Algebra: Difference between revisions
(→Citations: added) |
(Citation updated) |
||
Line 80: | Line 80: | ||
धनयोर्धनमृणमृणयोर्धनर्णयोरन्तरं समैक्यं खम् । | धनयोर्धनमृणमृणयोर्धनर्णयोरन्तरं समैक्यं खम् । | ||
ऋणमैक्यं च धनमृणधनशून्ययोः शून्ययोः शून्यम् ॥ | ऋणमैक्यं च धनमृणधनशून्ययोः शून्ययोः शून्यम् ॥<ref>Brahma-sphuţa-siddhānta (ch.18, vs.30, p.309)</ref> | ||
Brahmagupta (62.8) says: | Brahmagupta (62.8) says: | ||
Line 91: | Line 89: | ||
ऊनमधिकाद्विशोध्यं धनं धनादृणमृणादधिकमूनम् । | ऊनमधिकाद्विशोध्यं धनं धनादृणमृणादधिकमूनम् । | ||
व्यस्तं तदन्तरं स्यादृणं धनं धनमृणं भवति ॥<ref>Brahma-sphuta-siddhanta, ch.18, vs.31 | व्यस्तं तदन्तरं स्यादृणं धनं धनमृणं भवति ॥<ref>Brahma-sphuta-siddhanta, ch.18, vs.31 p.309</ref> | ||
Brahmagupta writes: "From the greater should be subtracted the smaller; (the final result is) positive, if positive from positive. and negative, if negative from negative. If, however, the greater is subtracted from the less, that difference is reversed (in sign). negative ,becomes positive and 'positive becomes negative. When positive is to be subtracted from negative or negative from positive then they must be added together. | Brahmagupta writes: "From the greater should be subtracted the smaller; (the final result is) positive, if positive from positive. and negative, if negative from negative. If, however, the greater is subtracted from the less, that difference is reversed (in sign). negative ,becomes positive and 'positive becomes negative. When positive is to be subtracted from negative or negative from positive then they must be added together. | ||
Line 101: | Line 97: | ||
शून्यर्णयो: खधनयो: खशून्ययोर्वा वधः शून्यम् ॥<ref>Brahma-sphuţa-siddhānta (ch.18, vs.33, p.310)</ref> | शून्यर्णयो: खधनयो: खशून्ययोर्वा वधः शून्यम् ॥<ref>Brahma-sphuţa-siddhānta (ch.18, vs.33, p.310)</ref> | ||
Brahmagupta says:"The product of a positive and a negative number is negative; product of two negatives is positive; product of positive multiplied by positive is positive. The product of zero and negative, or of zero and positive is zero. Product of two zeroes is zero. | Brahmagupta says:"The product of a positive and a negative number is negative; product of two negatives is positive; product of positive multiplied by positive is positive. The product of zero and negative, or of zero and positive is zero. Product of two zeroes is zero. | ||
Line 110: | Line 104: | ||
भक्तमृणेन धनमृणं धनेन हृतमृणमृणं भवति ॥<ref>Brahma-sphuta-siddhanta (ch.18, vs.34, p.310)</ref> | भक्तमृणेन धनमृणं धनेन हृतमृणमृणं भवति ॥<ref>Brahma-sphuta-siddhanta (ch.18, vs.34, p.310)</ref> | ||
Brahmagupta states: "Positive divided by positive or negative divided by negative becomes positive. But positive divided by negative is negative and negative divided by positive remains negative. | Brahmagupta states: "Positive divided by positive or negative divided by negative becomes positive. But positive divided by negative is negative and negative divided by positive remains negative. |
Revision as of 16:36, 22 January 2022
Algebra is one of the broad areas of Mathematics. The Hindu name for the science of algebra is bījagaṇita. Bīja means "element" or "analysis" and gaṇita means " the science of calculation". Bījagaṇita literally means "science of calculation with elements or the science of analytical calculation.
Brahmagupta (628) calls algebra as kuṭṭaka - gaṇita or kuṭṭaka. Kuṭṭaka means pulveriser. Algebra is also called as avyakta - gaṇita or the science of calculation with unknowns (avyakta means unknown) in contrast to the name vyakta - gaṇita the science of calculation with knowns (vyakta means known) for arithmetic including geometry and mensuration.
