An introduction to plotting with Maple Worksheet by Mike May, S.J.- maymk@slu.edu restart; In previous courses you have been using a graphing calculator to graph functions of one variable. Having a convenient grapher makes the concepts of calculus easier to understand. However, most of Calculus III deals with functions of several variables and our calculators are not very good at graphing surfaces. The point of this worksheet is to give an introduction to graphing with Maple. This should make it easy for you to produce the relevant pictures for this course.

Since functions of one variable are more familiar, we start with them. The syntax for plotting a function of one variable is plot("function of x", x="low value of x".."high value of x"); where the expressions in quotation marks are to be replaced by appropriate values. Hit enter to execute the command below. plot(sin(x), x=-Pi..Pi);

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

Things to notice: The "function of x" is not an equation. It is what we would set y equal to if we were writing an equation. We specified the x-range we wanted, and Maple decided on an appropriate y-range. We will learn how to specify the y-range a little later. Click once on the graph. The graph should now be enclosed in a box. Dragging the corners of the box will let you resize the graph. The second row of icons above has also been replaced by a new row. The new row has buttons that control the style of the graph. From left to right you should see a box with the coordinates of the point you clicked on, a drop down menu of icons concerned with the style of the graph, a drop down menu of icons concerned with the style of the coordinate axes, a "1:1" button that determines whether the x and y axes need to have the same scale, a drop down menu of icons concerned with the action for clicking and dragging, and a button for whether or not to show the grid for the graph.

1) Plot the graph of y = cos(2*x) with 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. Stretch the graph to cover the screen. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= 2) Replot the graph above, but modify the style so that it is done with dots rather than with connected lines, and so the axes are on the sides of the graph rather than in the middle of them. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= 3) Replot the graph above, but modify the style so that it is a connected curve, with no axes, and the same scale for the x and y axes. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic=

We would like to be able to specify the y-range of a plot. If a plot has a vertical asymptote, Maple will give such a large y-range that we miss details we are interested in. The solution is to specify the y-range. Specifying the y-range is done using the same conventions used to specify the x-range. The command plot("function of x", x="low value of x".."high value of x"); becomes plot("function of x", x="low value of x".."high value of x", y="low value of y".."high value of y"); For an example, execute the plotting commands given below. QyQtSSVwbG90RzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiQqJi1JJGNvc0dGJTYjSSJ4R0YoIiIiRi4hIiIvRi47ISM1IiM3Ri8=

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

QyQtSSVwbG90RzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiUqJi1JJGNvc0dGJTYjSSJ4R0YoIiIiRi4hIiIvRi47ISM1IiM3L0kieUdGKDshIiMiIiNGLw==

NigtJSdDVVJWRVNHNiQ3XnA3JCQhJCsiISIiJCIxRFh3IUg6MlIpISM8NyQkITFNTEwzRVk/JiohIzokIjI9LmksV2tiLyIhIzw3JCQhMW5tInpvPks1KiEjOiQiMiR6I0dFPDJBLyIhIzw3JCQhMUxMJGVRJylSaikhIzokIjFEY09ObV5YIikhIzw3JCQhMUxMJDNxVTs7KSEjOiQiMjkhZng9JTQvciQhIz03JCQhMmxtO0gpUmEicCghIzskITFLdyp5JlJpLUAhIzw3JCQhMUxMZSVILWREKCEjOiQhMWpfK3BzWWl4ISM8NyQkIS1Eck1UL28hIzYkITIpcE0pKik0eldGIiEjPDckJCExTUxlQyoqb1BqISM6JCExZUkwWCk9YmQiISM7NyQkIS1EbUpZc2UhIzYkITIlZnRpKFxTN2MiISM8NyQkITFubW1oLSNSUiYhIzokITI8MipHJzRdejsiISM8NyQkITFMTCQzVD5DKFwhIzokITEiXFQiKVxAMjwmISM8NyQkITImKioqKipcRzR6XCUhIzskIjJtRjpdb2I+dCUhIz03JCQhMSwrK3YyWEBTISM6JCIxKXBYSEBgWWUiISM7NyQkISs6WkhpTiEiKiQiMWRrT0QsU2lEISM7NyQkITFNTGVDcUxYSiEjOiQiMS53eFxzR3pKISM7NyQkITFubW0sU2BcRSEjOiQiMlkmcEMvKXprSyQhIzw3JCQhMW5tbTFRX0hBISM6JCIyJik+KHAhKSp5YXUjISM8NyQkITIvK103NV80dSIhIzskIjFIOSZRakNtcyohIzw3JCQhMiZvbW1jTFszOCEjOyQhMiQ0Y1xWKil6Iik+ISM8NyQkITJVTGUqeSpSNzIiISM7JCExMUsvIT4ienJXISM7NyQkISxELG0qUiQpISM2JCExYGpvdDlrYyEpISM7NyQkITEnKioqKlwtWzMzJyEjOyQhMm5NJEgkND4oXDghIzs3JCQhMSQqKipcUCt0QFEhIzskITJEeiVwJSpSJXlVIyEjOzckJCEybiMzeCIpPVdLSyEjPCQhMWJCTU9uVExIISM6NyQkITIvbVRnc2BKayMhIzwkITJNQiJvViJwPmwkISM7NyQkITJ0MngiWyc0JltCISM8JCExRGAkXHpLNjklISM6NyQkITJVXDcuZGxRMCMhIzwkITFidjJUXWBtWiEjOjckJCExNnpXI1xAI2Y8ISM7JCEwal0+NSlmJ2YmISM5NyQkITFHTGU5dWRrOSEjOyQhMScpbyJwLjVbdichIzo3JCQhMmouXmNQYnNKIiEjPCQhMXRRUCV5dWRfKCEjOjckJCEyW3U9bkxMKnA2ISM8JCExeSVlVWVsISpbKSEjOjckJCEyS1gneShINkUtIiEjPCQhMWk+R2UxIXlzKiEjOjckJCExOzthKWUjKkd2KSEjPCQhMnZwSnQhZTVRNiEjOjckJCExLCg9Iyo+cyd6cyEjPCQhMks9KyYpKipcK1AiISM6NyQkITEmeSYqKTQ9WDFlISM8JCExPiR6TXY+JD48ISM5NyQkITImcEdkPzlCTFYhIz0kITJvQkNgSSFlMEIhIzo3JCQhMlEmKlw3LjYrJ0chIz0kITIlNG9ALSwxJlwkISM6NyQkITIjUXEjPmsheidRIiEjPSQhMUU/biZRKy1AKCEjOTckJCIwdihlUlooSGspISM9JCIxXllxPSczcToiISM3NyQkIjJLej1uOF0nZjohIz0kIjE8ZUNnWCI0VCchIzk3JCQiMikzPC9FMChHLiQhIz0kIjIxXiczWCtwJkgkISM6NyQkIjJYaWtgIjQ0MVghIz0kIjJiImZGa2QncEAjISM6NyQkIjBhKG8vOEp6ZiEjOyQiMidwOyVla1clcDshIzo3JCQiMWMvLCVwSkRYKCEjPCQiMiN5WDRfODVROCEjOjckJCIxckxMJDNfZCMqKSEjPCQiMk9oKltjUSplNiIhIzo3JCQiMkFZTyFIRyd5LSIhIzwkIjFjV0JFbmR4JyohIzo3JCQiMnRlUihcLzpqNiEjPCQiMVlbSDgiWyNSJikhIzo3JCQiMkJyVS8yUSUpSCIhIzwkIjFuaDJhLXRPdyEjOjckJCIydSRlOSJwRFBWIiEjPCQiMVRvdE84Ri5wISM6NyQkIjJ2M19EJDRJLzwhIzwkIjFVN18oUipcI3kmISM6NyQkIjJ3TGVSPHdbKD4hIzwkIjBFdVFKJj1sXCEjOTckJCIxUTN4Y20tO0QhIzskIjJQPFMoKmYiUVxRISM7NyQkIjFRTGVScjxkSSEjOyQiMTMpKSlcTj4kPkohIzo3JCQiMiZRJDNfNXklUlQhIzwkIi8peS8/RzxAIyEjODckJCIxUkwkMzJ6PEEmISM7JCIybUxyPjVZKWY7ISM7NyQkIjEoKipcN28lZmN2ISM7JCIxblAieiYqejpqKiEjOzckJCIxY21tIkg1OSopKiEjOyQiL0hNKnkjUmFiISM5NyQkIjJgbTthWiU9dTkhIzskIjFvJFFEQSpRVmwhIzw3JCQiLURAaVQnKj0hIzYkITJlYmQqb2Qlb28iISM8NyQkIjFubTt1IVFDTiMhIzokITBEYVs4TVgqSCEjOjckJCIxKSoqKioqcEtiQkchIzokITFVdXNgWy1rTCEjOzckJCIxKSoqKlx4dlclRyQhIzokITFqbks+emo4SSEjOzckJCIyKCkqKlwoPWxRSVAhIzskITIlPVImR1UqR0hBISM8NyQkIjEqKioqXCNvRGJBJSEjOiQhMlJoITNHT0AyNiEjPDckJCIxS0xMVi1WcVkhIzokITFrL09PbkYiKSopISM9NyQkIjEqKioqKlwjM1lYXiEjOiQiMUJwMzhsJWY6KSEjPDckJCIxbW1UTiI0ZmQmISM6JCIyVipIKFJzWktPIiEjPDckJCIxLSsrTkddWWchIzokIjJfKCpbdkVUeGciISM8NyQkIjFKTDNLW0gqWychIzokIjJqOyhwIVwkUTM6ISM8NyQkIi12YCs5X3AhIzYkIjJvKClvbCNvUUc2ISM8NyQkIjI6TEwkZWVsL3UhIzskIjF4dkptayxtZSEjPDckJCIxKCoqXChvelJ5eSEjOiQhMnZKPyUpeVQpKTQkISM+NyQkIjFvbW1Fem1NJCkhIzokITEmZiVIeF53WmIhIzw3JCQiMW1tO2YpcDchKSkhIzokITEsJD5ZMW9TQSohIzw3JCQiMUxMMyM0M1NFKiEjOiQhMjxYT0k/RWIxIiEjPDckJCIxLSsrcWtAKm8qISM6JCExO1lZR2wqPicqKiEjPDckJCIyTEwkZURgbDw1ISM6JCEwJz03UWAveXIhIzs3JCQiMm1tbSczTENoNSEjOiQhMWpXNEUxaUFOISM8NyQkIjIqKipcKCkqPTx4NSIhIzokIjFKTSEzJFI2ZXQhIz03JCQiMiwrRFRpKT5fNiEjOiQiMWAlcDQtZDFPJSEjPDckJCIkPyIhIiIkIjFvMnhBajZLcSEjPC0lJkNPTE9SRzYmJSRSR0JHJCIjNSEiIiQiIiEhIiIkIiIhISIiLSUlVklFV0c2JDskISQrIiEiIiQiJD8iISIiOyQhIz8hIiIkIiM/ISIiLSUrQVhFU0xBQkVMU0c2J0kieEc2IkkieUc2Ii0lJUZPTlRHNiUlIUclIUciIzUlK0hPUklaT05UQUxHJStIT1JJWk9OVEFMRy0lKkFYRVNTVFlMRUc2IyUnTk9STUFMRy0lKFNDQUxJTkdHNiMlLlVOQ09OU1RSQUlORURHLSUlUk9PVEc2Jy0lKUJPVU5EU19YRzYjJCIkZyIhIiItJSlCT1VORFNfWUc2IyQiJD8iISIiLSUtQk9VTkRTX1dJRFRIRzYjJCIlIXokISIiLSUuQk9VTkRTX0hFSUdIVEc2IyQiJV1QISIiLSUpQ0hJTERSRU5HNiI=

