Science & Mathematics
The Museum's collections hold thousands of objects related to chemistry, biology, physics, astronomy, and other sciences. Instruments range from early American telescopes to lasers. Rare glassware and other artifacts from the laboratory of Joseph Priestley, the discoverer of oxygen, are among the scientific treasures here. A Gilbert chemistry set of about 1937 and other objects testify to the pleasures of amateur science. Artifacts also help illuminate the social and political history of biology and the roles of women and minorities in science.
The mathematics collection holds artifacts from slide rules and flash cards to codebreaking equipment. More than 1,000 models demonstrate some of the problems and principles of mathematics, and 80 abstract paintings by illustrator and cartoonist Crockett Johnson show his visual interpretations of mathematical theorems.

Lithograph of "Cascades of the Columbia"
 Description
 The lithographic firm of Sarony, Major & Knapp (1857–1867) of New York printed this lithograph of “Cascades of the Columbia” originally drawn by John M. Stanley (1814–1872) of Detroit (1834–1840, 1864–1872) and Washington, D.C. (1850–1860). The illustration was printed as Plate XLV in the “General Report” of volume XII of Reports of Explorations and Surveys, to ascertain the most practicable and economical route for a railroad from the Mississippi River to the Pacific Ocean, “Narrative Final Report of Explorations for a Route for a Pacific Railroad, near the Forty–Seventh and Forty–Ninth Parallels of North Latitude, St. Paul to Puget Sound”. The volume was printed in 1860 by Thomas H. Ford in Washington, D.C.
 Location
 Currently not on view
 date of book publication
 1860
 graphic artist
 Sarony, Major, & Knapp
 original artist
 Stanley, John Mix
 graphic artist
 Sarony, Major, & Knapp
 original artist
 Stanley, John Mix
 author
 Stevens, Isaac Ingalls
 printer
 Ford, Thomas H.
 graphic artist
 unknown
 publisher
 U.S. War Department
 U.S. Army Corps of Engineers Topographic Command
 ID Number
 GA.24834
 catalog number
 24834
 accession number
 1978.0612
 Data Source
 National Museum of American History

Machine A Calculer Rebo
 Description
 By the 1920s, companies in the United States, Germany, and France manufactured inexpensive notched band adders. A firm in Marseille, France, under the direction of engineer E. Reybaud, sold this device from 1922 until at least 1930. This example was from the collection of L. Leland Locke.
 The metal adder and stylus fit into a red paper container. The adder has nine columns of digits and a zeroing bar at the top. Instructions indicate that the device came in two models that sold for 25 and 40 francs. This was sufficiently inexpensive that every member of a commercial firm could have such an adder.
 Reference: “The Register,” Typewriter Topics, vol. 76 (September 1930), p.14.
 Location
 Currently not on view
 date made
 ca 1925
 maker
 Reybaud, E.
 ID Number
 MA.155183.25
 catalog number
 155183.25
 accession number
 155183
 Data Source
 National Museum of American History

Pro Calculo! Adder
 Description
 Adders like this one were designed to help consumers with addition, but did not actually add automatically. The surface of the metal instrument has seven slots that reveal part of seven flat notched metal bands below. To enter a digit, one pulls down a band with the metal stylus. The hooked shape of the slots exposed a notch in an adjacent band, making it possible to carry or to borrow digits. This adder also has a zeroing bar at the base. It fits into a dark brown paper case.
 Instruments of this type appeared as early as the 1600s, and sold commercially from the 1890s into the 1970s. They sold in Germany from the invention of the “Trick” in 1911. Otto Meuter patented a variation on this device that sold as the Arithma from 1920. Meuter received a fixed fee for each Arithma produced. With inflation, this sum soon was minute.
 Meuter decided to form another company with J. Bergmann and to market adders known as the Pro Calculo! and the Correntator. These sold widely in the 1920s. For example, the trade magazine Typewriter Topics reported that 15,000 ProCalculo! adders sold in 1926. In 1928, the product was renamed the Produx.
 References: Typewriter Topics, 59, February, 1925, p. 84. One model, offered by Pittsburgh Typewriter & Supply, sold for $3.00.
 Typewriter Topics, 67 (November, 1927), p. 5051. New style adders introduced.
 Martin Reese, Historische Buerowelt, 43 (September 1995).
 Location
 Currently not on view
 date made
 ca 1925
 maker
 Pittsburgh Typewriter and Supply Company
 ID Number
 MA.155183.26
 catalog number
 155183.26
 accession number
 155183
 Data Source
 National Museum of American History

