Josh Robbins
#Josh RObbins
restart;
Semicolon ends a line, so does a colon, but colon does not show an output
#x:=3;
x
Warning, inserted missing semicolon at end of statement
SSJ4RzYi
A:=[1,2,3,4];
NyYiIiIiIiMiIiQiIiU=
A[2];
IiIj
[9,2,3,4,1][1];
IiIq
f:=(a,b)->a*x+b;
Zio2JEkiYUc2IkkiYkdGJUYlNiRJKW9wZXJhdG9yR0YlSSZhcnJvd0dGJUYlLCYqJjkkIiIiSSJ4R0YlRi1GLTklRi1GJUYlRiU=
f(3,4);
LCZJInhHNiIiIiQiIiUiIiI=
sum(n**3+n, n=1..10);
IiUhMyQ=
This sums up the series of n^(3+n) for the values 1 though 10
product(n**3+n, n=1..10);
IjYrKyshMyEqSC5QKGYi
This multiplies together the series of n^(3+n) for the values 1 though 10
[n**3+n $n=1..10];
NywiIiMiIzUiI0kiI28iJEkiIiRBIyIkXSQiJD8mIiRRKCIlNTU=
the $ kind of means 'for' or 'in the case that,' so the above reads a list (because of the brackets) of n^(3+n) for the domain 1 through 10
cos(3);
LUkkY29zRzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliRzYiNiMiIiQ=
dog(3);
LUkkZG9nRzYiNiMiIiQ=
dog is outputted as italicized because maple does not recognize 'dog' as a function. 'cos' is not slanted because maple recognizes 'cos' as the cosine function
Pi with a capital P is the number Pi
cos(Pi/4);
LCQqJCIiIyMiIiJGJEYl
Angles will always be in radians
e^3;
KiRJImVHNiIiIiQ=
e is slanted and not a function
-----------------ctrl j inserts a maple line below and k inserts a new maple line above, ctrl t inserts a text line
evalf(e^3);
KiRJImVHNiIiIiQ=
plot (3*x+4);
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plot (3*x**2+4, x=-5..5, y=-10..20);
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
plot (3*x**2+4, x=-5..5, dog=-10..20);
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
You can lable the axes whatever you want
plot (3*x**2+4, x=-5..5, dog=-10..20, title= "My graph");
