|bc-def {1} |pascal-triangle {155} |bc-factorial {3} |bc-symmetry {4} |bc-absorb {5} |bc-absorb-k {6} |bc-absorb-r-k {7} |bc-addition {8} |bc-sum-both {9} |bc-sum-upper {10} |bin-thm-xy {12} |bin-thm-z {13} |negate-upper {14} |pascal-triangle-up {164} |bc-switch {15} |bc-alt-sum {16} |bc-partial {17} |bc-partial-k {18} |partial-binomial {19} |half/2 {20} |bc-tc {21} |bc-prod1 {22} |bc-prod2 {23} |bc-prod3 {24} |bc-prod4 {25} |bc-prod5 {26} |vandermonde-conv {27} |bc-prod {169} |bc-saalschutz {28} |bc-dixon {29} |bc-half-dixon {30} |bc-dyson {31} |bc-quad {32} |bc-tops {174} |bc-quotient {33} |half-fact {34} |half-bc {35} |n-1/2-bc {36} |minus-half-bc {37} |sum-middle {39} |nth-diff {40} |recip-bc {41} |nth-diff-extract {42} |newton-maclaurin {44} |newton-series {45} |stirling-try1 {46} |stirling-try2 {47} |binomial-inversion {48} |subfactorial-rec {49} |nn:subfact {194} |subfactorial-sum {50} |subfactorial-sol {51} |generic-gf {52} |bracket-notation {53} |convolution {54} |nn:coeff-brack {197} |alt-convolution {55} |neg-binomial1 {56} |neg-binomial2 {57} |t-series-def {58} |t-series-rec {59} |t-series-power {60} |t-series-mod-power {61} |t-b1 {62} |t-b2 {63} |t-e1 {64} |t-e2 {65} |cat {68} |cat+- {69} |cat:r {70} |cat+-:r {71} |cat:mod-r {72} |cat+-:mod-r {73} |conv-table {202} |bc-gen-fib {74} |bc-gen-luc {75} |hyp-def {76} |nn:hyp {205} |1F0 {77} |0F1 {78} |1F1 {79} |t-ratio {81} |Fa1c {82} |f-def-lim {83} |f-def-int {84} |f-rec {85} |gamma-f {86} |gamma--f {87} |gen-falling-powers {88} |gen-rising-powers {89} |nn:gfall {211} |nn:grise {211} |Fabc {92} |Fa-nc {93} |hyp-kummer {94} |hyp-dixon {96} |hyp-saalschutz {97} |hyp-half/2 {99} |hyp-refl {101} |miracle-half/2 {104} |hyp-gen-vdm {105} |hyp/dz {106} |hyp-diff-eq {107} |gauss-diff-eq {108} |hyp-alt-diff-eq {109} |hyp4z-4z2 {110} |hyp-gauss-half {111} |gauss-miracle {112} |useless {113} |alt-sum< {114} |hypk-def {115} |tk-pqr {117} |qr-condition {118} |grow-p {119} |gosper-goal {120} |gosper-mystery {121} |pqrs-rec {122} |pQRs-rec {124} |petk-rec {125} |zeil-pqr {127} |tbar-ratio {128} |zeil-pqrs-rec {129} |zeil-s {130} |gz-success {131} |bin-rec {133} |sym-saalschutz {134} |apery-sum {141} |apery-rec {142} |pt-def {143} |pt-goal {144} |ldo {145} |-1-choose-k {4} |fix-symm-error {6} |sine-arcsine {11} |ht-warmup {12} |hyperfactorial-def {13} |factorial-def {21} |factorial-dup {22} |increase-denominator {25} |omit-first-term {26} |bc-div-p {36} |binomial-to-factorial {37} |ax+by-expansion {39} |bc-alt-recip {42} |prove-saalschutz {43} |prove-refl-trans {50} |diff-limits {51} |hyp-backwards {52} |convergence-caution {53} |explain-gauss-miracle {54} |explain-gosper-mystery {55} |samplesort-recurrence {58} |lucas-bc {61} |frac-bc {72} |wraparound3 {75} |bc-inequality {81} |prove-bc-quad {83} |dyson {86} |stirling-gamma {88} |vdm-summable {94} |gosper-bonus {97} |prove-saalschutz-again {99} |legendre-recs {101} |reprove-bc-quad {106} |not-holonomic {107} |apery-mn {108}