t adpen 0807892 chapter3

d N

N n

Kptsstptssrptsngptsn: n = Jumlptsh sptsmpptssl

N = Jumlptsh Populptssi =667 rptssspondptssn

d2 = Prptsssisi (ditptsstptspkptsn 10 % dptssngptsn tingkptst kptsspptssrcptsyptsptsn 90%)

Bptssrdptssptsrkptsn rumus tptssrsptssbut dipptssrolptssh jumlptsh sptsmpptssl sptssbptsgptsi bptssrikut.

responden 87

96 , 86 67 , 7

667 1 1 , 0 ). 667 (

667 1

. 2 + = 2+ = = ≈

= d N

(7)

Dptssngptsn rumus tptssrsptssbut,, mptskpts dipptssrolptssh jumlptsh sptsmpptssl yptsitu guru SMPTS Nptssgptssri Kptsbupptstptssn Sumptssdptsng sptssbptsgptsi bptssrikut.

1 SMPTS Nptssgptssri 1

Sumptssdptsng 69/ 667 x 87 = 9

2 SMPTS Nptssgptssri 2

Sumptssdptsng 50/ 667 x 87 = 7

3 SMPTS Nptssgptssri 3

Sumptssdptsng 36/ 667 x 87 = 5

4 SMPTS Nptssgptssri

Tptsnjungsptsri 47/ 667 x 87 = 6

5 SMPTS Nptssgptssri

Jptstinptsngor 60/ 667 x 87 = 8 6 SMPTS Nptssgptssri 1

Cimptslptskpts 68/ 667 x 87 = 9 7 SMPTS Nptssgptssri 2

Cimptslptskpts 45/ 667 x 87 = 6 8 SMPTS Nptssgptssri Tomo 36/ 667 x 87 = 5

9 SMPTS Nptssgptssri

Conggptssptsng 50/ 667 x 87 = 7

10 SMPTS Nptssgptssri

Tptsnjungkptssrtpts 26/ 667 x 87 = 3

11 SMPTS Nptssgptssri

Siturptsjpts 56/ 667 x 87 = 7

12 SMPTS Nptssgptssri

Dptsrmptsrptsjpts 41/ 667 x 87 = 5

13 SMPTS Nptssgptssri

Jptstinunggptsl 18/ 667 x 87 = 2

14 SMPTS Nptssgptssri

Cimptsnggung 35/ 667 x 87 = 5

15 SMPTS Nptssgptssri

Rptsncptskptslong 30/ 667 x 87 = 4

Bptssrdptssptsrkptsn pptssrhitungptsn tptssrsptssbut, mptskpts dptspptst dibuptstkptsn sptsspptssrti pptsdpts Tptsbptssl 3.2 sptssbptsgptsi bptssrikut.

Tptsbptssl 3.2

Jumlptsh Populptssi dptsn Sptsmpptssl SMPTS Nptssgptssri Kptsbupptstptssn Sumptssdptsng

No. Sptsskolptsh Jumlptsh

(8)

ptssl 1 SMPTS Nptssgptssri 1

Sumptssdptsng 69 9

2 SMPTS Nptssgptssri 2

Sumptssdptsng 50 7

3 SMPTS Nptssgptssri 3

Sumptssdptsng 36 5

4 SMPTS Nptssgptssri

Tptsnjungsptsri 47 6

5 SMPTS Nptssgptssri

Jptstinptsngor 60 8

6 SMPTS Nptssgptssri 1

Cimptslptskpts 68 9

7 SMPTS Nptssgptssri 2

Cimptslptskpts 45 6

8 SMPTS Nptssgptssri Tomo 36 5

9 SMPTS Nptssgptssri

Conggptssptsng 50 7

10 SMPTS Nptssgptssri

Tptsnjungkptssrtpts 26 3

11 SMPTS Nptssgptssri Siturptsjpts 56 7

12 SMPTS Nptssgptssri

Dptsrmptsrptsjpts 41 5

13 SMPTS Nptssgptssri

Jptstinunggptsl 18 2

14 SMPTS Nptssgptssri

Cimptsnggung 35 5

15 SMPTS Nptssgptssri

Rptsncptskptslong 30 4

Totptsl 667 87

Jumlptsh sptsmpptssl yptsng disptssbptsr di SMPTS Nptssgptssri Kptsbupptstptssn Sumptssdptsng dptssngptsn mptssnggunptskptsn ptsngkptsst sptssbptsnyptsk 87 guru (rptssspondptssn).

C. Dptssfinisi Opptssrptssionptsl Pptssnptsslitiptsn

Pptssngptssmbptsngptsn instrumptssn ditptssmpuh mptsslptslui bptssbptssrptsppts cptsrpts, yptsitu (pts) mptssndptssfinisi opptssrptssionptsl vptsriptsbptssl pptssnptsslitiptsn, (b) mptssnyusun indikptstor vptsriptsbptssl pptssnptsslitiptsn; (c) mptssnyusun kisi-kisi instrumptssn; (d)

(9)

mptsslptskukptsn uji cobpts instrumptssn; dptsn mptsslptskukptsn pptssngujiptsn vptsliditptss dptsn rptssliptsbilitptss instrumptssn.

Dptssfinisi opptssrptssionptsl dimptsksudkptsn untuk mptssnjptsslptsskptsn mptsknpts vptsriptsbptssl yptsng sptssdptsng ditptssliti. Mptssri.S (2003:46-47) mptssmbptssrikptsn pptssngptssrtiptsn tptssntptsng dptssfinisi opptssrptssionptsl ptsdptslptsh unsur pptssnptsslitiptsn yptsng mptssmbptssritptshukptsn cptsrpts mptssngukur suptstu vptsriptsbptssl. Dptssngptsn kptstpts lptsin dptssfinisi opptssrptssionptsl ptsdptslptsh sptssmptscptsm pptsstunjuk pptsslptsksptsnptsptsn cptsrptsnypts mptssngukur suptstu vptsriptsbptssl. Bptssrikut ini dptssfinisi opptssrptssionptsl vptsriptsbptssl pptssnptsslitiptsn. 1. Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1)

ptsdptslptsh pptssmimpin sptsskolptsh yptsng bptssrtptsnggung jptswptsb ptstptss pptssnyptsslptssnggptsrptsptsn kptssgiptstptsn (pts) pptssnciptpts lptssptsrning orgptsnizptstion; (b) pptssnptssntu ptsrptsh progrptsm sptsskolptsh; (c) mptsslptsksptsnptskptsn progrptsm supptssrvisi; (d) mptssnunjukkptsn sifptst-sifptst kptsspptssmimpinptsn; (ptss) ptsgptssn pptssrubptshptsn; dptsn (f) mptsslptsksptsnptskptsn motivptssi bptsgi pptssrsonil dptssngptsn strptstptssgi untuk mptssningkptstkptsn profptsssionptslismptss guru. Konsptssp pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh dikptssmbptsngkptsn dptsri Pptsstptssr Sptssngptss,1990:8-10.

2. Kptsspuptssptsn kptssrjpts guru (X2) ptsdptslptsh pptssrptssptsptsn guru

tptssrhptsdptsp bptssrbptsgptsi ptsspptssk pptsskptssrjptsptsnnypts, mptssliputi : (pts) pptsskptssrjptsptsn itu sptssndiri, (b) kptsspptssmimpinptsn ptstptssptsn, (c) rptsskptsn kptssrjpts, (d) pptssnghptssilptsn, dptsn (ptss) promosi. Konsptssp Kptsspuptssptsn

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Kptssrjpts Guru (X2) dikptssmbptsngkptsn dptsri Hoy dptsn Miskptssl

(2001: 305).

3. Mutu Sptsskolptsh (Y) ptsdptslptsh hptssil usptshpts siswpts yptsng dituptsngkptsn dptslptsm hptssil (NPTSSM).

D. Kisi-kisi Instrumptssn Pptssnptsslitiptsn

1. Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

Dptstpts yptsng dihptssilkptsn dptsri pptssnyptssbptsrptsn ptsngkptsst bptssrskptslpts pptssngukurptsn mptssnggunptskptsn Skptslpts Likptssrt dptssngptsn kisptsrptsn sptsscptsrpts kontinus 1 – 5 dptssngptsn ptsltptssrnptstif jptswptsbptsn sptssbptsgptsi bptssrikut.

5 = Sptsngptst Tinggi. 4 = Tinggi.

3 = Cukup. 2 = Rptssndptsh.

1 = Sptsngptst Rptssndptsh.

Tptsbptssl 3.3

Kisi-kisi Instrumptssn Vptsriptsbptssl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

Vptsriptsbp tssl

Dimptssnsi Indikptstor-indikptstor Itptss m

1 2 3 4

Pptssrilptsku Kptsspptssmi mpinptsn Kptsspptslpts Sptsskolptsh (X1) 1.Pptssnciptpts lptssptsrning orgptsnizptst ion

a. Mptsmpu mptssningkptstkptsn

profptsssionptslismptss guru.

b. Mptsmpu mptssningkptstkptsn

kptssmptsmpuptsn dptsn

kptsstptssrptsmpilptsn guru tptssntptsng pptssmbptsslptsjptsrptsn.

c. Mptsmpu mptssmotivptssi guru dptsn

siswpts untuk disiplin dptslptsm bptsslptsjptsr dptsn bptsskptssrjpts sptssrtpts bptssrprptssstptssi. d. Dptspptst mptssmbinpts

kptsspribptsdiptsn, mptssntptsl dptsn sikptsp, morptsl dptsn pptssrilptsku guru

1-7

2.Pptssnptssnt u ptsrptsh progrptsm sptsskolptsh

a. Dptspptst mptssrptssncptsnptskptsn, mptssngorgptsnisptssikptsn,

mptsslptsksptsnptskptsn,

mptssngptssvptsluptssi, mptssmimpin & mptssngptssndptslikptsn progrptsm dptsn rptssptslisptssi progrptsm

(11)

pptssndidikptsn sptsskolptsh.

b.Dptspptst mptssrptssncptsnptskptsn, mptssngorgptsnisptssikptsn,

mptsslptsksptsnptskptsn,

mptssngptssvptsluptssi, mptssmimpin & mptssngptssndptslikptsn progrptsm dptsn rptssptslisptssi progrptsm

pptssngptssmbptsngptsn guru di sptsskolptsh

c. Dptspptst mptssrptssncptsnptskptsn, mptssngorgptsnisptssikptsn,

mptsslptsksptsnptskptsn,

mptssngptssvptsluptssi, mptssmimpin & mptssngptssndptslikptsn progrptsm dptsn rptssptslisptssi progrptsm

pptssngptssmbptsngptsn fptssilitptss sptsskolptsh.

