विकिस्रोतः तः
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एतत् पृष्ठम् अपरिष्कृतम् अस्ति

112 Verses 15 to 17 relate to the case when the given interpolator corresponds to the actual values of the dividend and divisor, and verse 18 to the case when the given interpolator corresponds to the abraded dividend and abrad ed divisor 2-8. When the dividend is greater than the divisor: Ex. 4. हारादधिके भाज्ये हाराप्तं भाजितं पृथक्कृत्य । वल्युपहारान्तं पूर्वोक्त कर्म निष्पाद्य ।। १९ ।। तत्रोपरिराश्याहतपृथक्स्थसहितो भवेदधोराशिः एष विशेषो गदितः परमपि तुल्यं पुरोक्तन ॥ २० ॥1 i.e., “when the dividend is greater than the divisor, divide the dividend by the divisor and set down the quotient (obtained) in a separate place. Then (treating the remainder of the divi sion as the new dividend) having carried out the aforesaid ope rations ending in the reduction of the chain (of quotients), increase the lower number (of the reduced chain) by the prod uct of the upper number (of the reduced chain) and the quotient written in a separate place. This has been stated to be the difference (in this case); the other things are the same as stated before ' Solve the pulveriser Since the dividend 23 is greater than the divisor 7, we divide 23 by 7 Thus we get 3 as quotient and 2 as remainder. Treating 2 as the new divid end, we solve the pulveriser 2-1 The chain of quotient thus obtained is