The second graph is much more informative than the first. It is worthwhile at this point to note where we have been using imprecise language. By "x-range" we mean "the range of the independent variable", while "y-range" is "the range of the dependent variable". Equivalently, x-range and y-range respectively stand for the ranges of the input and output variables. The examples below show what happens when we change the names of the variables. QyQtSSVwbG90RzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiUqJi1JJGNvc0dGJTYjSSJ4R0YoIiIiRi4hIiIvRi47ISM1IiM3L0kiekdGKDshIiMiIiNGLw==

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

QyQtSSVwbG90RzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiUqJi1JJGNvc0dGJTYjSSJ5R0YoIiIiRi4hIiIvRi47ISM1IiM3L0kieEdGKDshIiMiIiNGLw==

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

QyQtSSVwbG90RzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiUqJi1JJGNvc0dGJTYjSSJ4R0YoIiIiRi4hIiIvSSJ5R0YoOyEjNSIjNy9GLjshIiMiIiNGLw==

Warning, unable to evaluate the function to numeric values in the region; see the plotting command's help page to ensure the calling sequence is correct

NictJSVWSUVXRzYkOyQhJCsiISIiJCIkPyIhIiI7JCEjPyEiIiQiIz8hIiItJStBWEVTTEFCRUxTRzYnSSJ5RzYiSSJ4RzYiLSUlRk9OVEc2JSUhRyUhRyIjNSUrSE9SSVpPTlRBTEclK0hPUklaT05UQUxHLSUqQVhFU1NUWUxFRzYjJSdOT1JNQUxHLSUoU0NBTElOR0c2IyUuVU5DT05TVFJBSU5FREctJSVST09URzYnLSUpQk9VTkRTX1hHNiMkIiRnIiEiIi0lKUJPVU5EU19ZRzYjJCIkPyIhIiItJS1CT1VORFNfV0lEVEhHNiMkIiUheiQhIiItJS5CT1VORFNfSEVJR0hURzYjJCIlXVAhIiItJSlDSElMRFJFTkc2Ig==

Notice that we can use any letter for input and output, but the input range is specified before the output range or we get an error. With the error it is worth pointing out where Maple hides some details. Put the cursor in the line containing the last plot command and select "Expand Document Block" from the View menu.

It is also useful to be able to see the graphs of several functions on the same graph. In Calculus I and II we were interested in seeing the graph of a function and its derivative at the same time. We also wanted to compare a function with the Taylor polynomial approximations we obtained for it. To plot several functions at the same time, the command plot("function of x", x="low value of x".."high value of x"); becomes plot({"function1 of x", "function2 of x", "etc."}, x="low value of x".."high value of x"); Note that the set of functions is enclosed in braces. For an example, consider the following commands which plot cos(x) along with some of the Taylor polynomial approximations of cos(x). QyQtSSVwbG90RzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiQ8JiIiIi1JJGNvc0dGJTYjSSJ4R0YoLChGK0YrKiRGLyIiIyMhIiJGMiokRi8iIiUjRisiI0MsJkYrRitGMUYzL0YvOyEiJCIiJkYr

6+-%'CURVESG6$7S7$$!#I!""$"#5!""7$$!2nmmmwAc#G!#;$"#5!""7$$!1LLLo!)*Qn#!#:$"#5!""7$$!2nmmmxnK]#!#;$"#5!""7$$!2lmmmV1:L#!#;$"#5!""7$$!2NLL$[9cg@!#;$"#5!""7$$!2nmm;ct?+#!#;$"#5!""7$$!2,++]`oz$=!#;$"#5!""7$$!2omm;)3Do;!#;$"#5!""7$$!2-++]^x!*\"!#;$"#5!""7$$!2KLLL">1D8!#;$"#5!""7$$!2mmmm())yr6!#;$"#5!""7$$!1-+++uR#***!#;$"#5!""7$$!(@)f#)!"($"#5!""7$$!)E;!f'!")$"#5!""7$$!1nmm;G&R2&!#;$"#5!""7$$!2WLLLtK5F$!#<$"#5!""7$$!1OLLLHsV<!#;$"#5!""7$$"/)*****\9!H$!#;$"#5!""7$$"1jmmm]^0;!#;$"#5!""7$$"1-++]9#4L$!#;$"#5!""7$$"20+++N;R(\!#<$"#5!""7$$"1ommm"4#)o'!#;$"#5!""7$$"1mmm;^Yi#)!#;$"#5!""7$$"1LLLLG^g**!#;$"#5!""7$$"2FLL$=2Vs6!#;$"#5!""7$$"2'*****\`pfK"!#;$"#5!""7$$"1LLLjcz"\"!#:$"#5!""7$$"2(******z-6j;!#;$"#5!""7$$"2#******4#32$=!#;$"#5!""7$$"2%*****\#y'G*>!#;$"#5!""7$$"2$******H%=H<#!#;$"#5!""7$$"1mmm1>qMB!#:$"#5!""7$$").W2D!"($"#5!""7$$"1LLLep'Rm#!#:$"#5!""7$$"*%>4NG!")$"#5!""7$$"1mmm6s5'*H!#:$"#5!""7$$"2&*****\c9W;$!#;$"#5!""7$$"2jmmmwl*GL!#;$"#5!""7$$"2'*****\iN7]$!#;$"#5!""7$$"2NLLL(>:nO!#;$"#5!""7$$"1LLL.a#o$Q!#:$"#5!""7$$"2lmm;&Q40S!#;$"#5!""7$$"*3:(fT!")$"#5!""7$$"1nmmc%GpL%!#:$"#5!""7$$"1LLL8-V&\%!#:$"#5!""7$$"+XhUkY!"*$"#5!""7$$"+:o<E[!"*$"#5!""7$$"#]!""$"#5!""-%&COLORG6&%$RGBG$"#5!""$""!!""$""!!""-%'CURVESG6$7in7$$!#I!""$!1aW+m\#***)*!#;7$$!2nmmmwAc#G!#;$!14J>[W&\]*!#;7$$!1LLLo!)*Qn#!#:$!1`Dw'3+h#*)!#;7$$!2nmmmxnK]#!#;$!10iEz+&4.)!#;7$$!2lmmmV1:L#!#;$!1daxX)fV*o!#;7$$!2NLL$[9cg@!#;$!1()e*\Pe;c&!#;7$$!2nmm;ct?+#!#;$!2'pjR[UJ!=%!#<7$$!2,++]`oz$=!#;$!1uIU/.0SE!#;7$$!2omm;)3Do;!#;$!-@Xn.I(*!#87$$!2-++]^x!*\"!#;$"1m#*>gXtlr!#<7$$!2KLLL">1D8!#;$"2m#eA7uoKC!#<7$$!2mmmm())yr6!#;$"29>&o;&R])Q!#<7$$!1-+++uR#***!#;$"1=M"R')=%4a!#;7$$!(@)f#)!"($"1y'=7R_$yn!#;7$$!)E;!f'!")$".or'*\f!z!#87$$!1nmm;G&R2&!#;$"1\xT)4J,u)!#;7$$!2WLLLtK5F$!#<$"1zFnr.xp%*!#;7$$!1NLLLyP2D!#;$"1_@3viH(o*!#;7$$!1OLLLHsV<!#;$"1JhPPjN[)*!#;7$$!2D++v$oc*H"!#<$"1R[\!3vc"**!#;7$$!0pmmT2Tb)!#;$"0;%4FfVj**!#:7$$!1bLLeka7T!#<$"1XaisYa"***!#;7$$"/)*****\9!H$!#;$"0AyZ(e%*****!#:7$$"1/LL$e#3#>)!#<$"0lJIljk'**!#:7$$"1jmmm]^0;!#;$"1jo*=o#Rr)*!#;7$$"2BLL$e#=#oC!#<$"11:s)>Qpp*!#;7$$"1-++]9#4L$!#;$"1%REPMe.X*!#;7$$"20+++N;R(\!#<$"1_wA>4I)y)!