Definition
Bhāskara II (1150) has defined Algebra as "Analysis (bīja) is certainly the innate intellect assisted by the various symbols (varṇa), which, for the instruction of duller intellects, has been expounded by the ancient sages who enlighten mathematicians as the sun irradiates the lotus; that has now taken the name algebra (bījagaṇita)".
That algebraic analysis' requires keen intelligence and sagacity has been observed by him on more than one occasion.
"Neither does analysis consist in symbols, nor are there different kinds of analyses; sagacity alone is analysis, for wide is imagination. "Analysis is certainly clear intelligence". "Or intelligence alone is analysis".In answer to the question, "if (unknown quantities) are to be discovered by intelligence alone what then is the need of analysis ?" he says, "Because intelligence is certainly the real analysis; symbols are its helps. The innate intelligence which has been expressed for the duller intellects by the ancient sages, who enlighten mathematicians as the sun irradiates the lotus, with the help of various symbols, has now obtained the name of algebra.
Thus, according to Bhāskara II, algebra may be defined as the science which treats of numbers expressed by means of symbols, and in which there is scope and primary need for intelligent artifices and ingenious devices.
Origin
The .origin of Hindu algebra can be definitely traced back to the period of the śulba (800-500 B.C.) and the Brāhmaṇa (c. 2000
B.C.).
Technical Terms
Unknown Quantiy
The unknown quantity was called in the Sthānāṅga-sūtra (before 300 B.C.) yāvat - tāvat (as many as or so much as, meaning an arbitrary quantity). In the so-called Bakhshālī treatise, it was called yadṛcchā , vāñcā or kāmika (any desired quantity).This term was originally connected with the Rule of False Position. āryabhaṭa I (499) calls the unknown quantity as gulikā (shot). This term strongly leads one to suspect that the shot was probably then used to represent the unknown. From the beginning of the seventh century the Hindu algebraists are found to have more commonly employed the term avyakta (unknown).
Equation
The equation is called by Brahmagupta (628) sama-karaṇa or samī- karaṇa (making equal) or more simply sama (equation). pṛthūdakasvāmī (860) employs also the term sāmya (equality or equation); and Sripati (1039) sadṛśī- karaṇa (making similar). Narayana (1350) uses the terms samī- karaṇa , sāmya and samatva (equality). An equation has always two pakṣa (side).
Absolute Term
In the Bakhshālī treatise the absolute term is called dṛśya (visible). In later Hindu algebras it has been replaced by a closely allied term rūpa (appearance), though it continued to be employed in treatises on arithmetic. Thus the true significance of the Hindu name for the absolute term in an algebraic equation is obvious. It represents the visible or known portion of the equation while its other part is practically invisible or unknown.
Power
The oldest Hindu terms for the power of a quantity, known or unknown, are found in the Uttarādhyayana-sūtra (c. 300 B.C. or earlier). In it the second power is called varga (square), the third power ghana ( cube), the fourth power varga-varga (square-square), the sixth power ghana-varga (cube-square), and the twelfth power ghana-varga-varga (cube-square-square), using the multiplicative instead of the additive principle. In this work we do not find any method for indicating odd powers higher than the third. In later times, the fifth power is called varga-ghana-ghāta(product of cube and square, ghāta = product), the seventh power varga-varga-ghana-ghāta (product of square-square and cube) and so on. Brahmagupta's system of expressing powers higher than the fourth is scientifically better. He calls the fifth power pañca-gata (literally, raised to the fifth), the sixth power ṣaḍ-gata (raised to the sixth) ; similarly the term for any power is coined by adding the suffix gata to the name of the number indicating that power. Bhāskara II has sometimes followed it consistently for the powers one and upwards. In the Anuyogadvāra-sūtra, a work written before the commencement of the Christian Era, we find certain interesting terms for higher powers, integral as well as fractional, particularly successive squares (varga) and square-roots (varga-mūla). According to it the term prathama-varga (first square) of a quantity, say a2 means a; dvitīyavarga (second square) = (a2)2 = a4 ; tṛtīya -varga (third square) = ((a2)2 )2 = a8 and so on. In general, nth varga of a = a2x2x2x ……. to n terms =a2ⁿ. Similarly, prathama-varga-mūla (first square-root) means √a ; dvitīya-varga-mūla (second square-root) =√ (√a) = a1/4 ; and, in general, nth varga-mūla of a = a1/2ⁿ
Again we find the term tṛtīya-varga-mūla-ghana (cube of the third square-root) for (a1/23)3 = a3/8•
The term varga for "square" has an interesting origin in a purely concrete concept. The Sanskrit word varga literally means "rows," or "troops" (of similar things). Its application as a mathematical term originated in the graphical representation of a square, which was divided into as many varga or troops of small squares, as the side contained units of some measure.