Baby Calculator Adder
 Description
 The orange, black, and tan paper box contains a black and goldcolored metal instrument, instructions on pink paper, and a metal stylus. The device has seven columns for addition.
 The Baby Calculator was a handheld adder manufactured by the Calculator Machine Company of Chicago from at least 1925 into the 1940s. The Tavella Sales Company of New York City distributed this example. According to the box, it sold for $2.50 in the United States and $3.00 in Canada and other foreign countries. It has hooks at the top of each column for carrying in addition, but none at the bottom to assist in borrowing in subtraction.
 References: Typewriter Topics (March 1925), 59:76.
 Popular Mechanics (January, 1935), p. 128A; vol. 73 (March, 1940), p. 143A; vol. 83 (February, 1945), p. 192. A new design was introduced in 1945. See Popular Mechanics, April, 1945, p. 202.
 Location
 Currently not on view
 date made
 ca 1925
 distributor
 Tavella Sales Company
 maker
 Calculator Machine Company
 ID Number
 MA.155183.27
 catalog number
 155183.27
 accession number
 155183
 Data Source
 National Museum of American History

Prewett Addograf
 Description
 This aluminum device consists of two discs sealed together at the rim, with a rotating disc in between. Various numbers are stamped around the rim of the rotating disc. Openings in the outer discs reveal three numbers on either side at one time. One side of the instrument has the numbers from 1 to 20 stamped clockwise around the scalloped rim of the movable disc. The other side of this disc has the numbers from 21 to 40, also stamped clockwise.
 At the top of the instrument, three alternate numbers are visible (i.e., 1, 3, 5). Three alternate numbers also are visible on the reverse side (i.e., 35, 37, 39). The sum of two numbers on opposite sides of the disc is always 40 (i.e., 1 and 39). Part of the scalloped edge of the movable disc is exposed at the bottom.
 Clay W. Prewett and the Prewett Addograf and System Company (also known as the Prewett System Company) of Los Angeles, California, sold this device. A 1940 brochure describing “The Prewett Addograf and System” indicated that it consisted of not only this instrument but a $10 brochure describing how it worked, a $5 brochure on modern short cuts in multiplication, division, interest, fractions, and mixed numbers; and a $5 multiplication chart. The entire system could be purchased for $15. It was not returnable.
 Location
 Currently not on view
 date made
 1940
 maker
 Prewett System Company
 ID Number
 MA.155183.28
 catalog number
 155183.28
 accession number
 155183
 Data Source
 National Museum of American History

Locke Adder
 Description
 The first Americanmade adder to enjoy modest commercial success was developed by Clarence E. Locke (18651945). A native of Edgerton, Wisconsin, he graduated from Cornell College in Mt. Vernon, Iowa, in 1892. Locke worked for a time as a civil engineer in Minnesota, and then joined his father operating a lumber yard in Kensett, Iowa.
 This version of the device has a metal base with grooves for nine sliding metal rods that move crosswise. Each rod represents a digit of a number being added. Protruding knobs on the rods represent different numerals. The rods are held in place by bronzecolored metal covers that extend over the right and left thirds of the instrument. When the device is in zero position, all the rods are in their rightmost position.
 Numbers are entered by sliding rods to the left, and the result appears in numbers immediately to the left of the cover on the right. The rods are colorcoded to distinguish units of money. They lock when depressed, so that they will not slide if the instrument is tilted. The locking mechanism, the colorcoded rods, and the oval shape of the knobs on the rods are all improvements featured in Locke’s second calculating machine patent, taken out in 1905. There is no carry mechanism. The base of is covered with green cloth.
 The instrument is marked on the right cover: C. E. LOCKE (/) MFG. Co. It also is marked: KENSETT, IOWA. [/] U.S.A. It is marked on the left cover: THE (/) LOCKE (/) ADDER. It also is marked: PATENTED DEC. 24. 1901 (/) JAN. 3 1905. This example came to the Smithsonian from the collection of L. Leland Locke.
 The instrument resembles MA.323619, but it has green rather than red cloth on the bottom and has no surrounding wooden box. Also compare to MA.321327.
 References: C. E. Locke, “Calculating Machine,” U.S. Patent 689680, December 24, 1901.
 C. E. Locke, “Calculating Machine,” U.S. Patent 779088, January 3, 1905.
 Robert Otnes, “Sliding Bar Calculators,” ETCetera #11 (June 1990): pp. 68.
 P. Kidwell, “Adders Made and Used in the United States,” Rittenhouse, 8, (1994): pp. 7896.
 Location
 Currently not on view
 date made
 1905
 maker
 C. E. Locke Manufacturing Company
 ID Number
 MA.155183.29
 catalog number
 155183.29
 accession number
 155183
 Data Source
 National Museum of American History