#;7$$"1ommm"4#)o'!#;$"1um*3:Lb%y!#;7$$"1mmm;^Yi#)!#;$"18w7j"3kx'!#;7$$"1LLLLG^g**!#;$"140Ya"3iV&!#;7$$"2FLL$=2Vs6!#;$"2l'*)p&[C"zQ!#<7$$"2'*****\`pfK"!#;$"2@uhS&G)QU#!#<7$$"1LLLjcz"\"!#:$"12^R'Q^=*y!#<7$$"2(******z-6j;!#;$!12p#QX*G=#*!#<7$$"2#******4#32$=!#;$!2:6nq&R&*pD!#<7$$"2%*****\#y'G*>!#;$!2Eum$*Q5l4%!#<7$$"2$******H%=H<#!#;$!1F?^![ERm&!#;7$$"1mmm1>qMB!#:$!1m%Rg)3Z<p!#;7$$").W2D!"($!1\8!)>@ub!)!#;7$$"1LLLep'Rm#!#:$!1x$))4E))3)))!#;7$$"*%>4NG!")$!1$y!*eC_R`*!#;7$$"1LL$ed*f:H!#:$!1k>nW1sX(*!#;7$$"1mmm6s5'*H!#:$!1Cv,mkN%*)*!#;7$$"1******\S=QI!#:$!1LCLJ4eY**!#;7$$"2FLL$))3E!3$!#;$!1V)[x'z>")**!#;7$$"2jmmmsPB7$!#;$!1^!>iHY")***!#;7$$"2&*****\c9W;$!#;$!1ln#["fR(***!#;7$$"1LL$e;!pYK!#:$!1u?Q!QB[%**!#;7$$"2jmmmwl*GL!#;$!1a#HLdp\#)*!#;7$$"1LL$ep+^T$!#:$!1be()GEHG'*!#;7$$"2'*****\iN7]$!#;$!1/)))*f`Ag$*!#;7$$"2NLLL(>:nO!#;$!1Q(\&zYV]')!#;7$$"1LLL.a#o$Q!#:$!1T#HWJY!zw!#;7$$"2lmm;&Q40S!#;$!0D&\x6!y\'!#:7$$"*3:(fT!")$!1L8BL#\'\_!#;7$$"1nmmc%GpL%!#:$!12ng5,,nO!#;7$$"1LLL8-V&\%!#:$!2=!zlpog_@!#<7$$"+XhUkY!"*$!2/"H-G[W%z%!#=7$$"+:o<E[!"*$"2w_khXCa8"!#<7$$"#]!""$"1jAja=iOG!#;-%&COLORG6&%$RGBG$"2'\_'eM%yg>!#<$"1ij9.e@R!)!#;$"2'\_'eM%yg>!#<-%'CURVESG6$7Y7$$!#I!""$!1-+++++]7!#;7$$!2nmmmwAc#G!#;$!2`uUC@b'fL!#<7$$!1LLLo!)*Qn#!#:$!206z*4i@\W!#<7$$!2nmmmxnK]#!#;$!14JC'zS/(\!#;7$$!2lmmmV1:L#!#;$!1\YmhMUn[!#;7$$!2NLL$[9cg@!#;$!0:qmgo2E%!#:7$$!2nmm;ct?+#!#;$!1h9w\b8ZL!#;7$$!2,++]`oz$=!#;$!2d$G`1auN@!#<7$$!2omm;)3Do;!#;$!1)Ri#Q7V!)o!#<7$$!2-++]^x!*\"!#;$"1@Pun#Q-o)!#<7$$!2KLLL">1D8!#;$"2:>o&fEb0D!#<7$$!2mmmm())yr6!#;$"2V*eh*eE,#R!#<7$$!1-+++uR#***!#;$"1di%4s+IU&!#;7$$!(@)f#)!"($"16&y%)f4Fy'!#;7$$!)E;!f'!")$"0[Y#H*yq!z!#:7$$!1nmm;G&R2&!#;$"1pfr5qOS()!#;7$$!2WLLLtK5F$!#<$"16o/_typ%*!#;7$$!1OLLLHsV<!#;$"16XeFnN[)*!#;7$$"/)*****\9!H$!#;$"0AyZ(e%*****!#:7$$"1jmmm]^0;!#;$"1Z^m>HRr)*!#;7$$"1-++]9#4L$!#;$"1C1gvsP]%*!#;7$$"20+++N;R(\!#<$"0e7>I5&)y)!#:7$$"1ommm"4#)o'!#;$"1G#4'GkwYy!#;7$$"1mmm;^Yi#)!#;$"1sN07Px!y'!#;7$$"1LLLLG^g**!#;$"1JbYbN`\a!#;7$$"2FLL$=2Vs6!#;$"1W:>*3EV"R!#;7$$"2'*****\`pfK"!#;$"2-%z[c\/(\#!#<7$$"1LLLjcz"\"!#:$"1KG#*pMJj$*!#<7$$"2(******z-6j;!#;$!1\:e&))>,U'!#<7$$"2#******4#32$=!#;$!2;g&R`MDx?!#<7$$"2%*****\#y'G*>!#;$!2dR]'oB`&G$!#<7$$"2$******H%=H<#!#;$!2cY?2x6!>V!#<7$$"1mmm1>qMB!#:$!1"*GnK)RV([!#;7$$").W2D!"($!19j&R7=c'\!#;7$$"1LLLep'Rm#!#:$!1"[w$eb$))\%!#;7$$"*%>4NG!")$!2&esmf"H)pK!#<7$$"1mmm6s5'*H!#:$!2%)QR$Gp738!#<7$$"2&*****\c9W;$!#;$"2mMbZ&z!=r"!#<7$$"2jmmmwl*GL!#;$"1Z1Sv.>hd!#;7$$"2'*****\iN7]$!#;$"23lDH'H6K6!#;7$$"2NLLL(>:nO!#;$"13#)G)*[O6=!#:7$$"1LLL.a#o$Q!#:$"1-AgI*f"pE!#:7$$"2lmm;&Q40S!#;$"1&=d:e;2q$!#:7$$"1LL$eY/C3%!#:$"10gEu9<SU!#:7$$"*3:(fT!")$"1c%*zd#eM#[!#:7$$"1MLLo<K[U!#:$"1z6/,[L[b!#:7$$"1nmmc%GpL%!#:$"1:4!R+:iL'!#:7$$"+N$zhT%!"*$"2NKB"*>?n4(!#;7$$"1LLL8-V&\%!#:$"1(Q0>6$>7z!#:7$$"1mm;z"G*zX!#:$"1^UUw@qW))!#:7$$"+XhUkY!"*$"1wX%))*z&\%)*!#:7$$"*[,`u%!")$"2e$oowc$o3"!#:7$$"+:o<E[!"*$"2$*)[")*4')e>"!#:7$$",vS)38\!#5$"2ayR"4b%3K"!#:7$$"#]!""$"2mmmmmmTX"!#:-%&COLORG6&%$RGBG$"13$GVp>!\&)!#;$"1_MmX%)eqk!#;$"0%z*\.-\D"!#:-%'CURVESG6$7S7$$!#I!""$!#N!""7$$!2nmmmwAc#G!#;$!2Q\_(4?2#*H!#;7$$!1LLLo!)*Qn#!#:$!2`O=*Ra'[d#!#;7$$!2nmmmxnK]#!#;$!2%Q)[3yuJ8#!#;7$$!2lmmmV1:L#!#;$!1[!4@8hzr"!#:7$$!2NLL$[9cg@!#;$!1;@,')G,M8!#:7$$!2nmm;ct?+#!#;$!1EB;t#\T+"!#:7$$!2,++]`oz$=!#;$!1L-Dy;k!*o!#;7$$!2omm;)3Do;!#;$!2`034-0`"R!#<7$$!2-++]^x!*\"!#;$!2(yG*)zp;O7!#<7$$!2KLLL">1D8!#;$"1Jq;HY0@7!#;7$$!2mmmm())yr6!#;$"1e8gUTbMJ!#;7$$!1-+++uR#***!#;$"0mB+r*f2]!#:7$$!(@)f#)!"($"0&zR_yw)e'!#:7$$!)E;!f'!")$"1i!y_%y[Gy!#;7$$!1nmm;G&R2&!#;$"0-729]Fr)!#:7$$!2WLLLtK5F$!#<$"1$4tGC<]Y*!#;7$$!1OLLLHsV<!#;$"0P)e;:(z%)*!#:7$$"/)*****\9!H$!#;$"1&RHZ(e%*****!#;7$$"1jmmm]^0;!#;$"1<``og6r)*!#;7$$"1-++]9#4L$!#;$"1%\'p9"[_W*!#;7$$"20+++N;R(\!#<$"1M,;2y+j()!#;7$$"1ommm"4#)o'!#;$"1*zXr!HRjx!#;7$$"1mmm;^Yi#)!#;$"1DLz4Ne'e'!#;7$$"1LLLLG^g**!#;$"1*4][?4%R]!#;7$$"2FLL$=2Vs6!#;$"2x#>a`5.FJ!#<7$$"2'*****\`pfK"!#;$"2XUf7'R-47!#<7$$"1LLLjcz"\"!#:$!2Kp+d]rs7"!#<7$$"2(******z-6j;!#;$!1(Q3s,z'HQ!#;7$$"2#******4#32$=!#;$!11q!3viuv'!#;7$$"2%*****\#y'G*>!#;$!1T6gR3hd)*!#;7$$"2$******H%=H<#!#;$!26$or^syg8!#;7$$"1mmm1>qMB!#:$!1$['\'\;as"!#:7$$").W2D!"($!2Y/K!H%GO9#!#;7$$"1LLLep'Rm#!#:$!1veax*f$[D!#:7$$"*%>4NG!")$!2:[ET:t)=I!#;7$$"1mmm6s5'*H!#:$!1-0!>@H$)[$!#:7$$"2&*****\c9W;$!#;$!1o?fp(fn+%!#:7$$"2jmmmwl*GL!#;$!2DH>y`15a%!#;7$$"2'*****\iN7]$!#;$!1pX)3XD$H^!#:7$$"2NLLL(>:nO!#;$!1"Ghxz,Ss&!#:7$$"1LLL.a#o$Q!#:$!1(*>$ye91O'!#:7$$"2lmm;&Q40S!#;$!2l1H.Q)Q?q!#;7$$"*3:(fT!")$!1.(*QtZh^w!#:7$$"1nmmc%GpL%!#:$!1dD7>UZ/%)!#:7$$"1LLL8-V&\%!#:$!1(3v9SYW5*!#:7$$"+XhUkY!"*$!1#yz5jN%y)*!#:7$$"+:o<E[!"*$!2t<#[K"*fk5!#:7$$"#]!""$!$:"!""-%&COLORG6&%$RGBG$""!!""$""!!""$"#5!""-%%VIEWG6$;$!#I!""$"#]!""%(DEFAULTG-%+AXESLABELSG6'I"xG6"Q!6"-%%FONTG6%%!G%!G"#5%+HORIZONTALG%+HORIZONTALG-%*AXESSTYLEG6#%'NORMALG-%(SCALINGG6#%.UNCONSTRAINEDG-%%ROOTG6'-%)BOUNDS_XG6#$"$I"!""-%)BOUNDS_YG6#$"#!*!""-%-BOUNDS_WIDTHG6#$"%!z$!""-%.BOUNDS_HEIGHTG6#$"%5Q!""-%)CHILDRENG6"

