reciprocal

(noun)

Of a number, the number obtained by dividing $1$ by the given number; the result of exchanging the numerator and the denominator of a fraction.

Related Terms

(noun)

A fraction that is turned upside down so that the numerator and denominator have switched places.

Related Terms

Examples of reciprocal in the following topics:

  • Secant and the Trigonometric Cofunctions

    • Trigonometric functions have reciprocals that can be calculated using the unit circle.
    • Each of these functions has a reciprocal function, which is defined by the reciprocal of the ratio for the original trigonometric function.
    • Note that reciprocal functions differ from inverse functions.
    • The cosecant function is the reciprocal of the sine function, and is abbreviated as$\csc$.
    • The other reciprocal functions can be solved in a similar manner.

  • Parallel and Perpendicular Lines

    • For two lines in a 2D plane to be perpendicular, their slopes must be negative reciprocals of one another, or the product of their slopes must equal $-1$.  
    • Since $3$ is the negative reciprocal of $-\frac{1}{3}$, the two lines are perpendicular.
    • Again, start with the slope-intercept form and substitute the values, except the value for the slope will be the negative reciprocal.  
    • The negative reciprocal of $\frac{1}{4}$ is $-4$.  
    • The values of their slopes are negative reciprocals of each other; therefore, the angle of intersection is $90$ degrees.

  • Complex Fractions

    • From previous sections, we know that dividing by a fraction is the same as multiplying by the reciprocal of that fraction.
    • Therefore, we use the cancellation method to simplify the numbers as much as possible, and then we multiply by the simplified reciprocal of the divisor, or denominator, fraction:
    • Recall, again, that dividing by a fraction is the same as multiplying by the reciprocal of that fraction:

  • Simplifying, Multiplying, and Dividing Rational Expressions

    • Recall the rule for dividing fractions: the dividend is multiplied by the reciprocal of the divisor.
    • The same applies to dividing rational expressions; the first expression is multiplied by the reciprocal of the second.
    • Rather than divide the expressions, we multiply $\displaystyle \frac {x+1}{x-1}$ by the reciprocal of $\displaystyle \frac {x+2}{x+3}$:

  • Complex Conjugates and Division

    • The reciprocal of a nonzero complex number $z = x + yi$ is given by

  • The Law of Sines

  • Fractions

    • The process for dividing a number by a fraction entails multiplying the number by the fraction's reciprocal.
    • The reciprocal is simply the fraction turned upside down such that the numerator and denominator switch places.

  • The Order of Operations

    • Since multiplication and division are of equal precedence, it may be helpful to think of dividing by a number as multiplying by the reciprocal of that number.

  • Introduction to Hyperbolas

  • Inverse Trigonometric Functions

    • The reciprocal function is $\displaystyle{\frac{1}{\sin x}}$, which is not the same as the inverse function.