Perfection SelfAdding Ruler
 Description
 The wooden ruler also serves as a stylusoperated nonprinting adding machine. It has a plastic inset along the middle, with a perforated paper strip that moves below the plastic. The numbers from 1 to 45 are marked along one edge of the plastic and from 46 to 90 along the other. A small dial and a window are at one end. Instructions are given on a plastic insert on the reverse of the rule. The number in the window indicates units and tens, while those around the dial denote hundreds. Only one of the hundreds digits (3) is marked. There is no stylus. One edge of the ruler is beveled and has a brass insert. This edge is marked off with a scale 15 inches long, divided to 1/16 inches.
 The device is marked: PERFECTION (/) SELFADDING RULER (/) PAT. JAN. 8th 1895. No place of manufacture is indicated. The inventor, Robert E. McClelland, lived in Williamsville, Illinois. Later versions of the rule indicate that it was made in New York.
 Reference:
 Robert E. McClelland, “Computing Machine,” U.S. Patent 532241, January 8, 1895.
 Location
 Currently not on view
 date made
 1895
 patentee
 McClelland, Robert E.
 ID Number
 MA.155183.30
 accession number
 155183
 catalog number
 155183.30
 Data Source
 National Museum of American History

Model for Desargues' Theorem with Triangles in Different Planes, by Richard P. Baker, Baker #49a
 Description
 This metal model was constructed by Richard P. Baker. A mathematics professor at the University of Iowa, Baker believed that models were essential instruction in many parts of mathematics and physics. Over one hundred of his models are in the NMAH collections.
 This painted wire structure is a model for Desargues' Theorem. A paper tag reads: No. 49a Desagues' Theorem by (/) projection (/) Triangles in different (/) planes. This version of the model is not listed in Baker's 1905 catalog, but is included in the 1931 catalog. The model sold for $2.50.
 References:
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 13.
 Richard P. Baker Papers, University Archives, University of Iowa, Iowa City, Iowa.
 Location
 Currently not on view
 date made
 ca 19001935
 ca 19101935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.001
 accession number
 211257
 catalog number
 211257.001
 Data Source
 National Museum of American History

Model of a Twisted Cubic by Richard P. Baker, Baker #72 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections. Baker mentioned the model in a 1905 listing of one hundred models he had constructed as well as in a 1931 catalog.
 A typed paper label on the top of the wooden base of this model reads: No. 72 (/) TWISTED CUBIC (/) (by cone and cylinder).
 Like several other models Baker made, this shows ruled surfaces, also called scrolls. Such a surface is swept out by a moving line. The two ruled surfaces shown here are a cylinder, indicated with red threads, and a double cone, indicated in yellow. The points where the surfaces intersect are indicated by a wire. The curve of intersection is of degree three and is known as a twisted cubic.
 The model sold for $4.00.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 13.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 72.
 R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 George Salmon, A Treatise on the Analytic Geometry of Three Dimensions, Dublin: Hodges, Foster, and Company, 1874, esp. pp. 303313.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.002
 accession number
 211257
 catalog number
 211257.002
 Data Source
 National Museum of American History

Model of a Twisted Cubic by Richard P. Baker, Baker #74 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections. Baker mentioned the model in a 1905 listing of one hundred models he had constructed as well as in a 1931 catalog.
 A typed paper label on the top of the wooden base of this model reads: No. 74 (/) TWISTED CUBIC: 3 real (/) asymptotes.
 Like several other models Baker made, this shows ruled surfaces, also called scrolls. Such a surface is swept out by a moving line. This model shows portions of three hyperbolic cylinders, one with yellow strings, one with blue strings, and one with red strings (a hyperbolic cylinder is a surface that joins two parallel hyperbolas, just as a regular cylinder joins two parallel circles. For a model, see 1982.0795.33). The hyperbolic cylinders in this model all make an acute angle with the base. Three pieces of wire indicate places where the three hyperbolic cylinders intersect. These are part of a curve of degree three known as a twisted cubic, in this case a twisted cubic with three real asymptotes.
 The model sold for $7.50.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 13.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 72. R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 George Salmon, A Treatise on the Analytic Geometry of Three Dimensions, Dublin: Hodges, Foster, and Company, 1874, esp. pp. 303313.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.003
 accession number
 211257
 catalog number
 211257.003
 Data Source
 National Museum of American History

