lab 5 asi

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The purpose of this lab is to explore basic properties of the Jovian planets and to examine geologic processes on some of the larger moons of the outer solar system.

Part 1:  A Comparison of Planetary Sizes


Background

As we saw last week, a basic property of planets is their size. To compare sizes, we can compare the diameter (distance from one side to the other) of one planet to another, or we can compare the radius (half the diameter) of one planet to another.

Graphing All the Major Planets

Table 1. The average diameters* of the planets in our solar system in kilometers (km)

MercuryVenusEarthMarsJupiterSaturnUranusNeptune487912,10412,7426779139,822116,46450,72449,244

*Data source: AstronomyNotes.com

Size comparison is better shown graphically than with numbers. You have already done this for the terrestrial planets in last week's lab.

example of a graphed circle

The image above shows an example of what you will be doing. Remember scientific notation. The numbers on the axes are 0; 20,000; 40,000; and 60,000; and refer to kilometers. In order to plot a circle representing a planet with a 70,000 km diameter, I first took the radius (35,000 which is half the diameter), moved along the x-axis to 35,000, and drew a line up from zero that was 70,000 units long. Then I repeated this for the y-axis and sketched in the circle around the “+” that I’d drawn. Detail about drawing the circles were shown in the video last week.

Table 1 gives the average diameters for the planets in our solar system in kilometers.  Use this data to plot circles representing the different planets to their correct sizes on the graph paper provided (.png version; .docx version; and .pdf version). Use a different color for each circle. Clearly identify which circle corresponds to which planet (labels or keys to colors).  When you have finished, upload your completed graph to the correct assignment box.

graph paper for plotting sizes of planets

Figure 1. Example of graph paper used for plotting planet sizes. Links to downloadable .png, .docx, and .pdf versions.

UPLOAD TO ASSIGNMENT BOX FOR LAB 5 - Solar-System-Planet-Sizes

Upload your diagram to the Assignment Box—name your files: [Yourlastname]_Solar_System_Planet_Sizes

In addition to looking at a graphical representation, we sometimes compare objects by saying how many times larger or smaller one is relative to the other.  For example:  If one student is 5.5 feet tall, and another is 6 feet tall, then we can say that the taller student is 1.1 times taller than the shorter student or that the shorter student is 0.92 times shorter than the taller student. This is done by simply dividing one number into another.

Lab 5: Question 1 

Jupiter and Saturn are similar in size, but Jupiter is the largest planet in the solar system.  Jupiter is _________ times larger than Saturn.  Enter a number only.  Use two significant figure [example, 2.2 or 22]

Lab 5: Question 2 

SHORT ESSAY: Spend a bit of time looking at the graph you've created. Describe the variation that you see for the sizes of these planets. This should be at least a paragraph, not just a sentence or two, and should be more detailed than "some are bigger and some are smaller".  This is worth 5 points (regular questions are worth 1 point).

Part 2: A Comparison of Planetary Masses

Mass of Jupiter

Background

We determine the mass of a planet by seeing its gravitational pull on another object.  As mentioned in Lecture 2.4, Galileo was the first to observe the four largest moons of Jupiter orbiting the planet; these moons (Io, Europa, Ganymede, and Callisto) are called the Galilean satellites after their discoverer.  These moons orbit because of Jupiter's gravitational pull on them.  Kepler noticed that planets orbiting the Sun obeyed a relationship (his third law):

a3 =p2{"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>a</mi><mn>3</mn></msup><mo>&#xA0;</mo><mo>=</mo><msup><mi>p</mi><mn>2</mn></msup></math>"}   EQUATION 1

where a is the semi-major axis of the planet's orbit in astronomical units, and p is the orbital period in years. For the Earth, both numbers are 1 (we're 1 A.U. from the Sun and we orbit the Sun in one year).

Newton added gravity to Kepler's third law to create an expression that can be used for any object orbiting any other object:

a3 = p2×(G×M4×π2){"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>a</mi><mn>3</mn></msup><mo>&#xA0;</mo><mo>=</mo><mo>&#xA0;</mo><msup><mi>p</mi><mn>2</mn></msup><mo>&#xD7;</mo><mfenced><mfrac><mrow><mi>G</mi><mo>&#xD7;</mo><mi>M</mi></mrow><mrow><mn>4</mn><mo>&#xD7;</mo><msup><mi mathvariant="normal">&#x3C0;</mi><mn>2</mn></msup></mrow></mfrac></mfenced></math>"}   EQUATION 2

where a and p are the same as in Equation 1, G is a gravitation constant (a constant number), and M is the mass of the central object (the Sun's mass for planets; Jupiter for the Galilean satellites).  For the Earth's orbit around the Sun, a is 1 AU, p is 1 year, M is the mass of the Sun, and the value for G was chosen to make the term in the parentheses reduce to 1, so that Equation 2 becomes Kepler's third law.

