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Isostasy and Large Scale Gravity Chap. 9 Homework Answers
1. Why does it seem a contradiction that the mantle can both transmit shear-waves (S- waves) and rebound isostatically? Explain on both an atomic and a bulk scale.
The false paradox here is that how can the mantle both undergo āsolid-stateā creep (i.e., flow like a liquid) due the application of loads (e.g., ice sheets, erosion) over millions of years AND transmit earthquake induced shear waves with wave periods of <100 s. The logic goes, if the earth behaves as a āliquidā to long time scale load, and hence is ālike a liquidā internally, then since (ideal) liquids have no shear strength, then no earthquake shear waves should propagate through the earth. This was a big debate after earthquakes shear waves were finally measured in 1900!
At the atomic scale (10 -9^ m), earthquake induced shear wave oscillations travel through the earth as āelastic wavesā. For these short wave periods waves (<100 s), this means that the atoms can be well modeled as mass points with springs connecting the atoms as dictated by the crystal lattice arrangement of atoms. This means that shear waves can propagate through the atom āspringsā (atomic bonds) without much lose (dissipation) of the kinetic and strain energy associate that IS the seismic wave. Thus, the waves from an earthquake larger than magnitude 5 will be detectable by a seismometer on the other side of the planet.
But, at the atomic scale, the addition or subtraction of mass loads (e.g., ice sheets, filling sediment basin) occurs very long time scales (i.e., million years) much longer than the time- scales for earthquakes waves (<100 s wave period). Thus, on the long time scales, the physics shows that vacancy within a solid will slowly drift in the direction of the stresses applied by the load causing rock strain. This permits the deep hot rock to āflow like a liquidā so that the earthās surface will go up and down by hundreds of meters over millions of years.
2. How would you tell if an area is in isostatic equilibrium?
Isostasy from its Greek root means āsame standingā implying gravitational force equilibrium between different height blocks. The force derives from the āpullā of gravity upon lateral variations in the density (mass) of the lithospheric blocks. Thus, isostatic equilibrium is the same as gravitational equilibrium. When a region is said to be in isostatic equilibrium, we are assuming a model of the earth which says that rigid (infinite strength) blocks of lithosphere are floating in the āliquid-likeā asthenosphere that will flow when surface loads (mass anomalies) are applied over time. Using this ārigid-block over a liquid- like asthenosphereā as our Isostasy model, this predicts that lateral variations in topography are compensated by either mass deficits below high standing regions (roots) or mass excesses below low standing regions (anti-roots). Put another way, when isostatic equilibrium is operative, then changes in elevation (height) manifest changes, or we say are
compensated by, subsurface density variations (roots or anti-roots). Thus, the free air gravity measured over different elevation (height) areas that are in isostatic equilibrium will have the same free-air gravitational values! Amazing.
3. A large continental area covered with ice has a positive gravity anomaly. Which of the following might account for the positive gravity anomaly?
(i) The thickness of ice increased recently. Yes. Assuming recently means less than 10,000 yrs, then solid-state creep would not be able to establish isostatic equilibrium from the added ice thickness. In fact, the new ice would make for isostatic dis- equilibrium. Because the extra ice would be extra mass that is not isostatically compensated, the new ice would makes extra (higher) gravity.
(ii) The thickness of ice decreased recently. No. This would make a negative gravity anomaly. The argument is the opposite of answer (i). We would be in isostatic dis-equilibrium and the reduced ice thickness (mass) would create less gravity.
(iii) The thickness of ice increased several tens of thousands of years ago. No. The 20,000 yrs since the application of the ice load (mass added) would permit isostatic equilibrium; hence, the free-air gravity anomaly would be zero.
(iv) The thickness of ice decreased several tens of thousands of years ago. No. The 20,000 yrs since the application of the ice (un)load (mass removed) would permit isostatic equilibrium; hence, the free-air gravity anomaly would be zero.
4. Explain how erosion of mountains can sometimes result in uplift of the peaks.
Tricky question. Consider a flat uplifted plateau that is then eroded by rivers due to increased precipitation. As the rivers down cut the valleys, the river water will carry away the sediment, hence mass, of the plateau. This removal of mass unloads (removes mass) from the lithospheric block. This change in mass permits the plateau to isostatically rebound: just like the shorelines that move up when an ice sheet melts. Finally, if the mountain tops erode more slowly than the river valleys, then the net effect from the isostatic rebound driven by the eroding valleys, will be for the mountains to get temporarily higher (uplifted).
5. Melting of the ice in the Arctic (not Antarctic) region, where the ice floats on the sea, would cause the sea level to (i) rise (ii) fall (iii) be unchanged.
(iii) No uplift or subsidence is occurring. True. If uplift or subsidence is actively occurring at a significant rate (1 mm/yr) then isostatic compensation, due to mantle flow, will not have time to occur. Hence the mass distribution will not be compensated properly. Actively shortening mountain ranges can create mass excesses that are uncompensated and hence make more gravity than if they were compensated.
8. A wide block of wood 100 cm high and with density of 0.72 Mg/m 3 is floating in a liquid with density of 0.96 Mg/m 3.
(a) Calculate how far the top of the blocks is above the liquid surface.
The liquid density is Ļl = .96 Mg/m 3 and the wood density is Ļw = .72 Mg/m 3. Call the height above the block above the liquid surface h 1 and the thickness of the part of the block below the surface h 2. Thus, we have the height equation
h 1 + h 2 = 100 cm.
Now construct the weight (force) balance equation:
g *( h 1 Ļ w + h 2 Ļ w ) = g *( h 2 Ļ l )(N/m 2 ) or Force per unit area.
