Madhava of Sangamagrama

Madhava's sine table is the table of sines of various angles constructed by the 14th century Kerala mathematician-astronomer Madhava of Sangamagrama. The table lists the trigonometric sines of the twenty-four angles 3.75°, 7.50°, 11.25°, ..., and 90.00° (angles that are integral multiples of 3.75°, i.e. 1/24 of a right angle, beginning with 3.75 and ending with 90.00). The table is encoded in the letters of Devanagari using the Katapayadi system. This gives the entries in the table an appearance of the verses of a poem in Sanskrit.

Madhava's original work containing the sine table has not yet been traced. The table is seen reproduced in the Aryabhatiyabhashya of Nilakantha Somayaji^[1](1444–1544) and also in the Yuktidipika/Laghuvivrti commentary of Tantrasamgraha by Sankara Variar (circa. 1500-1560).^[2]

The table

The image below gives Madhava's sine table in Devanagari as reproduced in Cultural foundations of mathematics by C.K. Raju.^[3] The first twelve lines constitute the entries in the table. The last word in the thirteenth line indicates that these are "as told by Madhava".

Values in Madhava's table

To understand the meaning of the values tabulated by Madhava, consider some angle whose measure is A. Consider a circle of unit radius and center O. Let the arc PQ of the circle subtend an angle A at the center O. Drop the perpendicular QR from Q to OP; then the length of the line segment RQ is the value of the trigonometric sine of the angle A. Let PS be an arc of the circle whose length is equal to the length of the segment RQ. For various angles A, Madhava's table gives the measures of the corresponding angles <math>\angle</math>POS in arcminutes, arcseconds and sixtieths of an arcsecond.

As an example, let A be an angle whose measure is 22.50°. In Madhava's table, the entry corresponding to 22.50° is the measure in arcminutes, arcseconds and sixtieths of arcseconds of the angle whose radian measure is the modern value of sin 22.50°. The modern numerical value of sin 22.50° is 0.382683432363 and,

0.382683432363 radians = 180 / π × 0.382683432363 degrees = 21.926145564094 degrees.

and

21.926145564094 degrees = 1315 arcminutes 34 arcseconds 07 sixtieths of arcsecond.

In the Katapayadi system the digits are written in the reverse order. Thus in Madhava's table, the entry corresponding to 22.50° is 70435131.

Derivation of trigonometric sines from Madhava's table

For an angle whose measure is A, let

<math>\angle POS = m \text{ arcminutes, } s \text{ arcseconds, } t \text{ sixtieths of an arcsecond}</math>

Then

<math>

\begin{align} \sin (A) & = RQ \\ & = \text{length of arc } PS \\ & = \angle POS \text{ in radians}\\ & = \frac{\pi}{180\times 60}\left( m + \frac{s}{60}+ \frac{t}{60\times 60}\right). \end{align} </math>

Each of the lines in the table specifies eight digits. Let the digits corresponding to angle A (read from left to right) be

<math> d_1\quad d_2\quad d_3\quad d_4\quad d_5\quad d_6\quad d_7\quad d_8 </math>

Then according to the rules of the Katapayadi system of Kerala mathematicians we have

<math>

\begin{align} m & = d_8\times 1000 + d_7\times 100 + d_6 \times 10 +d_5\\ s & = d_4\times 10 + d_3\\ t & = d_2\times 10 + d_1 \end{align} </math>

Madhava's value of pi

To complete the numerical computations one must have a knowledge of the value of pi (π). It is appropriate that we use the value of π computed by Madhava himself. Nilakantha Somayaji has given this value of π in his Āryabhaṭīya-Bhashya as follows:^[4]

A transliteration of the last two lines:

vibudha-netra-gaja-ahi-hutāśana
tri-guṇa-veda-bha-vāraṇa-bāhavaḥ
nava-nikharva-mite vr̥tivistare
paridhi-mānam idaṁ jagadur budhāḥ

The various words indicate certain numbers encoded in a scheme known as the bhūtasaṃkhyā system. The meaning of the words and the numbers encoded by them (beginning with the units place) are detailed in the following translation of the verse: "Gods (vibudha : 33), eyes (netra : 2), elephants (gaja : 8), snakes (ahi : 8), fires (hutāśana : 3), three (tri : 3), qualities (guṇa : 3), vedas (veda : 4), nakṣatras (bha : 27), elephants (vāraṇa : 8), and arms (bāhavaḥ : 2) - the wise say that this is the measure of the circumference when the diameter of a circle is nava-nikharva (900,000,000,000)."

