NATS 101-05 Lecture 10 Air Pressure

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NATS 101-05 Lecture 10 Air Pressure

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Title: NATS 101-05 Lecture 10 Air Pressure

1
NATS 101-05Lecture 10Air Pressure

2
Review

ELR-Environmental Lapse Rate
Temp change w/height measured by a thermometer
hanging from a balloon
DAR and MAR are Temp change w/height for an
air parcel (i.e. the air inside balloon)
Why Do Supercooled Water Droplets Exist?
Freezing needs embryo ice crystal
First one, in pure water, is difficult to make

3
Review

Updraft velocity and raindrop size
Modulates time a raindrop suspended in cloud
Ice Crystal Process
SVP over ice is less than over SC water droplets
Accretion-Splintering-Aggregation
Accretion-supercooled droplets freeze on contact
with ice crystals
Splintering-big ice crystals fragment into many
smaller ones
Aggregation-ice crystals adhere on snowflakes,
which upon melting, become raindrops!

4
Warm Cloud Precipitation

As cloud droplet ascends, it grows larger by
collision-coalescence
Cloud droplet reaches the height where the
updraft speed equals terminal fall speed
As drop falls, it grows by collision-coalescence
to size of a large raindrop

Terminal Fall Speed (5 m/s)
Updraft (5 m/s)
Ahrens, Fig. 5.16
5
Ice Crystal Process

Since SVP for a water droplet is higher than for
ice crystal, vapor next to droplet will diffuse
towards ice
Ice crystals grow at the expense of water drops,
which freeze on contact
As the ice crystals grow, they begin to fall

Effect maximized around -15oC
Ahrens, Fig. 5.19
6
Accretion-Aggregation Process
Small ice particles will adhere to ice crystals
Supercooled water droplets will freeze on contact
with ice
snowflake
ice crystal
Ahrens, Fig. 5.17
Accretion (Riming)
Aggregation
Splintering
Also known as the Bergeron Process after the
meteorologist who first recognized the importance
of ice in the precipitation process
7
What is Air Pressure?

Pressure Force/Area
What is a Force? Its like a push/shove
In an air filled container, pressure is due to
molecules pushing the sides outward by recoiling
off them

Recoil Force
8
Air Pressure

Concept applies to an air parcel
surrounded by more air parcels, but
molecules create pressure through rebounding off
air molecules in other neighboring parcels

9
Air Pressure

At any point, pressure is the same in all
directions
But pressure can vary from one point to another
point

Higher density at the same
temperature creates higher pressure by more
collisions among molecules of average same speed

Higher temperatures at the same
density creates higher pressure by collisions
amongst faster moving molecules
11
Ideal Gas Law

Relation between pressure, temperature and
density is quantified by the Ideal Gas Law
P(mb) constant ? ?(kg/m3) ? T(K)
Where P is pressure in millibars
Where ? is density in kilograms/(meter)3
Where T is temperature in Kelvin

12
Ideal Gas Law

Ideal Gas Law describes relation between 3
variables temperature, density and pressure
P(mb) constant ? ?(kg/m3) ? T(K)
P(mb) 2.87 ? ?(kg/m3) ? T(K)
If you change one variable, the other two will
change. It is easiest to understand the concept
if one variable is held constant while varying
the other two

13
Ideal Gas Law

P constant ? ? ? T (constant)
With T constant, Ideal Gas Law reduces to
? P varies with ? ?
Denser air has a higher pressure than less dense
air at the same temperature
Why? You give the physical reason!

14
Ideal Gas Law

P constant ? ? (constant) ? T
With ? constant, Ideal Gas Law reduces to
? P varies with T ?
Warmer air has a higher pressure than colder air
at the same density
Why? You should be able to answer the underlying
physics!

15
Ideal Gas Law

P (constant) constant ? ? ? T
With P constant, Ideal Gas Law reduces to
? T varies with 1/? ?
Colder air is more dense (? big, 1/? small) than
warmer air at the same pressure
Why? Again, you reason the mechanism!

16
Summary

Ideal Gas Law Relates
Temperature-Density-Pressure

17
Pressure-Temperature-Density

Pressure
Decreases with height at same rate in air of same
temperature
Isobaric Surfaces
Slopes are horizontal

300 mb
400 mb
500 mb
9.0 km
9.0 km
600 mb
700 mb
800 mb
900 mb
1000 mb
Minneapolis
Houston
18
Pressure-Temperature-Density
WARM

Pressure (vertical scale highly distorted)
Decreases more rapidly with height in cold air
than in warm air
Isobaric surfaces will slope downward toward cold
air
Slope increases with height to tropopause, near
300 mb in winter