plot([cos(x),1,1-(x^2)/(2),1-(x^2)/(2)+(x^4)/(24)],x=-3..5,y=-1.5..1.5,color=[red,blue,green,black,brown]);

6+-%'CURVESG6$7in7$$!#I!""$!1aW+m\#***)*!#;7$$!2nmmmwAc#G!#;$!14J>[W&\]*!#;7$$!1LLLo!)*Qn#!#:$!1`Dw'3+h#*)!#;7$$!2nmmmxnK]#!#;$!10iEz+&4.)!#;7$$!2lmmmV1:L#!#;$!1daxX)fV*o!#;7$$!2NLL$[9cg@!#;$!1()e*\Pe;c&!#;7$$!2nmm;ct?+#!#;$!2'pjR[UJ!=%!#<7$$!2,++]`oz$=!#;$!1uIU/.0SE!#;7$$!2omm;)3Do;!#;$!-@Xn.I(*!#87$$!2-++]^x!*\"!#;$"1m#*>gXtlr!#<7$$!2KLLL">1D8!#;$"2m#eA7uoKC!#<7$$!2mmmm())yr6!#;$"29>&o;&R])Q!#<7$$!1-+++uR#***!#;$"1=M"R')=%4a!#;7$$!(@)f#)!"($"1y'=7R_$yn!#;7$$!)E;!f'!")$".or'*\f!z!#87$$!1nmm;G&R2&!#;$"1\xT)4J,u)!#;7$$!2WLLLtK5F$!#<$"1zFnr.xp%*!#;7$$!1NLLLyP2D!#;$"1_@3viH(o*!#;7$$!1OLLLHsV<!#;$"1JhPPjN[)*!#;7$$!2D++v$oc*H"!#<$"1R[\!3vc"**!#;7$$!0pmmT2Tb)!#;$"0;%4FfVj**!#:7$$!1bLLeka7T!#<$"1XaisYa"***!#;7$$"/)*****\9!H$!#;$"0AyZ(e%*****!#:7$$"1/LL$e#3#>)!#<$"0lJIljk'**!#:7$$"1jmmm]^0;!#;$"1jo*=o#Rr)*!#;7$$"2BLL$e#=#oC!#<$"11:s)>Qpp*!#;7$$"1-++]9#4L$!#;$"1%REPMe.X*!#;7$$"20+++N;R(\!#<$"1_wA>4I)y)!#;7$$"1ommm"4#)o'!#;$"1um*3:Lb%y!#;7$$"1mmm;^Yi#)!#;$"18w7j"3kx'!#;7$$"1LLLLG^g**!#;$"140Ya"3iV&!#;7$$"2FLL$=2Vs6!#;$"2l'*)p&[C"zQ!#<7$$"2'*****\`pfK"!#;$"2@uhS&G)QU#!#<7$$"1LLLjcz"\"!#:$"12^R'Q^=*y!#<7$$"2(******z-6j;!#;$!12p#QX*G=#*!#<7$$"2#******4#32$=!#;$!2:6nq&R&*pD!#<7$$"2%*****\#y'G*>!#;$!2Eum$*Q5l4%!#<7$$"2$******H%=H<#!#;$!1F?^![ERm&!#;7$$"1mmm1>qMB!#:$!1m%Rg)3Z<p!#;7$$").W2D!"($!1\8!)>@ub!)!#;7$$"1LLLep'Rm#!#:$!1x$))4E))3)))!#;7$$"*%>4NG!")$!1$y!*eC_R`*!#;7$$"1LL$ed*f:H!#:$!1k>nW1sX(*!#;7$$"1mmm6s5'*H!#:$!1Cv,mkN%*)*!#;7$$"1******\S=QI!#:$!1LCLJ4eY**!#;7$$"2FLL$))3E!3$!#;$!1V)[x'z>")**!#;7$$"2jmmmsPB7$!#;$!1^!>iHY")***!#;7$$"2&*****\c9W;$!#;$!1ln#["fR(***!#;7$$"1LL$e;!pYK!#:$!1u?Q!QB[%**!#;7$$"2jmmmwl*GL!#;$!1a#HLdp\#)*!#;7$$"1LL$ep+^T$!#:$!1be()GEHG'*!#;7$$"2'*****\iN7]$!#;$!1/)))*f`Ag$*!#;7$$"2NLLL(>:nO!#;$!1Q(\&zYV]')!#;7$$"1LLL.a#o$Q!#:$!1T#HWJY!zw!#;7$$"2lmm;&Q40S!#;$!0D&\x6!y\'!#:7$$"*3:(fT!")$!1L8BL#\'\_!#;7$$"1nmmc%GpL%!#:$!12ng5,,nO!#;7$$"1LLL8-V&\%!#:$!2=!zlpog_@!#<7$$"+XhUkY!"*$!2/"H-G[W%z%!#=7$$"+:o<E[!"*$"2w_khXCa8"!#<7$$"#]!""$"1jAja=iOG!#;-%&COLORG6&%$RGBG$"#5!""$""!!""$""!!""-%'CURVESG6$7S7$$!#I!""$"#5!""7$$!2nmmmwAc#G!#;$"#5!""7$$!1LLLo!)*Qn#!#:$"#5!""7$$!2nmmmxnK]#!#;$"#5!""7$$!2lmmmV1:L#!#;$"#5!""7$$!2NLL$[9cg@!#;$"#5!""7$$!2nmm;ct?+#!#;$"#5!""7$$!2,++]`oz$=!#;$"#5!""7$$!2omm;)3Do;!#;$"#5!""7$$!2-++]^x!*\"!#;$"#5!""7$$!2KLLL">1D8!#;$"#5!""7$$!2mmmm())yr6!#;$"#5!""7$$!1-+++uR#***!#;$"#5!""7$$!(@)f#)!"($"#5!""7$$!)E;!f'!")$"#5!""7$$!1nmm;G&R2&!#;$"#5!""7$$!2WLLLtK5F$!#<$"#5!""7$$!1OLLLHsV<!#;$"#5!""7$$"/)*****\9!H$!#;$"#5!""7$$"1jmmm]^0;!#;$"#5!""7$$"1-++]9#4L$!#;$"#5!""7$$"20+++N;R(\!#<$"#5!""7$$"1ommm"4#)o'!#;$"#5!""7$$"1mmm;^Yi#)!#;$"#5!""7$$"1LLLLG^g**!#;$"#5!""7$$"2FLL$=2Vs6!#;$"#5!""7$$"2'*****\`pfK"!#;$"#5!""7$$"1LLLjcz"\"!#:$"#5!""7$$"2(******z-6j;!#;$"#5!""7$$"2#******4#32$=!#;$"#5!""7$$"2%*****\#y'G*>!#;$"#5!""7$$"2$******H%=H<#!#;$"#5!""7$$"1mmm1>qMB!#:$"#5!""7$$").W2D!"($"#5!""7$$"1LLLep'Rm#!#:$"#5!""7$$"*%>4NG!")$"#5!""7$$"1mmm6s5'*H!#:$"#5!""7$$"2&*****\c9W;$!#;$"#5!""7$$"2jmmmwl*GL!#;$"#5!""7$$"2'*****\iN7]$!#;$"#5!""7$$"2NLLL(>:nO!#;$"#5!""7$$"1LLL.a#o$Q!#:$"#5!""7$$"2lmm;&Q40S!#;$"#5!""7$$"*3:(fT!")$"#5!""7$$"1nmmc%GpL%!#:$"#5!""7$$"1LLL8-V&\%!#:$"#5!""7$$"+XhUkY!"*$"#5!""7$$"+:o<E[!"*$"#5!""7$$"#]!""$"#5!""-%&COLORG6&%$RGBG$""!!""$""!!""$"#5!""-%'CURVESG6$7S7$$!#I!""$!#N!""7$$!2nmmmwAc#G!#;$!2Q\_(4?2#*H!#;7$$!1LLLo!)*Qn#!#:$!2`O=*Ra'[d#!#;7$$!2nmmmxnK]#!#;$!2%Q)[3yuJ8#!#;7$$!2lmmmV1:L#!#;$!1[!4@8hzr"!#:7$$!2NLL$[9cg@!#;$!1;@,')G,M8!#:7$$!2nmm;ct?+#!#;$!1EB;t#\T+"!#:7$$!2,++]`oz$=!#;$!1L-Dy;k!*o!#;7$$!2omm;)3Do;!#;$!2`034-0`"R!#<7$$!2-++]^x!*\"!#;$!2(yG*)zp;O7!#<7$$!2KLLL">1D8!#;$"1Jq;HY0@7!#;7$$!2mmmm())yr6!#;$"1e8gUTbMJ!#;7$$!1-+++uR#***!#;$"0mB+r*f2]!#:7$$!(@)f#)!"($"0&zR_yw)e'!#:7$$!)E;!f'!")$"1i!y_%y[Gy!#;7$$!1nmm;G&R2&!#;$"0-729]Fr)!#:7$$!2WLLLtK5F$!#<$"1$4tGC<]Y*!#;7$$!1OLLLHsV<!#;$"0P)e;:(z%)*!#:7$$"/)*****\9!H$!#;$"1&RHZ(e%*****!#;7$$"1jmmm]^0;!#;$"1<``og6r)*!#;7$$"1-++]9#4L$!#;$"1%\'p9"[_W*!#;7$$"20+++N;R(\!#<$"1M,;2y+j()!#;7$$"1ommm"4#)o'!#;$"1*zXr!HRjx!#;7$$"1mmm;^Yi#)!#;$"1DLz4Ne'e'!#;7$$"1LLLLG^g**!#;$"1*4][?4%R]!#;7$$"2FLL$=2Vs6!#;$"2x#>a`5.FJ!#<7$$"2'*****\`pfK"!#;$"2XUf7'R-47!#<7$$"1LLLjcz"\"!#:$!2Kp+d]rs7"!#<7$$"2(******z-6j;!#;$!1(Q3s,z'HQ!#;7$$"2#******4#32$=!#;$!11q!3viuv'!#;7$$"2%*****\#y'G*>!#;$!1T6gR3hd)*!#;7$$"2$******H%=H<#!#;$!26$or^syg8!#;7$$"1mmm1>qMB!#:$!1$['\'\;as"!#:7$$").W2D!"($!2Y/K!H%GO9#!#;7$$"1LLLep'Rm#!#:$!1veax*f$[D!#:7$$"*%>4NG!")$!2:[ET:t)=I!#;7$$"1mmm6s5'*H!#:$!1-0!>@H$)[$!#:7$$"2&*****\c9W;$!#;$!1o?fp(fn+%!#:7$$"2jmmmwl*GL!#;$!2DH>y`15a%!#;7$$"2'*****\iN7]$!#;$!1pX)3XD$H^!#:7$$"2NLLL(>:nO!#;$!1"Ghxz,Ss&!#:7$$"1LLL.a#o$Q!#:$!1(*>$ye91O'!#:7$$"2lmm;&Q40S!#;$!2l1H.Q)Q?q!#;7$$"*3:(fT!")$!1.(*QtZh^w!#:7$$"1nmmc%GpL%!#:$!1dD7>UZ/%)!#:7$$"1LLL8-V&\%!#:$!1(3v9SYW5*!#:7$$"+XhUkY!"*$!1#yz5jN%y)*!#:7$$"+:o<E[!"*$!2t<#[K"*fk5!#:7$$"#]!""$!$:"!""-%&COLORG6&%$RGBG$""!!""$"#5!""$""!!""-%'CURVESG6$7Y7$$!#I!""$!1-+++++]7!#;7$$!2nmmmwAc#G!#;$!2`uUC@b'fL!#<7$$!1LLLo!)*Qn#!#:$!206z*4i@\W!#<7$$!2nmmmxnK]#!#;$!14JC'zS/(\!#;7$$!2lmmmV1:L#!#;$!1\YmhMUn[!#;7$$!2NLL$[9cg@!#;$!0:qmgo2E%!#:7$$!2nmm;ct?+#!#;$!1h9w\b8ZL!#;7$$!2,++]`oz$=!#;$!2d$G`1auN@!#<7$$!2omm;)3Do;!#;$!1)Ri#Q7V!)o!#<7$$!2-++]^x!*\"!#;$"1@Pun#Q-o)!#<7$$!2KLLL">1D8!#;$"2:>o&fEb0D!#<7$$!2mmmm())yr6!#;$"2V*eh*eE,#R!#<7$$!1-+++uR#***!#;$"1di%4s+IU&!#;7$$!(@)f#)!"($"16&y%)f4Fy'!#;7$$!)E;!f'!")$"0[Y#H*yq!z!#:7$$!1nmm;G&R2&!#;$"1pfr5qOS()!#;7$$!2WLLLtK5F$!#<$"16o/_typ%*!#;7$$!1OLLLHsV<!#;$"16XeFnN[)*!#;7$$"/)*****\9!H$!#;$"0AyZ(e%*****!#:7$$"1jmmm]^0;!#;$"1Z^m>HRr)*!#;7$$"1-++]9#4L$!#;$"1C1gvsP]%*!#;7$$"20+++N;R(\!#<$"0e7>I5&)y)!#:7$$"1ommm"4#)o'!#;$"1G#4'GkwYy!#;7$$"1mmm;^Yi#)!#;$"1sN07Px!y'!#;7$$"1LLLLG^g**!#;$"1JbYbN`\a!#;7$$"2FLL$=2Vs6!#;$"1W:>*3EV"R!#;7$$"2'*****\`pfK"!#;$"2-%z[c\/(\#!#<7$$"1LLLjcz"\"!#:$"1KG#*pMJj$*!#<7$$"2(******z-6j;!#;$!1\:e&))>,U'!#<7$$"2#******4#32$=!#;$!2;g&R`MDx?!#<7$$"2%*****\#y'G*>!#;$!2dR]'oB`&G$!#<7$$"2$******H%=H<#!#;$!2cY?2x6!>V!#<7$$"1mmm1>qMB!#:$!1"*GnK)RV([!#;7$$").W2D!"($!19j&R7=c'\!#;7$$"1LLLep'Rm#!#:$!1"[w$eb$))\%!#;7$$"*%>4NG!")$!2&esmf"H)pK!#<7$$"1mmm6s5'*H!#:$!2%)QR$Gp738!#<7$$"2&*****\c9W;$!#;$"2mMbZ&z!=r"!#<7$$"2jmmmwl*GL!#;$"1Z1Sv.>hd!#;7$$"2'*****\iN7]$!#;$"23lDH'H6K6!#;7$$"2NLLL(>:nO!#;$"13#)G)*[O6=!#:7$$"1LLL.a#o$Q!#:$"1-AgI*f"pE!#:7$$"2lmm;&Q40S!#;$"1&=d:e;2q$!#:7$$"1LL$eY/C3%!#:$"10gEu9<SU!#:7$$"*3:(fT!")$"1c%*zd#eM#[!#:7$$"1MLLo<K[U!#:$"1z6/,[L[b!#:7$$"1nmmc%GpL%!#:$"1:4!R+:iL'!#:7$$"+N$zhT%!"*$"2NKB"*>?n4(!#;7$$"1LLL8-V&\%!#:$"1(Q0>6$>7z!#:7$$"1mm;z"G*zX!#:$"1^UUw@qW))!#:7$$"+XhUkY!"*$"1wX%))*z&\%)*!#:7$$"*[,`u%!")$"2e$oowc$o3"!#:7$$"+:o<E[!"*$"2$*)[")*4')e>"!#:7$$",vS)38\!#5$"2ayR"4b%3K"!#:7$$"#]!""$"2mmmmmmTX"!#:-%&COLORG6&%$RGBG$"#5!""$"1**4Y$QPJ%y!#;$""!!""-%%VIEWG6$;$!#I!""$"#]!"";$!#:!""$"#:!""-%+AXESLABELSG6'I"xG6"I"yG6"-%%FONTG6%%!G%!G"#5%+HORIZONTALG%+HORIZONTALG-%*AXESSTYLEG6#%'NORMALG-%(SCALINGG6#%.UNCONSTRAINEDG-%%ROOTG6'-%)BOUNDS_XG6#$"$I"!""-%)BOUNDS_YG6#$"$?"!""-%-BOUNDS_WIDTHG6#$"%!z$!""-%.BOUNDS_HEIGHTG6#$"%]P!""-%)CHILDRENG6"

