phaladeepika - appendix 2

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 613 Language : Malayalam PHALADEEPIKA (INDIAN ASTROLOGY) APPENDIX - 2 STRENGTH OF PLANETS (contd..) AUTHOR MANTRESWARA

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Page 1: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 613

Language : Malayalam

PHALADEEPIKA (INDIAN ASTROLOGY)

APPENDIX - 2STRENGTH OF PLANETS

(contd..)

AUTHORMANTRESWARA

Page 2: Phaladeepika - appendix 2

^eZo]nI 614

A\p_‘w 2

jUv_ew : KWnXw

hnjbhnhcw

1. ss\k¿§nI_ew (Natural / Permanent Streangth)

2. ZnKv_ew (Directional Streangth)

3. ZrIv_ew (Aspect Streangth)

4. tNjvSm_ew (Motional Streangth)

5. ÿm\_ew (Positional Streangth)

(1) D®_ew

(2)k]vXh¿§P_ew

(3)HmPbp‹cmiywi_ew

(4)tI{μ_ew

(5)t{Z°mW_ew

6. Ime_ew (Temporal Streangth)

(1) \tXm∂X_ew

(2)]£_ew

. (3){Xn`mK_ew

(4)A_vZ_ew

(5)amk_ew

(6)hmc_ew

(7)tlmcm_ew

(8)Ab\_ew

(9)bp≤_ew

DZmlcWPmXIw:

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

{Klkv^pSw:

`mK˛Iebn¬ 55T˛31’ 50T˛49’ 5T˛42’ 48T 145T˛26’ 10T˛46’ 77T˛51’*ZimwiØn¬ 55.52T 50.82T 5.70T 48T 145.43T 10.77T 77.85T

*jUv_eKWnXØn\v ChnsS `mK˛Iebv°p ]Icw `mK, ZimwitØmsS,

D]tbmKn°p∂p.

Page 3: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 615

1 . ss\k¿§nI_ew{KlßfpsS kzm`mhnI_eamWv \nk¿§_ew. G‰hpw IqSpX¬ ss\k¿§nI_ew

kqcy\mWv. ( 1 cq] AYhm 60 jjvSywiw). kqcy≥, N{μ≥, ip{I≥ Kpcp, _p[≥, IpP≥

i\n F∂ {IaØn¬ CXp Ipd™p hcp∂p.

{Klw i\n IpP≥ _p[≥ hymgw ip{I≥ N{μ≥ kqcy≥

A\p]mXw 60$1/7 60$2/7 60$3/7 60$4/7 60$5/7 60$6/7 60$7/7

_ew 8.57 17.14 25.70 34.28 42.85 51.43 60

ss\k¿§nI_ew ÿncamWv. AXv F√m PmXIØnepw CXp t]meØs∂ hcpw.

DZmlcWPmXIØn¬ {KlßfpsS \nk¿§_ew:

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

_ew 60 51.43 17.14 25.70 34.28 42.85 8.57

2. ZnKv_ewPmXIØn¬ tI{μ`mhßfn¬ ÿnXn hcptºmƒ {Kl߃°p In´p∂ _eamWv

ZnKv_ew. X\n°p ]d™n´p≈ `mhØns‚ a≤y Øn¬ \n¬°ptºmƒ Hcp {KlØn\p 1

cq] AYhm 60 jjvSywiw ZnKv_eap≠v. ZnKv_eap≈ tcJmwiØns‚ 180T˛bn¬ _ew

iq\y ambncn°pw. CXn\nSbv°p≈ ÿnXnbpsS _ew ss{XcminIw sNbvXv (aq∂psIm≠p

lcn®v) ImWWw.

\mep ]SnIfnembn thWw Cu _ew ImWm≥.

1. {Kl߃°p ]q¿Æ_ew In´p∂ ÿm\w (`mha≤yw) ImWpI

2. AXn¬\n∂pw 180T Ipd®v 0 _ew In´p∂ ÿm\w ImWpI.

3. 0 _ew hcp∂ tcJmwiØn¬\n∂pw {Klkv̂ pSw Ipd®v hyXymkw ImWpI.

4. Cu hyXymksØ aq∂psIm≠p lcn°pI.

DZmlcWPmXIØnse `mha≤yw

tI{μ`mh߃ 1 7 10 4

AhnsS _eap≈ {Kl߃ _pKp a cIp Nip

DZm. `mha≤yw 343.30 163.30 252.01 72.01

1. Hmtcm {KlØn\pw _ew In´p∂ ÿm\߃

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥hymgw ip{I≥i\n

`mhw 10 4 10 1 1 4 7

`mha≤yw 252T-˛01 72T ˛01 ’ 252T˛01 ’ 343T˛30’ 343T˛30’ 72T˛01 ’ 163T˛30 ’(+) ˛ 360 * ˛ ˛ ˛ 360* 360*

BsI 252˛01 432.01 252˛01 343T˛30’ 343T˛30’ 432.01 523.30

*180T˛¬ Ipdhp≈nSØv 360 Iq´Ww

Page 4: Phaladeepika - appendix 2

^eZo]nI 616

2. ]qPyw _ew In´p∂ ÿm\߃

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

BsI 252˛01 432.01 252˛01 343T˛30 343T˛30 432.01 523.30

(˛˛) 180T- 1 80 T- 1 80T- 1 80T- 1 80T- 1 80T- 1 80T-

iq\yw_ew72T˛01 252T˛01 72T˛01 163T˛30 163T˛30 252T˛01 343T˛30

3. `mhkv^pShpw {Klkv^pShpw XΩnep≈ hyXymkw.

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

`mhkv^pSw72T 01 ’ 252T 01’ 72T 01’ 163T 30’ 163T 30’ 252T 01’ 343T 30 ’(˛̨ ){Klkv^pSw 55T 31 50T 49’ 5T 42’ 48T 145T 26’ 10T 46’ 77T 51

hyXymkw 16T 30 ’ 201T 12* 66T 19’ 115T 30’ 18T 5’ 241T 15* 265T79*

360* 360* 360*

˛̨ 201T˛12* ˛̨ 241T15 ˛̨ 265T 79*

16T.30 158T .48 66T .19 115T .30 18T .5 118T 45 94T 21

(*180T Un{Knbn¬ A[nIap≈ hyXymkw 360T˛¬\n∂pw Ipdbv°pWw.)

4. ZnIv _ew (hyXymkØns‚ aq∂nsem∂v )

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

hyXymkw 16T.30 158T .48 66T .19 115T .30 18T .5 118T 45 94T 21

aq∂nsem∂v 5T˛30’ 52T˛56’ 22T˛7’ 38T˛30’ 6T˛1’ 39T˛35’ 31T˛27’ZimwiØn¬ 5T .50 52T .93 22T .11 38T .50 6T 02 39.T 58 31.T 45

DZmlcWPmXIØnse {KlßfpsS ZnKv_ew (ZimwiØn¬) :

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

ZnIv _ew 5.50 52.93 22.11 38.50 6˛02 39.58 31.45

3. ZrIv_ew(1) ]q¿ÆZrjvSn : ]q¿ÆZrjvSn_ew ImWp∂ coXn

1. t\m°p∂ {KlØns‚ tcJmwiw t\m°s∏Sp∂ {KlØns‚

tcJmwiØn¬\n∂pw Ipd®v ZrjvSntI{μw ImWpI.

2. Cu ZrjvSntI{μw sh®v Xmsg sImSpØn´p≈ ]´nIbn¬\n∂pwZrjvSnaqeyw ImWpI.

CXmWv B {KlØns‚ ZrjvSn_ew

1. ZrjvSnaqeyw ImWp∂Xn\p≈ tS_nƒ:

t\m°p∂ {KlØn¬\n∂pw˛

(1) 0T ˛ 30T = ZrjvSn C√.

(2) 30T -̨ 60T = (ZrjvSn tI{μw ˛̨ 30)/2

(3) 60T ˛ 90T = (ZrjvSn tI {μw˛̨ 60) + 15

(4) 90T ˛ 120T = (120 ˛ ZrjvSn tI{μw)/2 + 30

(5) 120T ˛ 150T = 150 ˛̨ ZrjvSn tI{μw

(6) 150T ˛ 180T = (ZrjvSn tI{μw ˛̨ 150)

(7) 180T ˛ 300T = (300 ˛ ZrjvSn tI{μw)/2

(8) 300T ˛ 360T = ZrjvSn C√.

Page 5: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 617

2. ZrjvSn hym]vXn

{Kl߃°p 2 apX¬ 10 hsc `mhßfntebv°v (30T- -̨ \pw 300T ˛ \pw

CSbv°p≈ ÿetØbv°v) ZrjvSnbp≠v.

11, 12, 1 `mhßfntebv°v (300T-˛\pw 30T ˛\pw CSbv°p≈ ÿetØbv°v)

ZrjvSnbn√.

3. DZmlcWPmXIØnse ZrjvSntI{μßfpw ZrjvSnaqeyhpw

( * {Klkv^pSw ZrjvSntI{μtØ°mƒ Ipdhp≈nSØv 360 Iq´Ww..)

(1) kqcyZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\nbv°v

{Klkv̂ pSw ˛ 50.82T 5.70T 48T 145.43T 10.77T 77.85T

+ ˛ 360* 360* 360* ˛ 360* ˛

BsI = ˛ 410.82 365.70 408. - ˛ 370.77 ˛

(˛̨ ) kqcykv ˛ 55.52 55.52 55.52 55.52 55.52 55.52

(=) ZrjvSntI{μw ˛ 355.30 310.18 352.48 89.91 315.25 22.33

ZrjvSnaqeyw ˛ $ $ $ (3) $ $

CXn¬ hymgØn\p am{Xta kqcyZrjvSnbp≈q. Cu ZrjvSnbpsS aqeyw apIfnse

]´nIbn¬\n∂pw ImWWw. hymgØn\p In´p∂ kqcy ZrjvSnbpsS (89.91) aqeyw :

60T ˛ 90T = (ZrjvSn tI{μw˛̨ 60) + 15

ZrjvSn tI{μw = 89.91

60 Ipdbv°Ww ˛̨ 60

_m°n = 29.91

AXnt\mSp 15 Iq´Ww + 15 = 44.91T

hymgØn\p In´p∂ kqcyZrjvSnbpsS _ew= 44.91T.

kqcy≥ ]m]\mbXn\m¬ = (˛̨ ) 44.91T.

