Trigonometric integral

Results: 250



#Item
171Another proof that ζ(2) = π 2 /6 via double integration Tim Jameson (Slightly modified version of Math. Gazette[removed]), note[removed]Over the years several proofs that ∞

Another proof that ζ(2) = π 2 /6 via double integration Tim Jameson (Slightly modified version of Math. Gazette[removed]), note[removed]Over the years several proofs that ∞

Add to Reading List

Source URL: www.maths.lancs.ac.uk

Language: English - Date: 2013-12-02 05:15:37
172Three answers to an integral Graham Jameson and Nicholas Jameson Article published in Math. Gazette[removed]), 457–459. Problem: By a suitable substitution, find Z

Three answers to an integral Graham Jameson and Nicholas Jameson Article published in Math. Gazette[removed]), 457–459. Problem: By a suitable substitution, find Z

Add to Reading List

Source URL: www.maths.lancs.ac.uk

Language: English - Date: 2010-05-05 05:32:58
173Inequalities for the perimeter of an ellipse G.J.O. Jameson, Math. Gazette[removed]The perimeter of the ellipse x2 /a2 + y 2 /b2 = 1 is 4J(a, b), where J(a, b) is the “elliptic integral” π/2

Inequalities for the perimeter of an ellipse G.J.O. Jameson, Math. Gazette[removed]The perimeter of the ellipse x2 /a2 + y 2 /b2 = 1 is 4J(a, b), where J(a, b) is the “elliptic integral” π/2

Add to Reading List

Source URL: www.maths.lancs.ac.uk

Language: English - Date: 2014-03-31 07:11:23
174Some remarkable integrals derived from a simple algebraic identity G.J.O. Jameson and T.P. Jameson, Math. Gazette[removed]The identity in question really is simple: it says, for u 6= −1, 1 1

Some remarkable integrals derived from a simple algebraic identity G.J.O. Jameson and T.P. Jameson, Math. Gazette[removed]The identity in question really is simple: it says, for u 6= −1, 1 1

Add to Reading List

Source URL: www.maths.lancs.ac.uk

Language: English - Date: 2013-02-20 09:36:33
175Ft_03_6.mcd[removed]The Fourier Transform, Part III: The Fourier transform is a mathematical method to describe a continuous function as a series of

Ft_03_6.mcd[removed]The Fourier Transform, Part III: The Fourier transform is a mathematical method to describe a continuous function as a series of

Add to Reading List

Source URL: science.widener.edu

Language: English - Date: 1997-07-23 10:18:43
176Nmr_03_6.mcd[removed]NMR Part III, Quadrature Phase Cycling Quadrature phase cycling removes spectral artifacts created by non-ideal conditions in the NMR

Nmr_03_6.mcd[removed]NMR Part III, Quadrature Phase Cycling Quadrature phase cycling removes spectral artifacts created by non-ideal conditions in the NMR

Add to Reading List

Source URL: science.widener.edu

Language: English - Date: 1997-06-25 17:40:12
177Maplets for Calculus: Improving Student Skills and Understanding in Calculus Douglas B. Meade, University of South Carolina, [removed] Philip B. Yasskin, Texas A&M University, [removed] Maplets for Ca

Maplets for Calculus: Improving Student Skills and Understanding in Calculus Douglas B. Meade, University of South Carolina, [removed] Philip B. Yasskin, Texas A&M University, [removed] Maplets for Ca

Add to Reading List

Source URL: m4c.math.tamu.edu

Language: English - Date: 2012-03-13 19:32:22
178CET – MATHEMATICS – 2014 VERSION CODE: C – 2 1. Which one of the following is not correct for the features of exponential function given by f (x) = bx where b > 1?

CET – MATHEMATICS – 2014 VERSION CODE: C – 2 1. Which one of the following is not correct for the features of exponential function given by f (x) = bx where b > 1?

Add to Reading List

Source URL: www.expertclasses.org

Language: English - Date: 2014-05-03 09:11:47
179Math[removed]Week 4 Recitation (Fall[removed]If, when solving these problems, you encounter an integral you’ve already evaluated in an earlier problem on the worksheet, you should use that result, rather than solving the s

Math[removed]Week 4 Recitation (Fall[removed]If, when solving these problems, you encounter an integral you’ve already evaluated in an earlier problem on the worksheet, you should use that result, rather than solving the s

Add to Reading List

Source URL: mixedmath.files.wordpress.com

Language: English - Date: 2013-09-28 15:22:03
180i i Jürgen Jahns and Stefan Helfert: Introduction to Micro- and Nanooptics — Chap. jahns8917c01 — [removed] — page 1 — le-tex

i i Jürgen Jahns and Stefan Helfert: Introduction to Micro- and Nanooptics — Chap. jahns8917c01 — [removed] — page 1 — le-tex

Add to Reading List

Source URL: www.wiley-vch.de

Language: English - Date: 2012-04-15 21:04:10