Coefficient
In Hindu algebra there is no systematic use of any special term for the coefficient. Ordinarily, the power of the unknown is mentioned when the reference is to the coefficient of that power. In explanation of similar use by Brahmagupta his commentator pṛthūdakasvāmī writes "the number (aṅka) which is' the coefficient of the square of the unknown is called the 'square' and the number which forms the coefficient of the ( simple) unknown is called 'the unknown quantity. However, occasional use of a technical term is also met with. Brahmagupta once calls the coefficient saṃkhyā (number) and on several other occasions guṇaka, or guṇākara (multiplier). pṛthūdakasvāmī (860) calls it aṅka (number) or prakṛti (multiplier). These terms reappear in the works of Sripati (1039)5 and Bhāskara II (1150). The former also used rūpa for the same purpose.
Symbols
Symbols of Operation. There are no special symbols for the fundamental operations in the Bakhshālī work. Any particular operation intended is ordinarily indicated by placing the tachygraphic abbreviation, the initial syllable of a Sanskrit word of that import, after, occasionally before, the quantity affected. Thus the operation of addition is indicated by yu (an abbreviation from yuta, meaning added), subtraction by + which is very probably from kṣa (abbreviated from kṣaya, diminished), multiplication by gu (from guṇa or guṇita, multiplied) and division by bhā (from bhāga or bhājita or, divided).
Bhāskara II (1150) says, "Those (known and unknown numbers) which are negative should be written with a dot (bindu) over them."
Symbols for Powers and Roots. The symbols for powers and roots are abbreviations of Sanskrit words of those imports and are placed after the number
affected. Thus the. square is represented by va (from varga), cube by gha (from ghana), the fourth power by va-va (from varga-varga), the fifth power by va-gha-ghā (from varga-ghana-ghāta), the sixth power by gha-va (from ghana-varga), the seventh power by va-va-gha-ghā (from varga-varga-ghana-ghāta) and so on. The product of two or more unknown quantities is indicated by writing bhā (from bhāvita, product) after the unknowns with or without interposed dots; e.g., yāva-kāgha-bhā or yāvakāghabhā means (yā)2 (kā)3. In the Bakhshali treatise the square-root of a quantity is indicated by writing after it mū which is an abbreviation for mūla (root).
For instance
11 yu 5 mū 4
1 1 1
Means √(11+5) = 4
and
11 7+ mū 2
1 1 1
Means √(11 -7) = 2
In other treatises the symbol of the square-root is ka (from karaṇī, root or surd) which is usually placed before the quantity affected.
For example ka 9 ka 450 ka 75 ka 54 means √9 + √450 + √ 75 + √54
Symbols for Unknowns
Bhāskara II (1150) observes, "Here (in algebra) the initial letters of (the names of) knowns and unknowns should be written for implying them." It has been stated before that at one time the unknown quantity was called yāvat-tāvat (as many as, so much as). In later times this name, or its abbreviation yā is used for the unknown.
Bhāskara II (1150) says: "yāvat-tāvat (so much as), kālaka (black), nīlaka, (blue), pīta (yellow), lohita (red) and other colours have been taken by the venerable professors as notations for the measures of the unknowns, for the purpose of calculating with them."
"In those examples where occur two, three or more unknown quantities, colours such as yāvat-tāvat, etc., should be assumed for them. As assumed by the previous teachers, they are: yāvat-tāvat (so much as), kālaka (black), nīlaka (blue), pītaka (yellow), lohitaka (red), harītaka (green), śvetaka (white), citraka (variegated), kapilaka (tawny) , piṅgalaka (reddish-brown), dhūmraka (smoke-coloured), pātalaka (pink), śavalaka (spotted), śyāmalaka (blackish), mecaka (dark blue) etc. Or the letters of alphabets beginning with ka, should be taken as the measures of the unknowns in order to prevent confusion.