(2) N{μZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\n°v

{Klkv̂ pSw 55.52T .... 5.70 48T 145.43 10.77T 77.85T

˛ ˛ 360 360 ˛ 360 ˛

˛ ˛ 365.70 408 ˛ 370.77 ˛

N{μkv̂ pSw 50.82T .... 50.82T 50.82T 50.82T 50.82T 50.82T

ZrjvSntI{μw 4.70 .... 314.88 357.18 94.61 319.95 27.03

ZrjvSnaqeyw $ .... $ $ (4) $ $

N{μZrjvSn hymgØn\pam{Xw. ZrjvSnaqeyw ]´nIbnse (4) {]Imcw ImWWw.

90T ˛ 120T = (120 ˛ ZrjvSn tI{μw) /2 + 30

120 ˛̨ 94.61 = 25.39

25.39/2 = 12.70

Page 6: Phaladeepika - appendix 2

^eZo]nI 618

N{μZrjvSn (hymgØn\v) 12.70+ 30 = 42.70

N{μ≥ Cu PmXIØn¬ ]m]\mbXn\m¬ (˛̨ ) 42.70

((3) IpPZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\n°v

{Klkv̂ pSw 55.52T 50.82T ˛ 48T 145.43T 10.77T 77.85T

IpPkv̂ pSw 5.70 5.70 ˛ 5.70 5.70 5.70 5.70

ZrjvSntI{μw 49.82 45.12 .... 42.30 139.73 5.07 72.15

ZrjvSnaqeyw (2) (2) .... (2) (5) $ (3)

IpPZrjvSn (˛̨ )9.91 7.56 ˛̨ 6.15 10.27 ˛̨ 27.15

(4) _p[ZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\nbv°v

{Klkv̂ pSw 55.52T 50.82T 365.70T .... 145.43T 370.77T 77.85T

_p[kv̂ pSw 48T 48T 48T. ... 48T 48T 48T

ZrjvSntI{μw7.52 2.82 317.70 .... 97.43 322.77 29.85

ZrjvSnaqeyw $ $ $ .... (4) $ $

Kpcphn\v _p[ZrjvSn

_p[≥ Cu PmXIØn¬ ]m]\mbXn\m¬ ]m]ZrjvSn (˛̨ ) 41.58

(5) KpcpZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\nbv°v

{Klkv̂ pSw 415.52T 410.82T 365.70T 408T .... 370.77T 77.85T

Kpcpkv̂ pSw 145.43T 145.43T 145.43T 145.43T .... 145.43T 145.43T

ZrjvSntI{μw 270.09 265.39 220.27 262.57 ... 225.34 292.42

ZrjvSnaqeyw (7) (7) (7) (7) .... (7) (7)

ip`ZrjvSn 14.96 17.31 39.87 18.72 .... 37.33 3.79

(6) ip{IZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\nbv°v

{Klkv̂ pSw 5.52T 50.82T 365.70T 48T 145.43T .... 77.85T

ip{Ikv̂ pSw 10.77 10.77 10.77 10.77 10.77 .... 10.77

ZrjvSntI{μw 44.75 40.05 354.93 37.23 134.68 ... 67.08

ZrjvSnaqeyw (2) (2) $ (2) (5) ... (3)

ip`ZrjvSn .38 5.03 .... 3.62 15.32 ... 22.08

(7) i\nZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\nbv°v

{Klkv̂ pSw 415.52T 410.82T 365.70T 408T 145.43T 370.77 ....

i\nkv̂ pSw 77.85T 77.85T 77.85T 77.85T 77.85T 77.85T ....

ZrjvSntI{μw 337.67 332.97 287.85 330.15 67.58 292.92 ....

ZrjvSnaqeyw $ $ (7) $ (3) (7) ...

i\nZrjvSn(˛̨ )... ... 6.07 ... 22.58 3.54

Page 7: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 619

(2) hntiZrjvSn

{Klw hntijZrjvSn ZrIv_ew jjvSywiw

IpP≥ 4˛8, 1/4 15

Kpcp 5˛9, 1/2 30

i\n 3˛10 3/4 45

1) IpPs‚ hntijZrjvSn

4 8

90 ˛ 120 210 ˛ 240

IpPkv̂ pSw + 5.70 5.70 5.70 5.70

--95.70 125.70 215.70 ˛ 245.70

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

{Klkv̂ pSw: 55.52T 50.82T 5.70T 8.00T 145.43T 10.77T 77.85T

IpPZrjvSn ˛˛ ˛˛ ˛˛ ˛˛ ˛˛ ˛˛ ˛˛

Hcp {KlØns‚ kv^pShpw IpPs‚ ta¬∏d™ ho£W tImWØn¬ hcp∂n√

AXn\m¬ DZmlcWPmXIØn¬ Hcp {KlØn\pw IpPs‚ hntijZrjvSn C√.

2) KpcphntijZrjvSn

5 9

120 ˛ 150 240 ˛ 270

Kpcpkv̂ pSw + 145.43 145.43 145.43 145.43

265.43 295.43 385.43˛ 415.43

(25.43˛55.43)

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

{Klkv̂ pSw: 55.52T 50.82T 5.70T 48.00T 145.43T 10.77T 77.85T

hntijZrjvSn ̨ 30 ˛̨ 30 ˛̨ ˛̨ ˛̨

3) i\n hntijZrjvSn

3 10

60 ˛ 90 270˛300

aμkv^pSw + 77.85 77.85

137.85˛167.85 347.85˛377.85 (17.85)

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

Klkv̂ pSw 55.52T 50.82T 5.70T 48.00T .43T 10.77T 77.85T

\nZrjvSn ˛ ˛ 45 ˛ 45 45 ˛̨

3. ZrIv_ew kΩdn

1. ip`ZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\nbv°v

hymgw 14.96 17.31 39.87 18.71 .... 37.34 3.79

hntijZr ˛30 ˛ 30 ˛ ˛ ˛ -̨

ip{I≥ 7.38 5.02 ˛ 3.62 15.33 ˛ 22.09

ZrjvSn_ew 22.34 52.34 39.87 52.34 15.33 37.34 25.88

137

Page 8: Phaladeepika - appendix 2

^eZo]nI 620

2. ]m]ZrjvSn

kqcy\v N{μ\v IpP\v _p[\v hymg\v ip{I\v i\n°v

kqcy≥ ... .... .... .... 44.91 .... ....

N{μ≥ .... .... .... .... 42.70 .... ....

IpP≥ 9.91 7.56 .... 6.16 10.27 .... 27.15

_p[≥ .... .... .... .... 41.29 .... ....

i\n .... .... 6.07 .... 22.59 3.54 ˛

hntijZr .... .... 45 .... 45 45 ˛

ZrjvSn_ew ˛9.91 ˛7.56 ˛51.07 ˛6.16 ˛206.76 ˛ 48.54 ˛ 27.15

DZmlcWPmXIØnse ZrIv_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

ip`_ew (+) 22.34 52.34 39.87 52.34 15.33 37.34 25.88

]m]_ew (˛) 9.91 7.56 51.07 6.16 206.75 48.54 27.15

ZrjvSn]nfiw 12.43 44.78 - ˛̨ 11.20 46.18 ˛191.42 ˛11.20 1.27

Zr. _ew(1/4) 3.11 11.19 ˛̨ 2.80 11.55 ˛ 47.86 ˛2.80 ˛0.32

4. tNjvSm_ewIpP≥, _p[≥, hymgw, ip{I≥, i\n F∂o A©p Xmcm{Kl߃°p h{IKXnbn¬

In´p∂ _eamWv tNjvSm_ew. tNjvSm_ew ImWp∂Xn\v bYm¿∞kv^pSw, icmicnkv^pSw,

iot{Lm®w, tNjvSmtI{μw Ch BhiyamWv.

1. bYm¿∞kv^pSw.

DZmlcWPmXIØnse {Klkv^pSw

{Klkv^pSw: kqcy≥ ˛ IpP≥ _p[≥ hymgw ip{I≥ i\n

`mK˛Iebn¬ 55T˛31’ ˛ 5T˛42 ’ 48T 145T˛26 ’ 10T˛46 ’ 77T˛51’ZimwiØn¬ 55.52T ˛ 5.70T 48T 145.43T 10.77T 77.85T

2. icmicnkv^pSw

Hcp {KlØns‚ {]Z£nWhgn ]mfn®bn√mØXpw IrXyamb hrØmIrXnbnep≈

XpamsW∂ k¶¬∏Ønep≈XmWv icmicn kv^pSw. CXp ImWp∂Xn\p≈ Ffp∏Øn\v

]´nIIƒ e`yamWv. F∂m¬ ChbpsS ASnÿm\w D÷bn\n tcJmwiØn¬ (76T E), 1˛1˛1900

A¿≤cm{Xn kabamWv. AXpsIm≠v Cu ]´nIIfn¬\n∂pw P\\ØnbXnbnse

icmicnkv^pSw ImWp∂Xn\v BZyambn 1˛1˛1900 apX¬ P\\ØnbXnhsc Ign™pt]mb

Znhk߃ KWn s®Sp°Ww.

