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Aditi Ranjan (née Shirali; born 25 February 1952) is an Indian textile designer, educator and researcher involved in the field of Indian crafts. [1] She taught textile design at the National Institute of Design, Ahmedabad from 1974 to 2012. [ 2 ]
The 30th edition (1996) was renamed CRC Standard Mathematical Tables and Formulae, with Daniel Ian Zwillinger as the editor-in-chief. [2] The 33rd edition (2018) was renamed CRC Standard Mathematical Tables and Formulas. [3]
Bamfaad (lit. ' Explosive ') is a 2020 Indian romantic action film directed by Ranjan Chandel starring Aditya Rawal and Shalini Pandey in their first lead film. [1] The film was released on 10 April 2020. [2]
Bronshtein and Semendyayev is a comprehensive handbook of fundamental working knowledge of mathematics and table of formulas based on the Russian book Справочник по математике для инженеров и учащихся втузов (Spravochnik po matematike dlya inzhenerov i uchashchikhsya vtuzov, literally: "Handbook of mathematics for engineers and students of ...
The Discovery by Aditya Vardhan: Sharadiya Sandesh (written 1983) On a train, the trio of Feluda, Topesh, and Laal Mohon Ganguly meets a scientist named Aditya Vardhan who has found an alternative formula to petrol oil. A man comes to their compartment to meet them and tells the scientist that he is interested to buy the formula and leaves.
He published the Molesworth's Pocket Book of Engineering Formulae. This useful little volume contained formulas and details on many engineering related subjects. The first edition was published in November 1862 and ran to over thirty editions (The twenty-eighth edition [9] was published in 1921). His other works include: State Railways in India ...
Beiji qianjin yaofang (traditional Chinese: 備急千金要方; simplified Chinese: 备急千金要方; pinyin: Bèijí qiānjīn yàofāng), [a] literally Essential Formulas Worth a Thousand in Gold for Emergencies, [2] is a Chinese medical text by Tang-dynasty physician Sun Simiao, first published in 652. A sequel was published in 682.
More formulas of this nature can be given, as explained by Ramanujan's theory of elliptic functions to alternative bases. Perhaps the most notable hypergeometric inversions are the following two examples, involving the Ramanujan tau function τ {\displaystyle \tau } and the Fourier coefficients j {\displaystyle \mathrm {j} } of the J-invariant ...