![]() ![]() Please also find in Sections 2 & 3 below video 1 – Introduction to Recurrence Relations, video 2 – Limit of a Sequence, video 3 – Recurrence Relation from a Sequence, mind maps (see under Sequences) and worksheets on this topic to help your understanding. To learn about Sequences please click on the Sequences Theory (HSN) link. Clear, easy to follow, step-by-step worked solutions to all worksheets below are available in the Online Study Pack. Thanks to the SQA and authors for making the excellent resources below freely available. Please use regularly for revision prior to assessments, tests and the final exam. Exam Focused Online Study Pack – For students looking for a ‘good’ Pass Higher Maths Past Paper Video SolutionsĢ1. Higher Maths Practice Unit Assessments – Solutions Includedġ9. Old Higher Maths Exam Questions by Topicġ8. 264 SQA Exam Multiple Choice Questions & Answersġ4. Practice Exam Papers A to H – Answers Includedġ2. 40 Non-Calculator Higher Maths Questions & Answersġ1. Higher Maths Videos, Theory Guides, Mind Maps & Worksheetsĩ. Higher Maths Past & Practice Papers by Topicħ. Sequences – Videos, Theory Guides & Mind MapsĦ. We hope you find this website useful and wish you the very best of success with your Higher Maths course in 2024. Please find below:ģ. To access a wealth of additional free resources by topic please either use the above Search Bar or click HERE selecting on the topic you wish to study. Please do your very best to keep on top of your studies.įor students looking for extra help with the Higher Maths course you may wish to consider subscribing to the fantastic additional exam focused resources available in the Online Study Pack. Passing the fast paced Higher Maths course significantly increases your career opportunities by helping you gain a place on a college/university course, apprenticeship or even landing a job. A ‘good’ pass at Higher Maths will set you up well for the AH Maths Course next year should you be interested. Math.A sound understanding of Sequences is essential to ensure exam success. Wilf, H.S., Zeilberger, D.: An algorithmic proof theory for hypergeometric (ordinary and “ \(q\)”) multisum/integral identities. Wang, L.X.W.: Higher order Turán inequalities for combinatorial sequences. Rosset, S.: Normalized symmetric functions, Newton’s inequalities and a new set of stronger inequalities. ![]() Pólya, G., Schur, J.: Über zwei Arten von Faktorenfolgen in der Theorie der algebraischen Gleichungen (German). Pólya, G.: Über die algebraisch-funktionentheoretischcen Untersuchungen von J. ![]() Petkovšek, M., Wilf, H.S., Zeilberger, D.: A=B, A. Niculescu, C.P.: A new look at Newton’s inequalities. Moll, V.H.: Combinatorial sequences arising from a rational integral. Moll, V.H.: The evaluation of integrals: a personal story. Kauers, M., Paule, P.: A computer proof of Moll’s log-concavity conjecture. Jensen, J.L.W.V.: Recherches sur la théorie des équations. Hou, Q.-H., Li, G.: Log-concavity of \(P\)-recursive sequences. Guo, J.J.F.: Higher order Turán inequalities for Boros-Moll sequences. Guo, J.J.F.: An inequality for coefficients of the real-rooted polynomials. Griffin, M., Ono, K., Rolen, L., Zagier, D.: Jensen polynomials for the Riemann zeta function and other sequences. 296(2), 521–541 (1986)Ĭsordas, G., Varga, R.S.: Necessary and sufficient conditions and the Riemann hypothesis. 136(2), 241–260 (1989)Ĭsordas, G., Norfolk, T.S., Varga, R.S.: The Riemann hypothesis and the Turán inequalities. 56(3), 701–722 (2013)Ĭraven, T., Csordas, G.: Jensen polynomials and the Turán and Laguerre inequalities. 254(1), 89–99 (2011)Ĭhen, W.Y.C., Xia, E.X.W.: The ratio monotonicity of the Boros-Moll polynomials. 141–203, Cambridge University Press, CambridgeĬhen, W.Y.C., Dou, D.Q.J., Yang, A.L.B.: Brändén’s conjectures on the Boros-Moll polynomials. Academic Press Inc, New York (1954)Ĭhen, W.Y.C.: The spt-function of Andrews. Cambridge University Press, Cambridge (2004)īrändén, P.: Iterated sequences and the geometry of zeros. 237(1), 272–287 (1999)īoros, G., Moll, V.H.: The double square root, Jacobi polynomials and Ramanujan’s master theorem. Boros, G., Moll, V.H.: A sequence of unimodal polynomials. ![]()
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