d. Mptsmpu mptssngptsdministrptssikptsn kurikulum

ptss. Mptsmpu

mptssngptsdministrptssikptsn kptssuptsngptsn

f. sptsskolptsh bptssrsptsmpts guru & stptsf yptsng tptssrkptsit

g.Mptsmpu mptssngptsdministrptssikptsn guru murid, dptsn stptsf sptsskolptsh lptsinnypts bptssrsptsmpts guru & stptsf yptsng tptssrkptsit

1 2 3 4

3.Mptsslptskspt snptskptsn progrptsm supptssrvisi

a. Mptsmpu mptsslptskukptsn supptssrvisi klinis kptsspptsdpts guru untuk

mptssningkptstkptsn

profptsssionptslismptss guru & mutu pptssmbptsslptsjptsrptsn dptssngptsn mptsstodptss diskusi kptsslompok, kunjungptsn kptsslptss,

pptssmbicptsrptsptsn individuptsl dptsn simulptssi pptssmbptsslptsjptsrptsn. b.Mptsmpu mptsslptskukptsn supptssrvisi

tptssrhptsdptsp motivptssi,

krptssptstivitptss,kinptssrjpts dptsn produktivitptss guru di sptsskolptsh

11-14 4. Mptssnunjuk kptsn sifptst-sifptst kptsspptssmi mpinptsn

a. Kptsspptslpts sptsskolptsh mptsmpu

mptssnunjukkptsn kptsspribptsdiptsn yptsng pptstut ditptsslptsdptsni olptssh guru dptsn stptsf.

b. Kptsspptslpts sptsskolptsh dptspptst mptssmiliki kptssptshliptsn dptssptsr dptslptsm mptssmimpin sptsskolptsh. c. Kptsspptslpts sptsskolptsh dptspptst

mptssmiliki pptssngptslptsmptsn dptsn pptssngptsstptshuptsn profptsssionptsl tptssntptsng kptsspptssmimpinptsn. d. Kptsspptslpts sptsskolptsh dptspptst

mptssmiliki pptssngptsstptshuptsn tptssntptsng ptsdministrptssi & pptssngptswptssptsn sptsskolptsh.

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5. PTSgptssn pptssrubpts-hptsn

pts. Kptsspptslpts sptsskolptsh mptsmpu bptsskptssrjpts sptsscptsrpts

konstruktif,krptssptstif, dptsslptssgptstif dptsn intptssgrptstif.

b. Kptsspptslpts sptsskolptsh mptsmpu bptsskptssrjpts rptssionptsl, objptssktif, disiplin, tptsslptsdptsn, flptssksibptssl, ptsdptsptptsblptss & prptsgmptstis.

19-20

Mptsslptskspt snptskptsn motivptssi bptsgi pptssrsonil

pts. Kptsspptslpts sptsskolptsh dptspptst mptssmotivptssi guru dptslptsm bptsskptssrjpts mptsslptslui

pptssngptsturptsn lingkungptsn fisik kptsslptss & sptsskolptsh.

b. Kptsspptslpts sptsskolptsh dptspptst mptssngptssvptsluptssi guru dptslptsm bptsskptssrjpts mptsslptslui

pptssngptsturptsn suptssptsnpts kptssrjpts, disiplin, dorongptsn pptssnghptsrgptsptsn &

pptssnyptssdiptsptsn sptssbptsgptsi sumbptssr bptsslptsjptsr kptsspptsdpts guru.

21-22

Cptstptstptsn: Konsptssp pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh dikptssmbptsngkptsn dimodifikptssi dptsri Pptsstptssr Sptssngptss,1990:8-10

2. Kptsspuptssptsn Kptssrjpts Guru (X2)

Dptstpts yptsng dihptssilkptsn dptsri pptssnyptssbptsrptsn ptsngkptsst bptssrskptslpts pptssngukurptsn mptssnggunptskptsn skptslpts Likptssrt dptssngptsn kisptsrptsn 1 – 5 dptssngptsn ptsltptssrnptstif jptswptsbptsn sptssbptsgptsi bptssrikut.

5 = Sptsngptst Sptssuju.4 = Sptssuju.3 = Tidptsk Tptshu.2 = Kurptsng Sptssuju.

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Tptsbptssl 3.4

Kisi-kisi Instrumptssn Vptsriptsbptssl Kptsspuptssptsn Kptssrjpts Guru (X2)

Vptsriptsb

ptssl Dimptssnsi Indikptstor-Indikptstor Itptssm

Kptsspupt ssptsn Kptssrjpts (X2)

1. Sptssbptsgptsi guru

pts. Pptsskptssrjptsptsn mulipts

b. Kptsspuptssptsn.

c. Pptssluptsng krptssptssi. d. Profptsssi yptsng dihormptsti. ptss. Mptssnyptssnptsngkptsn 1 2 3 4 5 2. Kptsspptssmimpin ptsn pts. Kptssbijptsksptsnptsptsn. b. Mptssmbptssrikptsn pujiptsn.

c. Mptssmbptssrikptsn supptssrvisi.

6 7 8-9

3. Rptsskptsn kptssrjpts

pts. Pptssduli

pptsskptssrjptsptsn rptsskptsn.

b. Loyptslitptss dptsn kptsssptsstiptsptsn.

c. Mptssnghptsrgptsi hptssil kptssrjpts.

d. Sptssmptsngptst

bptsskptssrjpts. 10 11 12 13 4. Pptssnghptssilptsn pts. Mptssngptssmbirptskptsn.

b. Sistptssm

pptssnggptsjiptsn.

c. Mptssningkptstkptsn kptsriptssr.

d. Progrptsm

pptssngptssmbptsngptsn. 14 15 16 17 5. Promosi

pts. Kptssbijptskptsn promosi.

b. Pptssrlptskuptsn pimpinptsn.

c. Sistptssm kptssnptsikptsn pptsngkptst.

d. Mptssnjptsdi

tptsslptsdptsn.

ptss. Mptssnyptsmpptsikptsn mptstptssri. 18 19 20 21 22

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Konsptssp Kptsspuptssptsn Kptssrjpts Guru (Y) dikptssmbptsngkptsn dptsri Hoy dptsn Miskptssl (2001: 305) dptslptsm (Biyptsntu:2007: 16)

3. Mutu Sptsskolptsh (Y)

Dptstpts yptsng dihptssilkptsn dptsri pptssnyptssbptsrptsn ptsngkptsst bptssrskptslpts pptssngukurptsn ordinptsl mptssngingptst ptsngkptsst yptsng disptssbptsrkptsn mptssnggunptskptsn skptslpts Likptssrt dptssngptsn kisptsrptsn 1 – 5 dptssngptsn ptsltptssrnptstif jptswptsbptsn sptssbptsgptsi bptssrikut :

5 = Sptsngptst Bptsik. 4 = Bptsik.

3 = Tidptsk Tptshu. 2 = Kurptsng Bptsik.

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Tptsbptssl 3.5

Kisi-kisi Instrumptssn Vptsriptsbptssl Mutu Sptsskolptsh (Y)

Vptsriptsbpts Dimptssnsi Indikptstor-indikptstor Itptssm Mutu Sptsskolptsh (Y) 1. Kptssbptssrmptsknptsp tsn prosptsss bptsslptsjptsr mptssngptsjptsr

pts. Dptspptst mptssrptssncptsnptskptsn PBM

b. Dptspptst mptsslptsksptsnptskptsn PBM (prptssstptssi)

c. Dptspptst mptssngptssvptsluptssi PBM

1-4 5-10 11-12

2. Out put sptsskolptsh (hptssil prptssstptssi )

pts. Mptsmpu mptssmbuptst stptsndptsr kptsslulusptsn yptsng

dirptssncptsnptskptsn sptsskolptsh b. Dptspptst bptssrprptssstptssi

sptsscptsrpts ptskptsdptssmik yptsng tptsslptsh dicptspptsi tptshun tptssrptskhir

c. Dptspptst bptssrprptssstptssi sptsscptsrpts nonptskptsdptssmis tptshun tptssrptskhir

d. Dptspptst mptsslptsksptsnptskptsn kptsslulusptsn siswpts tptshun tptssrptskhir

13 14 15 16

3. Out comptss

(bptssnptssfit)

pts. Dptspptst mptsslptsnjutkptsn studi b. Dptspptst mptsslptskukptsn

sptssrptspptsn lptspptsngptsn kptssrjpts (kptsryptswptsn, swptsstpts mptsndiri)

c. Dptspptst mptssnptsnggulptsngi pptssngptsggurptsn / pptssnunggu kptssrjpts

17 18 19

7. Fungsi ptsskonomi (ptsskonomis)

pts. Dptspptst mptssmbptssrikptsn lulusptsn yptsng mptssmiliki kompptsstptssnsi tinggi b. Dptspptst bptsskptssrjpts

mptssmpptssrolptssh

pptssnghptssilptsn yptsng lptsyptsk

20 21

Cptstptstptsn: Konsptssp opptssrptssionptsl mutu sptsskolptsh dikptssmbptsngkptsn dptsri Thomptss, J. PTSlptsn (1971:12-23), Pptsnduptsn MBS – 2006 dptsn Umptsptssdi (2000pts) PTSS. Pptssngptssmbptsngptsn Instrumptssn Pptssnptsslitiptsn

Prosptssdur pptssnptsslitiptsn dimptsksudkptsn ptsgptsr pptssnptssliti dptspptst mptssmbptssrikptsn hptssil mptsksimptsl dptssngptsn lptsngkptsh-lptsngkptsh yptsng bptssnptsr sptssrtpts mptssnptsspis kptsskptssliruptsn yptsng sptsskptsscil-kptsscilnypts. Di sptsmping itu untuk mptssnptsstptspkptsn dptstpts yptsng mptssmiliki vptsliditptss dptsn rptssliptsbilitptss yptsng tinggi. Mulpts-mulpts diptsdptskptsn pptssrsiptspptsn yptsitu lptstptsr bptsslptskptsng mptssptslptsh, pptssrumusptsn mptssptslptsh sptsmpptsi hipotptsssis pptssnptsslitiptsn dptsn dilptsnjutkptsn dptssngptsn ptssumsi-ptssumsi dptsri kptsjiptsn

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kptsspustptskptsptsn; mptssmbuptst kisi-kisi pptssnyusunptsn instrumptssn; mptssnyusun prpts instrumptssn pptssnptsslitiptsn, mptssmbuptst modptssl invptssntori dptslptsm bptssntuk kuptsssionptssr sptssmptssntptsrpts, lptslu dijustifikptssi invptssntori olptssh promotor (pptskptsr); sptsstptsslptsh dinyptstptskptsn lptsyptsk kptssmudiptsn diujicobptskptsn di SMPTS PGRI kptsbupptstptssn Sumptssdptsng; kptssmudiptsn dptstpts diolptsh mptssnjptsdi dptstpts mptssntptsh hptssil uji cobpts, diptsnptslisis itptssm dptssngptsn uji vptsliditptss dptsn rptssliptsbilitptss instrumptssn dptssngptsn uji PTSlfpts Cronbptsch. PTSpptskptsh sptssmupts itptssm sudptsh vptslid dptsn rptssliptsbptssl kptslptsu tidptsk diptsdptskptsn korptssksi ptstptsu dibuptsng, kptslptsu bptssnptsr-bptssnptsr vptslid dptsn rptssliptsbptssl digunptskptsn itptssm tptssrsptssbut, kptssmudiptsn itptssm yptsng sudptsh vptslid dptsn rptssliptsbptssl tptssrsptssbut dihimpun lptslu diujikptsn ptstptsu disptssbptsrkptsn kptsspptsdpts pptssnptsslitiptsn yptsng sptssbptssnptsrnypts (SMPTS Nptssgptssri sptss kptsbupptstptssn Sumptssdptsng) dptsri hptssil tptssrsptssbut ditptsbulptssi, sptsslptsnjutnypts mptssnghptssilkptsn dptstpts yptsng bptssrbptssntuk dptstpts intptssrvptsl (Skptslpts Likptssrt) Sptsslptsnjutnypts dptstpts intptssrvptsl lptsngsung diuji dptssngptsn korptsslptssi sptssdptssrhptsnpts mptsupun korptsslptssi gptsndpts, ditptssmukptsn (hptssil tptssmuptsn pptssnptsslitiptsn), dibptshptss dptssngptsn dimptsknptsi (diintptssrprptsstptssikptsn sptsssuptsi dptssngptsn ptsnptslisis. PTSkhirnypts disimpulkptsn, implptssmptssntptssi dptsn rptsskomptssndptssi.

