EARTH AND SPACE SCIENCE Chapter 3 Models of the Earth 3.1 Finding Locations on Earth.
Models and Dimensions of Earth
description
Transcript of Models and Dimensions of Earth
Models and Dimensions of EarthI. Model = Anything that represents the properties of
an object.A. Types and Examples of Models:
_______ -provides us with information through our sense of sight.
Physical
globe
_______ -a physical model with moving parts so that it can perform the functions or movements as the original object.
Mechanical
Model train
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2.
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_______ -mathematical relationships expressed by symbols, formulas and equation.
Mathematical
equations
_______ -a graph to provide a “picture” of a relationship of symbols, formulas and equations.
Graphic
Line graph
_______ -models that can only exist in someone’s mind. Mental
Water molecule – H2O
3.
4.
5.
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II. Shape of Earth
A. Oblate Sphere - A flattened sphere
1. Flattened at poles
2. Bulges at Equator
3. Diagram of an _________________Oblate sphere
North Pole
South Pole
Equator
NOT TO SCALE
4. Earth’s equatorial circumference is
_______ greater than its polar circumference.
a. Equatorial circumference - 24,900 miles
b. Polar circumference - 24,860 miles2
B. Causes of Earth’s Shape
1. _______ Gravity -an inward pulling force. This force pulls inward equally
in all directions and causes earth to be __________spherical.
KEY:
= force of gravity
2. _______Centrifugal Force - An outward force caused by the spinning
(or rotating) of earth on its axis. This force causes earth to _______bulge.
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a. The faster the rotational speed, the _______ greater the centrifugal force.
X Y
b. (1) How long does it take each location to make one complete rotation?
X ________ 24 hours
Y ________ 24 hours
(2) Which location, X or Y, travels a greater distance to make one complete rotation? _____ X
(3) At which location, X or Y, is the rotational speed greater? _____ X
(4) At which location, X or Y, is centrifugal force greater? _____ X
c. Therefore, the greater centrifugal force causes earth to bulge at the
__________Equator.
X Y•
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C. Evidence of Earth’s Shape1. Photographs from space reveal that Earth is
Almost a perfect sphere – very, very spherical – looks round to the human eye.
2. Observations of ships on the horizon
The gradual “appearance” or “disappearance” of a ship over the horizon is evidence that earth’s surface is __________curved.
3. Observations of an Eclipse of the Moon (as viewed from Earth)a. As viewed from space:
As the moon orbits Earth, and travels from position 1 to position 2, it passes through
__________Earth’s shadow.
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b. As viewed from Earth:
c. Earth’s shadow on the moon (full moon) during a lunar eclipse provides evidence that Earth is ________spherical.
Photos by Brian Ottum
Top row shows a full moon gradually moving into Earth’s shadow (curved shadow).
Middle row shows the moon entirely in Earth’s shadow.
Bottom row shows the moon gradually moving out of Earth’s shadow (curved shadow).
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4. Measurement of Gravity a.
b. The shorter the distance between two objects, the greater the gravitational force. Therefore a person or object that is closer to the center of Earth (the center of gravity) would weigh more than when the person or object is farther from the center of gravity.
c. (1) If Earth is an “oblate spheroid”, where on the surface of Earth would a person be closer to the center of the Earth? ________________At the poles.
(2) Where on the surface of Earth would a person weigh the most?_________________At the poles.
d. Under what circumstances would a person weigh the same everywhere on Earth?
_________________________________________________If Earth was a perfect sphere (perfectly round).
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5. Observation of the North Star, Polaris a. The altitude of Polaris changes as an observer moves north or south (in the Northern Hemisphere); this is because Earth is _______ and it’s surface isspherical _______curved.
(Altitude is the height, measured in degrees that a heavenly body is above the horizon of the observer.)
b.
Observer Latitude
Altitude of Polaris
1
2
3
4
90o 90o
60o 60o
35o 35o
0o 0o
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c.
North Pole Canada
Southern U.S.A. Equator
d. Summary: The altitude of Polaris (above the horizon) is equal to the latitude of the observer.7
e. Locating the North Star
To find Polaris:1. Find the “Big Dipper” (Ursa major)2. Find the two end stars in the bucket – these are the pointer stars.3. Use your thumb and finger to measure the distance between the pointer stars. Polaris is 5 times that distance from the bucket of the Big Dipper.