We can rearrange terms to solve for mass:

M = a3p2×(4×π2G){"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>M</mi><mo>&#xA0;</mo><mo>=</mo><mo>&#xA0;</mo><mfrac><msup><mi>a</mi><mn>3</mn></msup><msup><mi>p</mi><mn>2</mn></msup></mfrac><mo>&#xD7;</mo><mfenced><mfrac><mrow><mn>4</mn><mo>&#xD7;</mo><msup><mi mathvariant="normal">&#x3C0;</mi><mn>2</mn></msup></mrow><mi>G</mi></mfrac></mfenced></math>"}   EQUATION 3

We can use Equation 3 to calculate the mass of Jupiter by watching one of its moon's orbit around it.  However, astronomical units and years are not useful for satellites that are closer to Jupiter than Earth's Moon is to us, and that orbit Jupiter in days, not years.  So we can do conversions to adjust G to units of Jupiter diameters (a length) and days.  Doing so and multiplying by 4 and PI squared gives us

M = (2.27×1026)×(D3T2){"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>M</mi><mo>&#xA0;</mo><mo>=</mo><mo>&#xA0;</mo><mfenced><mrow><mn>2</mn><mo>.</mo><mn>27</mn><mo>&#xD7;</mo><msup><mn>10</mn><mn>26</mn></msup></mrow></mfenced><mo>&#xD7;</mo><mfenced><mfrac><msup><mi>D</mi><mn>3</mn></msup><msup><mi>T</mi><mn>2</mn></msup></mfrac></mfenced></math>"}   EQUATION 4

where D is the distance between Jupiter and one of its moons in units of Jupiter diameters, and T is time in days.

Measurements and Calculations

Figure 2 shows a sequence of 5 images of Jupiter and its four largest satellites, taken on different nights at different times.  We are going to use the motion of Callisto (the outermost moon) around Jupiter to determine the mass of Jupiter, using Equation 4.

You will be making your measurements on a much larger version of this image. [Link to larger version of Figure 2].  You should be able to magnify this; you can also download and open with a photo viewer or paint program and magnify.

5 sequential images of Galilean moons orbiting Jupiter

Figure 2.  Small version of screen shots showing the 4 Galilean satellites orbiting Jupiter. Original source (Penn State) has replaced simulator with a very different one since these screen captures were made.

In order to use Equation 4, you need to determine D (the distance between Callisto and Jupiter in Jupiter Diameters-JD), and T (the time in days).  The figure below is an enlargement of the first (September 3) image in Figure 2. I've measured the distance between the surface of Jupiter and the surface of Callisto as 13.8 JD, using a screen shot and small circles that are approximately the same size as Jupiter.  I measured this with a millimeter ruler and got 13.6 JD.  Another instructor measured this distance and got 13.1 JD.  So this number will vary depending on the accuracy of your measurement. 

illustration of how to measure Jupiter Diameters

Figure 3.  Enlargement of the left hand side of the September 3rd image from Figure 2.  We measure JD (Jupiter Diameters) from the surface of Jupiter to the surface of Callisto.  There are 13 full JD and an additional partial JD between the two objects. 

Determine the distance

[Link to larger version of Figure 2] For each of the five observations (use the large version of Figure 2), determine Callisto's orbital distance in JD.

Write down your individual measurements for Callisto's orbital distance.  You will use the average of these values in subsequent calculations

  • September 3: ____________ JD (Jupiter Diameters)
  • September 12: ___________ JD (Jupiter Diameters)
  • September 20: ___________ JD (Jupiter Diameters)
  •  September 28: ___________ JD (Jupiter Diameters)
  • October 7: ______________ JD (Jupiter Diameters)

Lab 5: Question 3 

Average the 5 measurements you made and enter that average in the box provided.  Important:  Use only 3 significant digits (so 13.8 rather than 13.833333).  [Hint: your average should be between 13.0 and 14.0).

•  Average of 5 values: ___________ JD (Jupiter Diameters)

Determine the Time

The date and time for each image is given on the left hand side.  Times are U.T. or universal time (so 21:00 UT is 9 pm in Greenwich England). The date is also given in Julian Days, which is used mainly by astronomers, assuming that the zero point is at noon U.T. on January 1, 4713 BC (or BCE).  You can subtract the two numbers to get the difference in time (in UT). This has been done for you.

  • Time from September 3 to September 12 observations: 8.5 days
  • Time from September 12 to September 20 observations: 8.1 days
  • Time from September 20 to September 28 observations: 8.2days
  • Time from September 28 to October 7 observations: 8.4 days

Lab 5: Question 4 

What is the average length of time between the images? Enter a number in the box provided.  Use only 2 significant digits (such as 8.1).

But, for Equation 4, we want the time for a complete orbit by Callisto.  Each image was taken at approximately half the orbital period, so Callisto is on the left, then the right, then the left, and so on.  You need to double the answer to Question 4 to get the orbital period in days.

Lab 5: Question 5 

What is the orbital period for Callisto in days.  You need to double your answer to Question 4.  Enter an answer with three significant figures (put only one digit after the decimal point).

Now use Equation 4 and your answers to Question 3 (use the average) and Question 5 to calculate the mass of Jupiter.  Your answer will not exactly match the true value.  I came out slightly high and another instructor came out slightly low.

