Gradshteyn, I. S. and Ryzhik, I. M. Eqns. 6.518 and 6.649.1 in Tables of Integrals, Series, and Products, 6th ed. San Diego, CA: Academic Press, pp. 657 and 703, 2000.Iyanaga, S. and Kawada, Y. (Eds.). Encyclopedic Dictionary of Mathematics. Cambridge, MA: MIT Press, p. 1476, 1980.Magnus, W. and Oberhettinger, F. Formeln und Sätze für die speziellen Funktionen der mathematischen Physik, 2nd ed. Berlin: Springer-Verlag, 1948.
为第一类贝塞尔函数,
为第二类贝塞尔函数,以及 
为第一类修正贝塞尔函数。 另令 ![R[z]>0](/images/equations/Dixon-FerrarFormula/Inline4.svg)
且 ![-1/2<R[nu]<1/2](/images/equations/Dixon-FerrarFormula/Inline5.svg)
。 那么 Dixon-Ferrar 公式![int_0^inftyK_(2nu)(2zsinht)dt=(8cos(nupi))/(pi^2)[J_nu^2(z)+Y_nu^2(z)]](/images/equations/Dixon-FerrarFormula/NumberedEquation1.svg)
![int_0^inftyK_(mu-nu)(2zsinht)e^((mu+nu)t)dt
=(pi^2)/(4sin[(nu-mu)pi])[J_nu(z)Y_mu(z)-J_mu(z)Y_nu(z)]](/images/equations/Dixon-FerrarFormula/NumberedEquation2.svg)
![R[z]>1](/images/equations/Dixon-FerrarFormula/Inline6.svg)
and ![-1<R[nu-mu]<1](/images/equations/Dixon-FerrarFormula/Inline7.svg)
.