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IX. Parts of Earth
A. The three “spheres” of outer Earth
1. the shell of gases that surrounds Earth.____________ Atmosphere
2. the waters of Earth; its oceans, seas, lakes and rivers.
____________Hydrosphere
3. the dense, solid outer shell of Earth composed of rock.
___________Lithosphere
4. % of Earth’s surface is covered by land.___________29
atmosphere
hydrosphere
lithosphere
5. Which sphere of Earth is:
a. most dense?
b. least dense?
__________________ lithosphere
__________________ atmosphere
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B. Earth’s Interior
crust
mantle
inner core
outer core
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III. Size of Earth
A. The Greek Mathematician, Eratosthenes, is credited as being the first man to make a scientific determination of Earth’s circumference. The time was about 200 BC – over 2000 years ago!
1. 2. Eratosthenes’ method for determining Earth’s circumference:
part-------- whole
7.2o
-------360o
Angle
500 miles = ------------- Circum. Distance
7.2 x Circum. = 180,000---------------
7.2 ----------
7.2
Circum. = 25,000 miles
Actual Circum. = 24,881 miles8
B. Earth’s other measurements Once Earth’s circumference is known, it’s other dimensions: diameter, radius, volume and surface area, can be calculated. 1. Calculating Earth’s diameter:
C = π d 25,000 miles = 3.14 d------------------ --------- 3.14 3.14
D = 7961.7 miles
2. Based on Earth’s diameter, its radius would be: ___________About 4000 miles.
3. Using the formula for the volume of a sphere, V = 4/3 π r3
Earth’s volume is:
V = 4/3 x 3.14 x (4000)3 V = 1.3 x 3.14 x 64,000,000,000
V = 267,520,000,000 cubic miles.
4. Using the formula for area of a sphere, A = 4 π r2, Earth’s surface area is:
A = 4 x 3.14 x (4000)2 A = 12.56 x 16,000,000
A = 200,960,000 square miles9
IV. Latitude and Longitude A. Latitude - Angular distance north or south of the Equator.
1. Parallels- Lines used for measuring latitude – they are “parallel” to the Equator and to each other.
2. Equator- 0o latitude, starting place for measuring latitude.
3. North/South Pole - 90o latitude, maximum latitude.
Use a protractor to measure every 10o above the Equator. Draw parallel lines at each of these angles.
RT p.3
RT p.4
RT p.5
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B. Longitude - Angular distance east or west of the Prime Meridian
1. Meridians - Lines used for measuring longitude, they meet at the poles.
2. Prime Meridian - 0o longitude, starting place for measuring longitude.
3. International Date Line - 180o longitude, maximum longitude.
Measure every 15o from the top.
RT p. 3
RT p. 4
RT p.511
C. Determining Latitude and Longitude (Continents and Oceans)
1. Use the map to determine the latitude and longitude of these numbered and lettered locations. Name the continents and oceans indicated by the letters.
Location Latitude Longitude
1
2
3
4
5
Location Latitude Longitude
6
7
8
9
10
30o N
45o S
120o W
75o E
0o 135o W
45o N 135o E
65o-70o S 165o W
45o S 180o
40o-45o N 75o-80o W
65o-70o N 0o
15o S 15o E
20o-25o S 45o-49o W12
C. Determining Latitude and Longitude (Continents and Oceans)
1. Use the map to determine the latitude and longitude of these numbered and lettered locations. Name the continents and oceans indicated by the letters.
Continents
A
B
C
D
E
F
G
Oceans
H
I
J
K
L
North America
South AmericaEurope
Asia
Africa
Australia
Antarctica
Atlantic
Pacific
Indian
Antarctic
Arctic12
Noon
SunriseD. Earth’s Time Zones 1. As Earth rotates on its axis, half of earth is facing the sun and is experiencing daylight; the other half is in darkness and is experiencing night. 2. When the sun is directly over a certain meridian, it is 12 noon at any location at or near that meridian.
Midnight
Sunset
3. Think:Earth is a sphere/degrees in a circle Earth’s-------------------------------------------------- = -------- = = RotationalTime/ Hours to make one rotation Speed
360o
24 hr15o/hr
4. a. Number of time zones on Earth =
b. Approximate width of each time zone =
____ 24
_____ 15o
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5. a. If it is Wednesday, and you cross the International Date Line going west, it would then be _________Thursday
b. It is Tuesday, and you cross the International Date Line while traveling east, it would then be _________Monday
Going east subtract a day, going west add a day.