QyY+SSJwRzYiLUkkc2VxRyUqcHJvdGVjdGVkRzYkLUYnNiQtJkkmcGxvdHNHRiU2I0kscG9seWdvbnBsb3RHRiU2JDcmNyRJImlHRiVJImpHRiU3JCwmRjQiIiJGOEY4RjU3JEY3LCZGNUY4RjhGODckRjRGOi9JJmNvbG9yR0YlLUkmQ09MT1JHRiU2JkkkUkdCR0YlKiYtSSVyYW5kR0YlRiVGOC1JIl5HRig2JCIjNSIjNyEiIkZCRkIvRjQ7RjhGSC9GNUZMRkotJkYuNiNJKGRpc3BsYXlHRiU2IzcjRiRGOA==

6cq-%)POLYGONSG6$7&7$$"#5!""$"#5!""7$$"#?!""$"#5!""7$$"#?!""$"#?!""7$$"#5!""$"#?!""-%&COLORG6&%$RGBG$"1svmvVygR!#;$"1x"G>mo:#>!#;$"0)))[A7%HN#!#;-%)POLYGONSG6$7&7$$"#?!""$"#5!""7$$"#I!""$"#5!""7$$"#I!""$"#?!""7$$"#?!""$"#?!""-%&COLORG6&%$RGBG$"0H4#>,++!)!#:$"1aT;Z)4XF%!#;$"04<Dks8V)!#:-%)POLYGONSG6$7&7$$"#I!""$"#5!""7$$"#S!""$"#5!""7$$"#S!""$"#?!""7$$"#I!""$"#?!""-%&COLORG6&%$RGBG$"1jeT6rk<T!#;$"1FH1;Vyg**!#;$"2lU$z2IN#)Q!#<-%)POLYGONSG6$7&7$$"#S!""$"#5!""7$$"#]!""$"#5!""7$$"#]!""$"#?!""7$$"#S!""$"#?!""-%&COLORG6&%$RGBG$"1D$3Hlw6%p!#;$"0y\;L!\Dx!#:$"0)>M3y6%H(!#:-%)POLYGONSG6$7&7$$"#]!""$"#5!""7$$"#g!""$"#5!""7$$"#g!""$"#?!""7$$"#]!""$"#?!""-%&COLORG6&%$RGBG$"2.x13aB)e5!#<$"1svmvVygR!#;$"1")4)[U!)4X*!#;-%)POLYGONSG6$7&7$$"#g!""$"#5!""7$$"#q!""$"#5!""7$$"#q!""$"#?!""7$$"#g!""$"#?!""-%&COLORG6&%$RGBG$"21a8;3Zw6#!#<$"1Wt-Gi>!\(!#;$"2LmBZj>!\X!#<-%)POLYGONSG6$7&7$$"#q!""$"#5!""7$$"#!)!""$"#5!""7$$"#!)!""$"#?!""7$$"#q!""$"#?!""-%&COLORG6&%$RGBG$"1Dh@w"\DP(!#;$"1Ntt[x6%H$!#;$"0(o;uH'o:'!#:-%)POLYGONSG6$7&7$$"#!)!""$"#5!""7$$"#!*!""$"#5!""7$$"#!*!""$"#?!""7$$"#!)!""$"#?!""-%&COLORG6&%$RGBG$"1jTXE$)eq%)!#;$"2V&>ZqB)eq%!#<$"1*\I<po:#R!#;-%)POLYGONSG6$7&7$$"#!*!""$"#5!""7$$"$+"!""$"#5!""7$$"$+"!""$"#?!""7$$"#!*!""$"#?!""-%&COLORG6&%$RGBG$"1WHku7%HN)!#;$"1F!4W0)4XZ!#;$"1fZULTHNA!#;-%)POLYGONSG6$7&7$$"$+"!""$"#5!""7$$"$5"!""$"#5!""7$$"$5"!""$"#?!""7$$"$+"!""$"#?!""-%&COLORG6&%$RGBG$"0hsC`PJ%y!#;$"1MyYSko:s!#;$"1_y/*RVyg&!#;-%)POLYGONSG6$7&7$$"#5!""$"#?!""7$$"#?!""$"#?!""7$$"#?!""$"#I!""7$$"#5!""$"#I!""-%&COLORG6&%$RGBG$"1i&Q)zK%yg(!#;$"1F75Jbs8V!#;$"1E&Rhummm)!#;-%)POLYGONSG6$7&7$$"#?!""$"#?!""7$$"#I!""$"#?!""7$$"#I!""$"#I!""7$$"#?!""$"#I!""-%&COLORG6&%$RGBG$"1E&Rhummm)!#;$"1=M]GXF'o*!#;$"2OYJ!e@R!)\!#<-%)POLYGONSG6$7&7$$"#I!""$"#?!""7$$"#S!""$"#?!""7$$"#S!""$"#I!""7$$"#I!""$"#I!""-%&COLORG6&%$RGBG$"1z26:xiob!#;$"0*4</*eqk$!#:$"1#y)=[HN#))*!#;-%)POLYGONSG6$7&7$$"#S!""$"#?!""7$$"#]!""$"#?!""7$$"#]!""$"#I!""7$$"#S!""$"#I!""-%&COLORG6&%$RGBG$"1Dh@w"\DP(!#;$"1)3yf-5XF'!#;$"1(zH-HZw6'!#;-%)POLYGONSG6$7&7$$"#]!""$"#?!""7$$"#g!""$"#?!""7$$"#g!""$"#I!""7$$"#]!""$"#I!""-%&COLORG6&%$RGBG$"1yb'o#>THN!#<$"1)[[VGR!)4&!#<$"21f'y]R!)4X!#<-%)POLYGONSG6$7&7$$"#g!""$"#?!""7$$"#q!""$"#?!""7$$"#q!""$"#I!""7$$"#g!""$"#I!""-%&COLORG6&%$RGBG$"1aj&QKPJ%Q!#;$"0)>M3y6%H(!#:$"1**4Y$QPJ%y!#;-%)POLYGONSG6$7&7$$"#q!""$"#?!""7$$"#!)!""$"#?!""7$$"#!)!""$"#I!""7$$"#q!""$"#I!""-%&COLORG6&%$RGBG$"2/u0$eXF'o"!#<$"1jTXE$)eq%)!#;$"1Ec[%[!)4X$!#;-%)POLYGONSG6$7&7$$"#!)!""$"#?!""7$$"#!*!""$"#?!""7$$"#!*!""$"#I!""7$$"#!)!""$"#I!""-%&COLORG6&%$RGBG$"1D$3Hlw6%p!#;$"1*R%Q`\DP"*!#;$"21f'y]R!)4X!#<-%)POLYGONSG6$7&7$$"#!*!""$"#?!""7$$"$+"!""$"#?!""7$$"$+"!""$"#I!""7$$"#!*!""$"#I!""-%&COLORG6&%$RGBG$"1s(fB&=THN!#;$"1`Y*)Q&yg>)!#;$"1N7R5S!)4&)!#;-%)POLYGONSG6$7&7$$"$+"!""$"#?!""7$$"$5"!""$"#?!""7$$"$5"!""$"#I!""7$$"$+"!""$"#I!""-%&COLORG6&%$RGBG$"1V&>ZqB)eq!#;$"2/u0$eXF'o"!#<$"2b8X?F!\DP!#<-%)POLYGONSG6$7&7$$"#5!""$"#I!""7$$"#?!""$"#I!""7$$"#?!""$"#S!""7$$"#5!""$"#S!""-%&COLORG6&%$RGBG$"2&3+Hz%yg>%!#<$"1fZULTHNA!#;$"2CK-)H+++?!#<-%)POLYGONSG6$7&7$$"#?!""$"#I!""7$$"#I!""$"#I!""7$$"#I!""$"#S!""7$$"#?!""$"#S!""-%&COLORG6&%$RGBG$"1E&Rhummm)!#;$"1(*>#pwuio&!#;$"1ae7K'o:#**!#;-%)POLYGONSG6$7&7$$"#I!""$"#I!""7$$"#S!""$"#I!""7$$"#S!""$"#S!""7$$"#I!""$"#S!""-%&COLORG6&%$RGBG$"1Lqg0cs8V!#<$"/hMQPJ%y%!#9$"0WW7hqk<"!#;-%)POLYGONSG6$7&7$$"#S!""$"#I!""7$$"#]!""$"#I!""7$$"#]!""$"#S!""7$$"#S!""$"#S!""-%&COLORG6&%$RGBG$"12$*yxq:#R'!#;$"2a>ZqB)eqC!#<$"1=M]GXF'o*!#;-%)POLYGONSG6$7&7$$"#]!""$"#I!""7$$"#g!""$"#I!""7$$"#g!""$"#S!""7$$"#]!""$"#S!""-%&COLORG6&%$RGBG$"0wx\W#)eq%!#;$"1VhzMhqkd!#;$"18GCU-\D<!#;-%)POLYGONSG6$7&7$$"#g!""$"#I!""7$$"#q!""$"#I!""7$$"#q!""$"#S!""7$$"#g!""$"#S!""-%&COLORG6&%$RGBG$"1_MmX%)eqk!#;$"1jeT6rk<T!#;$"1[iKH<#R!)*!#<-%)POLYGONSG6$7&7$$"#q!""$"#I!""7$$"#!)!""$"#I!""7$$"#!)!""$"#S!""7$$"#q!""$"#S!""-%&COLORG6&%$RGBG$"0y\;L!\Dx!#:$"2a>ZqB)eqC!#<$"1O!*pLl<T*)!#;-%)POLYGONSG6$7&7$$"#!)!""$"#I!""7$$"#!*!""$"#I!""7$$"#!*!""$"#S!""7$$"#!)!""$"#S!""-%&COLORG6&%$RGBG$"04<Dks8V)!#:$"2$\ubA=TH:!#<$"2X%oHOvioN!#<-%)POLYGONSG6$7&7$$"#!*!""$"#I!""7$$"$+"!""$"#I!""7$$"$+"!""$"#S!""7$$"#!*!""$"#S!""-%&COLORG6&%$RGBG$"1a!=)3h>!\*!#;$"1O!*pLl<T*)!#;$"2W!*)H,bs8B!#<-%)POLYGONSG6$7&7$$"$+"!""$"#I!""7$$"$5"!""$"#I!""7$$"$5"!""$"#S!""7$$"$+"!""$"#S!""-%&COLORG6&%$RGBG$"1ae7K'o:#**!#;$"11:[aXygf!#;$"1F75Jbs8V!#;-%)POLYGONSG6$7&7$$"#5!""$"#S!""7$$"#?!""$"#S!""7$$"#?!""$"#]!""7$$"#5!""$"#]!""-%&COLORG6&%$RGBG$"2mP?'Qh>!\"!#<$"0nuu\N#)e'!#:$"1L)GR#Q#)e]!#;-%)POLYGONSG6$7&7$$"#?!""$"#S!""7$$"#I!""$"#S!""7$$"#I!""$"#]!""7$$"#?!""$"#]!""-%&COLORG6&%$RGBG$"1)GqE]PJ%e!#;$"13WnKMLLL!#;$"1zjshFPJk!#;-%)POLYGONSG6$7&7$$"#I!""$"#S!""7$$"#S!""$"#S!""7$$"#S!""$"#]!""7$$"#I!""$"#]!""