So, the translation of the poem using the bhūtasaṃkhyā system will simply read "2827433388233 is, as the wise say, the circumference of a circle whose diameter is nava-nikharva (900,000,000,000)". That is, divide 2827433388233 (the number from the first two lines of the poem in reverse order) by nava-nikharva (900,000,000,000) to get the value of pi (π). This calculation yields the value π = 3.1415926535922. This is the value of π used by Madhava in his further calculations and is accurate to 11 decimal places.

Example

Madhava's table lists the following digits corresponding to the angle 45.00°:

<math>5\quad 1\quad 1\quad 5\quad 0\quad 3\quad 4\quad 2</math>

This yields the angle with measure

<math>

\begin{align} m & = 2\times 1000 + 4\times 100 + 3\times 10 + 0 \text{ arcminutes}\\

 & = 2430 \text{ arcminutes} \\

s & = 5\times 10 + 1 \text{ arcseconds}\\

 & = 51 \text{ arcseconds}\\

t & = 1\times 10 + 5 \text{ sixtieths of an arcsecond}\\

 & = 15 \text{ sixtieths of an arcsecond}

\end{align} </math> The value of the trigonometric sine of 45.00° as given in Madhava's table is

<math>

\sin 45^\circ = \frac{\pi}{180\times 60}\left( 2430 + \frac{51}{60} + \frac{15}{60\times 60}\right) </math>

Substituting the value of π computed by Madhava in the above expression, one gets sin 45° as 0.70710681.

This value may be compared with the modern exact value of sin 45.00°, namely, 0.70710678.

Comparison of Madhava's and modern sine values

In table below the first column contains the list of the twenty-four angles beginning with 3.75 and ending with 90.00. The second column contains the values tabulated by Madhava in Devanagari in the form in which it was given by Madhava. (These are taken from Malayalam Commentary of Karanapaddhati by P.K. Koru^[5] and are slightly different from the table given in Cultural foundations of mathematics by C.K. Raju.^[2]) The third column contains ISO 15919 transliterations of the lines given in the second column. The digits encoded by the lines in second column are given in Arabic numerals in the fourth column. The values of the trigonometric sines derived from the numbers specified in Madhava's table are listed in the fifth column. These values are computed using the approximate value 3.1415926535922 for π obtained by Madhava. For comparison, the exact values of the trigonometric sines of the angles are given in the sixth column.