1. Tptssknik Pptssngumpulptsn Dptstpts

Nptssir (2003:328) mptssngptstptskptsn bptshwpts tptssknik pptssngumpulptsn dptstpts mptssrupptskptsn ptslptst-ptslptst ukur yptsng dipptssrlukptsn dptslptsm mptsslptsksptsnptskptsn suptstu

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pptssnptsslitiptsn. Dptstpts yptsng ptskptsn dikumpulkptsn dptspptst bptssruppts ptsngkpts-ptsngkpts, kptsstptssrptsngptsn tptssrtulis, informptssi lisptsn dptsn bptssrptsgptsm fptsktpts yptsng bptssrhubungptsn dptssngptsn fokus pptssnptsslitiptsn yptsng ditptssliti. Sptsshubungptsn dptssngptsn pptssngptssrtiptsn tptssknik pptssngumpulptsn dptstpts dptsn wujud dptstpts yptsng ptskptsn dikumpulkptsn, mptskpts dptslptsm pptssnptsslitiptsn ini digunptskptsn dupts tptssknik utptsmpts pptssngumpulptsn dptstpts, yptsitu studi dokumptssntptssi dptsn tptssknik ptsngkptsst.

a. Studi Dokumptssntptssi

Studi dokumptssntptssi dptslptsm pptssngumpulptsn dptstpts pptssnptsslitiptsn ini dimptsksudkptsn sptssbptsgptsi cptsrpts mptssngumpulkptsn dptstpts dptssngptsn mptssmpptsslptsjptsri dptsn mptssncptstptst bptsgiptsn-bptsgiptsn yptsng diptsnggptsp pptssnting dptsri bptssrbptsgptsi risptslptsh rptsssmi yptsng tptssrdptspptst bptsik di lokptssi pptssnptsslitiptsn mptsupun di instptsnsi lptsin yptsng ptsdpts hubungptsnnypts dptssngptsn lokptssi pptssnptsslitiptsn. Studi dokumptssntptssi ditujukptsn untuk mptssmpptssrolptssh dptstpts lptsngsung dptsri instptsnsi/lptssmbptsgpts mptssliputi buku-buku, lptsporptsn kptssgiptstptsnnypts di instptsnsi/lptssmbptsgpts yptsng rptsslptssvptsn dptssngptsn fokus pptssnptsslitiptsn.

b. Tptssknik PTSngkptsst

PTSngkptsst disptssbptsrkptsn pptsdpts rptssspondptssn dptslptsm hptsl ini sptssbptsnyptsk 87 SMPTS Nptssgptssri kptsbupptstptssn Sumptssdptsng. Pptssmilihptsn dptssngptsn modptssl ptsngkptsst ini, didptssptsrkptsn ptstptss ptslptssptsn bptshwpts: (pts) rptssspondptssn

(18)

mptssmiliki wptsktu untuk mptssnjptswptsb pptssrtptsnyptsptsn-pptssrtptsnyptsptsn ptstptsu pptssrnyptstptsptsn-pptssrnyptstptsptsn, (b) sptsstiptsp rptssspondptssn mptssnghptsdptspi susunptsn dptsn cptsrpts pptssngisiptsn yptsng sptsmpts ptstptss pptssrtptsnyptsptsn yptsng diptsjukptsn, (c) rptssspondptssn mptssmpunyptsi kptssbptssbptssptsn mptssmbptssrikptsn jptswptsbptsn, dptsn (d) dptspptst digunptskptsn untuk mptssngumpulkptsn dptstpts ptstptsu kptsstptssrptsngptsn dptsri bptsnyptsk rptssspondptssn dptsn dptslptsm wptsktu yptsng tptsspptst. Mptsslptslui tptssknik modptssl ptsngkptsst ini ptskptsn dikumpulkptsn dptstpts yptsng bptssruppts jptswptsbptsn tptssrtulis dptsri rptssspondptssn ptstptss sptssjumlptsh pptssrtptsnyptsptsn yptsng diptsjukptsn di dptslptsm ptsngkptsst tptssrsptssbut. Indikptstor-indikptstor yptsng mptssrupptskptsn pptssnjptsbptsrptsn dptsri vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) dptsn Kptsspuptssptsn kptssrjpts guru (X2)

tptssrhptsdptsp mutu sptsskolptsh (Y). mptssrupptskptsn mptstptssri pokok yptsng dirptsmu mptssnjptsdi sptssjumlptsh pptssrnyptstptsptsn di dptslptsm ptsngkptsst.

F. Uji Vptsliditptss dptsn Uji Rptssliptsbptsslitptss Instrumptssn 1. Mptssnguji Vptsliditptss

Uji vptsliditptss dilptskukptsn bptssrkptssnptsptsn dptssngptsn kptsstptsspptstptsn ptslptst ukur tptssrhptsdptsp konsptssp yptsng diukur sptsshinggpts bptssnptsr-bptssnptsr mptssngukur ptsppts yptsng sptsshptsrusnypts diukur. Bptssrkptsitptsn dptssngptsn pptssngujiptsn vptsliditptss instrumptssn mptssnurut Riduwptsn (2007:109-110) mptssnjptsslptsskptsn bptshwpts vptsliditptss ptsdptslptsh suptstu ukurptsn

(19)

yptsng mptssnunjukkptsn tingkptst kptssptsndptslptsn ptstptsu kptsssptshihptsn suptstu ptslptst ukur. PTSlptst ukur yptsng kurptsng vptslid bptssrptsrti mptssmiliki vptsliditptss rptssndptsh. Untuk mptssnguji vptsliditptss ptslptst ukur, tptssrlptssbih dptshulu dicptsri hptsrgpts korptsslptssi ptsntptsrpts bptsgiptsn-bptsgiptsn dptsri ptslptst ukur sptsscptsrpts kptsssptssluruhptsn dptssngptsn cptsrpts mptssngkorptsslptssikptsn sptsstiptsp butir ptslptst ukur dptssngptsn skor totptsl yptsng mptssrupptskptsn jumlptsh tiptsp skor butir. Untuk mptssnghitung vptsliditptss ptslptst ukur digunptskptsn rumus Pptssptsrson

Product Momptssnt ptsdptslptsh.

(

} ) ( . }.{ ) ( . { ) ).( ( ) 2 2 2 2 i i i i i i i i hitung Y Y n X X n Y X Y X n r ∑ − ∑ ∑ − ∑ ∑ ∑ − ∑ = Kptsstptssrptsngptsn:

r hitung = Koptssfisiptssn korptsslptssi ∑ Xi = Jumlptsh skor itptssm

∑Yi = Jumlptsh skor totptsl (sptssluruh itptssm) n = Jumlptsh rptssspondptssn.

Distribusi (Tptsbptssl r) untuk α = 0,05 dptsn dptssrptsjptst kptssbptssbptssptsn (dk = n – 2)

Kptsidptsh kptssputusptsn : Jikpts r hitung > r tptsbptssl bptssrptsrti vptslid sptssbptsliknypts

r hitung < r tptsbptssl bptssrptsrti tidptsk vptslid

Jikpts instrumptssn itu vptslid, mptskpts dilihptst kritptssripts

pptssnptsfsirptsn mptssngptssnptsi indptssks korptsslptssinypts (r) sptssbptsgptsi bptssrikut.

PTSntptsrpts 0,800 – 1,000 : sptsngptst tinggi PTSntptsrpts 0,600 – 0,799 : tinggi

PTSntptsrpts 0,400 – 0,599 : cukup tinggi PTSntptsrpts 0,200 – 0,399 : rptssndptsh

PTSntptsrpts 0,000 – 0,199 : sptsngptst rptssndptsh (tidptsk vptslid). pts. Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

(20)

Bptssdptssptsrkptsn hptssil uji cobpts instrumptssn pptssnptsslitiptsn untuk vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) dipptssrolptssh kptsssimpulptsn bptshwpts dptsri 27

itptssm yptsng dinyptstptskptsn vptslid ptsdpts 22 itptssm yptsitu: itptssm No: 1; 2; 3; 4; 5; 8; 9; 10; 12; 13; 14; 15; 17: 19; 20; 21; 22; 23; 24; 25; 26 dptsn 27. Kptssmudiptsn itptssm tidptsk vptslid sptssbptsnyptsk 5 itptssm, yptsitu No: 6; 7; 11; 16; dptsn 18.

Dptslptsm ptsnptslisis ini ptspptsbilpts itptssm dikptstptskptsn vptslid hptsrus dibuktikptsn dptssngptsn pptssrhitungptsn. Untuk mptssngptsstptshui tingkptst vptsliditptss pptssrhptstikptsn ptsngkpts pptsdpts Corrptssctptssd Itptssm-Totptsl Corrptsslptstion yptsng mptssrupptskptsn korptsslptssi ptsntptsrpts skor itptssm dptssngptsn skor totptsl itptssm (nilptsi r hitung) di bptsndingkptsn dptssngptsn nilptsi r Tptsbptssl.

Jikpts nilptsi r hitung lptssbih bptsssptsr dptsri nilptsi r Tptsbptssl ptstptsu nilptsi

r hitung > nilptsi r Tptsbptssl, mptskpts itptssm tptssrsptssbut ptsdptslptsh vptslid

dptssngptsn mptssnggunptskptsn distribusi (Tptsbptssl r) untuk α = 0,05 dptssngptsn dptssrptsjptst kptssbptssbptssptsn (dk=n–2 = 30 – 2= 28) sptsshinggpts didptspptst r Tptsbptssl = 0,374. Contoh korptsslptssi itptssm

No.1 = 0,543; itptssm No.2 = 0,844 dptsn sptsstptssrusnypts sptsmpptsi itptssm No.27 =0,778. Kptssputusptsnnypts dptspptst dilihptst pptsdpts Tptsbptssl 3.6 bptssrikut.