-%&COLORG6&%$RGBG$"12r4,'HN#o!#;$"1yb'o#>THN!#<$"0WW7hqk<"!#;-%)POLYGONSG6$7&7$$"#S!""$"#S!""7$$"#]!""$"#S!""7$$"#]!""$"#]!""7$$"#S!""$"#]!""-%&COLORG6&%$RGBG$"2/o.Lfw6%H!#<$"1_y/*RVyg&!#;$"0pK"*o<TH*!#:-%)POLYGONSG6$7&7$$"#]!""$"#S!""7$$"#g!""$"#S!""7$$"#g!""$"#]!""7$$"#]!""$"#]!""-%&COLORG6&%$RGBG$"1NM3([J%y!)!#;$"2vrTNu:#RS!#<$"1G/O9qmmm!#<-%)POLYGONSG6$7&7$$"#g!""$"#S!""7$$"#q!""$"#S!""7$$"#q!""$"#]!""7$$"#g!""$"#]!""-%&COLORG6&%$RGBG$"2Mh]bwio:#!#<$"#5!""$"1WHku7%HN)!#;-%)POLYGONSG6$7&7$$"#q!""$"#S!""7$$"#!)!""$"#S!""7$$"#!)!""$"#]!""7$$"#q!""$"#]!""-%&COLORG6&%$RGBG$"1Ey<hzg>I!#;$"1W!*)H,bs8$!#;$"1NM3([J%y!)!#;-%)POLYGONSG6$7&7$$"#!)!""$"#S!""7$$"#!*!""$"#S!""7$$"#!*!""$"#]!""7$$"#!)!""$"#]!""-%&COLORG6&%$RGBG$"1hHAL#)4Xn!#;$"1a-^&eB)e!*!#;$"1=&\oE)eqW!#;-%)POLYGONSG6$7&7$$"#!*!""$"#S!""7$$"$+"!""$"#S!""7$$"$+"!""$"#]!""7$$"#!*!""$"#]!""-%&COLORG6&%$RGBG$"2nJ=O<)4XF!#<$"1W^L^(o:#z!#;$"1"ed\&G'o:)!#;-%)POLYGONSG6$7&7$$"$+"!""$"#S!""7$$"$5"!""$"#S!""7$$"$5"!""$"#]!""7$$"$+"!""$"#]!""-%&COLORG6&%$RGBG$"1)[i$z\w6a!#;$"1sO,9")4X()!#;$"1V&>ZqB)eq!#;-%)POLYGONSG6$7&7$$"#5!""$"#]!""7$$"#?!""$"#]!""7$$"#?!""$"#g!""7$$"#5!""$"#g!""-%&COLORG6&%$RGBG$"1=&\oE)eqW!#;$"1sO,9")4X()!#;$"1:Kt==#R!e!#;-%)POLYGONSG6$7&7$$"#?!""$"#]!""7$$"#I!""$"#]!""7$$"#I!""$"#g!""7$$"#?!""$"#g!""-%&COLORG6&%$RGBG$"1z26:xiob!#;$"29.aSHPJ%=!#<$"0%z*\.-\D"!#:-%)POLYGONSG6$7&7$$"#I!""$"#]!""7$$"#S!""$"#]!""7$$"#S!""$"#g!""7$$"#I!""$"#g!""-%&COLORG6&%$RGBG$"14yf-5XFY!#;$"29(>0H$R!)4$!#<$"13WnKMLLL!#;-%)POLYGONSG6$7&7$$"#S!""$"#]!""7$$"#]!""$"#]!""7$$"#]!""$"#g!""7$$"#S!""$"#g!""-%&COLORG6&%$RGBG$"1"R%4uk<T\!#;$"00t"po:#R#!#:$"1;5/UVHNi!#;-%)POLYGONSG6$7&7$$"#]!""$"#]!""7$$"#g!""$"#]!""7$$"#g!""$"#g!""7$$"#]!""$"#g!""-%&COLORG6&%$RGBG$"1'))zh#fqk<!#;$"1F75Jbs8V!#;$"1<AFNWygz!#;-%)POLYGONSG6$7&7$$"#g!""$"#]!""7$$"#q!""$"#]!""7$$"#q!""$"#g!""7$$"#g!""$"#g!""-%&COLORG6&%$RGBG$"1j!3")euio$!#;$"1**4Y$QPJ%y!#;$"1DuuVvio:!#<-%)POLYGONSG6$7&7$$"#q!""$"#]!""7$$"#!)!""$"#]!""7$$"#!)!""$"#g!""7$$"#q!""$"#g!""-%&COLORG6&%$RGBG$"2'\_'eM%yg>!#<$"1=c>0?!\D*!#;$"1okn(RJ%y?!#;-%)POLYGONSG6$7&7$$"#!)!""$"#]!""7$$"#!*!""$"#]!""7$$"#!*!""$"#g!""7$$"#!)!""$"#g!""-%&COLORG6&%$RGBG$"1=t:!zg>!\!#;$"1s9KP1Zw"*!#;$"1DuuVvio:!#<-%)POLYGONSG6$7&7$$"#!*!""$"#]!""7$$"$+"!""$"#]!""7$$"$+"!""$"#g!""7$$"#!*!""$"#g!""-%&COLORG6&%$RGBG$"0=M]GXF'o!#:$"2&3+Hz%yg>%!#<$"1<AFNWygz!#;-%)POLYGONSG6$7&7$$"$+"!""$"#]!""7$$"$5"!""$"#]!""7$$"$5"!""$"#g!""7$$"$+"!""$"#g!""-%&COLORG6&%$RGBG$"1OYJ!e@R!)*!#;$"2%*Qbv&QJ%y#!#<$"0c*Hj1)4X&!#:-%)POLYGONSG6$7&7$$"#5!""$"#g!""7$$"#?!""$"#g!""7$$"#?!""$"#q!""7$$"#5!""$"#q!""-%&COLORG6&%$RGBG$"1^+uv3Zw^!#;$"2QI$oa/)4X"!#<$"1Dh@w"\DP(!#;-%)POLYGONSG6$7&7$$"#?!""$"#g!""7$$"#I!""$"#g!""7$$"#I!""$"#q!""7$$"#?!""$"#q!""-%&COLORG6&%$RGBG$"1a-^&eB)e!*!#;$"1<RB?K%yg$!#;$"2xgm$44'>!H!#<-%)POLYGONSG6$7&7$$"#I!""$"#g!""7$$"#S!""$"#g!""7$$"#S!""$"#q!""7$$"#I!""$"#q!""-%&COLORG6&%$RGBG$"0H4#>,++!)!#:$"1sO,9")4X()!#;$"14R%4uk<T*!#;-%)POLYGONSG6$7&7$$"#S!""$"#g!""7$$"#]!""$"#g!""7$$"#]!""$"#q!""7$$"#S!""$"#q!""-%&COLORG6&%$RGBG$"1;5/UVHNi!#;$"2Mh]bwio:#!#<$"1h^"*4ds8j!#;-%)POLYGONSG6$7&7$$"#]!""$"#g!""7$$"#g!""$"#g!""7$$"#g!""$"#q!""7$$"#]!""$"#q!""-%&COLORG6&%$RGBG$"1;5/UVHNi!#;$"1L)GR#Q#)e]!#;$"13WnKMLLL!#;-%)POLYGONSG6$7&7$$"#g!""$"#g!""7$$"#q!""$"#g!""7$$"#q!""$"#q!""7$$"#g!""$"#q!""-%&COLORG6&%$RGBG$"2io([\%yg>#!#<$"2a@>P7'>!\&!#=$"2a@>P7'>!\&!#=-%)POLYGONSG6$7&7$$"#q!""$"#g!""7$$"#!)!""$"#g!""7$$"#!)!""$"#q!""7$$"#q!""$"#q!""-%&COLORG6&%$RGBG$"14R%4uk<T*!#;$"2/o.Lfw6%H!#<$"1;ml)QR!)4(!#;-%)POLYGONSG6$7&7$$"#!)!""$"#g!""7$$"#!*!""$"#g!""7$$"#!*!""$"#q!""7$$"#!)!""$"#q!""-%&COLORG6&%$RGBG$"1r-4W0)4X(!#;$"2c-qyVN#)e#!#<$"1_y/*RVyg&!#;-%)POLYGONSG6$7&7$$"#!*!""$"#g!""7$$"$+"!""$"#g!""7$$"$+"!""$"#q!""7$$"#!*!""$"#q!""-%&COLORG6&%$RGBG$"2^RRPr:#R?!#<$"18GCU-\D<!#;$"13WnKMLLL!#;-%)POLYGONSG6$7&7$$"$+"!""$"#g!""7$$"$5"!""$"#g!""7$$"$5"!""$"#q!""7$$"$+"!""$"#q!""-%&COLORG6&%$RGBG$"1)RXoL#R!)p!#;$"1^+uv3Zw^!#;$"22[6m6\DP$!#<-%)POLYGONSG6$7&7$$"#5!""$"#q!""7$$"#?!""$"#q!""7$$"#?!""$"#!)!""7$$"#5!""$"#!)!""-%&COLORG6&%$RGBG$"1V<T"=^ui'!#;$"1sO,9")4X()!#;$"1**4Y$QPJ%y!#;-%)POLYGONSG6$7&7$$"#?!""$"#q!""7$$"#I!""$"#q!""7$$"#I!""$"#!)!""7$$"#?!""$"#!)!""-%&COLORG6&%$RGBG$"29(>0H$R!)4$!#<$"0c*Hj1)4X&!#:$"1:aU&H\DP&!#;-%)POLYGONSG6$7&7$$"#I!""$"#q!""7$$"#S!""$"#q!""7$$"#S!""$"#!)!""7$$"#I!""$"#!)!""-%&COLORG6&%$RGBG$"1**4Y$QPJ%y!#;$"13A)f&fqkP!#;$"1G/O9qmmm!#<-%)POLYGONSG6$7&7$$"#S!""$"#q!""7$$"#]!""$"#q!""7$$"#]!""$"#!)!""7$$"#S!""$"#!)!""-%&COLORG6&%$RGBG$"1<+eep:#R)!#;$"0*[#e;XF'))!#:$"1WHku7%HN)!#;-%)POLYGONSG6$7&7$$"#]!""$"#q!""7$$"#g!""$"#q!""7$$"#g!""$"#!)!""7$$"#]!""$"#!)!""-%&COLORG6&%$RGBG$"1j!3")euio$!#;$"14R%4uk<T*!#;$"1_7(*o4'>!p!#;-%)POLYGONSG6$7&7$$"#g!""$"#q!""7$$"#q!""$"#q!""7$$"#q!""$"#!)!""7$$"#g!""$"#!)!""-%&COLORG6&%$RGBG$"1**4Y$QPJ%y!#;$"1)fPN")>!\l!#;$"1D0gHT!)4l!#;-%)POLYGONSG6$7&7$$"#q!""$"#q!""7$$"#!)!""$"#q!""7$$"#!)!""$"#!)!""7$$"#q!""$"#!)!""-%&COLORG6&%$RGBG$"1aC?i5XF')!#;$"1V**3jHN#)e!#<$"22[6m6\DP$!#<-%)POLYGONSG6$7&7$$"#!)!""$"#q!""7$$"#!*!""$"#q!""7$$"#!