経済分析 第82号
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1 6 K Y T YF KT effeive lor servie M H M H effeive mnhour Prouive mnhour mnhour M H M F M F if K M F ii M F M F F F M F F K M F i CoDougls Y Y Ae K K A Y K γ i ii Y * < lnk Y Y Y ˆ ˆ pive M H Brehling M H M H M H II - 5 -

2 II H MH H H H H H M H C H HS C H HS H M C H > HS H H II II HS M H M * F * HS H * F * HS M Y Y M * F YKTHS 5 H * F YKTHS M H * M H M H M H M H 6 M H M H H H δ M H 7 δ M H 7-5 -

3 M M H H M Y K HS 5P H Y K HS 5P M M P M M M M M 8 M Y M Mˆ Mˆ 9M Mˆ. K 6 ge omposiion impliidhrymes 6 CES YA K [ ] σ Y Y S S Y Y * AY Y B Y BA S I σ i I i i U UI I f U σ ln lni g U f g A I f g f U f U f U f U g U Ig U I III f U g U

4 γ g γσ γ γ γ γ f γ f ρg lnx ρ lnx 5 8 X γ γ γ Y γ Y γ γ lni 5 8I γ ε ε y XεεN I ρ ρ T lnπ T lnσ yxγ ' yxγ σ ˆ γ ρ X ' X X ' y ˆ δ ρ yx ˆ' γ yx ˆ γ T ρ ln π T ln ˆ δ ρ ln ˆ ρ mx ρ ρ < ˆ δ γˆ ρˆ ii i ii. CoenHikmn CoDougls

5 Y Ae K Y K Q W K Y P P P P Y Y Y k P P P Y Y Y K NiriRosen k k ln lnk lnk lnk lnk lnk k k exp 9 P W Q K Y K Y γ γ A A e Y P K e Y P < < K K K K k k ln

6 exp k k ln γ A ĉ ĉ 9 â â 6 CoenHikmn 5 CoenHikmn onsisen mnhour Y K Y F K Y F K NiriRosen Y F x x YY II IIBA B x x Y x x x

7 A CBCoen Hikmn x x y y x x x x x x x x x B ij ij CoDougls γ YA xi i i F x x x M xγ NR NiriRosenNR x x x x Y P P M Pγ P ' x Y F x x x x x x xx x x x G Y P g Y P gγ Y P NR x x x x Y g P g P P Slusky B ij x Y B G Y P x Y DP I B x γ γ M γ γ D Y Y =Y Y Y x M γ x xa Y Y DP I B x D I B

8 D B 5 D rnk 5 I B x I B x I B ij 7 5 D B NRY NiriRosen7 Y Y H U Y H U U H U h h U x γh U Y DP I B x Y x Y γh U Y DP I B x γh U I D I B h i ii iii. ARIMA - 6 -

9 II x x x x NR iii < DS D S DS D > S D < S FirJffee 8-6 -

10 e & p& g DS g' > e & > p& & < p& e p& e iv. Qusifixe foro i 8 employmen os ihiringos iiriningcos H K T M M C Y V K M M M M M MR f R R f - 6 -

11 f f Y F M H YM YH YM MYH H M H F f f h M M m S m S h m γ P W H WHWHH M H m r P YM W H f M r γ m n r P YHWH M H [ ] γ m PY NW H fγ m r 9 W Hε H { W H fγ m γ m H γ YH H ε H Y ε H 9 PY W H f W Hε W H f / H ε H W H HS H HS HS H ε δ HS ε f δ HS - 6 -

12 H H H π f ε M P f S M r M r M G M, H B M H G M H r{ PY W H } / γ S r S B M H PY HWH M M H M rm rm R M H r{pymmpymhwh } PYHHWHHM / r θ ± rθ θ r M M A A M M M M *M M M M M M γ V Disggregion y y i yix' i uii k ' i i x' i ui y yx' u ˆ y ˆ x' ˆ y ' ˆ i x i Ri R Ri i - 6 -