Lab 5: Question 6 

This is a short answer essay question, and is worth 5 points.  In the box provided, include

•  your calculated mass of Jupiter (answer is in kilograms)
•  your calculations (how you used Equation 4 to get your answer)
•  a short discussion comparing your answer to the published value (given in Table 2 below).  

Planets and Solar System

What exactly is mass? Chemists will often define mass as the amount of matter in an object (matter is something that will have weight in a gravitational field), while physicists often talk about something with more mass having more inertia than something will less mass. Geologists and planetary scientists tend to think more about density than mass (as we learned in module 3, density is the amount of mass in a given volume).

ρ=MV{"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>&#x3C1;</mi><mo>=</mo><mfrac><mi>M</mi><mi>V</mi></mfrac></math>"}    EQUATION 5

where ρ is density, M is mass, and V is volume.  Planets and stars are spherical (more or less), which means their volumes can be approximated by

Vsphere=43×π×r3{"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>V</mi><mrow><mi>s</mi><mi>p</mi><mi>h</mi><mi>e</mi><mi>r</mi><mi>e</mi></mrow></msub><mo>=</mo><mfrac><mn>4</mn><mn>3</mn></mfrac><mo>&#xD7;</mo><mi mathvariant="normal">&#x3C0;</mi><mo>&#xD7;</mo><msup><mi mathvariant="normal">r</mi><mn>3</mn></msup></math>"}   EQUATION 6

where r is the radius of the sphere.

So, comparing sizes and masses can give us some information about the density (and therefore composition) of an object.  For example, the Earth and the Moon are both terrestrial worlds containing rock and metal.  The Earth's diameter (twice the radius is 12,742 km, as shown in Table 1 above.  The Moon's diameter is 3,476 km (NASA).  We can say that the Earth is 3.67 times larger than the Moon (12,742 divided by 3,476), or between 3 and 4 times larger.  The masses for the Earth and Moon are given in Table 2.  If the Earth and Moon were made of exactly the same material, we'd expect the Earth to be about 50 times more massive than the Moon (all the terms in equations 5 and 6 drop out except for the two masses and the two radii cubed, so 3.67 cubed, i.e., relative sizes cubed).  If we look at the masses of the Earth and Moon (Table 2), we can see that the Earth is actually almost 82 times more massive than the Moon, which clearly indicates that the material making up the Earth has an average density greater than the material making up the Moon.

So let's compare the two largest Jovian planets.  Jupiter and Saturn are fairly similar in size (you calculated this is Question 1). 

Lab 5: Question 7 

Assuming that Jupiter and Saturn are the same density, then how many times more massive do you expect Jupiter to be relative to Saturn (use your answer to Question 1 for the relative sizes)? Enter only a number.

Lab 5: Question 8 

Using the values in Table 2, how many times more massive is Jupiter than Saturn in reality?  Enter only a number.

Despite being composed of roughly the same materials, Jupiter and Saturn are not the same density.  This is because gas will compress more in a stronger gravitational field.

Table 2. Masses for solar system objects 

Planet/

Object

Mass

(times 1024 kg)

Object

Mass

(times 1024 kg)

Mercury

0.330

       Sun

1,988,500

Venus

4.87

Earth's Moon

0.073

Earth

5.97

All Asteroids

0.00239

Mars

0.642

All Jupiter's Moons

0.39312

Jupiter

1898

All Saturn's Moons

0.1406

Saturn

568

All Uranus' Moons

0.008876

Uranus

86.8

All Neptune's Moons

0.021492

  Neptune

102

Charon

0.001586

Pluto

0.0146

Kuiper Belt

0.13552

References for Table 2:  Planets, Earth's Moon, Pluto; Sun; Asteroids; Jupiter's Moons; Saturn's Moons; Uranus' Moons; Neptune's Moons; Charon; Kuiper Belt. (All are NASA fact sheets, except for Asteroid Belt and Kuiper Belt which are based on recent research papers.)

Jupiter has often been called a "failed star" because it is very similar in composition to the Sun, but much less massive.  Table 2 gives the masses for everything in the solar system (at least for everything that currently has measured or estimated masses).

Lab 5: Question 9 

How many times more massive is the Sun than Jupiter?

We can also think about the mass of the Sun (or Jupiter) as a percentage of the total mass. For example, if I have 5 marbles that are all identical, one marble will have 1/5th of the mass of the entire group of marbles, which is 20% of the total mass.   You calculate this by taking 1 marble, dividing it by all of the marbles (1/5 = 0.2) and then multiplying by 100 to get percent. The Sun makes up approximately 99.86% of the total mass of the solar system. So the rest of the solar system is insignificant in terms of mass. The Jovian planets make up most of that remaining mass. 

Lab 5: Question 10 

Jupiter's mass makes up what percentage of the mass of the solar system that is NOT in the Sun (exclude the Sun)?  Enter only a number.

Part 2: Satellites of the Jovian Planets

Background

The larger moons of the outer planets are large enough to be considered planets if they orbited the Sun directly, instead of orbiting a planet.  Both Ganymede and Titan are actually larger than Mercury (the innermost planet in our solar system).  Callisto is only slightly smaller than Mercury.  Io, Europa, and Triton are similar in size to Earth's Moon. 

selected moons of the outer solar system

Figure 4.  Selected moons of the outer solar system, with the Earth and Earth's moon for scale.  Credit: OpenStax Astronomy.