*!""$"#!)!""7$$"#!)!""$"#!)!""-%&COLORG6&%$RGBG$"1E<$GA%HN#)!#;$"2/o.Lfw6%H!#<$"1s(fB&=THN!#;-%)POLYGONSG6$7&7$$"#!*!""$"#q!""7$$"$+"!""$"#q!""7$$"$+"!""$"#!)!""7$$"#!*!""$"#!)!""-%&COLORG6&%$RGBG$"0w"**R"3'>]!#:$"2^RRPr:#R?!#<$"1<RB?K%yg$!#;-%)POLYGONSG6$7&7$$"$+"!""$"#q!""7$$"$5"!""$"#q!""7$$"$5"!""$"#!)!""7$$"$+"!""$"#!)!""-%&COLORG6&%$RGBG$"1'))zh#fqk<!#;$"1fZULTHNA!#;$"29.aSHPJ%=!#<-%)POLYGONSG6$7&7$$"#5!""$"#!)!""7$$"#?!""$"#!)!""7$$"#?!""$"#!*!""7$$"#5!""$"#!*!""-%&COLORG6&%$RGBG$"2$e"4o3\DP"!#<$"0)>M3y6%H(!#:$"1E<$GA%HN#)!#;-%)POLYGONSG6$7&7$$"#?!""$"#!)!""7$$"#I!""$"#!)!""7$$"#I!""$"#!*!""7$$"#?!""$"#!*!""-%&COLORG6&%$RGBG$"1WHku7%HN)!#;$"1aj&QKPJ%Q!#;$"1/6*z(HN#)=!#;-%)POLYGONSG6$7&7$$"#I!""$"#!)!""7$$"#S!""$"#!)!""7$$"#S!""$"#!*!""7$$"#I!""$"#!*!""-%&COLORG6&%$RGBG$"283FK;%HNU!#<$"1W!*)H,bs8$!#;$"1AX\1vio:!#;-%)POLYGONSG6$7&7$$"#S!""$"#!)!""7$$"#]!""$"#!)!""7$$"#]!""$"#!*!""7$$"#S!""$"#!*!""-%&COLORG6&%$RGBG$"1jvP'*eqk(*!#;$"1W7o*[#)eq#!#;$"13WnKMLLL!#;-%)POLYGONSG6$7&7$$"#]!""$"#!)!""7$$"#g!""$"#!)!""7$$"#g!""$"#!*!""7$$"#]!""$"#!*!""-%&COLORG6&%$RGBG$"1D0gHT!)4l!#;$"0H4#>,++!)!#:$"1"G>*R;#R!Q!#;-%)POLYGONSG6$7&7$$"#g!""$"#!)!""7$$"#q!""$"#!)!""7$$"#q!""$"#!*!""7$$"#g!""$"#!*!""-%&COLORG6&%$RGBG$"1XjcW)eqk*!#;$"1seq!fDPJ)!#;$"1^+uv3Zw^!#;-%)POLYGONSG6$7&7$$"#q!""$"#!)!""7$$"#!)!""$"#!)!""7$$"#!)!""$"#!*!""7$$"#q!""$"#!*!""-%&COLORG6&%$RGBG$"1Wt-Gi>!\(!#;$"0w"**R"3'>]!#:$"10jBm(o:#R!#<-%)POLYGONSG6$7&7$$"#!)!""$"#!)!""7$$"#!*!""$"#!)!""7$$"#!*!""$"#!*!""7$$"#!)!""$"#!*!""-%&COLORG6&%$RGBG$"1yb'o#>THN!#<$"1jvP'*eqk(*!#;$"1<W'>">THv!#;-%)POLYGONSG6$7&7$$"#!*!""$"#!)!""7$$"$+"!""$"#!)!""7$$"$+"!""$"#!*!""7$$"#!*!""$"#!*!""-%&COLORG6&%$RGBG$"00t"po:#R#!#:$"2'))zh#fqk<"!#<$"1=&\oE)eqW!#;-%)POLYGONSG6$7&7$$"$+"!""$"#!)!""7$$"$5"!""$"#!)!""7$$"$5"!""$"#!*!""7$$"$+"!""$"#!*!""-%&COLORG6&%$RGBG$"1G/O9qmmm!#<$"1F^v#z6%H&*!#;$"283FK;%HNU!#<-%)POLYGONSG6$7&7$$"#5!""$"#!*!""7$$"#?!""$"#!*!""7$$"#?!""$"$+"!""7$$"#5!""$"$+"!""-%&COLORG6&%$RGBG$"1X2&zz8Vy)!#;$"2W!*)H,bs8B!#<$"1)[i$z\w6a!#;-%)POLYGONSG6$7&7$$"#?!""$"#!*!""7$$"#I!""$"#!*!""7$$"#I!""$"$+"!""7$$"#?!""$"$+"!""-%&COLORG6&%$RGBG$"00t"po:#R#!#:$"1Dh@w"\DP(!#;$"14yf-5XFY!#;-%)POLYGONSG6$7&7$$"#I!""$"#!*!""7$$"#S!""$"#!*!""7$$"#S!""$"$+"!""7$$"#I!""$"$+"!""-%&COLORG6&%$RGBG$"1hHAL#)4Xn!#;$"1Oo+d!\DP*!#;$"2b8X?F!\DP!#<-%)POLYGONSG6$7&7$$"#S!""$"#!*!""7$$"#]!""$"#!*!""7$$"#]!""$"$+"!""7$$"#S!""$"$+"!""-%&COLORG6&%$RGBG$"1XjcW)eqk*!#;$"/(*)\<5XF'!#:$"1hHAL#)4Xn!#;-%)POLYGONSG6$7&7$$"#]!""$"#!*!""7$$"#g!""$"#!*!""7$$"#g!""$"$+"!""7$$"#]!""$"$+"!""-%&COLORG6&%$RGBG$"1[iKH<#R!)*!#<$"1iC\T&HN#G!#;$"1i2`c2Zwr!#;-%)POLYGONSG6$7&7$$"#g!""$"#!*!""7$$"#q!""$"#!*!""7$$"#q!""$"$+"!""7$$"#g!""$"$+"!""-%&COLORG6&%$RGBG$"1WHku7%HN)!#;$"2%)42=7^ui#!#<$""!!""-%)POLYGONSG6$7&7$$"#q!""$"#!*!""7$$"#!)!""$"#!*!""7$$"#!)!""$"$+"!""7$$"#q!""$"$+"!""-%&COLORG6&%$RGBG$"1DFH1;Vyg!#;$"2LmBZj>!\X!#<$"2'*HQ]@THN%!#<-%)POLYGONSG6$7&7$$"#!)!""$"#!*!""7$$"#!*!""$"#!*!""7$$"#!*!""$"$+"!""7$$"#!)!""$"$+"!""-%&COLORG6&%$RGBG$"1=&\oE)eqW!#;$"21f'y]R!)4X!#<$"1XC"Hes8V%!#;-%)POLYGONSG6$7&7$$"#!*!""$"#!*!""7$$"$+"!""$"#!*!""7$$"$+"!""$"$+"!""7$$"#!*!""$"$+"!""-%&COLORG6&%$RGBG$"2'\_'eM%yg>!#<$"0hsC`PJ%y!#;$"1Crnflo:_!#;-%)POLYGONSG6$7&7$$"$+"!""$"#!*!""7$$"$5"!""$"#!*!""7$$"$5"!""$"$+"!""7$$"$+"!""$"$+"!""-%&COLORG6&%$RGBG$"1"Ql#y`B)e)!#;$"2%)42=7^ui#!#<$"21a8;3Zw6#!#<-%)POLYGONSG6$7&7$$"#5!""$"$+"!""7$$"#?!""$"$+"!""7$$"#?!""$"$5"!""7$$"#5!""$"$5"!""-%&COLORG6&%$RGBG$"1F!4W0)4XZ!#;$"2aC?i5XF'[!#<$"13FrZYF'o(!#;-%)POLYGONSG6$7&7$$"#?!""$"$+"!""7$$"#I!""$"$+"!""7$$"#I!""$"$5"!""7$$"#?!""$"$5"!""-%&COLORG6&%$RGBG$"10jBm(o:#R!#<$"1)fPN")>!\l!#;$"1)[i$z\w6a!#;-%)POLYGONSG6$7&7$$"#I!""$"$+"!""7$$"#S!""$"$+"!""7$$"#S!""$"$5"!""7$$"#I!""$"$5"!""-%&COLORG6&%$RGBG$"02f3X!\Dd!#:$"1XjcW)eqk*!#;$"1s(fB&=THN!#;-%)POLYGONSG6$7&7$$"#S!""$"$+"!""7$$"#]!""$"$+"!""7$$"#]!""$"$5"!""7$$"#S!""$"$5"!""-%&COLORG6&%$RGBG$"1DuuVvio:!#<$"1zjshFPJk!#;$"2e"4o3\DP6!#<-%)POLYGONSG6$7&7$$"#]!""$"$+"!""7$$"#g!""$"$+"!""7$$"#g!""$"$5"!""7$$"#]!""$"$5"!""-%&COLORG6&%$RGBG$"2^RRPr:#R?!#<$"1V**3jHN#)e!#<$"1F^v#z6%H&*!#;-%)POLYGONSG6$7&7$$"#g!""$"$+"!""7$$"#q!""$"$+"!""7$$"#q!""$"$5"!""7$$"#g!""$"$5"!""-%&COLORG6&%$RGBG$"1<RB?K%yg$!#;$"1"G>*R;#R!Q!#;$"21f'y]R!)4X!#<-%)POLYGONSG6$7&7$$"#q!""$"$+"!""7$$"#!)!""$"$+"!""7$$"#!)!""$"$5"!""7$$"#q!""$"$5"!""-%&COLORG6&%$RGBG$"18GCU-\D<!#;$"1**4Y$QPJ%y!#;$"1s#H1;Vyg*!#;-%)POLYGONSG6$7&7$$"#!)!""$"$+"!""7$$"#!*!""$"$+"!""7$$"#!*!""$"$5"!""7$$"#!)!""$"$5"!""-%&COLORG6&%$RGBG$"1mS@67XF')!#<$"1jTXE$)eq%)!#;$"2/u0$eXF'o"!#<-%)POLYGONSG6$7&7$$"#!*!""$"$+"!""7$$"$+"!""$"$+"!""7$$"$+"!""$"$5"!""7$$"#!*!""$"$5"!""-%&COLORG6&%$RGBG$"02f3X!\Dd!#:$"0hsC`PJ%y!#;$"1N7R5S!)4&)!#;-%)POLYGONSG6$7&7$$"$+"!""$"$+"!""7$$"$5"!""$"$+"!""7$$"$5"!""$"$5"!""7$$"$+"!""$"$5"!""-%&COLORG6&%$RGBG$"1DFH1;Vyg!#;$"1*o$fs]DPr!#;$"29(>0H$R!)4$!#<-%*AXESSTYLEG6#%'NORMALG-%(SCALINGG6#%.UNCONSTRAINEDG-%%ROOTG6'-%)BOUNDS_XG6#$"$5$!""-%)BOUNDS_YG6#$"$?"!""-%-BOUNDS_WIDTHG6#$"%!e$!""-%.BOUNDS_HEIGHTG6#$"%qN!""-%)CHILDRENG6"

%; LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= %; LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic=

4) Produce a nice plot of the graph of y = tan(x) with x between 0 and 10. You will need to specify the y-range. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= 5) Plot 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 with LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYpLUkjbW9HRiQ2LVEqJnVtaW51czA7RicvJSxtYXRodmFyaWFudEdRJ25vcm1hbEYnLyUmZmVuY2VHUSZmYWxzZUYnLyUqc2VwYXJhdG9yR0Y0LyUpc3RyZXRjaHlHRjQvJSpzeW1tZXRyaWNHRjQvJShsYXJnZW9wR0Y0LyUubW92YWJsZWxpbWl0c0dGNC8lJ2FjY2VudEdGNC8lJ2xzcGFjZUdRLDAuMjIyMjIyMmVtRicvJSdyc3BhY2VHRkMtSSNtbkdGJDYkUSIyRidGLy1GLDYtUSYmbGVxO0YnRi9GMkY1RjdGOUY7Rj1GPy9GQlEsMC4yNzc3Nzc4ZW1GJy9GRUZOLUkjbWlHRiQ2JVEieEYnLyUnaXRhbGljR1EldHJ1ZUYnL0YwUSdpdGFsaWNGJ0ZKRkZGLw==, along with the lines tangent to that graph when x = -1.5, -.5, .5, and 1.5. Crop the graph to show the region where y is between -2 and 4. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic=

As was noted earlier, you can graph a function of one variable on a graphing calculator. Often, a calculator will be the easier way to deal with such graphs. There are two reasons to look at them with Maple when your calculator is already at hand: It gives an introduction to graphing with Maple using familiar material. (This is the reason we include it here.) Maple graphs can easily be printed out if you want to write on them or turn them in.

The syntax for plotting the graph of a function of 2 variables is similar to the one variable case. We use the command: plot3d("function of x and y", x="low x".."high x", y="lowy".."high y"); as we see with the following command. QyQtSSdwbG90M2RHNiI2JSwmLUkkc2luRzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliR0YlNiNJInhHRiUiIiItRik2I0kieUdGJUYvL0YuOyEiJCIiJi9GMjssJEkjUGlHRishIiIsJEY6IiIjRi8=

6&-%+AXESLABELSG6%Q"x6"Q"y6"Q!6"-%*AXESSTYLEG6#%'NORMALG-%%GRIDG6%;$!"$""!$""&""!;$!0z*e`EfTJ!#9$"0ezrI&=$G'!#9X,I)anythingG%*protectedG6"6"[gl'!%"!!#\bm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

Once again, if you click once on the graph, it will be enclosed in a box, and a set of buttons will appear up on the menu bar. There are 2 boxes labeled 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 and 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 with scroll arrows for specifying the viewing angles, a drop down list of 7 buttons for style used on the graph itself, a drop down list of 4 buttons for style used on the axes, a "1:1" button to use the same scale on all 3 axes, and a drop down list of 3 possible actions of dragging on the graph. The default has a wire frame model, that is opaque (the front bump hides the back bump), the axes are not displayed, from a viewing angle of 45 degrees on both angles.

6) Replot the graph given above. Then use the buttons to produce an image that: A) Shades the image, draws a grid of lines on the image, and boxes the axes around the image; 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 B) Shades the image and draws contour lines on it, while putting the axes in standard position through the origin; 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 C) Uses a wire frame model with contour lines, and suppresses the axes. 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

The list of controls for changing the appearance of a graph includes controls for theta and phi, the coordinates of the position in spherical coordinates that the graph is viewed from. The angle phi is the angle in degrees down from the positive z-axis. Thus an angle of LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYmLUkjbWlHRiQ2JVEnJiM5NjY7RicvJSdpdGFsaWNHUSZmYWxzZUYnLyUsbWF0aHZhcmlhbnRHUSdub3JtYWxGJy1JI21vR0YkNi1RIj1GJ0YyLyUmZmVuY2VHRjEvJSpzZXBhcmF0b3JHRjEvJSlzdHJldGNoeUdGMS8lKnN5bW1ldHJpY0dGMS8lKGxhcmdlb3BHRjEvJS5tb3ZhYmxlbGltaXRzR0YxLyUnYWNjZW50R0YxLyUnbHNwYWNlR1EsMC4yNzc3Nzc4ZW1GJy8lJ3JzcGFjZUdGSS1JI21uR0YkNiRRIjBGJ0YyRjI= looks down on the x-y plane from above, LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYmLUkjbWlHRiQ2JVEnJiM5NjY7RicvJSdpdGFsaWNHUSZmYWxzZUYnLyUsbWF0aHZhcmlhbnRHUSdub3JtYWxGJy1JI21vR0YkNi1RIj1GJ0YyLyUmZmVuY2VHRjEvJSpzZXBhcmF0b3JHRjEvJSlzdHJldGNoeUdGMS8lKnN5bW1ldHJpY0dGMS8lKGxhcmdlb3BHRjEvJS5tb3ZhYmxlbGltaXRzR0YxLyUnYWNjZW50R0YxLyUnbHNwYWNlR1EsMC4yNzc3Nzc4ZW1GJy8lJ3JzcGFjZUdGSS1JI21uR0YkNiRRIzkwRidGMkYy gives a viewpoint looking along the x-y plane, while LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYmLUkjbWlHRiQ2JVEnJiM5NjY7RicvJSdpdGFsaWNHUSZmYWxzZUYnLyUsbWF0aHZhcmlhbnRHUSdub3JtYWxGJy1JI21vR0YkNi1RIj1GJ0YyLyUmZmVuY2VHRjEvJSpzZXBhcmF0b3JHRjEvJSlzdHJldGNoeUdGMS8lKnN5bW1ldHJpY0dGMS8lKGxhcmdlb3BHRjEvJS5tb3ZhYmxlbGltaXRzR0YxLyUnYWNjZW50R0YxLyUnbHNwYWNlR1EsMC4yNzc3Nzc4ZW1GJy8lJ3JzcGFjZUdGSS1JI21uR0YkNiRRJDE4MEYnRjJGMg== looks up from below. The angle theta measures the rotation of the x-y plane, measured in degrees around from the positive x-axis (in the standard direction viewed from above). If LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYmLUkjbWlHRiQ2JVEnJiM5NjY7RicvJSdpdGFsaWNHUSZmYWxzZUYnLyUsbWF0aHZhcmlhbnRHUSdub3JtYWxGJy1JI21vR0YkNi1RIj1GJ0YyLyUmZmVuY2VHRjEvJSpzZXBhcmF0b3JHRjEvJSlzdHJldGNoeUdGMS8lKnN5bW1ldHJpY0dGMS8lKGxhcmdlb3BHRjEvJS5tb3ZhYmxlbGltaXRzR0YxLyUnYWNjZW50R0YxLyUnbHNwYWNlR1EsMC4yNzc3Nzc4ZW1GJy8lJ3JzcGFjZUdGSS1JI21uR0YkNiRRIjBGJ0YyRjI= (so we are looking down the z-axis), then \316\270=0 shows the y- axis horizontal increasing from left to right and the x-axis vertical decreasing as you go up. The default setting has LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYkLUkjbWlHRiQ2JVEoJnRoZXRhO0YnLyUnaXRhbGljR1EmZmFsc2VGJy8lLG1hdGh2YXJpYW50R1Enbm9ybWFsRidGMg== and LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYkLUkjbWlHRiQ2JVEpJnZhcnBoaTtGJy8lJ2l0YWxpY0dRJmZhbHNlRicvJSxtYXRodmFyaWFudEdRJ25vcm1hbEYnRjI= both set to 45 degrees. (When you change the viewing angles, hit return or enter after changing the value in each box.) 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

6&-%+AXESLABELSG6%Q"x6"Q"y6"Q!6"-%*AXESSTYLEG6#%&FRAMEG-%%GRIDG6%;$!"$""!$""&""!;$!0z*e`EfTJ!#9$"0ezrI&=$G'!#9X,I)anythingG%*protectedG6"6"[gl'!%"!!#\bm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

7) Redraw the graph above. Adjust the viewing angle so that theta = 60 and phi = 30. Use a wireframe model that is opaque, and have the axes on the outside of the graph. 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 8) Find the angle settings that look along the z axis and put the x-y plane in standard position for the plane. (Standard position has the x-axis horizontal and increasing to the right. The y- axis is vertical and increasing as you rise.) 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 The correct settings are..... 9) View the graph above as a contour map with the x-y plane in standard position. 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 This contour map view can be obtained more directly with the plots[contourmap] command, using plots[contourplot]("func(x,y)", x="low x".."hi x", y="low y".."hi y"); The plots[contourplot] command has the option of letting you specify which contours will be drawn with a contours=["list of values"] option. Thus to get the map above with contours corresponding to the values of -2/3, 0, 1/4, and 5/4 we use the command: plots[contourplot](sin(x) + sin(y), x=-3..5, y= -Pi..2*Pi, contours= [-2/3, 0, 1/4, 5/4]); 10) Redraw the contour plot you found in the previous exercise, using the plot options rather than adjusting the controls and redrawing. 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

The syntax for showing more than one graph on the same plot is similar to the one variable case. We simply replace the function with a set of functions. 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 The control of the z-range is done with a view = "low value of z".."high value of z" clause inserted into the plot3d command. QyQtSSdwbG90M2RHNiQlKnByb3RlY3RlZEdJKF9zeXNsaWJHNiI2JjwkLCYtSSRzaW5HRiU2I0kieEdGKCIiIi1GLTYjSSJ5R0YoRjAsKCokRi8iIiNGMCokRjNGNkYwISImRjAvRi87ISIkIiImL0YzOywkSSNQaUdGJiEiIkZAL0kldmlld0dGKDtGOyIiJEYw

6'-%+AXESLABELSG6%Q"x6"Q"y6"Q!6"-%*AXESSTYLEG6#%$BOXG-%%GRIDG6%;$!"$""!$""&""!;$!0z*e`EfTJ!#9$"0z*e`EfTJ!#9X,I)anythingG%*protectedG6"6"[gl'!%"!!#\bm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z*e`EfTJ!#9$"0z*e`EfTJ!#9X,I)anythingG%*protectedG6"6"[gl'!%"!!#\bm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fjDnK!#;$"2:QL(fjDnK!#;;$!#I!""$"#I!""

11) Plot the functions 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 print(); and 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 on the same axes. Plot over the rectangle with x and y between -1 and 3. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= 12) Regraph the same pair of functions, this time constraining the z-range between -1 and 7. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= These 2 surfaces have a simple relationship. Describe the relationship and replot the graph viewed at an angle to make the relationship clear visually. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= The relationship is....... The viewing angle that makes this obvious is ......

Save and print this worksheet. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic= LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2I1EhRic=