Model of a Twisted Cubic by Richard P. Baker, Baker #75 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections. Baker mentioned the model in a 1905 listing of one hundred models he had constructed as well as in a 1931 catalog.
 A typed paper label on the top of the wooden base of this model reads: No. 75 (/) CUBICAL HYPERBOLIC PARABOLA.
 Like several other models Baker made, this shows ruled surfaces, also called scrolls. Such a surface is swept out by a moving line. This model shows portions of a parabolic cylinder (going crosswise) and a hyperbolic cylinder (with two opposite sections, extending vertically). One asymptotic plane of the hyperbolic cylinder is parallel to what Sommerville calls the axial plane of the parabolic cylinder. The cylinders intersect in two curves which are represented by wires in the model. These wires are part of a cubical hyperbolic parabola.
 The model sold for $5.00.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 13.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 72. R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 George Salmon, A Treatise on the Analytic Geometry of Three Dimensions, Dublin: Hodges, Foster, and Company, 1874, esp. pp. 303313.
 D. M. Y. Sommerville, Analytical Geometry of Three Dimensions, Cambridge: Cambridge University Press, 1959, esp. pp. 294297.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.004
 accession number
 211257
 catalog number
 211257.004
 Data Source
 National Museum of American History

Model of a Cubical Parabola by Richard P. Baker, Baker #76 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections. Baker mentioned the model in a 1905 listing of one hundred models he had constructed as well as in a 1931 catalog.
 A typed paper label on the top of the wooden base of this model reads: No. 76 (/) TWISTED CUBIC: CUBICAL (/) PARABOLA. A mark incised in the base at the front reads: 76 R.P.B.
 Like several other models Baker made, this shows ruled surfaces, also called scrolls. Such a surface is swept out by a moving line. This model shows portions of a parabolic cylinder (going crosswise with blue strings) and a hyperbolic paraboloid (in red strings). A metal wire along the points of intersection indicates the cubical parabola.
 The model sold for $5.00.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 13.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 72. R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 George Salmon, A Treatise on the Analytic Geometry of Three Dimensions, Dublin: Hodges, Foster, and Company, 1874, esp. pp. 303313.
 D. M. Y. Sommerville, Analytical Geometry of Three Dimensions, Cambridge: Cambridge University Press, 1959, esp. pp. 294297.
 Website of the University of Arizona Mathematics Department, accessed June 22, 2017.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.005
 accession number
 211257
 catalog number
 211257.005
 Data Source
 National Museum of American History

Model of Cubic Cones with a Cuspidal Edge by Richard P. Baker, Baker #81 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections.
 The typed part of a paper label on the top edge of the wooden frame of this model reads: No. 81 (/) CUBIC CONE: (/) CUSPIDAL EDGE.
 Baker’s string models represent a special type of geometric surface called a ruled surface. A ruled surface, sometimes called a scroll, is one that is swept out by a moving line. This model shows the ruled surface swept out by the yellow threads connecting the sides, base, and top of the model.
 A version of the model sold for $4.50, but it may have been considerably smaller.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 14.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 7.
 R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.007
 accession number
 211257
 catalog number
 211257.007
 Data Source
 National Museum of American History

Model of a Cubic Cone Showing Only a Single Sheet by Richard P. Baker, Baker #82 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections.
 The typed part of a paper label on the bottom of the wooden base of this model reads: No. 82 (/) cubic cone: SINGLE SHEET (/) only.
 Baker’s string models represent a special type of geometric surface called a ruled surface. A ruled surface, sometimes called a scroll, is one that is swept out by a moving line. This model shows the ruled surface swept out by the yellow threads connecting the curved vertical wooden sides of the model and by the threads joining the curved horizontal piece of wood on the top of the model to the curved piece at the front. All the threads of this model pass through a point in the center of the model which intersects a wire rising from the base.
 The model sold for $4.50.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 14.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 7.
 R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.008
 accession number
 211257
 catalog number
 211257.008
 Data Source
 National Museum of American History

Model of a Cylindroid by Richard P. Baker, Baker #83 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections. Baker mentioned the model in a 1905 listing of one hundred models he had constructed as well as in a 1931 catalog.
 A typed paper label on the top of the wooden base of this model reads: No. 83 (/) CYLINDROID.
 Like several other models Baker made, this shows a ruled surface, also called a scroll. Such a surface is swept out by a moving line. This line is represented by the blue string in the model. The string rotates periodically about the vertical access, and at the same time moves uniformly up (or down) the vertical axis. The surface also is known as Plücker’s conoid after the German mathematician and physicist Julius Plücker.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 13.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 72.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.009
 accession number
 211257
 catalog number
 211257.009
 Data Source
 National Museum of American History