6. a. How many time zones are there in the continental U.S.?____4
b. Is it earlier or later in California than in New York? _______earlier
c. If it is 8:00 EST, what time is it in PST?
______5:00
d. If is 6:00 MST, what time is it in EST?_____8:00
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V. Fields- A region of space/area that has a measurable value of a given property at every point.
A. Isolines - Lines on a field map connecting all points of the same value.
B. The diagram below shows an elevation field map of a geographical region; the elevation is in feet (above sea level). Complete this field map by drawing isolines for 40, 50, 60, 70 and 80 feet.
1. What is the approximate elevation of point
A
B
C
_______71 – 79 ft ~75 ft
_______41 – 49 ft ~44 ft
_______51 – 59 ft ~56 ft
2. Isolines that show elevation are called ______________contour lines.14
C. The field map below shows weather data plotted for a January morning.
1. What measurable property is shown on this map? ___________temperature
2. Based on this property, the isolines on this map are called __________isotherms
3. What is the approximate measurement for this property for New York State?____5o C
D. The field map below shows the average yearly number of thunderstorms in the United States.
1. Approximately how many thunderstorms occur each year in:
a. Albany, New York –
b. Los Angeles, California –
New Orleans, Louisiana -
________20 - 30
________ Less than 10
________More than 70
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VI. Topographic Maps . . . are maps of an elevation field A. Topographic Maps show elevation of the land by using contour lines, and show other natural and man-made features using symbols. B. Contour line - isolines on a map connecting points of the same
elevation
Elevation - Height above sea level (feet, meters, etc.)
C. Contour interval - DIFFERENCE IN ELEVATION
D. Index Contour Line - Heavy, dark contour line, usually with numerical value for elevation marked.
E. Depression Contour Line – Special contour lines used to show a hole or a crater on Earth’s surface. These lines are drawn like contour lines but are marked on the inside.
between two consecutive contour lines.
F. Bench Mark (B.M.) - Marker in the ground indicating the “exact” elevation above sea level.
G. Spot Elevations – are the elevations of such places as road intersections, hilltops, lake surfaces and other points of special interest. These points are located on the map by a small cross (+), unless the location is obvious, such as certain road intersections or hilltops.16
Index contour Bench Mark
Spot Elevation
Can you find the following on this example of a topographic map?
-Index contour -Bench mark -Spot elevation
Another example.
Find the 1650 ft line.
Find the 1700 ft line
How many “steps up” are there between the 1650 and 1700 ft lines? _____ 5
How do you get from 1650 to 1700 in five equal steps?
_______________Go up by ten each time
Therefore the contour interval on this map is
____________ 10 feet.
Sometimes there will be more than one line with the same value on a map. This happens whenever there is a ridge or a valley.
Notice that some of the lines here are different – they are called _______hachured
lines.
The outside hachured line is always equal to the lowest contour line next to it. Going in from there the elevation goes down.
H. A simple contour map (or topographic map)Can you identify features 1, 2, and 3?Contour line
Hachure (depression) lineIndex contour line
4. Contour interval -
________20 feet
5. Highest possible elevation (of the hilltop) - _________259 feet
6. Which is the steepest side of the hill: north, south, east, or west?
6. Which is the steepest side of the hill: north, south, east, or west?
7. How do contour lines show a steeper slope? ____________________Lines are closer together.
8. What three (3) basic features of a landform do contour lines show?
a.
b.
c.
____________________elevation
____________________Steepness (gradient)
____________________Shape of the land17
I. River Valleys (the law of V’s) – contour lines bend upstream where they cross a river. This can be used to determine the direction in which a river is flowing.
Can you tell which way this stream is flowing?
Can you tell which way the stream is flowing now?
The stream flows from right to left.
J. Common Symbols on Topographic Map
1.
2.
3.
4.
5.
6.
7.
8.
barn/garage
church
railroad
house, building
school
swamp
cemetery
Gravel pit, quarry, mine
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VII. Map Reading SkillsA. Directions on a map Complete the
statements below to give the correct direction between the cities on the map of Great Britain. Use the terms: north, northeast, east, southeast, south, southwest, west or northwest.