2 (1) 1˛1˛1900 apX¬ P\\kabwhsc

sN∂ Znhk߃ ImWp∂ hn[w:

DZmlcWPmXIØnse P\\w 10˛6˛1945 , 1˛36 F.Fw. BbXn\m¬ 1˛1˛1900

A¿≤cm{XnapX¬ 10˛6˛1945, 1˛36 F.Fw. hsc Ign™ kabamWv ImtW≠Xv.

(1) 1- ˛ 1 ˛ 1900 apX¬ 10 ˛ 6 ˛ 1945 hsc

138

Page 9: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 621

BsI sN∂ h¿j߃ (1945 ˛̨ 1900) ˛ 45

(2) 45 h¿jsØ Znhkw (45$ 365) = 16425 Znhk߃

(3.) A[nh¿jßfnse A[nIZnhk߃ = 12 Znhk߃

(4) 1˛1˛1945 apX--¬ 9˛6˛1945 hsc = 160 Znhk߃

(5) BsI ˛ 16597 Znhk߃

(6) A¿≤cm{XnapX¬ P\\w hscbp≈ kabw:

1945 Pq¨ 9˛mw XnbXn A¿≤cm{XnapX¬ P\\whsc sN∂Xv:

1 aWn°q¿ 36 an\n‰v. F∂m¬ ]´nIbnse icmicnkv^pSw D÷bn\n kabØn\mIbm¬,

C¥y≥ Ãm≥tU¿Uv kabhpw D÷bn\n kabhpw XΩnep≈hyXymkw A\pkcn®v Cu

kabsØ am‰Ww.

tcJmwiØnse Un{Knsb kabam°m≥: 1T = 4 an\n‰v

C¥y≥ kv‰m≥Um¿Uv kabØns‚ tcJmwiw 82T˛30’D÷bn\nkab.Øns‚ tcJmwiw 76T

hyXykw 6˛30’6T˛30’ s\ kabam°ptºmƒ 6˛30$ 4 26 an\n‰v

P\\kabamb 1 aWn°q¿ 36 an\n‰n¬\n∂pw 26an\n‰v Ipdbv°p tºmƒ 1 aWn 10

an\n‰v AYhm 70 an\n‰vv In´pw. CXns\ 24 aWn°q¿ (1440 an\n‰v) sIm≠p lcn®v Bhiyamb

Znhk`mKw ImWWw.

2 (2) icmicnkv^pSw ImWp∂Xn\p≈ ]´nIIƒ

h{Itam AXpaqeap≈ tNjvSm_etam Cs√¶nepw kqcys‚ icmicnkv^pSw ImWWw.

ImcWw AXmWv _p[ip{I∑-mcpsS icmicnkv^pShpw IpP≥ hymgw, i\n ChcpsS

iot{Lm®hpw.

icmicnkv^pSw : kqcy≥

1˛1˛1900˛se (0 aWn°q¿, 76o E) icmicnkqcykv^pSw: 257.4568T

bqWn‰v 100 1000 10000

1 0.9856 98.5602 265.6026 146.0265

2 1.9712 197.1205 71.2053 272.0531

3 2.9568 295.6808 76.8080 48.0796

4 3.9524 34.2411 342.4106 184.1062

5 4.9280 132.8013 248.0133 320.1327

6 5.9136 231.3616 153.6159 96.1593

7 6.8992 329.9218 59. 2186 232.1868

8 7.8848 68.4821 324.8212 8.2124

9 8.8704 167.0424 230.4239 144.2389

139

Page 10: Phaladeepika - appendix 2

^eZo]nI 622

DZmlcWPmXIØn¬ kqcys‚ icmicnkv^pSw

1˛1˛1900 se icmicnkv^pSw ˛ 257.4568

CXns‚IqsS 1˛1˛1900 apX¬ 9˛6˛1945 hsc bp≈ 16597 ZnhksØ am‰w tN¿°Ww.

257.4568

10000 146.0265

6000 153.6159

500 132.8013

90 88.704

7 6.8992

1a 10an 0.04791

BsI 785.55. CXn¬ D≈ 360TIƒ Ipdbv°ptºmƒ ˛̨ 720

= 65.55

DZmlcWPmXIØnse kqcy≥, _p[≥, ip{I≥ ChcpsS icmicn kv^pShpw

CXpXs∂. C\n IpP≥, Kpcp, i\nChcpsS icm icn kv^pSw ImWWw.

icmicnkv^pSw : IpP≥

-1˛1-˛1990 : icmicnkv^pSw: 270.22T

bqWn‰v 100 1000 10000

1 0.524 52.40 164.02 200.19

2 1.048 104.80 328.04 40.39

3 1.572 157.21 132.06 240.58

4 2.096 209.61 296.08 80.78

5 2.620 262.01 100.10 280.97

6 3.144 314.41 264.12 121.16

7 3.668 6.81 68.14 321.36

8 4.192 59.22 232.55 161.55

9 4.716 111.62 36.17 1.74

icmicnkv^pSw : Kpcp

icmicnkv^pSw (1˛1˛1900) : 220.04

bqWn‰v 10 100 1000 10000

1 .08 0.83 8.31 83.1 110.96

2 .17 1.66 16.62 166.19 221.96

3 .25 2.49 24.93 249.29 332.89

4 .33 3.32 33.24 332.39 83.85

5 .41 4.15 41.55 55.48 194.82

6 .50 4.99 49.86 138.58 305.78

7 .58 5.82 58.17 221.67 56.74

8 .66 6.65 66.58 304.77 167.71

9 .75 7.48 74.79 78.87 278.67

140

Page 11: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 623

icmicnkv^pSw : i\n

1˛1˛1900 icmicnkv^pSwn 236.74

bqWn‰v 10 100 1000 10000

1 .03 .33 3.34 33.44 334.39

2 .07 .67 6.59 66.88 308.79

3 .10 1.00 10.03 100.32 283.18

4 .13 1.34 13.38 133.76 257.57

5 .17 1.67 16.72 167.20 231.97

6 .20 2.01 20.06 200.64 206.36

7 .23 2.34 23.41 234.08 180.75

8 .27 2.68 26.75 267.51 155.14

9 .30 3.01 30.10 300.95 129.54

DZmlcWPmXIØn¬ {KlßfpsS icmicnkv^pSw:

{Klw kqcy≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

kv^pSw

ZimwiØn¬ 55.52T 5.70T 48T 145.43T 10.77T 77.85T

1˛1˛1990˛¬ ˛ 270.22 ˛ 220.04 ˛ 236.74

1˛1˛1990\p tijw (16597 ZnhkØn\)v

10000 ˛ 200.19 ˛ 110.96 ˛ 334.39

6000 ˛ 264.12 ˛ 138.58 ˛ 200.64

500 ˛ 262.01 ˛ 41.55 ˛ 16.72

90 ˛ 47.16 ˛ 7.48 ˛ 3.01

7 ˛ 3.66 ˛ 0.58 ˛ 0.23

1a 10an ˛ 0.02 ˛ 0.00 ˛ 0.00

BsI ˛ 1047.39 ˛ 519.19 ˛ 791.73

Id£≥* ˛ ˛̨ ˛ (˛̨ )3.63 -̨ (+)5.04

_m°n ˛ 1047.39 ˛ 515.56 ˛ 796.77

˛-˛360/720 720 ˛ 360 ˛ 720

icmicn/ 65.55 327.39 65.55 155.56 65.55 76.77

Id£≥ *

kqcy≥ IpP≥ ˛ hymgw ˛ i\n

1˛1˛1900 ˛ ˛ -̨ -˛̨ 3.33 ˛ +5

1˛1˛1900 apX¬ ˛ ˛ ˛ .0067 ˛ 001

P\\h¿jwhsc ˛ ˛ ˛ $ ˛ $

(1945˛̨ 1900)= 45 ˛ ˛ ˛ 45 ˛ 45

˛ ˛ ˛ 0.301 ˛ 0.045

-̨ ˛ ˛ -̨ ˛ ˛ ˛̨ 04

˛ ˛ ˛ - (˛) 3.63 ˛ (+)5.04

141

Page 12: Phaladeepika - appendix 2

^eZo]nI 624

3. iot{Lm®w

kqcys‚ icmicnkv^pSamWv IpP≥, hymgw, i\n ChcpsS iot{Lm®w. _p[≥, ip{I≥

ChcpsS iot{Lm®w 5, 6 ]´nIIfn¬ \n∂p ImWWw.

iot{Lm®w ImWp∂Xn\p≈ ]´nIIƒ

6 (1) iot{Lm®w : _p[≥ (1˛1˛1900se ÿnXn ˛ 164 o )bqWn‰v 10 100 1000 10000

1 4.09 40.92 49.23 133.32 243.18

2 8.18 81.84 98.46 264.64 126.36

3 12.28 122.77 147.69 36.95 9.54

4 16.37 163.69 196.93 169.27 252.72

5 20.46 204.62 246.16 301.59 135.90

6 24.55 245.54 295.39 73.91 19.08

7 28.65 286.46 344.62 206.34 262.26

8 32.74 327.38 33.85 338.54 145.44

9 36.83 8.31 83.09 110.86 28.63

iot{Lm®w : ip{I≥ (1˛1˛1900se ÿnXn: 328.51o )bqWn‰v 10 100 1000 10000

1 1.60 16.02 160.21 162.15 181.46

2 3.20 32.04 320.43 324.29 2.93

3 4.81 48.06 120.64 246.44 184.39

4 6.41 64.09 280.86 288.52 5.86

5 8.01 80.11 81.07 90.73 187.32

6 9.61 96.13 241.29 252.88 8.87

7 11.21 116.15 41.50 55.02 190.25

8 12.82 128.17 201.72 217.17 11.71

9 14.42 144.19 1.93 19.32 193.18

DZmlcWPmXIØnse iot{Lm®ßƒ

IpP≥ _p[≥ Kpcp ip{I≥ i\n

1˛1˛1990˛¬ ˛ 164.0 ˛ 328.51 ˛

1˛1˛1990\p tijw (16597 ZnhkØn\v )