Angle A in degrees	Madhava's numbers for specifying sin A			Value of sin A derived from Madhava's table	Modern value of sin A
	in Devanagari script using Katapayadi system (as in Madhava's original table)	in ISO 15919 transliteration scheme	Decoded Values in minutes seconds thirds
(1)	(2)	(3)	(4)	(5)	(6)
03.75	श्रेष्ठं नाम वरिष्ठानां	śreṣṭhaṁ nāma variṣṭhānāṁ	224ʹ 50ʹʹ 22ʹʹʹ	0.06540314	0.06540313
07.50	हिमाद्रिर्वेदभावनः	himādrirvēdabhāvanaḥ	448ʹ 42ʹʹ 58ʹʹʹ	0.13052623	0.13052619
11.25	तपनो भानु सूक्तज्ञो	tapanō bhānu sūktajñō	670ʹ 40ʹʹ 16ʹʹʹ	0.19509032	0.19509032
15.00	मध्यमं विद्धि दोहनं	maddhyamaṁ viddhi dōhanaṁ	889ʹ 45ʹʹ 15ʹʹʹ	0.25881900	0.25881905
18.75	धिगाज्यो नाशनं कष्टं	dhigājyō nāśanaṁ kaṣṭaṁ	1105ʹ 01ʹʹ 39ʹʹʹ	0.32143947	0.32143947
22.50	छन्नभोगाशयाम्बिका	channabhōgāśayāmbikā	1315ʹ 34ʹʹ 07ʹʹʹ	0.38268340	0.38268343
26.25	मृगाहारो नरेशोयं	mr̥gāhārō narēśōyaṁ	1520ʹ 28ʹʹ 35ʹʹʹ	0.44228865	0.44228869
30.00	वीरो रणजयोत्सुकः	vīrō raṇajayōtsukaḥ	1718ʹ 52ʹʹ 24ʹʹʹ	0.49999998	0.50000000
33.75	मूलं विशुद्धं नाळस्य	mūlaṁ viṣuddhaṁ nāḷasya	1718ʹ 52ʹʹ 24ʹʹʹ	0.55557022	0.55557023
37.50	गानेषु विरळा नराः	gāneṣu viraḷā narāḥ	2092ʹ 46ʹʹ 03ʹʹʹ	0.60876139	0.60876143
41.25	अशुद्धिगुप्ता चोरश्रीः	aśuddhiguptā cōraśrīḥ	2266ʹ 39ʹʹ 50ʹʹʹ	0.65934580	0.65934582
45.00	शङ्कुकर्णो नगेश्वरः	śaṅkukarṇō nageśvaraḥ	2430ʹ 51ʹʹ 15ʹʹʹ	0.70710681	0.70710678
48.75	तनुजो गर्भजो मित्रं	tanujō garbhajō mitraṃ	2584ʹ 38ʹʹ 06ʹʹʹ	0.75183985	0.75183981
52.50	श्रीमानत्र सुखी सखे	śrīmānatra sukhī sakhē	2727ʹ 20ʹʹ 52ʹʹʹ	0.79335331	0.79335334
56.25	शशी रात्रौ हिमाहारौ	śaśī rātrou himāhārou	2858ʹ 22ʹʹ 55ʹʹʹ	0.83146960	0.83146961
60.00	वेगज्ञः पथि सिन्धुरः	vēgajñaḥ pathi sindhuraḥ	2977ʹ 10ʹʹ 34ʹʹʹ	0.86602543	0.86602540
63.25	छाया लयो गजो नीलो	chāya layō gajō nīlō	3083ʹ 13ʹʹ 17ʹʹʹ	0.89687275	0.89687274
67.50	निर्मलो नास्ति सत्कुले	nirmalō nāsti satkulē	3176ʹ 03ʹʹ 50ʹʹʹ	0.92387954	0.92387953
71.25	रात्रौ दर्पणमभ्राङ्गं	rātrou darpaṇamabhrāṅgaṁ	3255ʹ 18ʹʹ 22ʹʹʹ	0.94693016	0.94693013
75.00	नागस्तुङ्ग नखो बली	nāgastuṅga nakhō balī	3320ʹ 36ʹʹ 30ʹʹʹ	0.96592581	0.96592583
78.75	धीरो युवा कथालोलः	dhīrō yuvā kathālōlaḥ	3371ʹ 41ʹʹ 29ʹʹʹ	0.98078527	0.98078528
82.50	पूज्यो नारीजनैर्भगः	pūjyō nārījanairbhagaḥ	3408ʹ 20ʹʹ 11ʹʹʹ	0.99144487	0.99144486
86.25	कन्यागारे नागवल्ली	kanyāgārē nāgavallī	3430ʹ 23ʹʹ 11ʹʹʹ	0.99785895	0.99785892
90.00	देवो विश्वस्थली भृगुः	devō viśvasthalī bhr̥ guḥ	3437ʹ 44ʹʹ 48ʹʹʹ	0.99999997	1.00000000

Madhava's method of computation

No work of Madhava detailing the methods used by him for the computation of the sine table has survived. However from the writings of later Kerala mathematicians like Nilakantha Somayaji (Tantrasangraha) and Jyeshtadeva (Yuktibhāṣā) that give ample references to Madhava's accomplishments, it is conjectured that Madhava computed his sine table using the power series expansion of sin x.

<math>

\sin x = x - \frac{x^3}{3!} + \frac{x^5}{5!} - \frac{x^7}{7!} + \cdots </math>

See also

• Indian sine tables
• Surya Siddhanta
• Indian standard circle

References

Further references

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• For an account of Madhava's computation of the sine table see : Van Brummelen, Glen (2009). The mathematics of the heavens and the earth : the early history of trigonometry. Princeton: Princeton University Press. pp. 113–120. ISBN 978-0-691-12973-0.<templatestyles src="Module:Citation/CS1/styles.css"></templatestyles>
• For a thorough discussion of the computation of Madhava's sine table with historical references : C.K. Raju (2007). Cultural foundations of mathematics: The nature of mathematical proof and the transmission of calculus from India to Europe in the 16 thc. CE. History of Philosophy, Science and Culture in Indian Civilization. X Part 4. Delhi: Centre for Studies in Civilizations. pp. 114–123.<templatestyles src="Module:Citation/CS1/styles.css"></templatestyles>

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