Jupiter's Moon:  Io

Io, the innermost of the four large moons of Jupiter is the only large satellite in the outer solar system that does not have an icy surface.  This is because it is the most volcanically active moon in the solar system, and the surface is constantly being covered with newly erupted material (rock and sulfur deposits).

The figure below shows lava flows associated with the Amirani hotspot volcano and associated plume (this image has been color-enhanced.) Image data are shown for two flybys of Io by the Galileo spacecraft, from orbit I24 (Oct. 11, 1999; Day of Year = 284) and from orbit I27 (Feb. 22, 2000; Day of Year = 53). The left color panel shows lava flows (black & dark brown), SO2-condensate deposits (white-pink) from the Amirani plume, and S-rich deposits (yellow, red-brown). The rightmost panel shows areas of new lava in two inset regions (region 1 top, region 2 bottom row). This new lava (which is colored in red on the rightmost set of images) was erupted sometime between the two observation dates.

images of lava flows on Io at two different times

Figure 5.  Original caption (parts omitted): "These images from NASA's Galileo spacecraft show changes in the largest active field lava flows in the solar system, the Amirani lava flow on Jupiter's moon Io. Scientists have identified 23 distinct new flows by comparing the two images taken 134 days apart, on Oct. 11, 1999, and Feb. 22, 2000.  The color image on the left is a composite of black-and-white images collected on Feb. 22, 2000 and June 30, 1999. The white boxes and arrows show the locations of the areas analyzed in detail on the right. The left-hand pair of black-and-white images, labeled I24, are parts of a mosaic collected on Oct. 11, 1999. The center pair of images, labeled I27, shows what the same areas looked like on Feb. 22, 2000. These later images are about twice as sharp as the earlier images, making some features that did not change appear crisper. In order to demonstrate the real changes, the I27 images were divided by the I24 images, producing the pair of ratio images on the right. The new dark lava that erupted between October 1999 and February 2000 has been highlighted in red." Image and caption from NASA (PIA02585).

If we assume that this rate of eruption is typical, we can calculate how long it would take to resurface Io (cover the entire moon with a new surface of recent lava flows).  

The first step is to determine the rate of resurfacing.  We can use the information for the Amirani region by looking at the amount of surface area covered between the two observations divided by the time between the two observations.

The area of new lava in Regions 1 and 2 of Amirani has been estimated from the red-colored images as:

  • Area of new flows in Region 1 - 285 km2.
  • Area of new flows in Region 2 - 340 km2.

Lab 5: Question 11 

What is the average amount of new lava produced between the two observations (the average area)? Enter a number in the box provided. 

The two images were taken 135 days apart (October 11, 1999 to February 22, 2000).  We're going to want to use years rather than days for our units, so we divide 135 by 365.25 to get 0.37 years between the two images.

stop signIn order to calculate the time needed to resurface Io, you need to know the resurfacing rate for the Amirani region.  In order to ensure that you know this, enter your answer for the resurfacing rate into Mini Quiz 1, and check the feedback for the correct answer before continuing with the main lab quiz.

Mini Quiz 1

Calculate the rate of resurfacing by lava in km2/year for the Amirani region using your answer to Question 11 and the time between the two image.  Average resurfacing rate near Amirani hotspot is ________ km2/year. 

Enter your answer (a single number) in the box provided. When you are done, please check the Mini Quiz 1 feedback. Subsequent questions depend on using the number given in the feedback, regardless of whether your answer was marked correct or not.  Use this number, and not your answer for the calculations that follow.

Please make sure you have the correct answer (given under "View Feedback" screen capture of view feedback linkafter you submit your quiz--click on the link to show the feedback). Use the correct value in order to answer Question 12 below.

Assuming that the resurfacing rate for the Amirani region is representative for Io as a whole, we can use the answer to Mini Quiz 1 to calculate the time needed to resurface all of Io.  However, we first need to know how much area needs to be covered. Io's surface area can be approximated by the surface area of a sphere:

surface area of a sphere = 4×π×r2{"version":"1.1","math":"<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s</mi><mi>u</mi><mi>r</mi><mi>f</mi><mi>a</mi><mi>c</mi><mi>e</mi><mo>&#xA0;</mo><mi>a</mi><mi>r</mi><mi>e</mi><mi>a</mi><mo>&#xA0;</mo><mi>o</mi><mi>f</mi><mo>&#xA0;</mo><mi>a</mi><mo>&#xA0;</mo><mi>s</mi><mi>p</mi><mi>h</mi><mi>e</mi><mi>r</mi><mi>e</mi><mo>&#xA0;</mo><mo>=</mo><mo>&#xA0;</mo><mn>4</mn><mo>&#xD7;</mo><mi mathvariant="normal">&#x3C0;</mi><mo>&#xD7;</mo><msup><mi mathvariant="normal">r</mi><mn>2</mn></msup></math>"}  EQUATION 7

where r is the radius of the sphere.  Io's radius is 1821 km.  