10000 ˛ 243.18 ˛ 181.46 ˛

6000 ˛ 73.91 ˛ 252.88˛

500 ˛ 246.16 ˛ 81.07 ˛

90 ˛ 8.31 ˛ 144.19 ˛

7 ˛ 28.65 ˛ 11.21 ˛

1a 10an ˛ 0.19 ˛ 0.07 ˛

BsI ˛ 764.40 ˛ 999.32 ˛

142

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 625

IpP≥ _p[≥ Kpcp ip{I≥ i\n

BsI ˛ 764.40 ˛ 999.32 ˛

Id£≥

˛ (+) 6.61 ˛ (˛)5.01 ˛

_m°n ˛ 771.01 ˛ 994.31 ˛

˛-˛360/720 ˛ 720 ˛ 720 ˛

iot{Lm®ßƒ 65.55 51.01 65.55 274.31 65.55

Id£≥ *

_p[≥ -̨ ip{I≥

1˛1˛1900 ˛ - +6.67 -̨ ˛̨ 5 ˛

1˛1˛1900 apX¬ .00133 ˛ 001 ˛

P\\h¿jwhsc $ ˛ $ ˛

(1945 ˛̨ 1900) = 45 45 ˛ 45 ˛

+ 0.059 .045 ˛

0.06 ˛ 0.30 ˛

+ 6.61 ˛ ˛̨ 5.01 ˛

4. tNjvmtI{μw

1. bYm¿∞ {Klkv̂ pShpw icmicn {Klkv̂ pShpw XΩn¬Iq´n c≠p sIm≠p

lcn°pI. (tNjvSmtI{μw IpdhmsW¶n¬ AXns‚IqsS 360 Iq´Ww.)

2. Cu lcW^esØ iot{Lm®Øn¬\n∂pw Ipd®m¬ In´p∂

hyXymkamWv tNjvSmtI{μw

DZmlcWPmXIØnse tNjvSmtI{μ߃

IpP≥ _p[≥ hymgw ip{I≥ i\n

bYm¿∞kv̂ pSw 5.70T 48T 145.43T 10.77T 77.85T

icmicnkv̂ pSw 327.39 65.55 155.56 65.55 76.77

333.09 113.55 300.99 76.32 154.62

]IpXn 166.54 56.77 150.49 38.16 77.31

iot{Lm®w 65.55 51.01 65.55 274.31 65.55

+ 360 360 360 ˛ 360

= 425.55 411.01 425.55 ˛ 425.55

kv̂ pSw]IpXn 166.54 56.77 150.49 38.16 77.31

tNjvSmtI{μw 259.01 354.24 275.06 236.15 348.24

5. tNjvSm_ew

tNjvSmtI{μØns‚ aq∂nsem∂mWv tNtjSm_ew.

(tNjvSmtI{μw 180T ˛¬ IqSpXemsW¶n¬ AXv 360T˛¬\n∂pw Ipdbv°Ww.)

143

Page 14: Phaladeepika - appendix 2

^eZo]nI 626DZmlcWPmXIØnse tNjvSm_ew

IpP≥ _p[≥ hymgw ip{I≥ i\n

360 360 360 360 360

(˛)259.01 354.24 275.06 236.15 348.24

= 100.99 576 84.94 123.85 11.76

tNjvSm_ew(1/3)33.66 1.92 28.31 41.28 3.92

5. ÿm\_ew

5 (1) D®_ew

{KlßfpsS D®\oNÿnXn°\pkcn®p≈ _eamWnXv. Hcp {KlØns‚ AXn\oN

ÿm\hpw AXp \n¬°p∂ tcJmwihpw ({Klkv̂ pShpw) XΩnep≈ hyXymksØ aq∂psIm≠p

lcn®m¬ D®_ew In´pw.

DZmlcWPmXIØnse D®_ew

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

D®w 10T 33T 298T 165T 95T 357T 200T

*(+) 180T 180T 180T 180T 180T 180T 180T

\oNw = 190T 213T 478T 345T 275T 537T 380T

**(˛) ˛ ˛ 360 ˛ ˛ 360 360

190T 213T 118T 345T 275T 177T 20T

{Klkv̂ pSw 55.52T 50.82T 5.70T 48T 145.43T 10.77T 77.85T

hyXymkw 134.48 162.18 112.30 63* 129.57 166.23 57.85

®_ew (1/3) 44.83T 54.06T 37.43T 21T 43.19T 55.41T 19.28T

* D®tØmSp 180 Iq´nbm¬ \oNw In´pw.

** 360˛¬ IqSpXemsW¶n¬ 360 Ipd®p IfbWw.

5 (2) k]vXh¿§P_ew

Ign™ A≤ymbØn¬ hnhcn® Zih¿§Øn¬\n\n∂pw cmin, tlmc, t{Z°mWw, k]vXmwiw,

\hmwiw, ZzmZimwiw, {Xnwimwiw F∂o Ggp h¿§ßƒ tN¿∂XmWv k]vXh¿§w. Ct∏mƒ

k]vX h¿§P_eØn¬ {Kl߃ XΩnep≈ ss\k¿§nI _‘Øn\p ]pdsa X¬°me

_‘wIqSn ChnsS ]cnKWn°p∂p≠v.

k]vXh¿§P_ew (jjvSywiØn¬):

h¿§w aqe{Xn kzh¿§w A[nan{X an{X ka i{Xp A[ni{Xp

_ew 45 30 22.5 15 7.5 3.75 1.875

DZmlcWPmXIØnse˛

1. cminÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ Kpcp ip{I≥ i\n

cminÿnXn CShw CShw taSw CShw Nnßw taSw anYp\w

cmin\mY≥ ip ip Ip ip c Ip _p

ss\k¿§n i{Xp aqe{Xn aqe{Xn an{Xw an{Xw ka≥ ka≥

XXv°me 12 an .... .... 12 an{Xw 10 an{Xw 1 i{Xp 12 an{Xw

_‘w ka≥ aqe{Xn aqe{Xn A[nan A[nan i{Xp an{Xw

_ew 7.5 45 45 22.5 22.5 3.75 15

144

Page 15: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 627

2. tlmcmÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥Kpcp ip{I≥ i\n

tlmcm\mY≥ kqcy≥ kqcy≥ kqcy≥ kqcy≥ N{μ≥ kqcy≥ N{μ≥

ss\k¿§nI kz an{X an ka ka i{Xp ka

XXvIme .... 1 i{Xp 2 an{X1 i{Xp 10 an{Xw 2 an{X 12 an{X

kwbp‡ ... ka A[nan i{Xp an{X ka an{X

_ew 30. 7.5 22.5 3.75 15. 7.5 15.

3. t{Z°mWÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ Kpcp ip{I≥ i\n

aIcw aIcw taSw I∂n taSw Nnßw Xpemw

t{Z°mW\mY≥a a Ip _p Ip c ip

ss\._‘w i{Xp i{Xp kz aqe{Xn an i{Xp an{X

XXv._‘w 2 an{X 2 an{X .... .... 9 i{Xp 2 an{X 11 an{X

kw._‘w ka ka .... .... ka ka A[nan{X

_ew 7.5 7.5 30 45. 7.5 7.5 22.5

4. k]vXmwiÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ Kpcp ip{I≥ i\n

taSw ao\w CShwao\w aIcw anYp\w Xpemw

k]vXmwi\m. Ip Kp ip Kp a _p ip

ss\._‘w an{Xw an{Xw ka i{Xp ka an{X an{X

XXv._‘w 12 an{Xw 4 an{Xw 1 i{Xp 4 an{Xw 3 an{Xw 2 an{Xw 11 an{Xw

kw._‘w A[nan A[nan i{Xp ka an{Xw A[nan A[nan

_ew 22.5 22.5 3.75 7.5 15 22.5 22.5

5. \hmwiÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ Kpcp ip{I≥ i\n

Nnßw I¿°Sw CShw anYp\w hr›nIwI¿°Sw ao\w

\hmwi\mY. c N ip _p Ip N Kp

ss\._‘w kz kz ka kz an{X ka ka

XXv._‘w ˛ ˛ 1 i{Xp ˛ 9 i{Xp 12 an{Xw 11 an{Xw

kw._‘w ˛ ˛ i{Xp an{X ka an{X an{X

_ew 30 30 3.75 30. 7.5 15 15.

6 . ZzmZimwiÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ Kpcp ip{I≥ i\n

ao\w aIcw anYp\w [\p anYp\w Nnßw aIcw

ZzmZimwi\m Kp a _p Kp _p c a

ss\._‘w an{Xw i{Xp ka i{Xp ka i{Xp kz

XXv._‘w 4 an{Xw 2 an{Xw 2 an{Xw 4 an{Xw 10 an{Xw 2 an{Xw ....

kw._‘w A[nan ka an{Xw ka an{Xw ka≥

_ew 22.5 7.5 15 7.5 15 7.5 30

Page 16: Phaladeepika - appendix 2

^eZo]nI 628

7. {XnwimwiÿnXn_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ Kpcp ip{I≥ i\n

\Y≥ IpP i\n i\n Kpcp ip {I Kpcp Kpcp

ss\._‘w an{Xw i{Xp i{Xp i{Xp ka i{Xp ka

XXv._‘w 12 an{Xw 2 an{Xw 3 an{Xw 4 an{Xw 9 i{Xp 5 i{Xp 3 an{Xw

kw._‘w A[nan ka ka ka i{Xp A[ni an{Xw

_ew 22.5 7.5 7.5 7.5 3.75 1.875 15

BsI 142.5 127.5 127.5 123.75 86.25 65.62 135

5 (3) HmPbp‹cmiywi_ew

HmP˛bp‹cminIfnepw HmP˛bp‹\hmwißfnepap≈ ÿnXn°\pkcn®v {Kl߃°p

In´p∂ _eamWnXv.

