Metr 430 
NAME ________________________________________ 
Fall 2010 

Lab 1: Estimating the Temperature Change Due to Advection
For this exercise, you will need to estimate the contribution to the local change in temperature that advection would make. In this exercise you will learn how to do that, but also will make a 1 hour "forecast" of the temperature at San Francisco in which advection was the only factor.
I. Rewriting the temperature tendency
equation into a useful form.
Term A 
= 
Term B 
+ 
Term C 
_{}_{} 
= 

+ 

(Equation
1)
Rewriting
the equation (1) with the simplifying assumption that Term B=0 yields
(Equation
2)
All that was done to obtain (2) was to
multiply (1) through by the time interval.
II. A Simple Forecast Equation
Now, let's assume that you need to answer the
question "what will the temperature advection contribution to the local
temperature change experienced over 1 hour be?" For the purposes of this
exercise, you will make the reasonably good assumption that the temperature
advection will be unchanging across the 1 hour period.
Well, first you would need a simple forecast
equation.
_{ (Equation 3)}_{}
_{where Ti is the initial temperature at San Francisco and Tf is the "forecast" temperature.}_{}
_{III. Concept Map}_{}
_{How do you go about estimating the temperature advection during the 1 hour period we are considering?}_{}
Question 2: Write up a simple concept map of what you need to know
in order to answer the question "how much will the temperature change at
San Francisco over the 1 hour period?" (Hint, you will need to list the
things in equations 2a and 3 that you need to find) Do that on the back of this sheet. 
_{Of course, you need to obtain the surface streamlines and isotherms for the present time. Once you do that, you need to sketch a streamline that intersects your forecast station. This is the line or curve along which the distance s will be marked off. Incidentally, on synoptic charts a reasonable distance overwhich to evaluate the temperature gradient to estimate the advection is 100 miles (or 100 km). Remember to keep all the units consistent.}_{}
_{But, this is done for you in Figure 1.}_{}
_{}
_{Fig. 1. Chart showing the portion of a streamline segment that is used to calculate the contribution of the temperature advection to the temperature change at the observer's location. Assume the observer is at San Francisco. The wind is shown as a vector, with the air parcel at A shown moving towardst he observer. The distance is 100 km between location A and San Francisco and the wind speed is 100 km/h.}_{ }
_{Next, highlight the portion of the streamline that intersects the station back 100 miles (100 km) (a simple way to mark of this distance will be discussed in class). In figure 1, the streamline extends from the observer at San Francisco to point A.}_{}
_{The temperature gradient is evaluated (finite differenced) this way:}_{}
_{}_{}
_{where T2 is the temperature furthest downwind on the segment (in this case, at the forecast station) and T1 is the temperature furthest upwind on the segment. The temperatures are estimated by simply reading directly off of the isotherms. For the example shown in Fig. 1, T2 would be the temperature at San Francisco (observer) (15) and T1 would be the temperature at A (30).}_{}
_{Next, the result of the last step is multiplied by the average wind speed on the segment (you can get this by reading the wind barbs plotted on the chart and getting an average value for the region of the segment of streamline that you are considering). For the example in Fig. 1, note that the average wind would be 100 km/ hr. Make sure the units are consistent. If the distance is in miles, then the wind speed needs to be in miles per hour. If the distance is in km or m, then the wind speed should be in km/h or m/s.}_{}
Question 3: Rewrite the equation in Section 1 above using the correct calculus format.
Question 4. Using Fig 1, compute the temperature change due to advection and the resulting forecast temperature at the end of the hour period considered, assuming a (ridiculous) wind speed of 100 km/h. Question 5. Using Fig 1, write a simple
"rule" for visualizing the nature of the temperature advection on,
say, a surface weather map. (Example: if air moves
across the isotherms from lowered value isotherms to higher value therms, I
expect there to be (cold/warm) (choose one based upon the example here)
temperature advection.)
Question 6.
(a) On the map
distributed in class, determine the nature (sign) of the (thickness) temperature advection at A and B. (b) On the same map, plot a blue arrow for
every intersection of streamline and (thickness) temperature contour in cold
advection areas and a red arrow for every intersection in warm advection
areas. (See Example) 
_{ }