Mini Quiz 2

Calculate the surface area of Io in km2.  The surface area of Io is ________ km2. 

Enter your answer (a single number) in the box provided. Do not use scientific notation, and do not include any commas. When you are done, please check the Mini Quiz 2 feedback. Subsequent questions depend on using the number given in the feedback, regardless of whether your answer was marked correct or not.  Use this number, and not your answer for the calculations that follow.

Please make sure you have the correct answer (given under "View Feedback" after you submit your quiz). Use the correct value in order to answer Question 12 below.

The time to resurface Io is equal to Io's surface area divided by the average resurfacing rate.

Lab 5: Question 12 

The time needed to resurface Io by volcanic flows is _______ years.  Enter a number in the box provided.  

Jupiter's Moon:  Europa

"Scientists have good reason to believe that Jupiter’s moon Europa has a liquid ocean wedged between its ice shell and a rocky sea floor. Though it has a known radius of 1,561 kilometers -- slightly smaller than Earth’s moon -- uncertainty exists about the exact thickness of Europa’s ice shell and the depth of its ocean." NASA/JPL.  Estimates for Europa's ice shell range from 2 to 30 kilometers thick, and estimates of the water layer beneath the surface range from 3.5 to 100 kilometers thick.

cartoon showing layers inside Europa

Figure 6. Model showing layers inside Europa.  A metallic core (colored black) is in the center, surrounded by a thick rocky layer (brown), with an ocean of liquid water on top of the rock (blue), all capped by a layer of ice (white surface layer). Image source: NASA/JPL.

How much water is on Europa?  With the uncertainties on the thicknesses of the icy crust and the water layer, all we can do is estimate a maximum and minimum possible value for the volume of the ocean.  How do we do this? We determine the volume of a spherical layer by subtracting the volume of a smaller sphere (the bottom of the ocean) from the volume of a larger sphere (the top of the ocean), using Equation 6 (given earlier on this page). 

layers in Europa with radii for top and bottom of ocean indicated

Figure 7.  Model for Europa's interior showing metallic core (black), rocky mantle (brown), water layer (blue) and ice layer (white).  Lines indicate the radii for the top and bottom of the water layer. Illustration by M. Hutson/PCC.

We need to determine the radius for the top and bottom of the ocean layer.  We know the radius of Io (1,561 km).  The top of the ocean layer will be the bottom of the outermost ice layer.  The ice layer has an estimate thickness of between 2 and 30 km. 

STEP 1: Find the minimum and maximum radius of the top of the water layer, which is Europa minus its ice shell.

  • Minimum rtop: 1,561 km - 30 km = 1,531 km
  • Maximum rtop: 1,561 km - 2 km = 1,559 km

STEP 2: Find the minimum and maximum radius of the bottom of the water layer (which is also the top of Europa’s rocky interior)
by subtracting the ice thickness and ocean depth from the radius

  • Minimum rbottom: 1,561 km - (30 km + 3.5 km) = 1,527.5 km
  • Maximum rbottom: 1,561 km - (2 km + 100 km) = 1,459 km

STEP 3: Use the formula for the volume of a sphere (Equation 6) to find the minimum and maximum volume for Europa’s ocean layer.

  • Minimum volume of Europa's ocean: 4 x  PI x(1,5313 - 1,527.53) = 102,857,290 km3
  • Maximum volume of Europa's ocean: 4 x  PI x(1,5593 - 1,4593) = 2,862,511,574 km3

So the range of possible values for the volume of Europa's ocean is approximately 100 million cubic kilometers to almost 2.9 billion cubic kilometers.  How much water is that?  Let's compare to some bodies of water on Earth.

Table 3: Volumes of water contained in different bodies on Earth.

US map showing location of Lake Superior

Lake Superior

Volume of water: 12,100 cubic kilometers 

Data Source: Cook County

Image Source: Wikimedia

global view of Earth with Mediterranean identified

Mediterranean Sea

Volume of water: 3,750,000 cubic kilometers

Data Source: Wikipedia

Image Source: NASA

gulf stream currents drawn on image of Atlantic Ocean

Earth's Oceans

Volume of water: approximately

1.35 billion cubic kilometers

Data Source: Wikipedia

Image Source: NASA

Lab 5: Question13 

The minimum estimated volume of water on Europa is __________.

•  similar in size to Lake Superior
•  approximately 1/3 the volume of the Mediterranean Sea
•  approximately 3 times the volume of the Mediterranean Sea
•  approximately 30 times the volume of the Mediterranean Sea
•  approximately 1/2 the volume of the Earth's oceans
•  approximately 2 times the volume of the Earth's oceans

Lab 5: Question 14 

The maximum estimated volume of water on Europa is __________.

