Betekenis van:
inverse function

inverse function
Zelfstandig naamwoord
    • a function obtained by expressing the dependent variable of one function as the independent variable of another; f and g are inverse functions if f(x)=y and g(y)=x

    Hyperoniemen


    Voorbeeldzinnen

    1. G (Z) denotes the inverse cumulative distribution function for a standard normal random variable (i.e. the value x such that N(x)= z).
    2. G (Z) denotes the inverse cumulative distribution function for a standard normal random variable (i.e. the value x such that N(x) z)
    3. In a limited temperature range, the logarithm of the vapour pressure of a pure substance is a linear function of the inverse of the thermodynamic temperature according to the simplified Clapeyron-Clausius equation:
    4. N(x) denotes the cumulative distribution function for a standard normal random variable (i.e. the probability that a normal random variable with mean zero and variance of one is less than or equal to x). G (Z) denotes the inverse cumulative distribution function for a standard normal random variable (i.e. the value x such that N(x)= z).
    5. N(x) denotes the cumulative distribution function for a standard normal random variable (i.e. the probability that a normal random variable with mean zero and variance of one is less than or equal to x). G (Z) denotes the inverse cumulative distribution function for a standard normal random variable (i.e. the value x such that N(x) z)
    6. N(x) denotes the cumulative distribution function for a standard normal random variable (i.e. the probability that a normal random variable with mean zero and variance of one is less than or equal to x). G (Z) denotes the inverse cumulative distribution function for a standard normal random variable (i.e. the value x such that N(x) z) For PD = 0, RW shall be 0.