1. Dublin is of Manchester.___west
2. Manchester is of Dublin. ____east
3. Southampton is of Dublin._____southeast
4. Belfast is of London._____northwest
5. Glasgow is of Cardiff.____north
6. Limerick is of Aberdeen.______southwest
7. Aberdeen is of Limerick.______northeast
8. Manchester is of Newcastle._____south
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B. Distance on a map.
Use the given scale of miles on the map to determine the distance between the cities listed below.
1. Cardiff to Oxford = miles
2. Manchester to Dublin = miles
3. Oxford to London = miles
4. Plymouth to Limerick = miles
5. London to Manchester = miles
6. Aberdeen to Southampton =
miles
7. Which is the greater distance,
a. from Aberdeen to Belfast
or
_______95 - 105
_______180 - 195
_______55 - 70
_______230 - 245
_______150 - 165
_______ 400 - 420
b. from Dublin to Oxfordb. from Dublin to Oxford19
VIII. Topographic Map Skills A. Drawing Contour Lines on a Field Map - draw contour lines for 20, 40, 60, 80, 100, 120 feet.
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B. Drawing a Profile from a Contour MapStep 1: Place the straight edge of a sheet of paper between the two points.
Step 2: Place a mark on the paper at each point where a contour line goes under the paper. (and at A and B)
Step 3: Write the elevation of each contour line next to each mark.
110
100
80 60
40 40 6080
100
120
123
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B. Drawing a Profile from a Contour Map
140
120
100
80
60
40
20
0
A B
Step 4: Lay the piece of paper under the grid. (Line up points A and B)
110
100 80 60 40 40 60 80 100
120
123
Step 5: Place a dot on the grid at the correct elevation above each mark on the paper – keep the spacing the same.
••
••
• ••
•
•• •
Step 6: Draw a smooth line between the points. Make sure it dips below the bottom two points. Never draw the line straight across. Notice how the hill is steeper where the lines (and dots) are closer together.20
C. Gradient - Rate at which elevation changes from place to place.
1. Formula: change in field valueGradient = --------------------------------- distance
2. Calculating Gradient - Use the elevation field map that you drew contour lines on (which is one the previous page) to calculate the gradient between:
a. Point A and point C
Elevation at A = 110 ftElevation at C = 20 ft
110 – 20 ftGradient = ---------------- 3.5 miles
Reference Table page =
_______1
90 ftG = --------- 3.5 mi
G = 25.7 ft/mi (Don’t forget units – use the equation to figure them out.)
b. Point B and point D
Elevation at B = 123 ftElevation at D = 13 ft
123 – 13 ftGradient = ---------------- 3 miles
110 ftG = --------- 3 mi
G = 36.7 ft/mi (Don’t forget units – use the equation to figure them out.)21
2. Calculating Gradient - Use the elevation field map that you drew contour lines on (which is one the previous page) to calculate the gradient between:
c. Point B and point E
Elevation at B = 123 ftElevation at E = 80 ft
123 – 80 ftGradient = ---------------- 1.5 miles
43 ftG = --------- 1.5 mi
G = 28.7 ft/mi (Don’t forget units – use the equation to figure them out.)
d. Point F and point C
Elevation at F = 27 ftElevation at C = 20 ft
27 – 20 ftGradient = ---------------- 1.5 miles
7 ftG = --------- 1.5 mi
G = 4.7 ft/mi (Don’t forget units – use the equation to figure them out.)
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Determining the gradient on a field map
To determine the change in field value look at the value of the isolines
Gradient =
Change in field value
Distance
Gradient Formula:
The change in field value of the orange line is 60 meters
To figure the change of value:1. Determine the contour interval2. Figure the amount of contour intervals3. Multiply both figures
For the blue line 1. The contour interval is 202. There are 6 contour intervals3. The change in field value is 120 meters
To determine the distance use the map scale
The blue line has a value of about 1.1 miles
The orange line has a value of about 1.2 miles
Gradient of the blue line is 1201.1
= 109.1 meters/mile
Gradient of the orange line is 601.2
= 50 meters/mile
The steepest gradient of the map since the lines are closest together
The orange line has a lower gradient then the blue line.
The closer the isolines are the steeper the gradient