•  similar in size to Lake Superior
•  approximately 1/3 the volume of the Mediterranean Sea
•  approximately 3 times the volume of the Mediterranean Sea
•  approximately 30 times the volume of the Mediterranean Sea
•  approximately 1/2 the volume of the Earth's oceans
•  approximately 2 times the volume of the Earth's oceans

Jupiter's Moons Compared

4 Galilean satellites compared at different scales

Figure 8. Original caption (some text removed): "This mosaic includes images taken by NASA's Galileo spacecraft during nine orbits around Jupiter and its four largest satellites. From left to right, the moons shown are Io, Europa, Ganymede, and Callisto. Most of the images were acquired between June 1996 and June 1997 by Galileo, but three images- Callisto in the top row, Ganymede in the middle row and Io in the bottom row-are from Voyager's mission to Jupiter in 1979.  The top row displays the relative sizes of the moons in global views at relatively low resolution. The images, scaled to about 10 kilometers (3.9 miles) per picture element (pixel), feature the smallest visible features of about 20 kilometers (12.4 miles). Middle row images show regional views of up to 10 times higher resolution, each covering an area about 1,000 by 750 kilometers (621 by 466 miles) and scaled to about 1.8 kilometer (1.1 mile) per pixel. Bottom row views represent the highest resolutions, covering areas about 100 by 75 kilometers (62 by 47 miles) and scaled to about 180 meters (197 yards) per pixel.  Spectral regions not visible to the eye are shown, indicating differences in surface chemical composition or changes in the way the surface reflects sunlight. For example, in the left middle image, bright red depicts newly-ejected volcanic material on Io, and the surrounding yellow materials are older sulphur deposits. The picture to its right shows enormous cracks in Europa's icy shell. Blue represents ice and reddish areas probably represent a thin coating of darker material ejected by ice volcanoes along the cracks."  Source: NASA Photojournal (PIA00743).

Lab 5: Question15

Put the four Galilean moons in order of distance from Jupiter (from closest to Jupiter to farthest from Jupiter).

•  Callisto
•  Europa
•  Io
•  Ganymede

Lab 5: Question16 

Examine Figure 8.  Old icy surfaces are dark (from space weathering), but young craters will excavate fresh clean ice and will appear white. Put the four Galilean moons in order of age of surface (from youngest surface to oldest surface).

•  Callisto
•  Europa
•  Io
•  Ganymede

Lab 5: Question 17 

TRUE/FALSE:  The age of the surface of a moon indicates the level of geologic activity on that moon.  For the Galilean satellites, geologic activity is caused by a heating mechanism related to Jupiter's gravitational pull.

Saturn's Moon:  Titan

Background

Saturn's largest moon Titan is slightly larger than the planet Mercury (about 6%, or 1.06 times larger), and is the only moon in the solar system with a thick atmosphere (air pressure on the surface of Titan is about 1.5 times that at the surface of the Earth). As with Venus, thick clouds in Titan's atmosphere prevent orbiting spacecraft from viewing the surface in visible light.  The Cassini spacecraft imaged Titan's surface in ultraviolet and infrared light, and used radar to map features on the surface.  The Huygen's lander sent back images in visible light from a small area on the surface after it got beneath Titan's cloud layer.

As discussed in Lab 4, a topographic map uses color coding to indicate the relative elevation (highs and lows) of landforms, such as plains, volcanoes, impact craters, etc.  Generally, violet and blue are used for low elevations, shades of green for average elevations, and yellow/brown/orange/red/white for high elevations.  

A geologic map uses different colors to represent different types of rocks and/or deposits on the surface of a planet (such as sand dune, lakes, etc.), as well as locations of tectonic structures such as faults, rift valley, volcanoes, etc.

Exploring Titan

Below is a topographic map for Titan.

topographic map of Titan

Figure 9. Topographic map of Titan's surface.  Source: NASA.

Lab 5: Question 18 

Looking at the elevation scale on Figure 9, what is the total change in elevation (in meters) on the surface of Titan (from lowest to highest elevation)? Enter a single number only. [Hint: you should look at the elevation scale for this information - what you can actually see depends on how large or small you make the image.]

Lab 5: Question 19 

Compare your answer to Question 18 with the elevation changes for the terrestrial planets which you determined in last week's lab. Titan's elevation change is more similar to _____________ than to the other terrestrial worlds.

•  Mercury
•  Venus
•  Earth
•  Earth's Moon
•  Mars

Lab 5: Question 20 

For the terrestrial world you chose in Question 19, compare that world's elevation change to Titan's elevation change.  The elevation change on the terrestrial world from Question 19 is _______ times that of Titan.

Lab 5: Question 21 

Examine the distribution of high and low areas on Titan (Figure 9) and compare to the distributions of high/low areas on the terrestrial worlds in last week's lab.  The distribution of high and low areas on Titan most closely resembles the distribution of high and low areas on _____________ .