HmPcmin HmP\hmwiw c≠pw

kqcy≥, IpP≥, 15 15 30

_p[≥, Kpcp, i\n

bp‹cmin bp‹\hmwiw c≠pw

N{μ≥, ip{I≥ 15 15 30

DZmlcWPmXIØnse HmPbp‹ÿnXn:

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

kv^pSw 55.52T 50.82T 5.70T 48T 145.43T 10.77T 77.85

1. cmin CShw CShw taSw CShw Nnßw taSw anYp\w

2. HmPw /

bp‹w bp‹w bp‹w HmPw bp‹w HmPw HmPw HmPw

3. _ew .... 15 15 ,,,, 15 .... 15

1. \hmwiw Nnßw I¿°Sw CShw anYp\whr›nIw I¿°Swao\w

2. HmPw

/bp‹w HmPw bp‹w bp‹w HmPw bp‹w bp‹w bp‹w

3. _ew 15 15 .... 15 .... 15 ....

BsI_ew 15 30 15 15 15 15 15

(jjvSywiØn¬) 15 30 15 15 15 15 15

5 (4) tI{μ_ew

tI{μ_ew

tI{μw 1, 4, 7, 10 : 60 jjvSywiw

]W]cw 2, 5, 8, 11 : 30 jjvSywiw

Bt]m¢naw 3, 6, 9, 12 : 15 jjvSywiw

Page 17: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 629DZmlcWPmXIØnse tI{μ_ew

{Klw kqcy≥N{μ≥ IpP≥ _p[≥hymgw ip{I≥i\n

{KlÿnXn

(`mhw) I I I I I I II III VI II IV

Bt]m¢n Bt]m¢n ]W]cw Bt]m¢n Bt]m¢n ]W]cw tI{μw

_ew 15 15 30 15 15 30 60

5 (5) t{Z°mW_ew

{Kl߃ ]pcpj≥ (kqcy≥, Kpcp, IpP≥), \]pwkIw (i\n, _p[≥), kv{Xo (N{μ≥,

ip{I≥) F∂nßs\ a∂q XcØn¬ hcp∂p. Ah¿°v t{Z°mWØnse (aq∂p

`mKßfn¬) Nne {]tXy I`mKßfn¬ \n¬°ptºmƒ In´p∂ _eamWv t{Z°mW _ew.

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

]pcpj... ]pcpj≥ kv{Xo ]pcpj \]pwk ]pcpj kv{Xo \]pwkI

t{Z°mWw 1 2 1 2 1 3 2

_ew 15 15 15 15 15 15 15

DZmlcWPmXIØnse t{Z°mW_ew

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

kv^pSw 55.52T 50.82T 5.70T 48T 145.43T 10.77T 77.85T

t{Z°mWw 3 3 1 2 3 2 2

_ew .... 15 15 15 .... .... 15

6. Ime_ew

6 (1) \tXm∂X_ew (Znhcm{Xn_ew)

\tXm∂X_ew (Znhcm{Xn_ew) 60 jjvSywiw AYhm 1 cq]bmWv. cm{Xn˛{Kl߃°v

A¿≤cm{Xn 12 aWn°pw ]I¬ ˛ {Kl߃°v D®bv°v 12 aWn°pamWv Cu _ew In´pI.

A√mØ t∏mgsØ _ew {InbsNbvXp I≠p]nSn°Ww.

DZmlcWPmXIØnse P\\w cm{Xn 1.36˛\mWv. A∂v DZbw 6.03˛\pw AkvXa\w 6.46˛\pw.

AXpsh®p Zn\am\w ImWWw.

aWn an\n‰v sk°‚ v

AkvXa\w: 6˛46 ]n.Fw. = 18 46

DZbw = 6 03

Zn\am\w 18˛46 ˛̨ 6.03 = 12 43

]Iens‚ ]IpXn 6˛43/2 = 6˛21 1 / 2

= 6 --21 v30

DZbØnt\mSpIqsS CXp Iq´nbm¬-- \´p® In´pw.

\´p® 6˛03 + 6˛21˛30 = 12 24 30.

A¿≤cm{Xn 12-˛-24˛30 + 12˛00 = 24- 24 30

147

Page 18: Phaladeepika - appendix 2

^eZo]nI 630

cm{Xn_e°mcmb N{μ≥, IpP≥, i\n F∂nh¿°v cm{Xn 0 aWn 24 an\n‰v 30 sk°‚n\v 60

jjvSywiw _ew In´pw. F∂m¬ P\\w 1˛36 \mWt√m. B hyXymkw Ipdbv°Ww.

1˛36 ˛̨ 0˛24˛30 = 1- 11 30

1 aWn°q¿ 11 an\n‰v 30 sk°‚psIm≠v _ew F{X Ipd™p F∂p t\m°m≥ {Inb sNømw.

1˛11˛30 $ 60 = 71˛30 $ 60 71 1/2 $ 60 = 5.96 jjvSywiw

12 aWn°q¿ 720 an\n‰v 720

_m°n 60˛̨ 5.96 = 54.04 jjvSywiw

AXmbXv ˛̨

1) N{μ≥, IpP≥, i\n F∂nhcpsS cm{Xn_ew 54.04 jjvSywiw.

2) ]I¬˛_e°mcmb kqcy≥, IpP≥, Kpcp F∂nhcpsS

]I¬_ew 60 ˛̨ 54.04 = 5.96 jjvSywiw.

3) _p[\v Ft∏mgpw Htc _eamIbm¬ _p[s‚ _ew

60 jjvSywiw.

DZmlcWPmXIØnse {KlßfpsS \tXm∂X_ew

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

_ew 5.96 54.04 54.04 60 5.96 5.96 54.04

6 (2.) ]£_ewN{μ\v kqcy\n¬\n∂pap≈ AI¬®bmWv hmhpIfpsSbpw ]£ ßfpsSbpw

ASnÿm\w. c≠p t]¿°pw Htc tcJmwiw ({Klkv^pSw) BIptºmƒ N{μs‚ k©mcw

kqcys‚ IqsSbmIpIbpw H´pw Zriya√msX hcnIbpw sNøpw. AXmWv IdpØ hmhv

(Aamhmkn). AhnSp∂tßm´v shfpØ]£amWv. N{μ≥ kqcy\n¬\n∂pw 12T AIeptºmƒ

Hcp XnYnbmbn. 15 XnYnbmIptºƒ (180T) shfpØhmhv (]u¿Æan). N{μkv^pSw ho≠pw

kqcykv^pSØnseØptºmƒ ASpØ IdpØhmhv. Npcp°Øn¬ N{μ\pw kqcy\pw XΩnep≈

Zqcw t\m°nbmWv ]£_ew IW°m°p∂Xv. IdpØhmhp Ign™v F´masØ ZnhkwapX¬

shfpØ hmhp Ign™v GgmasØ Znhkw hsc N{μ\v ]£_eap≠v. ]£_eamWv N{μs‚

{][m\_ew. ]£_e an√mØ N{μ≥ ]m]\mWv. 60 jjvSywiw AYhm 1 cq]bmWv ]£_ew.

N{μ\pw kqcy\pw XΩnep≈ AIehpw {KlßfpsS ]£_ehpw

(1) (2)

0T -̨ 180T 180-T ˛ 360T

]m]¿°p ]q¿Æ_ew ip`¿°p ]q¿Æ _ew

ip`¿°p 0 _ew ]m]¿°p 0 _ew

CXn\nSbv°p hcp∂Xv IW°psNbvXp I≠p ]nSn°Ww

]£_ew ImWp∂hn[w:

N{μkv^pSw ˛̨ kqcykv^pSw = ]m]cpsS ]£_ew.

(N{μkv^pSw kqcykv^pStØ°mƒ IpdhmsW¶n¬ 180T Iq´Ww.)

148

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 631

DZmlcWPmXIØnse {Klkv^pSw (ZimwiØn¬):

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

55.52T 50.82T 5.70T 48.00T 145.43T 10.77T 77.85T

DZmlcWPmXIØnse N{μkv^pSw - : 50.82

CXp kqcykv^pStØ°ƒ IpdhmbXn\m¬ 180T Iq´Ww.

50˛82 + 180 = 230-- .82

(˛) kqcykv^pSw (˛) 55.52

hyXymkw = 175. 30

175.30s\ 3 sIm≠p lcn®m¬ ]m]cpsS

]£_ew In´pw. 175.30/3 = 58.43

ip`cpsS ]£_ew 60 ˛̨ 58.43 = 1. 57

N{μ\v ]£_ew Cc´nbmWv. 58.43 $ 2 = 116.86

DZmlcWPmXIØnse {KlßfpsS ]£_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

58.43 116.86 58.43 58.43 1.57 1.57 58.43

6 (3.) {Xn`mK_ew

]Iens\bpw cm{Xnbtbbpw apΩq∂p `mKßfm°n Hmtcm `mKØpw Hmtcm {KlØn\pw

Hmtcm _ew sImSpØn´p≈XmWv {Xn`mK_ew. P\\w Ft∏mgmbmepw hymgØn\v {Xn`mK_e

ap≠v. 60 jjvSywiamWv {Xn`mK_ew.

{Xn`mK_ew ImWp∂ coXn:

]I¬ cm{Xn

`mKw 1 2 3 1 2 3

_eap≈ {Klw _p c a N ip Ip

1. DZmlcWPmXIØnse P\\w cm{XnbmbXn\m¬ BZyw

cm{Xnam\w ImWWw.

