01911cam a2200385M  4500003000800000005001700008008004100025020001800066020001500084020001800099020001500117020001800132020001500150020001500165020001800180020001500198020001800213072002500231072001500256082002800271100002100299245004500320260004100365300002200406520081600428650001801244650001601262650003901278650001601317650001201333856005401345856006901399856002101468856003601489FlBoTFG20260416145738.0250130s2025    xx      o     0|| 0 eng d  a9781040327050  a1040327052  a9781032687728  a103268772X  a9781040327074  a1040327079  z1032687703  z9781032687704  z1032686197  z9781032686196 7aMATx0080002bisacsh 7aPB2bicssc04a511.36223/eng/202502041 aDeBonis, Mark J.10aBeginner’s guide to mathematical proof  a[S.l.] :bCHAPMAN & HALL CRC,c2025.  a1 online resource  aA Beginners Guide to Mathematical Proof prepares mathematics majors for the transition to abstract mathematics, as well as introducing a wider readership of quantitative science students, such as engineers, to the mathematical structures underlying more applied topics. The text is designed to be easily utilized by both instructor and student, with an accessible, step-by-step approach requiring minimal mathematical prerequisites. The book builds towards more complex ideas as it progresses but never makes assumptions of the reader beyond the material already covered. Features No mathematical prerequisites beyond high school mathematics Suitable for an Introduction to Proofs course for mathematics majors and other students of quantitative sciences, such as engineering Replete with exercises and examples 0aProof theory. 0aMathematics 7aMATHEMATICS / Discrete Mathematics 0xPhilosophy. 72bisacsh40uhttps://www.taylorfrancis.com/books/978103268772842uhttp://www.oclc.org/content/dam/oclc/forms/terms/vbrl-201703.pdf403Taylor & Francis423OCLC metadata license agreement