•  Mercury
•  Venus
•  Earth
•  Earth's Moon
•  Mars

Below is a geologic map of Titan's surface.  A color coded key of features is included.  An explanation of the key is given in the figure caption.geologic map of Titan

Figure 10. Original caption: "The first global geologic map of Saturn's largest moon, Titan, is based on radar and visible and infrared images from NASA's Cassini mission, which orbited Saturn from 2004 to 2017.  Black lines mark 30 degrees of latitude and longitude. Map is in Mollweide projection, a global view that attempts to minimize the size or area distortion, especially at the poles (although shapes are increasingly distorted away from the center of the map). It is centered on 0 degrees latitude, 180 degrees longitude. Map scale is 1:20,000,000. In the annotated figure, the map is labeled with several of the named surface features. Also located is the landing site of the European Space Agency's (ESA) Huygens Probe, part of NASA's Cassini mission. The map legend colors represent the broad types of geologic units found on Titan: plains (broad, relatively flat regions), labyrinth (tectonically disrupted regions often containing fluvial channels), hummocky (hilly, with some mountains), dunes (mostly linear dunes, produced by winds in Titan's atmosphere), craters (formed by impacts) and lakes (regions now or previously filled with liquid methane or ethane). Titan is the only planetary body in our solar system other than Earth known to have stable liquid on its surface — methane and ethane." Source: NASA/JPL.

Lab 5: Question 22 

Examine the geologic map of Titan.  Most of the sand dunes (the sand grains are composed of hydrocarbons) are located ______.

•  near the equator
•  in mid-latitudes, between the equator and poles
•  near the poles

Lab 5: Question 23 

Examine the geologic map of Titan.  Most of the bodies of liquid ethane-methane are located ______.

•  near the equator
•  in mid-latitudes, between the equator and poles
•  near the poles

Lab 5: Question 24 

Examine the geologic map of Titan.  Most of the tectonically disrupted regions are located ______.

•  near the equator
•  in mid-latitudes, between the equator and poles
•  near the poles

Below is a colorized radar image of Kraken Mare, which is the largest body of liquid ethane and methane on the surface of Titan. Located near Titan's north pole, the "sea covers 154,000 square miles (400,000 square km), making it about five times bigger than North America's Lake Superior.  (Space.com) The Cassini spacecraft mapped the surface of Titan using radar and "included a segment designed to collect altimetry (or height) data, using the spacecraft's radar instrument along a 120-mile (200-kilometer) shore-to-shore track of Kraken Mare. For a 25-mile (40-kilometer) segment of this data along the sea's eastern shoreline, Cassini's radar beam bounced off the sea bottom and back to the spacecraft, revealing the sea's depth in that area. This region, which is near the mouth of a large, flooded river valley, showed depths of 66 to 115 feet (20 to 35 meters). Scientists think that, for the areas in which Cassini did not observe a radar echo from the seafloor, Kraken Mare might be too deep for the radar beam to penetrate. Alternatively, the signal over this region might simply have been absorbed by the liquid, which is mostly methane and ethane. The altimetry data for the area in and around Kraken Mare also showed relatively steep slopes leading down to the sea, which also suggests the Kraken Mare might indeed be quite deep." NASA  

colorized radar image of Kraken Sea

Figure 11. Original caption: "This is a segment of a colorized mosaic from NASA's Cassini mission that shows the most complete view yet of Titan's northern land of lakes and seas. Saturn's moon Titan is the only world in our solar system other than Earth that has stable liquid on its surface. The liquid in Titan's lakes and seas is mostly methane and ethane. Seas and major lakes are labeled in the annotated version. The data were obtained by Cassini's radar instrument from 2004 to 2013. In this color scheme, liquids appear blue and black depending on the way the radar bounced off the surface. Land areas appear yellow to white. Kraken Mare, Titan's largest sea, is the body in black and blue that sprawls from just below and to the right of the north pole down to the bottom. Most of the bodies of liquid on Titan occur in the northern hemisphere. In fact nearly all the lakes and seas on Titan fall into a box covering about 600 by 1,100 miles (900 by 1,800 kilometers). Only 3 percent of the liquid at Titan falls outside of this area."  Source (image and caption): Wikipedia

Lab 5: Question 25 

Short answer. The Cassini spacecraft was able to determine the surface area covered by Kraken Mare, and it is about 5 times larger than the surface area covered by Lake Superior.  Why can't we determine the volume of liquid in Kraken Mare?

Saturn's Moon: Enceladus

Enceladus is dissimilar from the moons examined above, as it is not comparable in size to any of the terrestrial worlds, but is much smaller.  The image below compares Enceladus to the British Isles.  To put this into a more local context, the state of Oregon is about 400 miles east-west and about 300 miles north-south (netstate).  Despite this, the Cassini spacecraft observed water erupting from fissures on Enceladus, indicating that the moon has a liquid water layer beneath its icy surface.

Enceladus compared to United Kingdom

Figure 12. Original caption: Enceladus is only 314 miles (505 km) across, small enough to fit within the length of the United Kingdom. Source: NASA

Gravity measurements of Enceladus and the wobble in its orbital motion suggest a 10 km deep ocean beneath a layer of ice estimated to be between 30 km and 40 km thick. (NASA)  With this information we can estimate a possible minimum and maximum volume of liquid water beneath the icy surface on Enceladus, using the same method that is shown for Europa (section on Europa above).

model of Enceladus interior

Figure 13. Model for the interior of Enceladus (thickness of layers is not to scale).  The radius of the entire moon is 252.1 km; the radius of the ice layer (given in pale gray/blue) is estimated to be 30 to 40 km thick, and the liquid water layer (in dark blue) is estimated to be 10 km thick on average. The water and ice layers cover a rocky interior (dark gray). Source: NASA.

stop signIn order to calculate the volume of water on Enceladus, you need to know the radii to the top and bottom of the liquid water layer.  In order to ensure that you know this, enter your answers for the possible radii into Mini Quiz 3, and check the feedback for the correct answers before continuing with the main lab quiz.