P\\ZnhksØ AkvXa\w = 18˛46

ASpØ DZbw = 6˛03

cm{Xnam\w (18.46 ˛̨ 6.03) = 11˛17

2. CXns\ 3 `mKam°Ww.

11˛17 / 3 = 3 aWn°q¿ 45 an\n‰v

hoXap≈ 3 `mK߃

3. ASpØXmbn P\\w GXp `mKØmWp hcp∂sX∂p t\m°Ww.

P\\kabw 1˛36 F.Fw. = 25˛36 aWn

AkvXa\w = 18˛46

`mKw ˛1 18˛46 + 3˛45 = 21-.91 = 22˛31

`mKw˛2 22˛31 + 3˛45 25˛76 = 26˛16

4. P\\w 25˛36 \mIbm¬ AXp c≠masØ `mKØv

AYhm ip{Is‚ `mKØp hcp∂p.

149

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^eZo]nI 632

. DZmlcWPmXIØnse {Xn`mK_ew

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

˛ ˛ ˛ ˛ 60 60 ˛

6 (4) A_vZ_ew (15 jjvSywiw)

P\\w hcp∂ ssN{Xh¿jØns‚ BZyZnhkØns‚ \mY\mWv h¿jm[n]≥.

P\\ZnhksØ Al¿§WkwJy A\pkcn®mWv CXp ImWp∂Xv. Al¿§Ww hfsc

\o≠ kwJybmbXn\m¬ kuIcy Øn\pth≠n HXp°nb kwJyIfmWv h¿jmcw`w

ImWm\p]tbmKn °p∂Xv. hnhn[ Npcp°kwJyIƒ CXn\mbn \nehnep≠v. ChnsS tUm.

_n.hn.cma≥ At±lØns‚ {Kl_ehpw `mh_ehpw F∂ ]pkvXIØn¬ sImSpØn´p≈

Al¿§W]´nIbmWv D]tbmKn°p ∂Xv. Cu Al¿§W]´nI Bcw`n°p∂Xv 2˛5˛1827

_p[\mgvN apX¬°mWv.

1. DZmlcWPmXIØnse P\\w: 1945 Pq¨ 10, i\nbmgvN.

2. 1944 Unkw_¿ 31˛s‚ Al¿§Ww ˛ 42978

1˛1˛46 apX¬ 10˛6˛45 hsc ˛ 161 Znhk߃

10˛6˛45 se Al¿§Ww ˛ 43139

3. Cu Znhkßsf 360˛sIm≠p lcn®v F{X h¿japs≠∂p ImWWw.

43139 / 360 = lcW^ew h¿jkwJy = 119

4. Cu h¿jkwJysb 3 sIm≠p s]cp°n 1 Iq´Ww.

119 $ 3 = 357. 357 + 1 = 358.

5. Cu kwJysb 7˛sIm≠p lcn®m¬ In´p∂ injvSw B h¿jw XpSßp∂

BgvNbpw B BgvNbpsS \mY≥ h¿jm[n]\p amWv.

injvSw 1˛_p[≥,

2˛hymgw,

3˛sh≈n,

4˛i\n

5˛Rmb¿.

6˛Xn¶ƒ,

7˛sNmΔ F∂XmWv {Iaw.

6. 358/ 7 = lcW^ew 51, _m°n 1. 1˛_p[\mgvN. _p[\mgvNbpsS \mY≥ _p[≥.

P\\kabsØ h¿jm[n]≥ _p[≥.

DZmlcWPmXIØnse A_vZm[n]_ew:

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

˛ ˛ ˛ 15 ˛ ˛ ˛

6 (5) amk_ew (30 jjvSywiw)

amkm[n]s\ ImWp∂Xn\v, P\\ZnhksØ Al¿§WsØ 30˛sIm≠p lcn®m¬

In´p∂ lcW^esØ 2˛sIm≠p s]cp°n,

1 Iq´n, 7˛sIm≠p lcn°Ww.

150

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 633

1. 1945 Pq¨ 10˛se Al¿§Ww ˛ 43139

2. 30˛sIm≠p lcn°pI 43139 / 30 = 1437

3. lcW`esØ2˛sIm≠p s]cp°pI

1437 $ 2 = 2874

4. 1 Iq´pI 2874+1 = 2875

5. 2875˛s\ 7˛sIm≠p lcn°pI.2875/7 = 410.

injvSw 5.

1˛_p[≥, 2˛hymgw, 3˛sh≈n, 4˛i\n 5˛Rmb¿. F∂ {IaØn¬ amkmcw`w RmbdmgvN.

amkm[n]≥ kqcy≥.

DZmlcWPmXIØnse amkm[n]_ew:

kqcy≥ N{μ≥ IpP≥ _p[≥hymgw ip{I≥ i\n

30 ˛ ˛ ˛ ˛ ˛ ˛

6 (6) hmcm[n]_ew (45 jjvSywiw)

P\\Znhkw GXmgvNbmtWm, B BgvNbpsS \mY\mbncn°pw hmcm[n]≥.

DZmlcWP\\w i\nbmgvN. hmcm[n]≥ i\n.

DZmlcWPmXIØnse hmcm[n]_ew:

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

˛ ˛ ˛ ˛ ˛ ˛ 45

6 (7) tlmcm[n]_ew (60 jjvSywiw)

HcpZnhkw DZbwapX¬ ASpØ Znhkw DZbwhscbmWv Hcp `mcXobZnhkw. ZnhksØ

Ccp]Øn\membn Xncn®XmWv Hcp tlmc. AXmbXv, Imetlmc Hcp aWn°qdmWv. AXv

kucbqYØnse {Iaa\pkcn®pXs∂ a, Kp, Ip, c (`qan°p]Icw), ip. _p, N F∂ {IaØn¬

Bh¿Øn®phcp∂p. hmcm[n]s‚ tlmcXs∂bmWv BZyw. DZbw RbdmgvN 6˛15 \msW߶n¬

7˛15 hsc kqcytlmcm. XpS¿∂v, ip{I≥, _p[≥, N{μ≥ i\n, hygw, IpP≥ F∂ {IaØn¬

Bh¿Øn®phcpw. 25˛masØ N{\tlmctbmsS Xn¶fmgvN Bcw`n°pw. P\\w GXp

ImetlmcbnemtWm AXns‚ \mY\mWv tlmcm[n]≥.

tlmcIfpw tlmcm[n]∑-mcpw Bh¿Øn°p∂ hn[w:

tlmc ˛ tlmcm[n]≥

1 8 15 22 ˛ i\n

2 9 16 23 ˛ Kpcp

3 10 17 24 ˛ IpP≥

4 11 18 ˛ ˛ chn

5 12 19 ˛ ˛ ip{I≥

6 13 20 ˛ ˛ _p[≥

7 14 21 ˛ ˛ N{μ≥

151

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^eZo]nI 634

DZmlcWPmXIØnse P\\w i\nbmgvN.

P\\kabw 1˛36 F.Fw.

A∂v DZbw 6˛03 aWn°v.

1) BZyambn C¥y≥ kabsØ {]mtZinIkabw B°Ww.

Ãm≥tU¿Uv sadoUnb≥ 82T ˛ 30 ’Xriq¿ 76T ˛15 ’hyXymkw 6-- ˛15 $ 4 (˛̨ )25 an\n‰v

P\\w C¥y≥ kabw; 1˛36 F.Fw.

P\\w {]mtZinIkabw

1˛36 ˛̨ 0˛25 = 1 aWn 11 an\n‰v

= 25 -11

v 2) ASpØXmbn A∂sØ DZbsØ {]mtZinIkabam°Ww.

DZbw C¥y≥ kabw 6˛03 F.Fw.

DZbw {]mtZinIkabw (˛̨ ) 0˛25 an\n‰v

= 5 aWn 38 an\n‰v

3) 25˛11 F{XmasØ tlmcbnemsW∂p I≠p]nSn°Ww.

P\\w {]mtZinIkabw 25˛11

DZbw {]mtZinIkabw (˛̨ ) 5˛38

hyXymkw = 19--˛33

]sØmºXp Ign™Xn\m¬ Ccp]XmasØ tlmc.

4) Ccp]XmasØ tlmc apIfnse ]´nI{]Imcw _p[tlmc. AXpsIm≠v

tlmcm[n]≥ _p[≥.

DZmlcWPmXIØnse tlmcm_ew:

kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

0 0 0 60 0 0 0

6 (8) Ab\_ew

1. DØcmbWhpw Z£nWmb\hpw

(1) taSw ̨ anYp\w: taSamkw H∂mwXnbXn taSwcminbntebv°p {]thin°ptºmƒ kqcy≥

\ap°p t\sc apºn¬ (0T=tajhnjphw) Bbncn°pw. ]n∂oSv Znhkw Hcp Un{KnhoXw hSt°m´p

\oßn taSw, CShw, anYp\w cminIƒ ]n∂n v́v Aßp hSt°A‰Øv(90T )FØp∂p,

(2) I°SIw ̨ I∂n: I¿°Samkw H∂mwXnbXn sXt°m´p≈ aS°w Bcw`n°pw. I¿°SIw,

Nnßw, I∂n cminIƒ ]n∂n v́v, Xpemw H∂mwXnbXn kqcy≥ ho≠pw \ap°p t\sc apºn¬

(180T = Xpem hnjphw) FØ∂p.

152

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 635

(3) Xpemw ˛ [\p: sXt°m´p≈ bm{X XpScp∂ kqcy≥ Xpemw, hr›nIw, [\p cminIƒ

]n∂n v́v, [\pamkw Ahkm\w sXt° A‰Øv (270T) FØp∂p.

