Module rgsl::exponential [−][src]
Functions
exp | This routine provides an exponential function \exp(x) using GSL semantics and error checking. |
exp_e | This routine provides an exponential function \exp(x) using GSL semantics and error checking. |
exp_e10_e | This function computes the exponential \exp(x) using the gsl_sf_result_e10 type to return a result with extended range. |
exp_err_e | This function exponentiates x with an associated absolute error dx. |
exp_err_e10_e | This function exponentiates a quantity x with an associated absolute error dx using the
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exp_mult | This routine exponentiates x and multiply by the factor y to return the product y \exp(x). |
exp_mult_e | This routine exponentiates x and multiply by the factor y to return the product y \exp(x). |
exp_mult_e10_e | This function computes the exponential \exp(x) using the gsl_sf_result_e10 type to return a result with extended range. |
exp_mult_err_e | This routine computes the product y \exp(x) for the quantities x, y with associated absolute errors dx, dy. |
exp_mult_err_e10_e | This routine computes the product y \exp(x) for the quantities x, y with associated absolute errors dx, dy using the gsl_sf_result_e10 type to return a result with extended range. |
expm1 | This routine computes the quantity \exp(x)-1 using an algorithm that is accurate for small x. |
expm1_e | This routine computes the quantity \exp(x)-1 using an algorithm that is accurate for small x. |
exprel | This routine computes the quantity (\exp(x)-1)/x using an algorithm that is accurate for small
x. For small x the algorithm is based on the expansion
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exprel_2 | This routine computes the quantity 2(\exp(x)-1-x)/x^2 using an algorithm that is accurate for
small x. For small x the algorithm is based on the expansion
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exprel_2_e | This routine computes the quantity 2(\exp(x)-1-x)/x^2 using an algorithm that is accurate for
small x. For small x the algorithm is based on the expansion
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exprel_e | This routine computes the quantity (\exp(x)-1)/x using an algorithm that is accurate for small
x. For small x the algorithm is based on the expansion
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exprel_n | This routine computes the N-relative exponential, which is the n-th generalization of the functions gsl_sf_exprel and gsl_sf_exprel_2. The N-relative exponential is given by: |
exprel_n_e | This routine computes the N-relative exponential, which is the n-th generalization of the functions gsl_sf_exprel and gsl_sf_exprel_2. The N-relative exponential is given by: |