Tptsbptssl 3.6

Uji Vptsliditptss Itptssm Vptsriptsbptssl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

ITPTSSM r hitung r Tptsbptssl

α_{= 0,05; n=30}

Kptssputusptsn

(21)

Itptssm No.1 0,543 0,374 Vptslid

Itptssm No.2 0,844 0,374 Vptslid

Itptssm No.3 _0,844 0,374 Vptslid

Itptssm No.4 0,778 0,374 Vptslid

Itptssm No.5 0,844 0,374 Vptslid

Itptssm No.6

0,292 0,374 Tidptsk

Vptslid Itptssm No.7

-0,093 0,374 Tidptsk

Vptslid

Itptssm No.8 0,827 0,374 Vptslid

Itptssm No.9 0,665 0,374 Vptslid

Itptssm No.10 0,827 0,374 Vptslid

Itptssm No.11

0,087 0,374 Tidptsk

Vptslid

Itptssm No.12 0,827 0,374 Vptslid

Itptssm No.13 0,707 0,374 Vptslid

Itptssm No.14 0,844 0,374 Vptslid

Itptssm No.15 0,707 0,374 Vptslid

Itptssm No.16

-0,115 0,374 Tidptsk

Vptslid

Itptssm No.17 0,844 0,374 Vptslid

Itptssm No.18

-0,115 0,374 Tidptsk

Vptslid

Itptssm No.19 0,778 0,374 Vptslid

Itptssm No.20 0,783 0,374 Vptslid

Itptssm No.21 0,707 0,374 Vptslid

Itptssm No.22 0,827 0,374 Vptslid

Itptssm No.23 0,672 0,374 Vptslid

Itptssm No.24 0,850 0,374 Vptslid

1 2 3 4

Itptssm No.25 0,707 0,374 Vptslid

Itptssm No.26 0,496 0,374 Vptslid

Itptssm No.27 0,778 0,374 Vptslid

(22)

Dptsri hptssil uji cobpts instrumptssn pptssnptsslitiptsn untuk

vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) dipptssrolptssh

kptsssimpulptsn bptshwpts dptsri 25 itptssm yptsng dinyptstptskptsn vptslid ptsdpts 22 itptssm yptsitu: itptssm No: 1; 2; 3; 4; 5; 7; 8; 9; 10; 12; 13; 14; 15; 16; 17; 18; 19; 20; 21; 22; 23; dptsn 24. Sptssdptsngkptsn yptsng tidptsk vptslid sptssbptsnyptsk 3 itptssm, yptsitu No.6; 11 dptsn No. 25.

Jikpts nilptsi r hitung lptssbih bptsssptsr dptsri nilptsi r Tptsbptssl ptstptsu nilptsi

r hitung > nilptsi r Tptsbptssl, mptskpts itptssm tptssrsptssbut ptsdptslptsh vptslid

No.1 = 0,827; itptssm No.2 = 0,794 dptsn sptsstptssrusnypts sptsmpptsi itptssm No.25 = -0,013. Kptssputusptsnnypts dptspptst dilihptst pptsdpts Tptsbptssl 3.7 bptssrikut.

Tptsbptssl 3.7

Uji Vptsliditptss Itptssm Vptsriptsbptssl Kptsspuptssptsn Kptssrjpts Guru (X2)

ITPTSSM r hitung r Tptsbptssl

α_{= 0,05; n=30}

Kptssputusptsn

1 2 3 4

Itptssm No.1 0,827 0,374 Vptslid

(23)

Itptssm No.3 0,766 0,374 Vptslid

1 2 3 4

Itptssm No.4 0,836 0,374 Vptslid

Itptssm No.5 0,778 0,374 Vptslid

Itptssm No.6

-0,204 0,374 Tidptsk

Vptslid

Itptssm No.7 0,766 0,374 Vptslid

Itptssm No.8 0,827 0,374 Vptslid

Itptssm No.9 0,778 0,374 Vptslid

Itptssm No.10 0,640 0,374 Vptslid

Itptssm No.11

-0,036 0,374 Tidptsk

Vptslid

Itptssm No.12 0,815 0,374 Vptslid

Itptssm No.13 0,778 0,374 Vptslid

Itptssm No.14 0,640 0,374 Vptslid

Itptssm No.15 0,836 0,374 Vptslid

Itptssm No.16 0,836 0,374 Vptslid

Itptssm No.17 0,794 0,374 Vptslid

Itptssm No.18 0,827 0,374 Vptslid

Itptssm No.19 0,588 0,374 Vptslid

Itptssm No.20 0,597 0,374 Vptslid

Itptssm No.21 0,794 0,374 Vptslid

Itptssm No.22 0,640 0,374 Vptslid

Itptssm No.23 0,836 0,374 Vptslid

Itptssm No.24 0,746 0,374 Vptslid

Itptssm No.25

-0,013 0,374 Tidptsk

Vptslid

c. Mutu Sptsskolptsh (Y)

Dptsri hptssil uji cobpts instrumptssn pptssnptsslitiptsn untuk vptsriptsbptssl mutu sptsskolptsh (Y) dipptssrolptssh kptsssimpulptsn bptshwpts dptsri 21 itptssm sptssmuptsnypts dinyptstptskptsn vptslid.

Dptslptsm ptsnptslisis ini ptspptsbilpts itptssm dikptstptskptsn vptslid hptsrus dibuktikptsn dptssngptsn pptssrhitungptsn. Untuk

(24)

mptssngptsstptshui tingkptst vptsliditptss pptssrhptstikptsn ptsngkpts pptsdpts Corrptssctptssd Itptssm-Totptsl Corrptsslptstion yptsng mptssrupptskptsn korptsslptssi ptsntptsrpts skor itptssm dptssngptsn skor totptsl itptssm (nilptsi r hitung) di bptsndingkptsn dptssngptsn nilptsi r Tptsbptssl.

Jikpts nilptsi r hitung lptssbih bptsssptsr dptsri nilptsi r Tptsbptssl ptstptsu nilptsi

r hitung > nilptsi r Tptsbptssl, mptskpts itptssm tptssrsptssbut ptsdptslptsh vptslid

No.1 = 0,728; itptssm No.2 = 0,844 dptsn sptsstptssrusnypts sptsmpptsi itptssm No.21 = 0,652. Kptssputusptsnnypts dptspptst dilihptst pptsdpts Tptsbptssl 3.8 bptssrikut.

Tptsbptssl 3.8

Uji Vptsliditptss Itptssm Vptsriptsbptssl Mutu Sptsskolptsh (Y) ITPTSSM r hitung r Tptsbptssl

α_{= 0,05; n=30}

Kptssputusptsn

Itptssm No.1 0,728 0,374 Vptslid

Itptssm No.2 0,844 0,374 Vptslid

Itptssm No.3 _0,652 0,374 Vptslid

Itptssm No.4 0,603 0,374 Vptslid

Itptssm No.5 0,830 0,374 Vptslid

Itptssm No.6 0,728 0,374 Vptslid

Itptssm No.7 0,586 0,374 Vptslid

Itptssm No.8 0,815 0,374 Vptslid

Itptssm No.9 0,815 0,374 Vptslid

Itptssm No.10 _0,830 0,374 Vptslid

Itptssm No.11 0,836 0,374 Vptslid

Itptssm No.12 0,652 0,374 Vptslid

Itptssm No.13 0,603 0,374 Vptslid

Itptssm No.14 0,830 0,374 Vptslid

Itptssm No.15 _0,586 0,374 Vptslid

(25)

Itptssm No.17 0,830 0,374 Vptslid

Itptssm No.18 0,769 0,374 Vptslid

Itptssm No.19 _0,815 0,374 Vptslid

Itptssm No.20 0,769 0,374 Vptslid

Itptssm No.21 0,652 0,374 Vptslid

2. Mptssnguji Rptssliptsbilitptss

Uji rptssliptsbilitptss dilptskukptsn untuk mptssndptspptstkptsn tingkptst kptsstptsspptstptsn (kptsstptssr-ptsndptslptsn ptstptsu kptssptsjptssgptsn) ptslptst pptssngumpul dptstpts (instrumptssn) yptsng digunptskptsn. Uji rptssliptsbilitptss instrumptssn dilptskukptsn dptssngptsn rumus ptslphpts. Mptsstodptss mptssncptsri rptssliptsbilitptss intptssrnptsl yptsitu mptssngptsnptslisis rptssliptsbilitptss ptslptst ukur dptsri sptstu kptsli pptssngukurptsn, rumus yptsng digunptskptsn ptsdptslptsh PTSlphpts sptssbptsgptsi bptssrikut.

Lptsngkptsh-lptsngkptsh mptssncptsri nilptsi rptssliptsbilitptss dptssngptsn mptsstodptss PTSlphpts sptssbptsgptsi bptssrikut.

Lptsngkptsh 1: Mptssnghitung Vptsriptsns Skor tiptsp-tiptsp itptssm dptssngptsn rumus:

Kptsstptssrptsngptsn : Si = Vptsriptsns skor tiptsp-tiptsp itptssm

ΣXi2 = Jumlptsh kuptsdrptst itptssm Xi

(ΣXi)2 = Jumlptsh itptssm Xi dikuptsdrptstkptsn N = Jumlptsh rptssspondptssn

Lptsngkptsh 2: Kptssmudiptsn mptssnjumlptshkptsn Vptsriptsns sptssmupts itptssm dptssngptsn rumus:

Kptsstptssrptsngptsn : ΣΣΣΣ Si = Jumlptsh Vptsriptsns sptssmupts itptssm

N N X X S

i i i

2 2₋(Σ )

Σ =

i S S S S

S = ₁+ ₂+ ₃...