Laws Of Signs
Addition
धनयोर्धनमृणमृणयोर्धनर्णयोरन्तरं समैक्यं खम् ।
ऋणमैक्यं च धनमृणधनशून्ययोः शून्ययोः शून्यम् ॥[1]
Brahmagupta (62.8) says:
"The sum of two positive numbers is positive. Sum of two negative numbers is negative. Sum of a positive and a negative number is their difference. If positive and negative numbers are equal, their sum is zero. The sum of zero and negative is negative. Sum of a positive number and zero is positive. Sum of two zeroes is zero."
Subtraction
ऊनमधिकाद्विशोध्यं धनं धनादृणमृणादधिकमूनम् ।
व्यस्तं तदन्तरं स्यादृणं धनं धनमृणं भवति ॥[2]
Brahmagupta writes: "From the greater should be subtracted the smaller; (the final result is) positive, if positive from positive. and negative, if negative from negative. If, however, the greater is subtracted from the less, that difference is reversed (in sign). negative ,becomes positive and 'positive becomes negative. When positive is to be subtracted from negative or negative from positive then they must be added together.
Multiplication
ऋणमृणधनयोर्घातो धनमृणयोर्धनवधो धनं भवति ।
शून्यर्णयो: खधनयो: खशून्ययोर्वा वधः शून्यम् ॥[3]
Brahmagupta says:"The product of a positive and a negative number is negative; product of two negatives is positive; product of positive multiplied by positive is positive. The product of zero and negative, or of zero and positive is zero. Product of two zeroes is zero.
Division
धनभक्तं धनमृणहृतमृणं धनं भवति खं खभक्तं खम्।
भक्तमृणेन धनमृणं धनेन हृतमृणमृणं भवति ॥[4]
Brahmagupta states: "Positive divided by positive or negative divided by negative becomes positive. But positive divided by negative is negative and negative divided by positive remains negative.
Evolution and Involution
Brahmagupta says:
. "The square of a positive or a negative number is positive . The (sign of the) root is the same as was that from which the square was derived."
Bhāskara II: "The square of a positive and a negative number is positive; the square-root of a positive number is positive as well as negative. There is no square-root of a negative number, because it is non-square."
Fundamental Operations
Number of Operations
The Number of fundamental operations in algebra is recognised by all Hindu algebraists to be six, namely " addition, subtraction, multiplication,
division, squaring and the extraction of the square-root. So the cubing and the extraction of the cube-root which are included amongst the fundamental operations of arithmetic, are excluded from algebra.
But the formula
(a + b)3 = a3 + 3a2b + 3ab2 + b3
(a + b)3 = a3 + 3ab(a+b) + b3,
is found to have been given, as stated before, in almost all the Hindu treatises on arithmetic beginning with that of Brahmagupta (628).
Addition and Subtraction
Brahmagupta says: Of the unknowns, their squares, cubes, fourth powers, fifth powers, sixth powers, etc., addition and subtraction are (performed) of the like; of the unlike (they mean simply their) statement severally.
Bhāskara II:
"Addition and subtraction are performed of those of the same species (jāti) amongst unknowns; of different species they mean their separate statement."
Multiplication
Brahmagupta says: The product of two like unknowns is a square; the product of three or more like unknowns is a power of that designation. The multiplication of unknowns of unlike species is the same as the mutual product of symbols; it is called bhāvita (product or factum).
Division
Bhāskara II states: By whatever unknowns and knowns, the divisor is multiplied (severally) and subtracted from the dividend
successively so that no residue is left, they constitute the quotients at the successive stages.
Squaring
The rule for squaring of an algebraic expression is the same as the treatises on arithmetic,
(a+b)² =a²+b²+2ab
or in its general form
(a+b+c+d+ ... )2=a2+b2+c2+d2+ ..+2Σab.
Square-root
For finding the square-root of an algebraic expression Bhāskara II gives the following rule:
"Find the square-root, of the unknown quantities which are squares; then deduct from the remaining terms twice the products of those roots two and two; if there
be known terms, proceed with the remainder in the same way after taking the square-root of the knowns."