Model of a Scroll of Order Eight by Richard P. Baker, Baker #85 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections.
 The typed part of a paper label on the bottom of the wooden base of this model reads: No. 85 (/) SCROLL OF ORDER 8 (/) CONES WITH COMMON VERTEX.
 Baker’s string models represent a special type of geometric surface called a ruled surface. A ruled surface, sometimes called a scroll, is one that is swept out by a moving line. This model shows the ruled surfaces generated by the double tangents of two spheres through a line. The two spheres are white balls with diameters of three inches and 1 ½ inches (7.6 cm. and 3.8 cm.). The tangent lines are in blue thread – each thread is tangent to both spheres and passes through the line shown in yellow thread. According to Baker’s label and catalogs, the surface is of degree eight.
 The model sold for $8.00.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 14.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 8.
 R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.011
 accession number
 211257
 catalog number
 211257.011
 Data Source
 National Museum of American History

Model of the Differential Geometry of a Helix by Richard P. Baker, Baker #89 (a Ruled Surface)
 Description
 This string model was constructed by Richard P. Baker, possibly before 1905 when he joined the mathematics faculty at the University of Iowa. Baker believed that models were essential for the teaching of many parts of mathematics and physics, and over one hundred of his models are in the museum collections.
 The typed part of a paper label on the top of the wooden base of this model reads: No. 89 (/) Diff. Geometry of a helix. The model illustrates several terms used to describe curves in threedimensional space, using as an example the spiral curve on a cylinder known as a helix. In the model, the cylinder is represented by blue threads and the helix by a wire that twists along it. The point of interest, hereafter called P, is at the center, atop a wire extending perpendicularly from the base (the normal to the helix at the point). Shown with red threads is the osculating (kissing) plane to the helix at P. The red thread that passes through P represents the tangent line at P. The wire circular arc passing through P in the osculating plane represents part of what is called the osculating circle. The smaller circles joined by wires that pass through P form what is called the osculating cone.
 Shown with yellow threads is a plane perpendicular to the osculating plane known as the normal plane. The thread on this plane that passes through P is called the binormal to the curve at P.
 The model sold for $7.50.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 16.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 12.
 R. P. Baker Papers, University of Iowa, Iowa City, Iowa.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.012
 accession number
 211257
 catalog number
 211257.012
 Data Source
 National Museum of American History

Model of Lines of Curvature on an Ellipsoid by Richard P. Baker, Baker #90
 Description
 This is a model of lines of curvature on an ellipsoid. The rectangular wooden base supports a plaster halfellipsoid with grid of ellipses drawn on it. A tag on the model reads: No. 90 (/) LINES OF CURVATURE ON (/) ELLIPSOID.
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 16. A copy of this document is in the Baker Papers at the University of Iowa Archives.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 12.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.013
 accession number
 211257
 catalog number
 211257.013
 Data Source
 National Museum of American History

Model of Contour Lines by Richard P. Baker, Baker #92
 Description
 This painted plaster model showing contour lines fits in an open wooden box.
 In a catalog from about 1905, Baker described the surface shown as “a quasi geographical [sic] area containing 3 peaks, 1 hollow, and 2 passes. Contours, slope lines, ridge, and course lines are marked. An inloop and outloop curve occur.”
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 16. A copy of this document is in the Baker Papers at the University of Iowa Archives.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 5.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.014
 accession number
 211257
 catalog number
 211257.014
 Data Source
 National Museum of American History

Model of Contour Lines by Richard P. Baker, Baker #93
 Description
 This painted plaster model showing contour lines fits in an open wooden box.
 In a catalog from about 1905, Baker described the surface shown as “An area which can be derived by deformation from 92 [e.g. model MA.211257.014] without losing the descriptive character of contours, except that the inloop curve becomes an outloop (which may occur in infinitesimal transformation). The contours are now curves of the type of equipotential lines, and the configuration is made as symmetrical as possible.”
 References:
 R. P. Baker, A List of Mathematical Models, [1905], p. 16. A copy of this document is in the Baker Papers at the University of Iowa Archives.
 R. P. Baker, Mathematical Models, Iowa City, Iowa, 1931, p. 5.
 Location
 Currently not on view
 date made
 ca 19001935
 maker
 Baker, Richard P.
 ID Number
 MA.211257.015
 accession number
 211257
 catalog number
 211257.015
 Data Source
 National Museum of American History
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