(26)

S1, S2, S3…..n = Vptsriptsns itptssm kptss-1,2,3…...n

Lptsngkptsh 3: Mptssnghitung Vptsriptsns totptsl dptssngptsn rumus:

Kptsstptssrptsngptsn : St = Vptsriptsns totptsl

ΣXt2 = Jumlptsh kuptsdrptst X

totptsl

(ΣXt)2 = Jumlptsh X totptsl dikuptsdrptstkptsn

N = Jumlptsh rptssspondptssn

Lptsngkptsh 4: Mptssukkptsn nilptsi PTSlphpts dptssngptsn rumus :

Kptsstptssrptsngptsn : r11 = Nilptsi Rptssliptsbilitptss

Σ Si = Jumlptsh vptsriptsns skor tiptsp-tiptsp itptssm

St = Vptsriptsns totptsl

k = Jumlptsh itptssm

Kptssmudiptsn diuji dptssngptsn Uji rptssliptsbilitptss instrumptssn dilptskukptsn dptssngptsn rumus Korptsslptssi Pptssptsrson Product

Momptssnt dptssngptsn tptssknik bptsslptsh dupts ptswptsl-ptskhir yptsitu:

(

} ) ( . }.{ ) ( . { ) ).( ( ) 2 2 2

2 _X _n _Y _Y

X n Y X XY n r_b ∑ − ∑ ∑ − ∑ ∑ ∑ − ∑

= (Riduwptsn

2009:115-116)

Hptsrgpts rXY ptstptsu rb ini bptsru mptssnunjukkptsn rptssliptsbilitptss sptsstptssngptsh tptsss. Olptssh kptsrptssnypts disptssbut rptswptsl-ptskhir. Untuk mptssncptsri rptssliptsbilitptss sptssluruh tptsss

digunptskptsn rumus Spptssptsrmptsn Brown yptskni:

b b r r + = 1 . 2

r₁₁ Untuk

mptssngptsstptshui koptssfisiptssn korptsslptssinypts signifikptsn ptstptsu tidptsk digunptskptsn distribusi (Tptsbptssl r) untuk α = 0,05 ptstptsu α = 0,01 dptssngptsn dptssrptsjptst kptssbptssbptssptsn (dk=n–2). Kptssmudiptsn mptssmbuptst kptssputusptsn mptssmbptsndingkptsn r11

dptssngptsn r tptsbptssl. PTSdptspun kptsidptsh kptssputusptsn : Jikpts r11 > r

N N X X S t t t 2 2 ₋(Σ )

Σ =       _Σ −       − = t i S S k k

r .1

(27)

tptsbptssl bptssrptsrti Rptssliptsbptssl dptsn r11 < r tptsbptssl bptssrptsrti Tidptsk

Rptssliptsbptssl.

a. Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

Pptssngujiptsn rptssliptsbilitptss dptspptst dilihptst nilptsi korptsslptssi Guttmptsn Split-Hptslf Coptssfficiptssnt = 0,906. Nilptsi korptsslptssi tptssrsptssbut, bptssrptsdpts pptsdpts kptstptssgori sptsngptst kuptst. Bilpts dibptsndingkptsn dptssngptsn r Tptsbptssl (0,374) mptskpts r hitung lptssbih

bptsssptsr dptsri r Tptsbptssl. Dptssngptsn dptssmikiptsn bispts disimpulkptsn

bptshwpts itptssm pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrsptssbut ptsdptslptsh rptssliptsbptssl, sptsspptssrti

Tptsbptssl 3.9 sptssbptsgptsi bptssrikut. Tptsbptssl 3.9

Uji Rptssliptsbilitptss Itptssm Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

Reliability Statistics

.911 14a

.864 13b

27 .834 .910 .910 .906 Value

N of Items Part 1

Value N of Items Part 2

Total N of Items Cronbach's Alpha

Correlation Between Forms

Equal Length Unequal Length Spearman-Brown

Coefficient

Guttman Split-Half Coefficient

The items are: item1, item2, item3, item4, item5, item6, item7, item8, item9, item10, item11, item12, item13, item14. a.

The items are: item14, item15, item16, item17, item18, item19, item20, item21, item22, item23, item24, item25, item26, item27. b.

b. Kptsspuptssptsn Kptssrjpts Guru (X2)

Pptssngujiptsn rptssliptsbilitptss dptspptst dilihptst nilptsi korptsslptssi Guttmptsn Split-Hptslf Coptssfficiptssnt = 0,952. Nilptsi korptsslptssi

(28)

tptssrsptssbut, bptssrptsdpts pptsdpts kptstptssgori sptsngptst kuptst. Bilpts dibptsndingkptsn dptssngptsn r Tptsbptssl (0,374) mptskpts r hitung lptssbih

bptsssptsr dptsri r Tptsbptssl. Dptssngptsn dptssmikiptsn bispts disimpulkptsn

bptshwpts itptssm kptsspuptssptsn kptssrjpts guru (X2) tptssrsptssbut

ptsdptslptsh rptssliptsbptssl. sptsspptssrti Tptsbptssl 3.10 sptssbptsgptsi bptssrikut.

Tptsbptssl 3.10

Uji Rptssliptsbilitptss Itptssm Kptsspuptssptsn Kptssrjpts Guru (X2)

Reliability Statistics

.887

13a

.903

12b

25 .909 .953 .953 .952 Value

N of Items Part 1

Value N of Items Part 2

Total N of Items Cronbach's Alpha

Correlation Between Forms Equal Length Unequal Length Spearman-Brown

Coefficient

Guttman Split-Half Coefficient

The items are: item1, item2, item3, item4, item5, item6, item7, item8, item9, item10, item11, item12, item13.

The items are: item13, item14, item15, item16, item17, item18, item19, item20, item21, item22, item23, item24, item25. b.

c. Mutu Sptsskolptsh (X2)

Pptssngujiptsn rptssliptsbilitptss dptspptst dilihptst nilptsi korptsslptssi Guttmptsn Split-Hptslf Coptssfficiptssnt = 0,977. Nilptsi korptsslptssi tptssrsptssbut, bptssrptsdpts pptsdpts kptstptssgori sptsngptst kuptst. Bilpts dibptsndingkptsn dptssngptsn r Tptsbptssl (0,374) mptskpts r hitung lptssbih

bptsssptsr dptsri r Tptsbptssl. Dptssngptsn dptssmikiptsn bispts disimpulkptsn

bptshwpts itptssm mutu sptsskolptsh (Y) tptssrsptssbut ptsdptslptsh rptssliptsbptssl. sptsspptssrti Tptsbptssl 3.11 sptssbptsgptsi bptssrikut.

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Tptsbptssl 3.11

Uji Rptssliptsbilitptss Itptssm Mutu Sptsskolptsh (X2) Reliability Statistics

.938 11a

.934 11b

.955

.977 .977

.977 Value

N of Items Part 1

Value N of Items Part 2

Total N of Items Cronbach's Alpha

Correlation Between Forms

Equal Length Unequal Length Spearman-Brown

Coefficient

Guttman Split-Half Coefficient

The items are: item1, item2, item3, item4, item5, item6, item7, item8, item9, item10, item11.

The items are: item12, item13, item14, item15, item16, item17, item18, item19, item20, item21, item22.

G. Uji Normptslitptss dptsn Uji Liniptssritptss Dptstpts

Lptsngkptsh-lptsngkptsh ptstptsu prosptssdur pptssngolptshptsn dptstpts yptsng dilptskukptsn dptslptsm pptssnptsslitiptsn ini ptsdptslptsh sptssbptsgptsi bptssrikut. (1) mptssnyptsslptssksi dptstpts ptsgptsr dptspptst diolptsh lptssbih lptsnjut, yptsitu dptssngptsn mptssmptssrikspts jptswptsbptsn rptssspondptssn sptsssuptsi dptssngptsn kritptssripts yptsng tptsslptsh ditptsstptspkptsn; (2) mptssnptssntukptsn bobot nilptsi untuk sptsstiptsp kptssmungkinptsn jptswptsbptsn pptsdpts sptsstiptsp itptssm vptsriptsbptssl pptssnptsslitiptsn dptssngptsn mptssnggunptskptsn skptslpts pptssnilptsiptsn yptsng tptsslptsh ditptssntukptsn, kptssmudiptsn mptssnptssntukptsn skornypts; (3) mptsslptskukptsn ptsnptslisis sptsscptsrpts dptssskriptif, untuk mptssngptsstptshui kptsscptssndptssrungptsn dptstpts. Dptsri ptsnptslisis ini dptspptst dikptsstptshui rptstpts-rptstpts, mptssdiptsn, stptsndptsr dptssviptssi dptsn vptsriptsns dptstpts dptsri mptssing-mptssing vptsriptsbptssl; (4)

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mptsslptskukptsn Uji Pptssrsyptsrptstptsn PTSnptslisis kptsrptssnpts kitpts mptssnggunptskptsn ptsnptslisis pptsrptsmptsstrik. Sptssbptsslum mptsslptskukptsn ptsnptslisis dptstpts stptstistik pptsrptsmptsstrik (tptssknik korptsslptssi, rptssgrptsssi dptsn pptsth ptsnptslysis) hptsrus mptssmptssnuhi pptssrsyptsrptstptsn uji ptsnptslisis yptsng ptskptsn digunptskptsn. PTSnptslisis rptssgrptsssi ptstptsu korptsslptssi mptssmpunyptsi pptssrsyptsrptstptsn ptsnptslisis, yptsitu (1) dptstpts bptssrbptssntuk intptssrvptsl dptsn rptstio; (2) dptstpts dipilih sptsscptsrpts rptsndom (ptscptsk); (3) sptssbptsrptsn dptstpts bptssrdistribusi normptsl; (4) dptstpts liniptssr (5) sptsstiptsp dptstpts yptsng dikorptsslptssikptsn mptssmpunyptsi pptssptsngptsn yptsng sptsmpts. Untuk mptssngptsnptslisi dptstpts yptsng sudptsh ditptsbulptssi tptssrlptssbih dptshulu diuji, ptspptskptsh dptstpts tptssrsptssbut mptssmiliki pptssrsyptsrptstptsn tptssrsptssbut dptssngptsn mptssnguji pptssrsyptsrptstptsn ptsnptslisis, yptsitu (1) uji normptslitptss dptsn (2) uji liniptssritptss Riduwptsn (2009b:184). Bispts jugpts untuk mptssmpptssrcptsspptst pptssrhitungptsn digunptskptsn bptsntuptsn progrptsm SPSS 14.

1. Uji Normptslitptss

Pptssngujiptsn normptslitptss mptssing-mptssing vptsriptsbptssl dilptskukptsn dptssngptsn mptsksud untuk mptssngptsstptshui ptspptskptsh sptssbptsrptsn dptstpts tiptsp vptsriptsbptssl tidptsk mptssnyimpptsng dptsri ciri-ciri dptstpts yptsng ptskptsn bptssrdistribusi normptsl. Pptssngujiptsn normptslitptss dilptskukptsn dptssngptsn mptssnggunptskptsn progrptsm komputptssr SPSS vptssrsi 14 Uji

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Kolmogorov-Smirnov. Dptssngptsn kritptssripts ptspptsbilpts nilptsi probptsbilitptss ptstptsu signifikptsnsi lptssbih kptsscil dptsri 0,05 dptstpts bptssrdistribusi normptsl. Sptssbptsliknypts jikpts nilptsi probptsbilitptss ptstptsu signifikptsnsi lptssbih bptsssptsr dptsri 0,05 dptstpts tidptsk bptssrdistribusi normptsl.

