Analytic geometry

An Interesting Practical Application of Solid Analytic Geometry, W.K.Viertel,
9:5, 1978, 273-275
Geometry via Physics, Ross Honsberger, 10:4, 1979, 271-276
Distance from a Point to a Line, K.R.S.Sastry, 12:2, 1981, 146-147, C
A Classroom Approach to x<sup>2 </sup>+ y<sup>2</sup> + z<sup>2</sup> = w<sup>2</sup>, Norman Schaumberger, 12:5, 1981,
331-332, C
An Application of Convex Coordinates, J.N.Boyd and P.N.Raychowdhury, 14:4,
1983, 348-349, C
An Analytic Approach to the Euler Line, Johathan W. Lewin, 15:1, 1984, 52-53, C
The Fractal Geometry of Mandelbrot, Anthony Barcellos, 15:2, 1984, 98-114, 9.8
A Geometrical Interpretation of the Weighted Mean, Larry Hoehn, 15:2, 1984,
135-139, 0.2, 7.3
On Problems with Solutions Attainable in More Than One Way, Jean Pedersen and
George Polya, 15:3, 1984, 218-228, 0.2, 5.4.2
Proving Heron's Formula Tangentially, David E. Dobbs, 15:3, 1984, 252-253, C,
0.6
Pythagorean Systems of Numbers, Joseph Wiener, 15:4, 1984, 324-326, C, 0.2, 9.3
Distance From a Point to a Line, Abdus Sattar Gazdar, 15:4, 1984, 328-329, C
Right Triangles with Perimeter and Area Equal, William Parsons, 15:5, 1984,
429, C, 0.2
A Nonstandard Solution to a Standard Problem, Florence S. Gordon, 17:1, 1986,
74, C
Angling for Pythagorean Triples, Dan Kalman, 17:2, 1986, 167-168, C, 9.3
Geometric Parametrization of Pythagorean Triples, Alvin Tirman, 17:2, 1986,
168, C
Three Ways to Maximize the Area of an Inscribed Quadrilateral, Leroy F. Meyers,
17:3, 1986, 238-239, 5.5
A Pretrigonometry Proof of the Reflection Property of the Ellipse, Zalman P.
Usiskin, 17:5, 1986, 418, C
Behold! The Pythagorean Theorem via Mean Proportions, Michael Hardy, 17:5,
1986, 422, C
Drawing the Line Segment Connecting Two Points, Harley Flanders, 18:1, 1987,
53-57, 3.3, 8.1
Heron's Area Formula, Roger C. Alperin, 18:2, 1987, 137-138, C
Equiangular Lattice Polygons and Semiregular Lattice Polyhedra, Paul R. Scott,
18:4, 1987, 300-306
A Rational Approach to Lattice Polygons, Warren Page, 18:4, 1987, 316-317, C
Some Properties of Polygons Inside a Circle, Larry Hoehn, 18:5, 1987, 397-401
Newton's nth Root Method Without Derivatives, David A. Smith, 18:5, 1987,
403-406, C, 0.7
An Unexpected Appearance of the Golden Ratio, George Manuel and Amalia
Santiago, 19:2, 1988, 168-170, C, 5.1.1
Behold! Two Extremum Problems and the Arithmetic-Geometric Mean Inequality,
Paolo Montuchi and Warren Page, 19:4, 1988, 347, C, 5.1.4
The Generalized Polygonal Cycloid, Duane W. DeTemple, 19:5, 1988, 417-419, C
Pythagorean Theorem: aa' + bb' = cc', Enzo R. Gentile, 20:1, 1989, 58, C
FFF #3. Tangency by Double Roots, Ed Barbeau, 20:2, 1989, 132, F (also 20:3,
1989, 227)
To View an Ellipse in Perspective, Charles G. Moore, 20:2, 1989, 134-136, C,
0.5
The Root Mean SquareArithmetic MeanGeometric MeanHarmonic Mean Inequality,
Roger B. Nelsen, 20:3, 1989, 231, C, 9.5
On the Radial Packing of Circles in the Plane, P. D. Weidman and K. Pfendt,
21:2, 1990, 112-120, 9.7
Harmonic, Geometric, Arithmetic, Root Mean Inequality, Sidney Kung, 21:3, 1990,
227, C, 9.5
Triangles with Integer Sides and Sharing Barrels, David Singmaster, 21:4, 1990,
278-285, 9.3
Geometrical and Graphical Solutions of Quadratic Equations, E.John Hornsby,
Jr., 21:5, 1990, 362-369, 0.2
China's 1989 National College Entrance Examination, Bart Braden, 21:5, 1990,
390-393, 0.2, 0.6, 1.2
Triquetras and Porisms, Dana N. Mackenzie, 23:2, 1992, 118-131
Optimal Locations, Bennett Eisenberg and Samir Khabbaz, 23:4, 1992, 282-289,
3.1, 9.9
Single Equations Can Draw Pictures, Keith M. Kendig, 22:2, 1991, 134-139, C,
0.5, 5.1.5, 5.6.1, 5.6.2
Investigating Spirolaterals Through LOGO, William Fisher and Richard Campbell,
22:2, 1991, 148-159
Triangles in a Lattice Parabola, K.R.S.Sastry, 22:4, 1991, 301-306
FFF #66. An Equilateral Property of Altitudes, Ed Barbeau, 24:4, 1993, 344, F
The Geometer's Sketchpad and Cabri-Geometre (software review), Dennis DeTurck,
24:4, 1993, 370-376, 0.3, 0.10
Two Trisectrices for the Price of One Rolling Coin, Jack Eidswick, 24:5, 1993,
422-430, 0.3, 9.7
A Geometrical Exploration Concluded, James N. Boyd and P.N.Raychowdhury, 25:2,
1994, 155-156
Cutting Corners: A Four-gon Conclusion, S. C. Althoen and K. E. Schilling and M. F. Wyneken, 25:4, 1994, 266-279, 0.5, 9.5
The Arithmetic Mean-Geometric Mean Inequality (Proof by Picture), Sidney H. Kung, 26:1, 1995, 38, C
A Geometric Approach to Linear Functions, Jack E. Graver, 26:5, 1995, 389-394, C, 0.2, 6.3
How to Kick a Field Goal, Daniel C. Isaksen, 27:4, 1996, 267-271
An Application of Elementary Geometry in Functional Analysis, Ji Gao, 28:1, 1997, 39-42, 9.5
Area and Perimeter, Volume and Surface Area, Jingcheng Tong, 28:1, 1997, 57, C, 5.1.3
The Arithmetic Mean - Geometric Mean Inequality (proof by picture), Sidney H. Kung, 28:2, 1997, 88, C
A Stronger Triangle Inequality, Herbert R. Bailey and Robert Bannister, 28:3, 1997, 182-186
Paths of Minimum Length in a Regular Tetrahedron, Richard A. Jacobson, 28:5, 1997, 394-397, C, 5.7.1
The Brahmagupta Triangles, Raymond A. Beauregard and E. R. Surynarayan, 29:1, 1998, 13-17, 9.3
A Sharp Triangle Inequality, Murray S. Klamkin, 29:1, 1998, 33, C
Geometric Characterization of the Shortest Path in a Tetrahedron, Sergey Markelov, 29:2, 1998, 150-151, C
Folding Stars, Yuanqian Chen and Charles Waiveris, 30:5, 1999, 370-378, 9.7
FFF #151.  Going for the stars, Rick Mabry, 30:5, 1999, 383, F<P>