300 mb
COLD
400 mb
500 mb
9.5 km
600 mb
700 mb
8.5 km
800 mb
900 mb
1000 mb
Minneapolis
Houston
19
Pressure-Temperature-Density
WARM
Pressure Higher along horizontal red line in warm
air than in cold air Pressure difference is a
non-zero force Pressure Gradient Force or PGF
(red arrow) Air will accelerate from column 2
towards 1 Pressure falls at bottom of column 2,
rises at 1 Animation
300 mb
COLD
400 mb
500 mb
H
L
PGF
9.5 km
600 mb
700 mb
8.5 km
800 mb
900 mb
1000 mb
L
H
PGF
Minneapolis
Houston
SFC pressure rises
SFC pressure falls
20
Summary

Ideal Gas Law Implies
Pressure decreases more rapidly with height in
cold air than in warm air.
Consequently..
Horizontal temperature differences lead to
horizontal pressure differences!
And horizontal pressure differences lead
to air motionor the wind!

21
Review Pressure-Height

Remember
Pressure falls very rapidly with height near
sea-level
3,000 m 701 mb
2,500 m 747 mb
2,000 m 795 mb
1,500 m 846 mb
1,000 m 899 mb
500 m 955 mb
0 m 1013 mb
1 mb per 10 m height

Consequently. Vertical pressure changes
from differences in station elevation dominate
horizontal changes
22
Station Pressure
Ahrens, Fig. 6.7
Pressure is recorded at stations with different
altitudes Station pressure differences reflect
altitude differences Wind is forced by horizontal
pressure differences Horizontal pressure
variations are 1 mb per 100 km Adjust
station pressures to one standard level Mean Sea
Level
23
Reduction to Sea-Level-Pressure
Ahrens, Fig. 6.7
Station pressures are adjusted to Sea Level
Pressure Make altitude correction of 1 mb per 10
m elevation
24
Correction for Tucson

Elevation of Tucson AZ is 800 m
Station pressure at Tucson runs 930 mb
So SLP for Tucson would be
SLP 930 mb (1 mb / 10 m) ? 800 m
SLP 930 mb 80 mb 1010 mb

25
Correction for Denver

Elevation of Denver CO is 1600 m
Station pressure at Denver runs 850 mb
So SLP for Denver would be
SLP 850 mb (1 mb / 10 m) ? 1600 m
SLP 850 mb 160 mb 1010 mb
Actual pressure corrections take into account
temperature and pressure-height variations, but 1
mb / 10 m is a good approximation

26
You Try at Home for Phoenix

Elevation of Phoenix AZ is 340 m
Assume the station pressure at Phoenix was 977
mb at 3pm yesterday
So SLP for Phoenix would be?

27
Sea Level Pressure Values
882 mb Hurricane Wilma October 2005
Ahrens, Fig. 6.3
28
Summary

Because horizontal pressure differences are the
force that drives the wind
Station pressures are adjusted to one standard
levelMean Sea Levelto remove the dominating
impact of different elevations on pressure change

29
PGF
Ahrens, Fig. 6.7
30
Key Points for Today

Air Pressure
Force / Area (Recorded with Barometer)
Ideal Gas Law
Relates Temperature, Density and Pressure
Pressure Changes with Height
Decreases more rapidly in cold air than warm
Station Pressure
Reduced to Sea Level Pressure

31
Pressure in Warm and Cold Air
Ahrens, Fig. 6.2
32
Pressure-Temperature-Density
33
Pressure-Temperature-Density
Ahrens, Fig. 6.2

Pressure
Decreases with height at same rate in air of same
temperature
300 mb Level
Slope is horizontal

300 mb
9.0 km
Same Density
Same Density
1000 mb
Minneapolis Houston
34
Pressure-Temperature-Density
Ahrens, Fig. 6.2

Pressure
Decreases more rapidly with height in cold air
than in warm air
300 mb Level
Slopes downward from warm air to cold air

300 mb
9.5 km
8.5 km
Less Dense
MoreDense
1000 mb
Minneapolis Houston
35
Pressure-Temperature-Density

Pressure
Decreases more rapidly with height in cold air
than in warm air
300 mb Level
Slopes downward from warm air to cold air

Ahrens, Fig. 6.2
300 mb
9.5 km
8.5 km
Less Dense
MoreDense
1000 mb
Minneapolis Houston
36
Horizontal Pressure Differences

Pressure
Higher along horizontal red line in warm air than
in cold air
Pressure difference is a non-zero force
Pressure Gradient Force or PGF (red arrow)
Air accelerates from column 2 towards 1
Pressure falls at bottom of column 2, rises at 1

Ahrens, Fig. 6.2
300 mb
9.5 km
PGF
8.5 km
H
L
1000 mb
37
Pressure-Temperature-Density

Pressure (vertical scale highly distorted)
Decreases more rapidly with height in cold air
than in warm air
Isobaric surfaces will slope downward toward cold
air
Slope increases with height to tropopause, near
300 mb in winter