13 omposie oeffiien of eferminion 5 u i u j Zenner 7 i SP8 ii SNA II8 R

14 II7 II RT RT RT RT RT R D W s R SEC RSEC ln lnr PR II D W s R PIIP PIIP RB GNPV YW GNPV IVAC YC II IV 7. ρ D W s R D D CV TAX GNPV KHPNV KFPNV CCAP

15 II CCAC 5..8KFPNV 68.5 D D 77.IV R.967 s.69 D. W..6 ρ. II PIIPPIIP PIIPKIP IVAP R.99 s6.97 D. W..9 II IVAC IVAP. 67. R. s.5 D. W.. ρ.5 II II5 II6 lntic.5.859ln PGNP. lngnp R.99 s.9 D. W..88 II7 lntim.7.6lntct.878lnttcr.7559mg.9lnmg R. 966 s. 6 D. W

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4. ϵ(ν, T ) = c 4 u(ν, T ) ϵ(ν, T ) T ν π4 Planck dx = 0 e x 1 15 U(T ) x 3 U(T ) = σt 4 Stefan-Boltzmann σ 2π5 k 4 15c 2 h 3 = W m 2 K 4 5. A 1. Boltzmann Planck u(ν, T )dν = 8πh ν 3 c 3 kt 1 dν h 6.63 10 34 J s Planck k 1.38 10 23 J K 1 Boltzmann u(ν, T ) T ν e hν c = 3 10 8 m s 1 2. Planck λ = c/ν Rayleigh-Jeans u(ν, T )dν = 8πν2 kt dν c

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(1.2) T D = 0 T = D = 30 kn 1.2 (1.4) 2F W = 0 F = W/2 = 300 kn/2 = 150 kn 1.3 (1.9) R = W 1 + W 2 = = 1100 N. (1.9) W 2 b W 1 a = 0

(1.2) T D = 0 T = D = 30 kn 1.2 (1.4) 2F W = 0 F = W/2 = 300 kn/2 = 150 kn 1.3 (1.9) R = W 1 + W 2 = = 1100 N. (1.9) W 2 b W 1 a = 0 1 1 1.1 1.) T D = T = D = kn 1. 1.4) F W = F = W/ = kn/ = 15 kn 1. 1.9) R = W 1 + W = 6 + 5 = 11 N. 1.9) W b W 1 a = a = W /W 1 )b = 5/6) = 5 cm 1.4 AB AC P 1, P x, y x, y y x 1.4.) P sin 6 + P 1 sin 45

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1. (8) (1) (x + y) + (x + y) = 0 () (x + y ) 5xy = 0 (3) (x y + 3y 3 ) (x 3 + xy ) = 0 (4) x tan y x y + x = 0 (5) x = y + x + y (6) = x + y 1 x y 3 (

1. (8) (1) (x + y) + (x + y) = 0 () (x + y ) 5xy = 0 (3) (x y + 3y 3 ) (x 3 + xy ) = 0 (4) x tan y x y + x = 0 (5) x = y + x + y (6) = x + y 1 x y 3 ( 1 1.1 (1) (1 + x) + (1 + y) = 0 () x + y = 0 (3) xy = x (4) x(y + 3) + y(y + 3) = 0 (5) (a + y ) = x ax a (6) x y 1 + y x 1 = 0 (7) cos x + sin x cos y = 0 (8) = tan y tan x (9) = (y 1) tan x (10) (1 +

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.5 z = a + b + c n.6 = a sin t y = b cos t dy d a e e b e + e c e e e + e 3 s36 3 a + y = a, b > b 3 s363.7 y = + 3 y = + 3 s364.8 cos a 3 s365.9 y =,

.5 z = a + b + c n.6 = a sin t y = b cos t dy d a e e b e + e c e e e + e 3 s36 3 a + y = a, b > b 3 s363.7 y = + 3 y = + 3 s364.8 cos a 3 s365.9 y =, [ ] IC. r, θ r, θ π, y y = 3 3 = r cos θ r sin θ D D = {, y ; y }, y D r, θ ep y yddy D D 9 s96. d y dt + 3dy + y = cos t dt t = y = e π + e π +. t = π y =.9 s6.3 d y d + dy d + y = y =, dy d = 3 a, b

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