions

The more the number of fractions will be, the more complex the distributive property would become. The distributive law simplifies the fractions and helps solve both left and distributive property. The expression for right and left distributive property are (a+b)*c/d = a*c/d +b*c/d and a/b*(c+d) = a/b*c + a/b*d.

## Examples of Distributive Property

### Example 1:

The expression of 19*(67 + 3) can be solved easily through applying distributive law. When the expression is entered into the distributive property calculator then the outcome will be 1330. It solves the problem with the use of formula (a+b)*c = a*c + b*c. Distribute calculator is one of the highly accessible calculators that do not demand any penny for its use.

**Example 2:**

Suppose you have to deal with the expression of (3+9-12)*(22-0.2+2). It can be solved correctly when all the steps are taken perfectly. One can view these steps on the online calculator to determine either they are doing it rightly or not. The outcome of it would be zero.

**Example 3:**

One of the simplest fractions to solve is 1/8(8-2(6+7)). Enter the values with parentheses correctly into the distributive property calculator. The outcome of the given example would be -9/4.

**Example 4**

Another simple and easy expression to teach to students is ( 5 + 7 + 3 ) x 4. When the inner values of parenthesis would be solved then the outcome would be 15 which is then multiplied with 4. Hence, the final outcome would be 60. Distributive property is not quite challenging to deal with. Students can solve the problems through using the distributive property calculator.

**Example 5**

The calculation of expression 8 x (20 + 7) demands the steps for addition of 20 to 7. The outcome of it would be subjected to multiplication with 8. Hence, the final outcome of the expression will be 216 which can be verified with the use of a distributive property calculator.