100 mb
200 mb
300 mb
400 mb
500 mb
9.5 km WARM
600 mb
700 mb
8.5 km COLD
800 mb
900 mb
1000 mb
Minneapolis
Houston
38
Pressure-Temperature-Density
100 mb
Pressure Higher along horizontal red line in warm
air than in cold air Pressure difference is a
non-zero force Pressure Gradient Force or PGF
(red arrow) Air will accelerate from column 2
towards 1 Pressure falls at bottom of column 2,
rises at 1 Animation
200 mb
300 mb
400 mb
500 mb
H
L
PGF
9.5 km WARM
600 mb
700 mb
8.5 km COLD
800 mb
900 mb
1000 mb
L
H
PGF
Minneapolis
Houston
SFC pressure rises
SFC pressure falls
39
Measuring Air Pressure
Ahrens, Fig. 6.4

Mercury Barometer
Air pressure at sea level can support nearly 30
inches of Hg
Hg level responds to changes in pressure
Pressure can support nearly 30 feet of water

40
Recording Aneroid Barometer
Ahrens, Fig. 6.6

Aneroid cell is partially evacuated
Contracts as pressure rises
Expands as pressure falls
Changes recorded by revolving drum

41
Isobaric Maps
Ahrens, Fig. 2, p141
42
Isobaric Maps

Weather maps at upper levels are analyzed on
isobaric (constant pressure) surfaces.
(Isobaric surfaces are used for mathematical
reasons that are too complex to explain in this
course!)
Isobaric maps provide the same information as
constant height maps, such as
Low heights on isobaric surfaces correspond to
low pressures on constant height surfaces!
Cold temps on isobaric surfaces correspond to
cold temperatures on constant height surfaces!

43
Isobaric Maps
Some generalities
1) High/Low heights on an isobar surface
correspond to High/Low pressures on a constant
height surface
2) Warm/Cold temps on an isobaric surface
correspond to Warm/Cold temps on a constant
height surface
3) The PGF on an isobaric surface corresponds to
the downhill direction
44
Contour Maps

Display undulations of 3D surface on 2D map
A familiar example is a USGS Topographic Map
Its a useful way to display atmospheric
quantities such as temperatures, dew points,
pressures, wind speeds, etc.

Gedlezman, p15
45
Rules of Contouring(Gedzelman, p15-16)

Every point on a given contour line has the same
value of height above sea level.
Every contour line separates regions with
greater values than on the line itself from
regions with smaller values than on the line
itself.
The closer the contour lines, the steeper the
slope or larger the gradient.
The shape of the contours indicates the shape of
the map features.

46
Contour Maps

To successfully isopleth the 50-degree isotherm,
imagine that you're a competitor in a
roller-blading contest and that you're wearing
number "50". You can win the contest only if you
roller-blade through gates marked by a flag
numbered slightly less than than 50 and a flag
numbered slightly greater than 50.

47
570 dam contour
48
576 dam contour
49
570 and 576 dam contours
50
All contours at 6 dam spacing
51
All contours at 6 dam spacing
52
-20 C and 15 C Temp contours
53
-20 C, 15 C, -10 C Temp contours
54
All contours at 5o C spacing
55
Height contours Temp shading
56
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57
Key Concepts for Today

Station Pressure and Surface Analyses
Reduced to Mean Sea Level Pressure (SLP) PGF
Corresponds to Pressure Differences
Upper-Air Maps
On Isobaric (Constant Pressure) Surfaces PGF
Corresponds to Height Sloping Downhill
Contour Analysis
Surface Maps-Analyze Isobars of SLP
Upper Air Maps-Analyze Height Contours

58
Key Concepts for Today

Wind Direction and PGF
Winds more than 1 to 2 km above the ground are
perpendicular to PGF!
Analogous a marble rolling not downhill, but at
a constant elevation with lower altitudes to the
left of the marbles direction

59
Assignment

Reading - Ahrens pg 148-149
include Focus on Special Topic Isobaric Maps
Problems - 6.9, 6.10
Topic Newtons Laws
Reading - Ahrens pg 150-157
Problems - 6.12, 6.13, 6.17, 6.19, 6.22

60
Example Ideal Gas Law

If Pressure at Sea Level averages 1013 mb and
Temperature at Sea Level averages 288 K, what is
the average Density at Sea Level?
Answer can be found using the Ideal Gas Law
P(mb) 2.87 ? ?(kg/m3) ? T(K)
?(kg/m3) P(mb) / 2.87 ? T(K)
?(kg/m3) (1013 mb) / (2.87 ? 288 K)
?(kg/m3) 1.23 kg/m3 ? 2.00 lbs/yard3

61
Pressure-Temperature-Density