(4) aIcw ˛ ao\w: aIcw H∂mwXnbXn ho≠pw hSt°m´p≈ bm{X Bcw`n°p∂p. ao\w

Ahkm\w / taSw H∂n\v ho≠pw \ap°p apºn¬ (0T = tajhnjphw) FØp∂p,

0T / 360T

1˛taSw 12˛ao\w

(0T ˛30T) -(330˛360 T )

2˛CShw 11˛Ipw`w

(30T ˛60T) (300˛330T )

3˛anYp\w 10˛aIcw

(60T ˛90T) (270˛300T)

90T hS°v sX°v 270T

4˛I¿°Sw 9˛[\p

(90T ˛120T) (240T˛270T)

5˛Nnßw 8˛hr›nIw

(120T ˛150T) (210T˛̨ 240T)

6˛I∂n 7˛Xpemw

(150T ˛180T) (180-˛210 T)

180T

kqcys‚ hSt°m´pw (aIcw ˛ anYp\w) sXt°m´pw (I¿°SIw ˛ [\p) D≈ Cu

bm{XIsfbmWv DØcmbWw F∂pw Z£nWmb\w F∂pw ]dbp∂Xv. Cu DØcmbWhpw

Z£nWmb\hpw F√m {Kl ߃°pap≠v. F∂m¬ Ab\_eØn\p t\m°p∂Xv {Klw a≤y

tcJbv°p hSt°m sXt°m F∂XmWv AYhm Hmtcm {KlØn s‚bpw {Im¥n (North Declina-tion / South Declination) BWv.

2. Ab\_ew

a≤ytcJbn¬\n∂pw hSt°mt´m sXt°mt´m AIepw tXmdpw{KlßfpsS Ab\_ew

IqSpItbm IpdbpItbm sNøp∂p

.

(1) {Kl߃°v a≤ytcJbn¬ (0T/180T) 30 jjvSywiamWv. Ab\_ew. {KlßfpsS

]camh[n Ab\w ({Im¥n) 24 Un{Knbpw 24T ˛°p In´p∂ Ab\_ew 60 jjvSywihpw BWv.

CSbv°p≈Xv B\p]mXnIambn (ss{XcminIw sNbvXp) ImWWw.

(2) a≤ytcJbv°p hS°p≈ KXnbn¬ kqcy≥, IpP≥, hymgw, ip{I≥ F∂o {Kl߃°pv

Ab\_ew h¿≤n°p∂p. `qa≤ytcJ bv°p sXt°m´p≈ KXnbn¬ CXp Ipd™p Ipd™p

Xosc C√mXmIp∂p (kqcy≥, IpP≥, hymgw, ip{I≥ F∂o {KlßfpsS DØc{Im¥n (NorthDeclination) 24T tbmSv Iq´Ww. Z£nW{Im¥n (South Declination) BsW¶n¬ 24T bn¬\n∂pw

Ipdbv°Ww. AXmbXv, 24T N -¬ Chbv°p ]q¿Æ Ab\_ew D≠v; 24T S -¬ Xosc C√.)

153

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^eZo]nI 636

(3) `qa≤ytcJbv°p sX°p≈ KXnbn¬ i\n, N{μ≥ F∂o {Kl߃°mWv

Ab\_ew In´pI. hS°p≈ KXnbn¬ ChcpsS _ew B\p]mXnIambn IpdbpIbpw

sNøp∂p. (N{μ\pw i\n°pw Z£nW {Im¥n 24TtbmSp Iq´Ww; DØc{Im¥n Ipdbv°Ww.)

(4) _p[≥ hS°p `mKØmbmepw sX°p `mKØmbmepw 24T˛tbmSp Iq´Ww. (_p[\v

IqSpIam{Xta D≈q; Ipdben√.)

(5) kqcy\v Ab\_ew Cc´nbmWv.

3. kmb\kv^pSßfpw kmb\ÿnXnbpw

{KlßfpsS Ab\_ew IW°m°p∂Xv kmb\{Klkv^pS ßfnemWv; PmXIßfn¬

sImSp°p∂Xv \ncb\kv^pSßfpw. AXpsIm≠v Ab\_ew ImWp∂Xns‚ BZy]Snbmbn

PmXIØnse \ncb\ {Klkv^pSßsf kmb\am°n am‰Ww. (amkw H∂mwXnbXnIfnse

Ab\mwiw ]©mwKßfnepw Fs^sadnkpIfn epw sImSpØncn°pw.)

DZmlcWPmXIØnse {Klkv^pSw (\ncb\hpw kmb\hpw)

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

\ncb\w 55T˛31 ’ 50T˛49 ’ 5T˛42 ’ 48T˛00 ’ 145T˛26 ’ 10T˛46 ’ 77T˛51’(+) Ab\mwiw23T˛5’˛25 ”(=)kmb\w 78T˛36’ 73T˛54 ’ 28T-47’ 71 T ˛5’ 168T˛31’ 33T 51’ 100T 56’(ZimwiØn¬)78.60T 73.90T 28.78T 71..10T 168.53T 33.85T 100.93T

tPymXn»mkv{X{]Imcw tajhnjphw (Vernal Equinox) hcp∂Xv am¿®v 21˛\mWv. F∂m¬

\Ωƒ CXv (hnjp) BtLmjn°p∂Xv G{]n¬ 14˛\pw. Ccp]Øn\mep ZnhksØ Cu

hyXymkØn\p ImcWw Ab\mwiamWv. tPymXn»mkv{XIW°pIƒ (Astronomy) kmb\w

AYhm Ab\mwiw tN¿∂Xpw, `mcXobtPymXnj IW°pIƒ (Indian Astrology) \ncb\w

AYhm Ab\mwiw tNcmØhbpw BWv.

DZmlcWPmXIØnse kmb\{KlßfpsS Ab\ÿnXn

hS°v sX°v

3 2 1 12 11 10

60T˛90T 30T ˛60T 0T ˛30T - 330˛360 T300˛330 270˛300T

c 78.60 -̨ Ip 28T.78 ˛ ˛̨ ˛̨

N 73.90 ip 33.85 ˛̨ ˛̨ ˛̨ ˛̨

_p 71..10T ˛̨ ˛̨ ˛̨ ˛̨

4 5 6 7 8 9

90T˛120T 120T ˛150T 150T ˛180T 180-˛210 T 210˛̨ 240 240˛270

a 100.93T ˛̨ Kp 168.53T ˛ ˛ ˛

154

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 637

Cu PmXIØn¬ kmb\kv^pS{]Imcw F√m {Klßfpw cminafieØns‚

hS°p`mKØmWv.

4. {KlßfpsS {Im¥n (Declination){Kl߃ XßfpsS {`aWØn\nSbv°v Ipd®p\mƒv a≤ytcJ bv°p hS°pw Ipd®p\mƒ

a≤ytcJbv°p sX°pambncn°pw. Cu hyXnNe\ sØbmWv {Im¥n (Declination) F∂p

]dbp∂Xv.

.360T hymkap≈ JtKmfhrØsØ KWnXkuIcyØn\pth≠n 90T hoXap≈ \mep

`pPßfmbn Xncn®n´p≠v. {KlßfpsS kmb\ kv^pS߃ GXp `pPØnemWv hcp∂sX∂p

t\m°nbmWv AhbpsS {Im¥n \n›bn°p∂Xv.

`pPw ]cn[n {Im¥n ImWp∂ hn[w

1. 0T˛̨ 90T {Klkv^pSw ˛̨ 0T

2. 90T˛̨ 180T 180T ˛̨ {Klkv^pSw

3. 180T˛270T {Klkv^pSw ˛̨ 180T

4. 270T˛360T 360T ˛̨ {Klkv^pSw

DZmlcWPmXIØn¬ {KlßfpsS {Im¥n:

{Klw kqcy≥ N{μ≥IpP≥ _p[≥ hymgw ip{I≥ i\n

kv^pSw 78.60T 73.90T 28.78T 71.10T 168.53T 33.85T 100.93T

`pPw 1 1 1 1 2 1 2

{Im¥n 78.60T 73.90T 28.78T 71.10T *11.47T 33.85T *79.07T

*Cu PmXIØn¬ hymgØn\pw i\n°pw am{Xta am‰w hcp∂p≈p.

(Kp ˛ 180 ˛̨ 168.53 = 11.47. a ˛ 180 ˛̨ 100.95 = 79.05)

5. `pPØns‚ 6 `mKßfpw AhbpsS {Im¥nbpw

90T hoXap≈ `pPßsf 15T hoXap≈ 6 `mKßfmbn Xncn®v Hmtcm `mKØnepw hcp∂

Ab\w ({Im¥n) {]tXyIw IW°m°nbn´p≠v. (0T - ˛ bv°v Ab\Ne\an√).

`pPØns‚ `mKw 1 2 3 4 5 6

]cn[n 1T ˛15T 15T˛30T 30T˛45T 45T˛60T 60T˛75T 75T˛90T

{Im¥n

(Iebn¬) 362’ 341’ 299’ 236’ 150’ 52’BsI ˛̨ 703’ 1002’ 1238’ 1388’ 1440’

155

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^eZo]nI 638

DZmlcWPmXIØn¬˛̨

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

{Im¥n 78.60T 73.90T 28.78T 71.10T 11.47T 33.85T 79.07T

`mKw1 (1˛15) 362’ 362’ 362 ’ 362 ’ *276.80’ 362’ 362’`mKw2 (15˛30) 341’ 341’ *313.72 341 ’ ˛ - 341’ 341’`mKw3 (30˛45) 299’ 299’ - 299’ ˛ *77.14’ 299’`mKw4 (45˛60) 236’ 236’ -̨ 236 ’ - ˛ 236’`mKw5 (60˛75) 150’ *139.2 ˛ *111 ˛ ˛ - 150’`mKw6 (75˛90) *12.54’ ˛ ˛ ˛ -̨ ˛ *15.60

BsI(Ie) 1400.54’ 1377.2 675.72 1349 *276.80 780.14 1403.60

(`mK) 23.34T 22.95T 11.26T 22.48T 4.61T 13T 23.39T

*52$3.60 *150$13.90 *341$13.78 *150$11.10*362$11.47 *299$3.65 *52$4.07

15 15 15 15 15 15 15

DZmlcWPmXIØnse Ab\_ew

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

Un{Knbn¬ 23.34T 22.95T 11.26 22.48 4.61 13 23.39

{Im¥n

(+ / --˛̨ ) + 24T ˛̨ 24 + 24T + 24T + 24T + 24T ˛̨ -- 24 - -

BsI 47.34T 1.05 35.26 46.48 28.61 37 0.61

Ab\_ew ($ 5/4) 59.175* 1.31 44.08 58.10 35.76 46.25 0.76

*kqcy\v Cc´n 118.35*

6 (9) bp≤_ew

kmam\y\nbaw

tajmZn hnt£]ap≈ {Klw hS°p \n¬°pw. XpemZnhnt£] ap≈h≥ sX°pw. c≠p

hnt£]hpw tajmZnbmsW¶n¬ hnt£]tadnbh≥ hS°mbncn°pw. c≠pw XpemZnbmsW¶n¬

hnt£]w Ipd™h\mWv hS°v. hS°p \n¬°p∂h\mWv Pbn°p∂mXv. ip{I≥ FhnsS

\n∂mepw Pbn°pw.

kq£vaKWnXw.

