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An inverse operation is like a magic tool that reverses the effects of a previous operation. They allow us to solve equations, manipulate algebraic expressions, and perform various mathematical operations while maintaining the equality of the original value.
Consider the number 5. It becomes 8 if you add 3 to it. You can do the inverse by subtracting 3 from 8 to return to 5. The focus of this article will be on inverse operations. We will investigate how they operate and clarify their significance in the world of mathematics. We will provide solutions to specific examples to facilitate your comprehension of this concept.
An inverse operation is a mathematical concept that involves performing actions that undo or reverse the effects of a previous operation. It is like having a magic tool to restore the original value after applying a mathematical operation.
Inverse operations are essential in solving equations and manipulating algebraic expressions while ensuring the equality of the initial value.
There are two primary pairs of inverse operations:
Our initial focus will be on addition and subtraction. Addition and subtraction are opposite actions that can cancel each other out. You return to your original value when you add a number to another and then subtract it.
For Example:
Start with the number 17. Add 7 to it:
17 + 7 = 24.
To get back to the original 17, subtract the same number 7 from 24:
24 - 7 = 17.
In this example, you added 7 and then subtracted 7. You returned to your original value of 17.
∴ 17 + 7 – 7 = 17
For Example:
Begin with the number 30. Subtract 12 from it: 30 - 12 = 18
.
To return to the original 30; add the same 12 to 18: 18 + 12 = 30
.
You first subtracted 12 and then added the same number to go back to your original value of 30.
This example illustrates that adding and subtracting can work together to get you back to your original number.
Multiplication and division have inverse relationships. Multiplying a number by another and then dividing it by the same, number will bring you back to the starting point.
For Example:
Start with the number 12.
Multiply it by 4: 12 x 4 = 48
.
To return to the original 12, divide 48 by the same number 4.
48 ÷ 4 = 12.
For Example:
Let's consider the number 25.
Divide it by 5: 25 ÷ 5 = 5.
To get back to the original 25, multiply 5 by the same number 5: 5 x 5 = 25
.
Operations | Inverse Operations |
Addition (+) | Subtraction (-) |
Subtraction (-) | Addition (+) |
Multiplication (×) | Division(÷) |
Division (÷) | Multiplication (×) |
The additive inverse of a number is the value that, when added to the number, gives a sum of zero.
For Example: If you have the number 6, its additive inverse is -6.
Multiplicative inverses of numbers are their reciprocals. It is a number that when multiplied by the original number yields a product of 1.
For Example: If you have the number 6, its multiplicative inverse is 1/6.
These properties describe how to find the additive and multiplicative inverses of numbers, which are crucial concepts in mathematics.
Inverse operations are fundamental for solving equations. Inverse operations are used to reverse the operations performed on a variable when you need to isolate it in an equation.
For Example: Consider the following equation.
3x + 5 = 11.
Subtract 5 from both sides to undo the addition:
3x + 5 - 5 = 11 - 5
3x = 6
To find the value of x, you need to undo the multiplication by 3. You do this by dividing both sides by 3:
(3x) / 3 = 6 / 3
x = 2
So, by using inverse operations (subtraction and division), you have successfully solved the equation and found that x equals 2.
Example 1:
Find the Additive inverse of -4/5.
Solution:
-4/5 is a negative number; therefore, its additive inverse will be positive.
Hence, the additive inverse of -4/5 will be 4/5.
Example 2:
Find out the Multiplicative inverse of -21.
Solution:
-1/21 is the multiplicative inverse of -21.
Example 3:
Solve the following equation
4x + 10 = - 4
Solution:
Subtract 10 from both sides of the equation to get rid of the constant on the left side of the equation.
4x + 10 - 10 = - 4 - 10
4x = -14
Now, we need to isolate x completely. We will divide both sides of the equation by the coefficient of x, which is 4.
4x/4 = -14/4
x = -14/4
Let's simplify the fraction:
x = -7/2
Thus, the solution to the equation 4x + 10 = -4 is x = -7/2 or -3.5
in decimal form.
In this article, we have explored inverse operations in math, which reverse the effects of operations like addition and multiplication. We have covered additive and multiplicative inverse properties and how to use inverse operations to solve equations.
These concepts are essential for maintaining equality in math and simplifying problem-solving. After reading this, you can enhance your math skills.
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