5.2.2	Numerical integration

Encouraging Mathematical Inquisitiveness, Carl L. Main, 1:1, 1970, 32-36, 5.4.2
Calculus by Mistake, Louise S. Grinstein, 5:4, 1974, 49-53, C, 5.1.2, 5.1.4, 5.2.3, 5.2.5, 5.2.10, 5.4.2, 5.6.1, 5.7.2
An Integral Approximation Exact for Fifth-Degree Polynomials, Burt M. Rosenbaum, 7:3, 1976, 10-14, 9.6
A Short Program for Simpson's or Gazdar's RuleÐIntegration on Handheld Programmable Calculators, Abdus Sattar Gazdar, 9:3, 1978, 182-185
Calculator-Demonstrated Math Instruction, George McCarty, 11:1, 1980, 42-48, 5.1.1, 5.4.2, 9.6
Finding Bounds for Definite Integrals, W. Vance Underhill, 15:5, 1984, 426-429, C, 5.2.1
Behold! The Midpoint Rule is Better than the Trapezoidal Rule for Concave Functions, Frank Burk, 16:1, 1985, 56, C
Testing Understanding and Understanding Testing, Jean Pedersen and Peter Ross, 16:3, 1985, 178-185, 0.2, 1.2, 5.1.2
Numerical Integration via Integration by Parts, Frank Burk, 17:5, 1986, 418-422, C, 5.2.5
Computer Algebra Systems in Undergraduate Mathematics, Don Small and John Hosack and Kenneth Lane, 17:5, 1986, 423-433, 1.2, 5.1.4, 5.1.5, 5.4.2
Archimedes' Quadrature and Simpson's Rule, Frank Burk, 18:3, 1987, 222-223, C
A Clamped Simpson's Rule, James A. Uetrecht, 19:1, 1988, 43-52, 9.6
Applications of Transformation to Numerical Integration, Chris W. Avery and Frank D. Soler, 19:2, 1988, 166-168, C
Teaching Riemann Sums Using Computer Symbolic Algebra Systems, John H. Mathews, 21:1, 1990, 51-55, C, 5.2.1

Circumference of a CircleÑThe Hard Way, David P. Kraines and Vivian Y. Kraines and David A. Smith, 21:2, 1990, 142-144, C, 5.2.10
Determining Sample Sizes for Monte Carlo Integration, David Neal, 24:3, 1993, 254-259, C, 7.3, 9.10
Cubic Splines from Simpson's Rule, Nishan Krikorian and Mark Ramras, 27:2, 1996, 124-126, C, 9.6	
SimpsonÕs Rule with Constant Weights, R. S. Pinkham, 32:2, 2001, 91-93, 9.6
Estimating Large Integrals: The Bigger They Are, The Harder They Fall, Ira Rosenholtz, 32:5, 2001, 322-329, 9.6
Error Estimates for Numerical Integration Rules, Peter R. Mercer, 36:1, 2005, 27-43, 9.6
Estimating Definite Integrals, Norton Starr, 36:1, 2005, 60-63, C
Integrals of Fitted Polynomials and an Application to SimpsonÕs Rule, Allen D. Rogers, 38:2, 2007, 124-130, 9.6
FFF #274. The generality of the trapezoid rule, M. A. Khan, 39:1, 2008, 50, F, 5.2.1