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21 lis 2023 · The multiplicative inverse property states that for any real number a except zero, the multiplicative inverse of a is {eq}\frac{1}{a} {/eq}, and {eq}a\cdot \frac{1}{a} = 1 {/eq}.
Definition. The multiplicative inverse property states that for any non-zero real number, there exists a unique number that, when multiplied by the original number, results in a product of 1. This unique number is known as the multiplicative inverse or reciprocal of the original number.
The multiplicative inverse of a number, say, N, is represented by 1/N or N-1. It is also called reciprocal, derived from the Latin word ‘ reciprocus ‘. The meaning of inverse is something which is opposite.
Rational Function Inverse. 1.\:\:inverse\:\frac {1} {x} 2.\:\:inverse\:\frac {2} {x} 3.\:\:inverse\:\frac {3} {x} 4.\:\:inverse\:\frac {4} {x} 5.\:\:inverse\:\frac {2} {3x} 6.\:\:inverse\:\frac {1} {2x} 7.\:\:inverse\:\frac {4} {x+1} 8.\:\:inverse\:\frac {x+1} {x-1}
The multiplicative inverse of a number is defined as a number which when multiplied by the original number gives the product as 1. The multiplicative inverse of 'a' is denoted by 1/a. Learn the situations to use the multiplicative inverse examples.
Students discover the Multiplicative Inverse Property, which tells us that multiplying a number and its reciprocal always produces one. Launch The Commutative and Associative Properties help us re-order expression to make them easier to think about and solve.
The multiplicative inverse property states that if we multiply a number with its reciprocal, the product is always equal to 1. The image given below shows that $\frac{1}{a}$ is the reciprocal of the number “a”.
