Examples of Distributive Property in Real-Life

If you have ever simplified an algebraic expression or solved a math problem, you might have come across the Distributive Property. While it’s often taught in the context of mathematics, its applications extend far beyond the confines of the classroom.

In this article, we’ll explore various real-life scenarios where the Distributive Property plays a significant role, demonstrating its practical relevance beyond mathematical equations.

What is Distributive Property?

Distributive Property is a fundamental concept in mathematics that explains how operations interact when we distribute one operation over another. In simpler terms, it illustrates how multiplication distributes over addition or subtraction.

This property is expressed as a(b + c) = ab + ac, where ‘a’, ‘b’, and ‘c’ are any real numbers or variables.

Applications of the Distributive Property

Before learning about real-life examples, let’s briefly revisit how the Distributive Property operates in mathematics. In basic arithmetic operations, such as 2(3 + 4), we distribute the 2 to both terms inside the parentheses, resulting in 2 × 3 + 2 × 4 = 6 + 8 = 14 . Examples of Distributive Property in Real Life are:

Example of Distributive Property in Shopping and Budgeting

When you go shopping, you can figure out how much everything will cost overall by using the distributive property. For instance, if you purchase 3 pairs of trousers at ₹2400 each and 3 shirts for ₹1200 each, you may figure up the entire cost like this:

3 × 1200 + 3 × 2400 = 3 × (1200 + 2400)

Example of Distributive Property in Interior Design and Painting

It could be necessary to multiply the cost per square foot by the total area of the various walls when figuring out how much painting will cost in a certain space. The distributive property can be used to determine the overall cost if two walls are 10 feet wide and 8 feet high and 12 feet wide and 8 feet high.

10 × 8 + 12 × 8 = (10 + 12) × 8

Example of Distributive Property in Gardening and Landscaping

You may figure out how much it will cost to plant different areas of a garden. For example, you can utilize the distributive property if your garden has two areas that are 15 and 20 square feet, respectively, and the cost per square foot is 300.

(15 + 20) × 3 = 15 × 3 + 20 × 3

Example of Distributive Property in Tax Calculation

You may utilise the distributive property to compute deductions from various sources of income when calculating income tax. For example, if your tax rate is 10% and your taxable income is divided into ₹50,000 from job A and ₹30,000 from job B, the total tax can be computed as follows:

10% × (50,000 + 30,000) = 10% × 50,000 + 10% × 30,000

Example of Distributive Property in Travel Planning

Distributive property can be used to determine the total distance travelled while making travel plans. If you travel the same route for both legs of the trip—100 Km one day and 150 Km the next—you can compute the overall distance as follows:

2 × (100 + 150) = 2 × 100 + 2 × 150 = 500 Km

Example of Distributive Property in Construction Projects

The distributive property can be used in construction to determine how much building materials will cost. For example, you can use the distributive property to get the total cost if you need 50 square feet of wood and 50 square feet of steel, and the cost per square foot is ₹5 and ₹10, respectively.

(50 × 5) + (50 × 10) = 50 × (5 + 10) = ₹350

Example of Distributive Property in Cooking and Baking

The distributive property can be used in baking or cooking to modify a recipe according on how many servings it calls for. If you wish to make eight servings out of a recipe that calls for two cups of flour for four, for instance, you may determine how much flour you’ll need by using the following formula:

2 × (8 / 4) = (2 × 8) / (2 × 4) = 4 cups

Conclusion

Understanding the Distributive Property is not only crucial for excelling in mathematics but also for navigating everyday situations that involve distribution and allocation. Whether it’s dividing resources, sharing expenses, or analyzing economic policies, a solid grasp of this concept empowers individuals to make informed decisions and solve practical problems more effectively.

Also, Check

• GCD, LCM and Distributive Property
• Properties of Rational Numbers
• Properties of Real Numbers
• Use of (a+b)² in Real Life
• Whole Numbers – Definition, Properties and Examples

Applications of Distributive Property- FAQs

What is the distributive property?

A mathematical concept known as the distributive property permits a term outside of brackets to be multiplied across terms inside of brackets. It is shown as: a × (b + c) = a × b + a × c

How is the distributive property used in everyday life ?

The distributive property is a useful tool for problem-solving and computation simplification in a variety of contexts, including budgeting, purchasing, building, interior design, gardening, and cooking.

Can the distributive property be applied to subtraction ?

Yes, subtraction is also subject to the distributive property. As an example,

a × (b − c) = a × b − a × c

What are the benefits of using the distributive property ?

The distributive property makes complicated computations simpler, which facilitates problem solving and effective mathematical procedures.

Can the distributive property be used in multiplication ?

Yes, simplifying phrases through multiplication is a common usage of the distributive property. As an example,

a × (b + c) = a × b + a × c

Is the distributive property a fundamental concept in algebra ?

Yes, the distributive property is a basic algebraic idea that is applied often to a variety of algebraic procedures.