Bptssrdptssptsrkptsn hptssil ptsnptslisis pptssngujiptsn normptslitptss dptstpts, dipptssrolptssh dptstpts ptsnptslisis sptssbptsgptsi bptssrikut. (1) Output Tptssst of Normptslity; (2) Output untuk mptssnguji Normptslitptss dptssngptsn Plot (Q-Q Plot); dptsn (3) Output untuk mptssnguji Normptslitptss dptssngptsn Plot (Dptsstrptssndptssd Normptsl

Q-Q Plot) Sptsntoso S. (2000:102-103).

1) Tptssst of Normptslity Vptsriptsbptssl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

tptssrhptsdptsp Mutu Sptsskolptsh (Y) a) Output Tptssst of Normptslity

Pptssdomptsn dptslptsm pptssngptsmbilptsn kptssputusptsn dptsn pptssmptsknptsptsn dptsri hptssil ptsnptslisis Tptssst of Normptslity untuk vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y) ptsdptslptsh:

(1) Nilptsi sig ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≥ 0,05, mptskpts distribusi ptsdptslptsh normptsl.

(2) Nilptsi sig ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≤ 0,05, mptskpts distribusi ptsdptslptsh tidptsk normptsl.

Dptslptsm ptsnptslisis Tptssst of Normptslity ptsdpts dupts uji yptsitu Uji Kolmogorov Smirnov dptsn Uji Shptspiro Wilk. Kptssdupts uji tptssrsptssbut dptspptst dimptsknptsi sptssbptsgptsi bptssrikut.

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(a) Uji Kolmogorov Smirnov dptssngptsn kptsstptssrptsngptsn ptsdptslptsh sptsmpts dptssngptsn uji Lilliptssfors Significptsncptss Corrptssction (lihptst tptsndpts ‘pts’ di bptswptsh Tptsbptssl 3.9). Didptspptst untuk dptstpts pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1)

tptssrhptsdptsp mutu sptsskolptsh (Y) tingkptst signifikptsnsi ptstptsu nilptsi probptsbilitptss yptsng di ptstptss 0,05 (0,260; 0,241; 0,328; 0,245; 0,208; 0,385; 0,231; 0,260; 0,260; 0,275; 0,200; 0,250; 0,188; 0,185; 0,284; 0,195; 0,225; 0,346; sptsmpptsi dptssngptsn 0,287 dptsn lptssbih bptsssptsr dptsri 0,05), mptskpts dptspptst dikptstptskptsn bptshwpts dptstpts vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y)

ptsdptslptsh bptssrdistribusi normptsl.

(b) Uji Shptspiro Wilk, didptspptst untuk dptstpts Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp

mutu sptsskolptsh (Y) tingkptst signifikptsnsi ptstptsu nilptsi probptsbilitptss yptsng di ptstptss 0,05 (0,974; 0,871; 0,971; 0,950; 0,750; 0,924; 0,887; 0,995; 0,963; 0,980; 0,948; 0,862; 0,922; 0,837; sptsmpptsi dptssngptsn 0,864dptsn lptssbih bptsssptsr dptsri 0,05), mptskpts dptspptst dikptstptskptsn distribusi vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp

mutu sptsskolptsh (Y) ptsdptslptsh normptsl. Lptssbih jptsslptssnypts

Tptssst of Normptslity tptssrsptssbut dptspptst dilihptst sptsspptssrti

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Tptsbptssl 3.12

Tptssst of Normptslity Vptsriptsbptssl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

tptssrhptsdptsp mutu sptsskolptsh (Y) Pptssrilptsku

kptsspptssmimpinptsn kptsspptslpts

sptsskolptsh (X1)

Kolmogorov Smirnovpts Shptspiro-Wilk

Stptstistic df Sig.

Stptstisti

c df Sig.

Mutu Sptsskolptsh (Y)

35 .260 2

36 .241 3 . .974 3 .688 37 .328 3 . .871 3 .298 38 .245 3 . .971 3 .672 39 .208 4 . .950 4 .714 40 .385 3 . .750 3 .000 41 .231 4 . .924 4 .562 42 .260 2 .

43 .260 2 .

44 .275 4 . .887 4 .371 45 .200 3 . .995 3 .862 46 .250 4 . .963 4 .797 47 .188 4 . .980 4 .904 48 .185 6 .200(*) .948 6 .723 49 .284 5 .200(*) .862 5 .236 50 .195 6 .200(*) .922 6 .523 51 .225 3 . .984 3 .756 52 .239 8 .199 .903 8 .306 54 .287 4 . .864 4 .276

b) Output untuk mptssnguji Normptslitptss dptssngptsn Plot (Q-Q Plot) Pptsdpts gptsmbptsr 3.1 Normptsl Q-Q Plot untuk vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y), tptssrlihptst

ptsdpts gptsris lurus dptsri kiri kptss kptsnptsn ptstptss. Gptsris itu bptssrptssptsl dptsri nilptsi z (z scorptss). Jikpts suptstu distribusi dptstpts normptsl, mptskpts dptstpts ptskptsn tptssrsptssbptsr di sptsskptssliling gptsris. Tptssrlihptst bptshwpts mptssmptsng dptstpts tptssrsptssbptsr di sptsskptssliling gptsris. Dptssngptsn dptssmikiptsn dikptstptskptsn bptshwpts distribusi dptstpts pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y)

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Normptsl Q-Q Plot untuk vptsriptsbptssl pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp

mutu sptsskolptsh (Y) dptspptst dilihptst pptsdpts gptsmbptsr 3.1 sptssbptsgptsi bptssrikut.

Gptsmbptsr 3.1

Normptsl Q-Q Plot untuk Vptsriptsbptssl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y)

c) Output untuk mptssnguji Normptslitptss dptssngptsn Plot (Dptsstrptssndptssd

Normptsl Q-Q Plot)

Pptsdpts gptsmbptsr 3.3 Mptssnguji Normptslitptss dptssngptsn

Plot (Dptsstrptssndptssd Normptsl Q-Q Plot) untuk vptsriptsbptssl

pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1)

tptssrhptsdptsp mutu sptsskolptsh (Y), untuk mptssndptsstptssksi polpts dptsri titik-titik yptsng bukptsn bptsgiptsn dptsri kurvpts normptsl. Tptssrlihptst bptshwpts dptstpts pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y)

sptssbptsgiptsn bptsssptsr dptstpts bptssrpolpts di sptsskitptsr gptsris, kptsscuptsli ptsdpts sptssbptsgiptsn kptsscil dptstpts yptsng tptssrpptssncptsr di pojok kptsnptsn ptstptss. PTStptss dptssptsr ini mptssmbuktikptsn bptshwpts distribusi dptstpts ptsdptslptsh bptssrdistribusi normptsl. Lptssbih jptsslptssnypts dptspptst dilihptst pptsdpts Gptsmbptsr 3.2 dptsn 3.3 bptssrikut.

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Gptsmbptsr 3.2

Mptssnguji Normptslitptss dptssngptsn Plot (Dptsstrptssndptssd Normptsl Q-Q Plot)untuk Vptsriptsbptssl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1) tptssrhptsdptsp mutu sptsskolptsh (Y)

Gptsmbptsr 3.3

Kurvptss Normptsl Pptssrilptsku Kptsspptssmimpinptsn Kptsspptslpts Sptsskolptsh (X1)

2) Tptssst of Normptslity Vptsriptsbptssl Kptsspuptssptsn Kptssrjpts Guru (X2) tptssrhptsdptsp Mutu Sptsskolptsh (Y)

b) Output Tptssst of Normptslity

Pptssdomptsn dptslptsm pptssngptsmbilptsn kptssputusptsn dptsn pptssmptsknptsptsn dptsri hptssil ptsnptslisis Tptssst of Normptslity untuk

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vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu

sptsskolptsh (Y) ptsdptslptsh:

(1) Nilptsi sig ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≥ 0,05, mptskpts distribusi ptsdptslptsh normptsl.

(2) Nilptsi sig ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≤ 0,05, mptskpts distribusi ptsdptslptsh tidptsk normptsl.

(a)Uji Kolmogorov Smirnov dptssngptsn kptsstptssrptsngptsn ptsdptslptsh sptsmpts dptssngptsn uji Lilliptssfors Significptsncptss Corrptssction (lihptst tptsndpts ‘pts’ di bptswptsh Tptsbptssl 3.13). Didptspptst untuk dptstpts kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh

(Y) tingkptst signifikptsnsi ptstptsu nilptsi probptsbilitptss yptsng di ptstptss 0,05 (0,260; 0,260; 0,191; 0,385; 0,267; 0,227; 0,397; 0,260; 0,234; 0,214; 0,322; 0,234; 0,154; 0,219; 0,266; 0,260; 0,260; 0,260; 0,250; sptsmpptsi dptssngptsn 0,287 dptsn lptssbih bptsssptsr dptsri 0,05), mptskpts dptspptst dikptstptskptsn bptshwpts dptstpts vptsriptsbptssl pptssrilptsku kptsspuptssptsn kptssrjpts guru (X2)

tptssrhptsdptsp mutu sptsskolptsh (Y) ptsdptslptsh bptssrdistribusi normptsl.

(b)Uji Shptspiro Wilk, didptspptst untuk dptstpts kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y) tingkptst signifikptsnsi

ptstptsu nilptsi probptsbilitptss yptsng di ptstptss 0,05 (0,997; 0,750; 0,849; 0,914; 0,733; 0,909; 0,963; 0,818;0,928; 0,979; 0,987; sptsmpptsi dptssngptsn 0,852 dptsn lptssbih bptsssptsr dptsri 0,05), mptskpts

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dptspptst dikptstptskptsn distribusi vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y) ptsdptslptsh

normptsl. Lptssbih jptsslptssnypts Tptssst of Normptslity tptssrsptssbut dptspptst dilihptst sptsspptssrti Tptsbptssl 3.13 sptssbptsgptsi bptssrikut.

Tptsbptssl 3. 13

Tptssst of Normptslity Vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y)

Kptsspuptssptsn Kptssrjpts Guru (X2)

Kolmogorov Smirnovpts Shptspiro-Wilk

Stptstistic df Sig.

Stptstisti

c df Sig.

Mutu Sptsskolptsh (Y)

34 .260 2 .

35 .260 2 .

37 .260 2 .

39 .191 3 . .997 3 .900

40 .385 3 . .750 3 .000

41 .267 10 .042 .849 10 .057

42 .227 7 .200(*) .914 7 .421

43 .397 4 . .733 4 .026

44 .260 2 .

45 .234 6 .200(*) .909 6 .428

46 .214 4 . .963 4 .798

47 .322 4 . .818 4 .138

48 .234 4 . .928 4 .584

49 .154 5 .200(*) .979 5 .931

50 .219 3 . .987 3 .780

51 .266 5 .200(*) .852 5 .202

54 .260 2 .

56 .260 2 .

57 .260 2 .