This equation can be simplified to:
Ļ w ( h 1 (^) + h 2 (^) )=Ļ lh 2
We know have two equations and two unknows; this system can be algebraically solved for both h 1 and h 2. To do this, substitute in for one variable in terms of the other variable to isolate one equation with only one unknown. For example, rearrange the height equation and substitute that into the weight equation:
h 2 = 100 ā h 1
Ļ w ( h 1 + (100 ā h 1 ))=Ļ lh 2
2 2
w w l l
h h cm
Ļ Ļ Ļ Ļ
So, substituting into the height equation arranged to isolate h 1 gives:
h 1 = 100 ā h 2 = 100 ā 75 = 25 cm (height of the wood block above the surface)
(b) How far would it be if 12 cm were removed from the base of the block.
h 2 = 88 ā h 12
w l
h^ Ļ cm
Ļ
h 1 = 88 ā h 2 = 88 ā 66 = 22 cm (height of the wood block above the surface)
(c) How far would it be if 12 cm were from the top of the block.
Same answer as (b). What is relevant is the total volume (hence mass, hence weight) of the block; the volume (mass) of the block is proportional to the height of the block. The height (hence mass) of the block is the same if the blockās height is shortened 12 cm on its top or base!
9. A large area of continent consists of 30 km of crust with density 2.8 Mg/m 3 over 90 km of material with density 3.1 Mg/m 3. The asthenosphere density is 3.2 Mg/m 3. This region is covered with a 1.6 km thickness of ice of density 0.9 Mg/m^3. The ice covered region is assumed to be isostatic equilibrium. Then, the ice melts. By how much will the rock surface of the continent change when the new isostatic equilibrium is re-established?
Define layer densities: Ļi=0.9 Ļc =2.8 Ļm=3.1 Ļa=3.2 (units= Mg/m 3 ) Define layer thickness: t (^) i=1.6 tc =30 t (^) m=90 infinite (units= km) Define height variables: h 1 is bottom layer offset, h 2 is top layer offset
The height equation is: (90 + 30 + 1.6) = h 1 + h 2 + (30+90)
Which simplifies to: 1.6 = h 1 + h 2 (km)
The weight equation is: t (^) i Ļi + tc Ļc + tm Ļm = 0*h 2 + t (^) c Ļc + tm Ļm + h 1 Ļa
Which simplifies to: t (^) i Ļi = h 1 Ļa (note that the common layers between the two blocks always cancel out!)
Solving for h 1 gives: h 1 = ti * (Ļi / Ļa) = 1.6 * (0.9/3.2) = .45 km
So h 2 equals: h 2 = 1.6 ā h 1 = 1.15 km
So, the answer is that the former rock-ice surface that is now the rock-air surface rose 1.15 km upwards towards the stars due to isostatic equilibrium being re-established after the ice sheet melted.
10. The crust of a continent contains a 3 km thick layer of salt (2.2 Mg/m 3 ) that is embedded with sediments (2.4 Mg/m 3 ). Over time, the salt layer flows laterally and
Solving for h 1 : (^1)
s w w a s
t
h km
Ļ Ļ Ļ Ļ
In additional to filling up the sea with 2 km of sediment, the sinking of the lithosphere due to replacing the water with heavier sediment causes a 3.5 km of extra subsidence and hence 3.5 km of āextraā sediment. Thus, the original 2 km sea is now a 5.5 km thick sediment basin.
**13. SKIP.
- SKIP.
- The uplift of former beaches around the Gulf of Bothnia is about 275 m. What** thickness of ice would be needed to depress the beaches back to sea level? For densities use: ice (0.9), asthenosphere (3.2) Mg/m (^3).
Define: Ļ i = 0.9 and Ļ a =3.2 Mg / m^3
There are only two density changes: addition of ice (replacing air) to top of block (B) and pushing the base of the block (B) lithosphere into the asthenosphere. The problem states that the former -beach surface should be pushed down 275 m.
Weight equation: 1 i 275* a 1 275* a 977.
i
h h m
Ļ Ļ Ļ Ļ
16. The value of little-g at a place A is less than that at place B. Which of the following might be the explanation?
(i) A is at a higher latitude. FALSE: assuming no other gravitational effects are present, from the IGF formula, we know that little-g at higher latitudes increases.
(ii) A is at a higher elevation. TRUE: little- g is proportional to 1/r^2 which means that gravity decreases by 0.386 mgals per meter moved upwards from the Earth's surface
(iii) A is underlain by low density rocks. TRUE: g is proportional to the mass column under a gravitational measurement point.
(iv) A but not B was covered by a thick ice sheet millions of years ago. FALSE: One expects that FULL isostatic equilibrium would be re-established after 'millions of years' and hence would NOT affect the gravity values between sites A and B.
17. The value of little-g at a place varies with time due to which of the following?
(i) Isostatic rebound. (ii) TRUE. If a region is undergoing isostatic rebound to re-establish isostatic equilibrium, then the gravity field will be changing in time as the distribution of mass change with rebound. (iii) (iv) The topography of the continents. (v) FALSE. While topography (elevation) will affect gravity via the Free-Air correction, it will not vary the gravity over time. (vi) (vii) Lateral differences in the composition of rocks. (viii) FALSE. While lateral diference in rock composition, hence density, will change the spatial variation in gravity, it will not change gravity in time. (ix) (x) The earthās rotation. (xi) FALSE. If one assumes that the Earth's rotational angular velocity is constant, then gravity effect due to non-inertial reference frame force (Centrifugal force) will not change in time. Albeit, the Earth's rotational angular velocity is acutally slowly decreasing in time as angular momentum is exchanged between the Earth-Moon orbital system (the Moon is moving about a few cm per year away from the Earth).
