Multiplicative Inverse

A number’s reciprocal is its multiplicative inverse. The multiplicative inverse of a number 'n' is written as 1/n. Here, we 1 becomes the numerator and the number becomes the denominator.

When a number is multiplied by its reciprocal, the result will always be 1. 

Multiplying the number ‘n’ with its reciprocal = n × 1n = 1
For example, let’s take the number 4

According to the multiplicative inverse property:

n =  4

1/n = 1/4

Therefore, n × 1n = 1 → 4 × 14 = 1

Hence, multiplying 4 by its reciprocal gives 1 as the final result.

The multiplicative is just dividing the given number by 1. Now let’s learn how to find the multiplicative inverse. Follow the steps given below:

Step 1: Write the given number as an improper fraction. For example, if the number is 7, write it as 71.

Step 2: Now switch the numerator and denominator. So 71 will become 17. Now the numerator is 1 and the denominator is 7

Step 3: Now multiply both the fractions obtained in Step 1 and Step 2 to make sure that the product is 1

7/1 × 1/7 = 7/7 = 1

An integer is a number that can be positive or negative. It can never be a decimal or fraction. For positive integers, the product of the number and its reciprocal should be 1. Similarly, the product of a negative integer with its reciprocal should also be 1. 

Let the negative integer be -n. The multiplicative inverse for -n will be 1/-n

Multiplying  -n × 1/-n gives the product as 1

For example, take -9. The multiplicative inverse for -9 is 1/-9 

Multiplying  -9 ×  1/-9 gives the product as 1

Let m/n be the fraction. The multiplicative inverse of m/n will be n/m. 

Here, m and n ≠ 0. 

Multiplying m/n × n/m will give the product as 1.

For example, take the fraction 5/10. The multiplicative inverse will be 10/5

Multiplying 5/10 × 10/5 gives 1 as the result. Here, the numerator 5 and the denominators cancel out. Similarly, the numerator and denominator are 10 

To find the multiplicative inverse of a mixed fraction, first convert the given mixed fraction into an improper fraction. After converting, change the position of the fraction upside down to get the multiplicative inverse.

Let’s take 4 1/2 as the mixed fraction.

Converting 4 1/2 into an improper fraction results in 9/2 

Since the improper fraction is 9/2, its multiplicative inverse is 2/9 

Multiplying the fractions 9/2 and 29 will give 1 as the product.
 9/2 ×  2/9 = 1

The multiplicative inverse of a number is the reciprocal of that number, which, when multiplied by the original number, gives 1. The multiplicative inverse of 0 is not possible because multiplying any number by 0 will always be 0. The multiplicative inverse of 0 is written as 1/0, but it is not defined.

Complex numbers are made of two parts, a real part (any number) and an imaginary part (i). Let Z be a complex number, where Z = a + ib.

Here, ‘a’ is the real part, and ‘ib’ is the imaginary part. The multiplicative inverse of Z is 1/Z, which is 1/a+ib

For example, take 3 + i√2

In 3 + i√2:

3 is the real part, and i√2 is the imaginary part.

The multiplicative inverse of 3 + i√2 is 1/ 3 + i√2

Now, to find the multiplicative inverse of complex numbers, follow the steps given below:

Step 1:  Let the complex number Z = a + ib. The reciprocal form of the given complex will be 1/a + ib

Step 2: Take the conjugate of (a+ib), which is (a-ib). We take the conjugate to remove the imaginary part by multiplying and dividing the inverse with (a-ib)

→ 1/a + ib × a - ib/a -  ib 

Using the identity (a+ib) (a−ib)=a²−(ib)² and i2 is -1, we solve the denominator as

a² + b²

Step 3: Simplify to the simplest form

The modular multiplicative inverse of the number q is another number p, such that ‘q × p’  will always be 1 (remainder) when divided by ‘x’ 

It is represented as q × p ≡ 1 (mod x)

This means that ‘x’ can completely divide q × p - 1

For example, let’s find the modular inverse of 3 mod 7

We write the expression as q × p ≡ 1 (mod x)

Here, p is 3 and x is 7. We have to find p

Therefore, the expression is written as 3 × p  ≡ 1 (mod 7)

This means that the result should be when 3 is multiplied by some number ‘p’ when divided by 7.

Now we need to check for values of p. Start with number 1.

Here the value of p will be 5 because 3 × 5 gives 15. When 15 is divided by 7, we get a remainder of 1

Therefore, the modular multiplicative inverse of 3 mod 7 is 5

To master finding the multiplicative inverse, follow the given tips and tricks.

• To find the inverse, just change the position of the numerator and denominator. For the number 3, the multiplicative inverse will be 1/3

• If you are asked to find the inverse of 0, remember that it can never be written in its reciprocal form.

• Always convert the mixed fraction into an improper fraction before finding the multiplicative inverse.

Multiplicative inverse is not just used in daily life but also in professional fields. Given below are some real-life applications of the multiplicative inverse:

• Used in cryptography to enable secure encryption and decryption

• Used in finance to calculate the reciprocal exchange rates for currency conversions

• Used in scaling to adjust the given quantities proportionally

• Used in measurements for the conversion of units