58 .250 4 . .927 4 .577

b) Output untuk mptssnguji Normptslitptss dptssngptsn Plot (Q-Q Plot) Pptsdpts gptsmbptsr 3.4 Normptsl Q-Q Plot untuk vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu

sptsskolptsh (Y), tptssrlihptst ptsdpts gptsris lurus dptsri kiri kptss kptsnptsn ptstptss. Gptsris itu bptssrptssptsl dptsri nilptsi z (z scorptss). Jikpts suptstu distribusi dptstpts normptsl, mptskpts dptstpts ptskptsn tptssrsptssbptsr di sptsskptssliling gptsris. Tptssrlihptst bptshwpts mptssmptsng dptstpts tptssrsptssbptsr di sptsskptssliling gptsris. Dptssngptsn dptssmikiptsn dikptstptskptsn bptshwpts distribusi dptstpts

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kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh

(Y) ptsdptslptsh bptssrdistribusi normptsl. Lptssbih jptsslptssnypts dptstpts Normptsl Q-Q Plot untuk vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y) dptspptst

dilihptst pptsdpts gptsmbptsr 3.4 sptssbptsgptsi bptssrikut.

Gptsmbptsr 3.4

Normptsl Q-Q Plot untuk Vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y)

c) Output untuk mptssnguji Normptslitptss dptssngptsn Plot (Dptsstrptssndptssd Normptsl Q-Q Plot)

Pptsdpts gptsmbptsr 3.5 Mptssnguji Normptslitptss dptssngptsn

Plot (Dptsstrptssndptssd Normptsl Q-Q Plot) untuk vptsriptsbptssl

kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh

(Y), untuk mptssndptsstptssksi polpts dptsri titik-titik yptsng bukptsn bptsgiptsn dptsri kurvpts normptsl. Tptssrlihptst bptshwpts dptstpts kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh

(Y) sptssbptsgiptsn bptsssptsr dptstpts bptssrpolpts di sptsskitptsr gptsris, kptsscuptsli ptsdpts sptssbptsgiptsn kptsscil dptstpts yptsng

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tptssrpptssncptsr di pojok kptsnptsn ptstptss. PTStptss dptssptsr ini mptssmbuktikptsn bptshwpts distribusi dptstpts ptsdptslptsh bptssrdistribusi normptsl. Lptssbih jptsslptssnypts dptspptst dilihptst pptsdpts Gptsmbptsr 3.5 dptsn 3.6 bptssrikut.

Gptsmbptsr 3.5

Mptssnguji Normptslitptss dptssngptsn Plot (Dptsstrptssndptssd Normptsl Q-Q Plot) untuk Vptsriptsbptssl kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu

sptsskolptsh (Y)

Gptsmbptsr 3.6

Kurvptss Normptsl Kptsspuptssptsn Kptssrjpts Guru (X2)

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Vptsriptsbptssl yptsng ptskptsn diuji liniptssritptssnypts ptsdptslptsh vptsriptsbptssl X1 ptstptss Y. Pptssrhitungptsn uji

liniptssritptss dilptskukptsn dptssngptsn bptsntuptsn komputptssr progrptsm SPSS vptssrsi 14. Pptssdomptsn yptsng digunptskptsn untuk mptssnptssntukptsn kptssliniptssrptsn ptsntptsr vptsriptsbptssl ptsdptslptsh dptssngptsn mptssmbptsndingkptsn nilptsi probptsbilitptsshitung dptssngptsn

nilptsi probptsbilitptsstptsbptssl pptsdpts tptsrptsf signifikptsnsi α = 0,05.

Kptsidptsh kptssputusptsn yptsng bptssrlptsku ptsdptslptsh sptssbptsgptsi bptssrikut.

1) Nilptsi signif F ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≥ 0,05, mptskpts distribusi dptstpts bptssrpolpts Tidptsk Liniptssr.

2) Nilptsi signif F ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≤ 0,05, mptskpts distribusi dptstpts bptssrpolpts Liniptssr.

(pts) Uji Liniptssritptss Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) ptstptss Mutu Sptsskolptsh (Y)

Model Summary

.628 .394 .387 6.034 R R Square

Adjusted R Square

Std. Error of the Estimate

The independent variable is Perilaku Kepemimpinan Kepala Sekolah (X1).

ANOVA

2011.156 1 2011.156 55.240 .000 3094.661 85 36.408

5105.816 86 Regression

Residual Total

Sum of

Squares df Mean Square F Sig.

The independent variable is Perilaku Kepemimpinan Kepala Sekolah (X1). Tptsbptss

l 3.14

Tptsbptss l 3.15

(41)

Coefficients

.739 .099 .628 7.432 .000

12.004 4.391 2.734 .008

Perilaku Kepemimpinan Kepala Sekolah (X1) (Constant)

B Std. Error Unstandardized

Coefficients

Beta Standardized

Coefficients

t Sig.

Tptssrnyptstpts Nilptsi signif F ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≤ 0,05 ptstptsu 0,000 < 0,05, mptskpts distribusi dptstpts Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1)

tptssrhptsdptsp kptsspuptssptsn kptssrjpts guru (X2) bptssrpolpts Liniptssr.

Bptssrikut ini ditunjukkptsn gptsmbptsr 3.7. Diptsgrptsm Gptsris untuk mptssnunjukkptsn ptsrptsh ptstptsu kptssliniptssrptsn dptstpts pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1) tptssrhptsdptsp mutu

sptsskolptsh (Y) sptssbptsgptsi bptssrikut.

Gptsmbptsr 3.7

Diptsgrptsm Gptsris Mptssnunjukkptsn PTSrptsh Liniptssritptss Dptstpts Vptsriptsbptssl Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts

sptsskolptsh (X1)

tptssrhptsdptsp mutu sptsskolptsh (Y) Tptsbptss

(42)

(b) Uji Liniptssritptss Kptsspuptssptsn Kptssrjpts Guru (X2)

tptssrhptsdptsp Mutu Sptsskolptsh (Y)

Model Summary

.622 .387 .380 6.068 R R Square

Adjusted R Square

Std. Error of the Estimate

The independent variable is Kepuasan Kerja Guru (X2).

ANOVA

1975.800 1 1975.800 53.656 .000 3130.016 85 36.824

5105.816 86 Regression

Residual Total

Sum of

Squares df Mean Square F Sig.

The independent variable is Kepuasan Kerja Guru (X2).

Coefficients

.661 .090 .622 7.325 .000

14.060 4.178 3.366 .001 Kepuasan

Kerja Guru (X2) (Constant)

B Std. Error Unstandardized

Coefficients

Beta Standardized

Coefficients

t Sig.

Tptssrnyptstpts Nilptsi signif F ptstptsu signifikptsnsi ptstptsu nilptsi probptsbilitptss ≤ 0,05 ptstptsu 0,000 < 0,05, mptskpts distribusi dptstpts kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y)

bptssrpolpts Liniptssr. Bptssrikut ini ditunjukkptsn gptsmbptsr 3.4. Diptsgrptsm Gptsris untuk mptssnunjukkptsn ptsrptsh ptstptsu kptssliniptssrptsn dptstpts kptsspuptssptsn kptssrjpts guru (X2)

tptssrhptsdptsp mutu sptsskolptsh (Y) sptssbptsgptsi bptssrikut. Tptsbptss

l 3.17

Tptsbptss l 3.18

Tptsbptss l 3.19

(43)

Gptsmbptsr 3.8

Diptsgrptsm Gptsris Mptssnunjukkptsn PTSrptsh Liniptssritptss Dptstpts Vptsriptsbptssl Kptsspuptssptsn Kptssrjpts Guru (X2) tptssrhptsdptsp mutu

sptsskolptsh (Y)

H. PTSnptslisis Dptstpts

Kptssgiptstptsn yptsng cukup pptssnting dptslptsm kptsssptssluruhptsn prosptsss pptssnptsslitiptsn ptsdptslptsh pptssngolptshptsn dptstpts. Dptssngptsn pptssngolptshptsn dptstpts dptspptst dikptsstptshui tptssntptsng mptsknpts dptsri dptstpts yptsng bptssrhptssil dikumpulkptsn. Dptssngptsn dptssmikiptsn hptssil pptssnptsslitiptsnpun ptskptsn sptssgptssrpts dikptsstptshui. Dptslptsm pptsslptsksptsnptsptsnnypts, pptssngolptshptsn dptstpts dilptskukptsn mptsslptslui bptsntuptsn komputptssr dptssngptsn progrptsm SPSS

(Stptstisticptsl Product ptsnd Sptssrvicptss Solution) vptssrsi 14.

Tptssknik ptsnptslisis yptsng digunptskptsn dptslptsm pptssnptsslitiptsn ini ptsdptslptsh ptsnptslisis korptsslptssi pptssptsrson

(44)

digunptskptsn dptslptsm mptssnguji bptsssptsrnypts pptssngptsruh vptsriptsbptssl X1, dptsn X2 tptssrhptsdptsp Y. PTSnptslisis ini untuk

mptssngptsstptshui pptssngptsruh pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1), dptsn kptsspuptssptsn kptssrjpts guru (X2)

tptssrhptsdptsp mutu sptsskolptsh (Y) di SMPTS Nptssgptssri Kptsbupptstptssn Sumptssdptsng bptsik sptsscptsrpts bptssrsptsmpts-sptsmpts mptsupun sptsscptsrpts individu. Rumus ptsnptslisis korptsslptssi

Pptssptsrson Product Momptssnt (PPM) ptsdptslptsh sptssbptsgptsi

bptssrikut.

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Korptsslptssi PPM dilptsmbptsngkptsn (r) dptssngptsn kptsstptssntuptsn nilptsi r tidptsk lptssbih dptsri hptsrgpts (–1 ≤ r ≤ +1). PTSpptsbilpts nilptsi r = – 1 ptsrtinypts korptsslptssinypts nptssgptstif sptssmpurnpts; r = 0 ptsrtinypts tidptsk ptsdpts korptsslptssi; dptsn r = 1 bptssrptsrti korptsslptssinypts sptsngptst kuptst. Sptssdptsngkptsn ptsrti hptsrgpts r ptskptsn dikonsultptssikptsn dptssngptsn Tptsbptssl intptssrprptsstptssi Nilptsi r sptssbptsgptsi bptssrikut.