Mini Quiz 3

Find the minimum and maximum radius of the top of the water layer, which is the radius for Enceladus minus its ice shell. For the minimum radius, use the thicker ice shell; for the maximum, use the thinner ice shell.  Enter numbers in the boxes provided.

Question 1: Minimum rtop: _______________ km

Question 2: Maximum rtop: _______________ km

Find the minimum and maximum radius of the bottom of the water layer (which is also the top of Enceladus’ rocky interior) by subtracting the ice thickness and ocean depth from the radius

Question 3: Minimum rbottom: ________________ km

Question 4: Maximum rbottom: ________________ km

Enter your answers (a single number) in the boxes provided. When you are done, please check the Mini Quiz 3 feedback. The next question depends on using the numbers given in the feedback, regardless of whether your answers were marked correct or not.  Use these numbers, and not your answers for the calculations that follow.

Please make sure you have the correct answers (given under "View Feedback" after you submit your quiz). Use the correct values in order to answer Questions 26 and 27 below.

Lab 5: Question 26 

Use the formula for the volume of a sphere (Equation 6) to find the minimum  volume for Enceladus' ocean layer.   The minimum volume for Enceladus' ocean layer is __________ km3.  Enter only a number.  Do not use scientific notation and do not include commas in the number.  

Lab 5: Question 27 

Use the formula for the volume of a sphere (Equation 6) to find the maximum  volume for Enceladus' ocean layer.   The maximum volume for Enceladus' ocean layer is __________ km3.  Enter only a number.  Do not use scientific notation and do not include commas in the number.

Lab 5: Question 28 

The estimated volume of water on Enceladus is __________.

•  similar in size to Lake Superior
•  similar to, but slightly more than the volume of the Mediterranean Sea
•  similar to, but slightly less than the volume of the Mediterranean Sea
•  similar to, but slightly more than the volume of the Earth's oceans
•  similar to, but slightly less than the volume of the Earth's oceans

Neptune's Moon:  Triton

Of all the moons in our solar system, only Titan and Triton have atmospheres; both composed mainly of molecular nitrogen (N2). However, Titan's atmosphere is thicker than that of the Earth, while Triton's atmosphere is extremely thin, with a surface pressure only about 1/7000th that of the Earth. Unlike Titan, Triton's surface is easily imaged from space.

The only spacecraft to visit Triton was Voyager 2, which flew by the moon in 1989 and imaged the southern hemisphere of the moon. Below is a simplified geologic map of Triton based on the Voyager 2 images. You will want to examine  a much larger version of this image to answer the questions below.  [Link to larger version of Figure 14]. You should be able to magnify this; you can also download and open with a photo viewer or paint program and magnify.

geologic map of triton

Figure 14.  Simplified geologic map of Triton's southern hemisphere. North is up, West is left, and East is right. Source: Wikipedia.

Lab 5: Question 29 

Match the following descriptions to the correct terms.

•  fractures or tectonic faults
•  cryovolcanic lake
•  oldest lands composed of dirty water ice plus nitrogen ice
•  icy layer composed of nitrogen and methane with traces of ammonia
 

•  Cantaloupe Terrain
•  Subpolar land
•  South Polar Ice Cap
•  Patera
•  Planitia
•  Cryolava Plateau
•  Sulci
•  Cavus
•  Maculae
•  Geyser

Lab 5: Question 30 

Enlarge the image and look for impact craters.  Which of the following best describes crater on Triton?

•  there are no impact craters on the surface of Triton, so it must be constantly resurfaced (similar in age to Io)
•  there are only a few impact craters on the surface of Triton, so it must have a young surface (similar in age to Europa)
•  there are a fair number of impact craters on the surface of Triton, so it must have a moderately old surface (similar in age to Ganymede)
•  there are a lot of impact craters on the surface of Triton, so is must have a very old surface (similar in age to Callisto)

Lab 5: Question 31 

One of the areas is described as "dark spots of tholin (?)".  Tholins are organic molecules that can form when radiation interacts with molecules containing nitrogen, carbon, and hydrogen. These molecules can be in an atmosphere, or as ices on a surface.  These areas of possible tholins are located _________.

•  randomly over the entire moon
•  randomly on the south polar cap
•  only on a few areas of south polar cap ice that are at or near the edge south polar cap
•  randomly on the cantaloupe terrain
•  only on a few areas of the cantaloupe terrain that are very far away from the south polar cap

Lab 5: Question 32

There are red arrows that are listed as "direction of geyser plumes" in the legend.  Geysers of liquid nitrogen erupt straight upward from the surface of the south polar cap. Then, the winds in the thin atmosphere of Triton blow the liquid sideways.  Based on the arrows that you can see in the image, which way is the wind blowing across the south polar cap?

•  mainly from the south to the north
•  mainly from the east to the west
•  mainly from the north to the south
•  mainly from the west to the east

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