Dani (2006): "The book really consists of a compilation of tricks in elementary arithmetic and algebra, to be applied in computations with numbers and polynomials. By a 'trick' I do not mean a sleight of hand or something like that; in a general sense a trick is a method or procedure which involves observing and exploring some special features of a situation, which generally tend to be overlooked; for example, the trick described for finding the square of numbers like 15 and 25 with 5 in the unit’s place makes crucial use of the fact of 5 being half of 10, the latter being the base in which the numbers are written." Dani, S. G. (2006) [1993]. "Myths and reality: On 'Vedic Mathematics'"(PDF). In Kandasamy, W. B. Vasantha; Smarandache, Florentin (eds.). Vedic Mathematics, 'Vedic' or 'Mathematics': A Fuzzy & Neutrosophic Analysis(PDF). Gallup, New Mexico: Multimedia Larga. ISBN978-1-59973-004-2. Archived from the original(PDF) on 6 January 2022. Retrieved 23 May 2013.
Huddar, S. R.; Rupanagudi, S. R.; Kalpana, M.; Mohan, S. (2013). "Novel high speed vedic mathematics multiplier using compressors". 2013 International Mutli-Conference on Automation, Computing, Communication, Control and Compressed Sensing (IMac4s). IEEE. pp. 465–469. doi:10.1109/iMac4s.2013.6526456. ISBN978-1-4673-5090-7. S2CID11124644.
Mehta, Parth; Gawali, Dhanashri (2009). "Conventional versus Vedic Mathematical Method for Hardware Implementation of a Multiplier". 2009 International Conference on Advances in Computing, Control, and Telecommunication Technologies. IEEE. pp. 640–642. doi:10.1109/ACT.2009.162. ISBN978-1-4244-5321-4. S2CID6773150.
Behera, Navnita Chadha (1 July 1996). "Perpetuating the divide: Political abuse of history in South Asia". Contemporary South Asia. 5 (2): 191–205. doi:10.1080/09584939608719789. ISSN0958-4935.
Hasan, Mushirul (1 December 2002). "The BJP's intellectual agenda: Textbooks and imagined history". South Asia: Journal of South Asian Studies. 25 (3): 187–209. doi:10.1080/00856400208723498. ISSN0085-6401. S2CID143341141.
Sikand, Yoginder (2009). "Voices for Reform in the Indian Madrasas". In Noor, Farish A.; Sikand, Yoginder; Bruinessen, Martin van (eds.). The madrasa in Asia : political activism and transnational linkages. ISIM Series on Contemporary Muslim Societies. Amsterdam University Press. p. 61. ISBN978-81-7304-837-1. JSTORj.ctt46n10w. OCLC912632940.
Huddar, S. R.; Rupanagudi, S. R.; Kalpana, M.; Mohan, S. (2013). "Novel high speed vedic mathematics multiplier using compressors". 2013 International Mutli-Conference on Automation, Computing, Communication, Control and Compressed Sensing (IMac4s). IEEE. pp. 465–469. doi:10.1109/iMac4s.2013.6526456. ISBN978-1-4673-5090-7. S2CID11124644.
Mehta, Parth; Gawali, Dhanashri (2009). "Conventional versus Vedic Mathematical Method for Hardware Implementation of a Multiplier". 2009 International Conference on Advances in Computing, Control, and Telecommunication Technologies. IEEE. pp. 640–642. doi:10.1109/ACT.2009.162. ISBN978-1-4244-5321-4. S2CID6773150.
Hasan, Mushirul (1 December 2002). "The BJP's intellectual agenda: Textbooks and imagined history". South Asia: Journal of South Asian Studies. 25 (3): 187–209. doi:10.1080/00856400208723498. ISSN0085-6401. S2CID143341141.
Dani (2006): "The book really consists of a compilation of tricks in elementary arithmetic and algebra, to be applied in computations with numbers and polynomials. By a 'trick' I do not mean a sleight of hand or something like that; in a general sense a trick is a method or procedure which involves observing and exploring some special features of a situation, which generally tend to be overlooked; for example, the trick described for finding the square of numbers like 15 and 25 with 5 in the unit’s place makes crucial use of the fact of 5 being half of 10, the latter being the base in which the numbers are written." Dani, S. G. (2006) [1993]. "Myths and reality: On 'Vedic Mathematics'"(PDF). In Kandasamy, W. B. Vasantha; Smarandache, Florentin (eds.). Vedic Mathematics, 'Vedic' or 'Mathematics': A Fuzzy & Neutrosophic Analysis(PDF). Gallup, New Mexico: Multimedia Larga. ISBN978-1-59973-004-2. Archived from the original(PDF) on 6 January 2022. Retrieved 23 May 2013.
Dani (2006): "The book really consists of a compilation of tricks in elementary arithmetic and algebra, to be applied in computations with numbers and polynomials. By a 'trick' I do not mean a sleight of hand or something like that; in a general sense a trick is a method or procedure which involves observing and exploring some special features of a situation, which generally tend to be overlooked; for example, the trick described for finding the square of numbers like 15 and 25 with 5 in the unit’s place makes crucial use of the fact of 5 being half of 10, the latter being the base in which the numbers are written." Dani, S. G. (2006) [1993]. "Myths and reality: On 'Vedic Mathematics'"(PDF). In Kandasamy, W. B. Vasantha; Smarandache, Florentin (eds.). Vedic Mathematics, 'Vedic' or 'Mathematics': A Fuzzy & Neutrosophic Analysis(PDF). Gallup, New Mexico: Multimedia Larga. ISBN978-1-59973-004-2. Archived from the original(PDF) on 6 January 2022. Retrieved 23 May 2013.
Cooke, Roger L. (2013). "Overview of Mathematics in India". The history of mathematics : a brief course. Hoboken, N.J.: Wiley. p. 212. ISBN978-1-118-46029-0. OCLC865012817.
Behera, Navnita Chadha (1 July 1996). "Perpetuating the divide: Political abuse of history in South Asia". Contemporary South Asia. 5 (2): 191–205. doi:10.1080/09584939608719789. ISSN0958-4935.
Hasan, Mushirul (1 December 2002). "The BJP's intellectual agenda: Textbooks and imagined history". South Asia: Journal of South Asian Studies. 25 (3): 187–209. doi:10.1080/00856400208723498. ISSN0085-6401. S2CID143341141.
Sikand, Yoginder (2009). "Voices for Reform in the Indian Madrasas". In Noor, Farish A.; Sikand, Yoginder; Bruinessen, Martin van (eds.). The madrasa in Asia : political activism and transnational linkages. ISIM Series on Contemporary Muslim Societies. Amsterdam University Press. p. 61. ISBN978-81-7304-837-1. JSTORj.ctt46n10w. OCLC912632940.