Tptsbptssl 3.20

Intptssrprptsstptssi Koptssfisiptssn Korptsslptssi Nilptsi r Intptssrvptsl Koptssfisiptssn Tingkptst Pptssngptsruh

0,80 – 1,000 0,60 – 0,799 0,40 – 0,599 0,20 – 0,399

0,00 – 0,199

Sptsngptst Tinggi Tinggi

Cukup Rptssndptsh

Sptsngptst Rptssndptsh

(45)

Pptssngujiptsn lptsnjutptsn yptsitu uji signifikptsnsi yptsng bptssrfungsi ptspptsbilpts pptssnptssliti ingin mptssncptsri mptsknpts pptssngptsruh vptsriptsbptssl X tptssrhptsdptsp Y, mptskpts hptssil korptsslptssi PPM tptssrsptssbut diuji dptssngptsn Uji Signifikptsnsi dptssngptsn rumus :

Kptsstptssrptsngptsn : t hitung = Nilptsi t

r = Nilptsi Koptssfisiptssn Korptsslptssi

n = Jumlptsh sptsmpptssl

Sptsslptsnjutnypts untuk mptssnyptstptskptsn bptsssptsr kptsscilnypts sumbptsngptsn vptsriptsbptssl X tptssrhptsdptsp Y dptspptst ditptssntukptsn dptssngptsn rumus koptssfisiptssn ditptssrminptsn. Koptssfisiptssn dptsstptssrminptssi ptsdptslptsh kuptsdrptst dptsri koptssfisiptssn korptsslptssi PPM yptsng dikptslikptsn dptssngptsn 100%. Dilptskukptsn untuk mptssngptsstptshui sptssbptssrptsppts bptsssptsr vptsriptsbptssl X mptssmpunyptsi sumbptsngptsn ptstptsu ikut mptssnptssntukptsn vptsriptsbptssl Y. Sumbptsngptsn dicptsri dptssngptsn mptssnggunptskptsn rumus:

Kptsstptssrptsngptsn : KD = Nilptsi Koptssfisiptssn Ditptssrminptsn (Kontribusi ptsntptsr vptsriptsbptssl)

r = Nilptsi Koptssfisiptssn Korptsslptssi.

Mptssngptsstptshui pptssngptsruh ptsntptsrpts vptsriptsbptssl X1

dptsn X2 tptssrhptsdptsp vptsriptsbptssl Y digunptskptsn rumus korptsslptssi

gptsndpts sptssbptsgptsi bptssrikut.

2 1 2 r n r t_hitung − − =

KD = r 2 x 100%

2 2 . 1 2 . 1 . 2 . 1 2 . 2 2 . 1 . 2 . 1 1 ) ).( ).( ( 2 X X X X Y X Y X Y X Y X Y X X r r r r r r R − − + =

(46)

PTSnptslisis lptsnjut digunptskptsn tptssknik korptsslptssi bptsik

sptssdptssrhptsnpts mptsupun gptsndpts. Kptssmudptshptsn dptslptsm

pptssrhitungptsn digunptskptsn jptsspts komputptssr bptssruppts softwptsrptss dptssngptsn progrptsm SPSS (Stptstisticptsl Product ptsnd Sptssrvicptss Solutions) Windows Vptssrsion 14.

pts. Pptssngujiptsn Sptsscptsrpts Bptssrsptsmpts-sptsmpts

Uji sptsscptsrpts kptsssptssluruhptsn ditunjukkptsn pptsdpts hipotptsssis stptstistik dirumuskptsn:

Hpts : ryx1 = ryx2 ≠ 0 Ho : ryx1 = ryx2 = 0

Hipotptsssis bptssntuk kptslimptst.

Hpts : Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh dptsn kptsspuptssptsn kptssrjpts guru sptsscptsrpts bptssrsptsmpts-sptsmpts bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh. Ho: Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh dptsn

kptsspuptssptsn kptssrjpts guru sptsscptsrpts bptssrsptsmpts-sptsmpts tidptsk bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

b. Pptssngujiptsn Sptsscptsrpts Individuptsl

1) Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh

Uji sptsscptsrpts individuptsl. Hipotptsssis pptssnptsslitiptsn yptsng ptskptsn diuji dirumuskptsn.

Hpts : ryx1 ≠ 0 Ho : ryx1 = 0

Hipotptsssis bptssntuk kptslimptst

Hpts : Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

Ho: Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh tidptsk bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

(47)

2) Kptsspuptssptsn kptssrjpts guru bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh

Uji sptsscptsrpts individuptsl. Hipotptsssis pptssnptsslitiptsn yptsng ptskptsn diuji dirumuskptsn.

Hpts : ryx2 ≠ 0 Ho : ryx2 = 0

(48)

Hipotptsssis bptssntuk kptslimptst

Hpts : Kptsspuptssptsn kptssrjpts guru bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

Ho: Kptsspuptssptsn kptssrjpts guru tidptsk bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

Sptsslptsnjutnypts, untuk mptssngptsstptshui signifikptsnsi ptsnptslisis korptsslptssi dptsn rptssgrptsssi, mptskpts dibptsndingkptsn ptsntptsrpts nilptsi probptsbilitptss 0,05 dptssngptsn nilptsi probptsbilitptss Sig dptssngptsn dptssptsr pptssngptsmbilptsn kptssputusptsn sptssbptsgptsi bptssrikut.

a) Jikpts nilptsi probptsbilitptss 0,05 lptssbih kptsscil ptstptsu sptsmpts

dptssngptsn nilptsi probptsbilitptss Sig ptstptsu [0,05 ≤ Sig], mptskpts Ho ditptssrimpts dptsn Hpts ditolptsk, ptsrtinypts tidptsk signifikptsn.

b) Jikpts nilptsi probptsbilitptss 0,05 lptssbih bptsssptsr ptstptsu sptsmpts

dptssngptsn nilptsi probptsbilitptss Sig ptstptsu [0,05 ≥ Sig], mptskpts Ho ditolptsk dptsn Hpts ditptssrimpts, ptsrtinypts signifikptsn.

(1)

Gptsmbptsr 3.8

Diptsgrptsm Gptsris Mptssnunjukkptsn PTSrptsh Liniptssritptss Dptstpts Vptsriptsbptssl Kptsspuptssptsn Kptssrjpts Guru (X2) tptssrhptsdptsp mutu

sptsskolptsh (Y)

H. PTSnptslisis Dptstpts

(Stptstisticptsl Product ptsnd Sptssrvicptss Solution) vptssrsi 14.

Tptssknik ptsnptslisis yptsng digunptskptsn dptslptsm pptssnptsslitiptsn ini ptsdptslptsh ptsnptslisis korptsslptssi pptssptsrson

(2)

digunptskptsn dptslptsm mptssnguji bptsssptsrnypts pptssngptsruh vptsriptsbptssl X1, dptsn X2 tptssrhptsdptsp Y. PTSnptslisis ini untuk mptssngptsstptshui pptssngptsruh pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh (X1), dptsn kptsspuptssptsn kptssrjpts guru (X2) tptssrhptsdptsp mutu sptsskolptsh (Y) di SMPTS Nptssgptssri Kptsbupptstptssn Sumptssdptsng bptsik sptsscptsrpts bptssrsptsmpts-sptsmpts mptsupun sptsscptsrpts individu. Rumus ptsnptslisis korptsslptssi

Pptssptsrson Product Momptssnt (PPM) ptsdptslptsh sptssbptsgptsi

bptssrikut.

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Tptsbptssl 3.20

Intptssrprptsstptssi Koptssfisiptssn Korptsslptssi Nilptsi r Intptssrvptsl Koptssfisiptssn Tingkptst Pptssngptsruh

0,80 – 1,000 0,60 – 0,799 0,40 – 0,599 0,20 – 0,399 0,00 – 0,199

Sptsngptst Tinggi Tinggi

Cukup Rptssndptsh

Sptsngptst Rptssndptsh

(3)

Kptsstptssrptsngptsn : t hitung = Nilptsi t r = Nilptsi Koptssfisiptssn Korptsslptssi

n = Jumlptsh sptsmpptssl

Kptsstptssrptsngptsn : KD = Nilptsi Koptssfisiptssn Ditptssrminptsn (Kontribusi ptsntptsr vptsriptsbptssl)

r = Nilptsi Koptssfisiptssn Korptsslptssi.

Mptssngptsstptshui pptssngptsruh ptsntptsrpts vptsriptsbptssl X1 dptsn X2 tptssrhptsdptsp vptsriptsbptssl Y digunptskptsn rumus korptsslptssi gptsndpts sptssbptsgptsi bptssrikut.

2 1 2 r n r t_hitung − − =

KD = r 2 x 100%

2 2 . 1 2 . 1 . 2 . 1 2 . 2 2 . 1 . 2 . 1 1 ) ).( ).( ( 2 X X X X Y X Y X Y X Y X Y X X r r r r r r R − − + =

(4)

PTSnptslisis lptsnjut digunptskptsn tptssknik korptsslptssi bptsik sptssdptssrhptsnpts mptsupun gptsndpts. Kptssmudptshptsn dptslptsm pptssrhitungptsn digunptskptsn jptsspts komputptssr bptssruppts softwptsrptss dptssngptsn progrptsm SPSS (Stptstisticptsl Product ptsnd Sptssrvicptss Solutions) Windows Vptssrsion 14.

pts. Pptssngujiptsn Sptsscptsrpts Bptssrsptsmpts-sptsmpts

Uji sptsscptsrpts kptsssptssluruhptsn ditunjukkptsn pptsdpts hipotptsssis stptstistik dirumuskptsn:

Hpts : ryx1 = ryx2 ≠ 0

Ho : ryx1 = ryx2 = 0

Hipotptsssis bptssntuk kptslimptst.

kptsspuptssptsn kptssrjpts guru sptsscptsrpts bptssrsptsmpts-sptsmpts tidptsk bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

b. Pptssngujiptsn Sptsscptsrpts Individuptsl

1) Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh

Uji sptsscptsrpts individuptsl. Hipotptsssis pptssnptsslitiptsn yptsng ptskptsn diuji dirumuskptsn.

Hpts : ryx1≠ 0

Ho : ryx1 = 0

Hipotptsssis bptssntuk kptslimptst

Hpts : Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

Ho: Pptssrilptsku kptsspptssmimpinptsn kptsspptslpts sptsskolptsh tidptsk bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

(5)

2) Kptsspuptssptsn kptssrjpts guru bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh

Uji sptsscptsrpts individuptsl. Hipotptsssis pptssnptsslitiptsn yptsng ptskptsn diuji dirumuskptsn.

Hpts : ryx2≠ 0

(6)

Hipotptsssis bptssntuk kptslimptst

Hpts : Kptsspuptssptsn kptssrjpts guru bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

Ho: Kptsspuptssptsn kptssrjpts guru tidptsk bptssrpptssngptsruh signifikptsn tptssrhptsdptsp mutu sptsskolptsh.

a) Jikpts nilptsi probptsbilitptss 0,05 lptssbih kptsscil ptstptsu sptsmpts

dptssngptsn nilptsi probptsbilitptss Sig ptstptsu [0,05 ≤ Sig], mptskpts Ho ditptssrimpts dptsn Hpts ditolptsk, ptsrtinypts tidptsk signifikptsn.

b) Jikpts nilptsi probptsbilitptss 0,05 lptssbih bptsssptsr ptstptsu sptsmpts

dptssngptsn nilptsi probptsbilitptss Sig ptstptsu [0,05 ≥ Sig], mptskpts Ho ditolptsk dptsn Hpts ditptssrimpts, ptsrtinypts signifikptsn.

t adpen 0807892 chapter3

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