Catégories : Tous - triangles - motion - polygons - geometry

par Jodi Ward Il y a 13 années

1021

Measurements and Motion in Geometry

The document aims to provide a comprehensive guide to online resources and general information for teaching measurement and motion in geometry to students from first to sixth grade.

Measurements and Motion in Geometry

Math in Motion

The goal of this mind map is to outline online resources and general information that can be useful for teaching measurement and motion in geometry to first thru sixth grade.

Congruence Mapping

This subject could be covered with advanced elementary students or added if teaching an extended school year. If desired to add to teaching curriculum it would fit nicely during the tessellation unit.

Composition of Mappings
Tessellations
Congruence

Congruent Figures: Two geometric figures are congruent if and only if there exists a translation, reflection, rotation or glide reflection of one figure onto the other.

Rotations

Rotations can be confusing for the students, use foam shapes or virtual manipulative for classroom demonstrations

Reflections
Translations

Translation is a special kind of mapping using a sliding motion.

Congruence and Constructions

Congruence is if one can be placed on the other so that they both coincide.

Circumscring Circles About Triangles
Perpendiculars and Parallel Lines
Bisectors
Bisecting Segments and Angles
Perpendicular Bisector

Side-Side-Side (SSS) Congruence Propery

If three sides of one triangle are congruent to three sides of another triangle, the two triangles are congruent.

Triangle Inequality

The sum of the lengths of any two sides of a triangle is greater than the length of the thrid side.

Side-Angle-Side (SAS) Congruence Propery

If two sides and the included angle of one triangle are congruent to two sides and the included angle of another triangle, the two triangles are congruent.

Angle-Side Angle (ASA) Congruence Property

If two angles and the included side of one triangles are congruent to two angles and the included side of another triangle, the triangles are congruent.

Constructing Segments and Angles
Mapping

Congruent polygons are two polygons that have corresponding sides and corresponding angles that are congruent.

Volume and Surface Area

Volume and Surface Area of Space Figures
Irregular Shapes

The volume of some items is most easily found by submerging in water. This is achieved by measuring the amount of water that is displaced.

Spheres

Surface area of sphere = 4 x pi x r squared

Volume of sphere = 4/3 x pi x 4 cubed

Cones
Pyramids
Cylinders

Surface area of cylinder = (2 x pi x h) + (2 x pi x r squared)

Volume of cylinder = b x h

Prisms

This picture can be enlarged for a classroom poster.

Surface Area
Standard Units of Volume

There is a corresponding unit of volume, cubic. Shapes are three dimensional.

Metric Units
English Units
Nonstandard Units of Volume

Area and Perimeter

Area is the number of units it will take to cover a surface.

Perimeter is the length of the boundary of a surface.

Areas
Circles

Circumference is the distance around the circle.

To find the circumference take the diameter (the distance across a circle through the center point) x pi (3.1416)

Area of circle = pi (3.1416) x radius (r) squared

Polygons

Trapezoids

Area of trapezoid = 1/2 x [upper base (u) + lower base (b)] x height (h)

Triangles

Area of triangle = 1/2 x base (b) x height (h)

Parallelograms

Area of rectange = length (l) x width (w)

Area of parallelogram = base (b) x height (h)

Perimeter
Standard Units of Area
Nonstandard Units of Area

Systems of Measurement

International System of Units

The metric system is established as the International system of units. It also includes second for time, ampere for electric current, candela for light intensity and mole for molecular weigh of a substance.

Metric units

Metric Units for Mass

Kilogram kg 1000 grams

Hectogram hg 100 grams

Dekagram dag 10 grams

Gram g 1 gram

Decigram dg 1/10 gram

Centigram cg 1/100 gram

Milligram mg 1/1000 gram

History of the Celsius temperature scale:

Anders Celsius early became engaged in the general problem of weights and measures, including temperature measurements. Already as a student he assisted the astronomy professor Erik Burman in meteorology observations. At that time there existed a large variety of thermometers with different scales. Perhaps he already at this stage realized the necessity of a common international scale.