1. c≠p {KlßfpsS tcJmwi߃ ({Klkv^pS߃) XΩnep≈ AIew Hcp Un{Knbn¬

Ipdbptºmfp≈ AhÿsbbmWv {Klbp≤w F∂p ]dbp∂Xv.

2. kqcy\pw N{μ\pw {Klbp≤Øn¬ hcp∂n√; Xmcm{Kl߃ (Ip, _p, Kp, ip, a)

XΩnemWv {Klbp≤w kw`hn°pI.

3. KWnXcoXn: bp≤Ønep≈ c≠p {KlßfpsSbpw hnhn[ _e߃, AXmbXv,

\tXm∂X_ew, ]£_ew, {Xn`mK_ew, h¿j_ew, amk_ew, Znhk_ew, tlmcm_ew F∂o

Ime_eß tfmSpIqSn C\n ]dbm≥ t]mIp∂ ÿm\_ew, ZnIv_ew F∂nh IqSn Iq´Ww.

Ahbn¬ IqSpX¬ D≈Xn¬ \n∂pw Ipdhp≈Xp Ipdbv°Ww. At∏mƒ In´p∂ kwJysb

_nw_]cnamW hyXymkw sIm≠p lcn°Ww.

156

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A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 639

_nw_]cnamW߃ (Iebn¬):

IpP≥ _p[≥ Kpcp ip{I≥ i\n

9.4” 6.6” 190.4” 16.6” 158”

BZyw ]d™ kwJybn¬ \n∂pw c≠maXp ]d™ kwJy Ipdbv°p tºmƒ In´p∂XmWv v

bp≤_ew. bq≤Øn¬ Pbn® {KlØns‚ Ime_etØmSv CXp Iq´Ww; bp≤Øn¬ tXm‰

{KlØns‚ Ime_eØn¬ \n∂v A{Xbpw Ipdbv°pIbpw thWw.

\ΩpsS DZmlcWPmXIØn¬ {Klbp≤an√mØXn\m¬, ChnsS DZmlcWØn\mbn

{Klbp≤ap≈ as‰mcp PmXIw FSp°pIbmWv.

_p[≥ hymgw

{Klkv^pSw 170.53 170.45

ÿm\_ew 238.16 152.98

ZnIv_ew 31.97 31.99

\tXm∂X_ew 60.00 6.10

]£_ew 54.38 54.38

{Xn`mK_ew ˛̨ 60.0

h¿j_ew ˛̨ ˛̨

amk_ew ˛̨ ˛̨

Znhk_ew ˛̨ ˛̨

tlmcm_ew 60.00 ˛̨

BsI _ew 444.51 305.45 139.06

_nw_]cnamWw 6.6” 190.4” 183 ”.8139.06 / 183.8 0.8 jjvSywiw

bp≤_ew ˛̨ 0.80 + 0.80

157

Page 28: Phaladeepika - appendix 2

^eZo]nI 640

DZmlcWPmXIØn¬

{KlßfpsS jUv_ew

{Klw kqcy≥ N{μ≥ IpP≥ _p[≥ hymgw ip{I≥ i\n

_ew˛

1. ss\k¿§nI 60.00 51.43 17.14 25.70 34.28 42.85 8.57

2. ZnKv 5.50 52.93 22.11 38.50 6.02 39.58 31.45

3. ZrIv 3.11 11.19 ˛2.80 11.55 ˛47.86 ˛2.80 ˛0.32

4. tNjvSm 0 0 33.66 1.92 28.31 41.28 3.92

5. D® 44.83 54.06 37.43 21 43.19 55.41 19.28

6. k]vXh¿§P 142.5 127.5 127.5 123.75 86.25 65.62 135

7. HmPbpKa 15 30 15 15 15 15 15

8. tI{μw 15 15 30 15 15 30 60

9. t{Z°mW ˛ 15 15 15 ˛ ˛ 15

10.\tXm∂X 5.96 54.04 54.04 60 5.96 5.96 54.04

11.]£ 58.43 116.86 58.43 58.43 1.57 1.57 58.43

12.{Xn`mK ˛ ˛ ˛ ˛ 60 60 ˛

13. h¿j ˛ ˛ ˛ 15 ˛ ˛ ˛

14. amk 30 ˛ ˛ ˛ ˛ ˛ ˛

15. hmc ˛ ˛ ˛ ˛ ˛ ˛ 45

16. tlmcm ˛ ˛ ˛ 60 ˛ ˛ ˛

17.Ab\ 118.35 1.31 44.08 58.10 35.76 46.25 0.76

18.bp≤ 0 0 0 0 0 0 0

BsI

jjvSywiØn¬ 498.68 529.32 451.59 518.95 283.48 400.72 446.13

cq]bn¬ 8.31 8.82 7.53 8.65 4.72 6.68 7.44

an\nawth≠Xv 5.00 6.00 5.00 7.00 6.50 5.50 5.00

A\p]mXw 1.66 1.47 1.51 1.24 0.73 1.21 1.49

DZmlcWPmXIØn¬ {KlßfpsS _ew (cq] ˛ Zimwiw)

kqcy≥ 1.66

IpP≥ 1.51

i\n 1.49

N{μ≥ 1.47

_p[≥ 1.24

ip{I≥ 1.21

hymgw 0.73

Page 29: Phaladeepika - appendix 2

A\p_‘w 2 (jUv_ehpw N{μ{Inb apXembhbpw) 641

1) 0 -̨13-̨ 20

2) 0˛26˛40

3) 0˛40˛0

4) 0˛53˛20

5) 1˛6˛40

6) 1˛20˛0

7) 1˛33˛20

8) 1˛46˛40

9) 2˛0˛0

10) 2˛13˛20

11) 2˛26˛40

12) 2˛40˛0

13) 2˛53˛20

14) 3˛6˛40

15) 3˛20˛0

16) 3˛33˛20

17) 3˛46˛40

18) 4˛0˛0

19) 4˛13˛20

20) 4˛26˛40

21) 4˛40˛0

22) 4˛53˛20

23) 5˛6˛40

24) 5˛20˛0

25) 5˛33˛20

26) 5˛46˛40

27) 6˛0˛0

28) 6˛13˛20

29) 6˛26˛40

30) 6˛40˛0

31) 6 -̨53 -̨20

32) 7˛6˛40

33) 7˛20˛0

34) 7˛33˛20

35) 7˛46˛40

36) 8˛0˛0

37) 8˛13˛20

38) 8˛26˛40

39) 8˛40˛0

40) 8˛53˛20

41) 9˛6˛40

42) 9˛20˛0

43) 9˛33˛20

44) 9˛46˛40

45)10˛0˛0

46) 10˛13˛20

47) 10˛26˛40

48) 10˛40˛0

49) 10˛53˛20

50) 11˛6˛40

51) 11˛20˛0

52) 11˛33˛20

53) 11˛46˛40

54) 12˛0˛0

55) 12˛13˛20

56) 12˛26˛40

57) 12˛40˛0

58) 12˛53˛20

59) 13˛6˛40

60) 13˛20˛0

2. N{μmhÿ

1) 1˛6˛40

2) 2˛13˛20

3) 3˛20˛0

4) 4˛26˛40

5) 5˛33˛20

6) 6˛40˛0

7) 7˛46˛40

8) 8˛53˛20

9) 10˛00

10) 11˛6˛40

11) 12˛13˛20

12) 13˛20˛0

1. N{μ{Inb 3. N{μthe

1) 0˛22˛13˛20

2) 0˛44˛26˛40

3) 1˛6˛40˛0

4) 1˛28˛53˛20

5) 1˛57˛6˛40

6) 2˛13˛20˛0

7) 2˛35˛33˛20

8) 2˛57˛46˛40

9) 3˛20˛0˛0

10) 3˛42˛13˛20

11) 4˛4˛26˛40

12) 4˛26˛40˛0

13) 4˛48˛53˛20

14) 5˛11˛6˛40

15) 5˛33˛20˛0

16) 5˛55˛33˛20

17) 6˛17˛46˛40

18) 6˛40˛0˛0

19) 6˛2˛13˛20

20) 7˛24˛26˛40

21) 7˛46˛40

22) 8˛8˛53˛20

23) 8˛31˛6˛40

24) 8˛53˛20

25) 9˛15˛33˛20

26)9˛37˛46˛40

27) 10˛0˛0˛0

28) 10˛22˛13˛20

29) 10˛44˛26˛40

30) 11˛6˛40˛0

31) 11˛28˛53˛20

32) 11˛51˛6˛40

33) 12˛13˛20˛0

34) 12˛35˛33˛20

35) 12˛57˛46˛40

36) 13˛20˛0˛0