A temperature scale must be based on one or two standard temperatures, called fixed points. For those it was natural to choose temperatures within the temperature domain of practical interest, i.e. from about plus forty to minus twenty in modern Celsius degrees. Thermometers were simply used in meteorology, in horticulture, and sometimes for indoor use. As fixed points one could use the human body temperature or temperatures of local origin such as the observatory cellar in Paris or the highest temperature in sunshine in London. Of course also the freezing and boiling points of water were used, but it was not self-evident that they really were universal and e.g. independent of the geographic latitude.

Anders Celsius should be recognized as the first to perform and publish careful experiments aiming at the definition of an international temperature scale on scientific grounds. In his Swedish paper "Observations of two persistent degrees on a thermometer" he reports on experiments to check that the freezing point is independent of latitude (and also of atmospheric pressure!). He determined the dependence of the boiling of water with atmospheric pressure (in excellent agreement with modern data). He further gave a rule for the determination of the boiling point if the barometric pressure deviates from a certain standard pressure.

http://www.astro.uu.se/history/celsius_scale.html

Metric Units for Volume

Kiloliter kL 1000 Liter

Hectoliter hL 100 Liter

Dekaliter daL 10 Liter

Liter L 1 Liter

Deciliter dL 1/10 Liter

Centiliter cL 1/100 Liter

Mililiter mL 1/1000 Liter

Metric Units for Length

Kilometer km 1000 meters

Hectometer hm 100 meters

Dekameter dam 10 meters

Meter m 1 meter

Decimeter dm 1/10 meters

Centimeter cm 1/100 meters

Milimeter mm 1/1000 meters

English units

The English unit system was developed from a number of nonstandard units of measure. The inch was the length of 3 grains of barley placed end to end. The foot was the lenght of a human foot and a yard was the distance from the nose to the thumb of an outstreached hand. This was established by King Henry I of England.

Mass

English Units for Weight

Ounce oz 1/16 pound

Pound lb 16 ounces

Ton tn 2000 pounds

Temperature

The Fahrenheit scale, which measures temperature, was created by Daniel Gabriel Fahrenheit (1686-1736), a German-Dutch scientist, in 1724. Fahrenheit, who devoted much of his life’s work to the measurement of temperature, also invented the alcohol and mercury thermometers. On the Fahrenheit scale, the point at which frozen water melts is 32°, and the point where at which it boils is 212°. Between these two points is exactly 180°, a number easily divisible on a thermostat. Although we know with a degree of certainty what measurements Fahrenheit used to determine his scale, his process of arriving at the final scale is largely unknown.

Several stories have circulated regarding how Fahrenheit devised his scale. One is that he established 0° as the coldest temperature he could measure outdoors during the winter of 1708 to 1709 in Danzig (Gdańsk), Poland. This measurement and Fahrenheit's own body temperature, which he measured at 100°, were the two marks on which he based the rest of his scale. Many think that either his thermometer was off or he was running a fever that day, resulting in the relatively high reading on the bodily temperature. The scale was then divided into 12 separate segments, which were later divided into eight, creating a scale of 96 separate degrees.

http://www.wisegeek.com/what-is-the-history-of-the-fahrenheit-scale.htm

Volume

English Units for Volume

Ounce oz 1/8 cup

Cup c 8 ounces

Pint pt 2 Cups

Quart qt 2 pints

Gallon gal 4 quarts

Length

English Units for Length

Inch in 1/12 foot

Foot ft 12 inches

Yard yd 3 feet

Mile mi 5280 feet

Nonstandard units of length
Seeds and precious stones
Parts of the body

Hand

Horses are measured in "hands" still today

Foot

Cubit

Cubit is the distance from a man's elbow to the tip of his longest finger.

Span

A span is the distance between the little finger and thumb when the hand is fully spread out.