LSUlUExPVEc2Jy0lJ0NVUlZFU0c2JDdTNyQkISNdISIiJCIkIXohIiI3JCQhMk5MTCRlJUc/eSUhIzskIjFqSCpHJilRLkUoISM5NyQkITFtbVQmZXNCZiUhIzokIjFuZikqKXlscHMnISM5NyQkITFMTCQzcyUzelYhIzokIjEmeXF3KlsiSDonISM5NyQkITJOTExlLyRRa1QhIzskIjJNQkZkJWVpLWMhIzo3JCQhMm5tOy8iPXFdUiEjOyQiMWYpWyVRTVQjMyYhIzk3JCQhMkxMJDNfPmZfUCEjOyQiMi89X3chUmVDWSEjOjckJCEyLitdKG8xWVpOISM7JCIwWSkqKWVKTXZUISM4NyQkITFMTDMtT0pOTCEjOiQiMiZIRUZaXUhQUCEjOjckJCEyKCoqKlxQKm8lUTckISM7JCIxZHVuQ2VfRkwhIzk3JCQhMmptbTtSRmohSCEjOyQiMi5mbEFuQFMkSCEjOjckJCExTEwkZTRPWnIjISM6JCIxQWgrQHckNGgjISM5NyQkITIoKioqKipcblwhKlwjISM7JCIyOUdOTXl1TkYjISM6NyQkIStEd1ojRyMhIiokIjI9cChlSzciSCc+ISM6NyQkIStELnh0PyEiKiQiMjw9YiMzcTohcCIhIzo3JCQhMkpMJDMtVEMlKT0hIzskIjJ6dXEzdjdeWSIhIzo3JCQhMmxtbTs0eillOyEjOyQiMnVrSUEmUmNENyEjOjckJCEyam1tbU9selkiISM7JCIwJSk+YHB3ay8iISM4NyQkIS12PXQpZUMiISM2JCIxIz5tSWowbmwpISM6NyQkITJvbW1taDUkXDUhIzskIjFVIlsySmVKSSghIzo3JCQhMSQqKipcKD1bakwpISM7JCIxTHE0TDUlWzMnISM6NyQkITEnKioqXGlYZyNHJyEjOyQiMkVQaUVnTFQ9JiEjOzckJCEyeGxtO2FRKFJUISM8JCIxNzMhZTBCVF4lISM6NyQkITFsbTsvJz0+PCMhIzskIjFlUHA3cF5UVCEjOjckJCExRU1MTGUqZSRcISM9JCIxTEk/KjN0KyslISM6NyQkIjI9bm0ielJRYkAhIzwkIjFeJUhIU3EkUlQhIzo3JCQiMjorK3Y9PlkyJSEjPCQiMSZIJXBYYzIpXCUhIzo3JCQiMXZtbSJ6WHU5JyEjOyQiMFRXR3BLUDgmISM5NyQkIjEsKysrJnkpKUcpISM7JCIxb0dqLl87aGchIzo3JCQiMi4rK0RFJlFRNSEjOyQiMSVlSiwnPXRNcyEjOjckJCIyMCtdN3klM1Q3ISM7JCIxJjNeRkl1M2kpISM6NyQkIix2LltoWSIhIzUkIjIvYGYuLXhbLyIhIzo3JCQiMkVMTExReCRvOyEjOyQiMk1YbHojXC9ONyEjOjckJCIyMCsrXVArVik9ISM7JCIyRmFuNFB3XlkiISM6NyQkIjFtbSJ6cGUqej8hIzokIjFlPF5iJW95cCIhIzk3JCQiMSwrK0RcJ1FIIyEjOiQiMXlOQykpW2F5PiEjOTckJCIxTExlOVM4JlwjISM6JCIxQSM+XzczeEUjISM5NyQkIjIyK11pPz1icSMhIzskIjJtMTAkSCdbZmYjISM6NyQkIjFMTEwzcz82SCEjOiQiMnNlYkhBUUQlSCEjOjckJCIyJioqKlw3YFdsNyQhIzskIjEleW08QCVlS0whIzk3JCQiMndtbW0nKlJSTCQhIzskIjI7PywvcllYdCQhIzo3JCQiMW9tO2E8LllOISM6JCIxLHZZZ0JJc1QhIzk3JCQiMlhMJGU5dE9jUCEjOyQiMS81aT8nKTNMWSEjOTckJCIxLCsrXVFrXFIhIzokIjFcR2JpZiEqel0hIzk3JCQiMU5MJDNkZzY8JSEjOiQiMS1DSV9UZD5jISM5NyQkIjFvbW1teEdwViEjOiQiMSoqR1F3RT9GaCEjOTckJCItRCJvSzBlJSEjNiQiMSV6Kj4kKlFRJXAnISM5NyQkIjEsK3Y9NXMjeSUhIzokIjE5eiZINUVCRSghIzk3JCQiI10hIiIkIiQheiEiIi0lJkNPTE9SRzYmJSRSR0JHJCIjNSEiIiQiIiEhIiIkIiIhISIiLSUlVklFV0c2JDskISNdISIiJCIjXSEiIjskISQrIiEiIiQiJCsjISIiLSUrQVhFU0xBQkVMU0c2JC1JI21pRzYjL0krbW9kdWxlbmFtZUc2IkksVHlwZXNldHRpbmdHSShfc3lzbGliRzYiNjVRIng2Ii8lJ2ZhbWlseUdRITYiLyUlc2l6ZUdRIzEwNiIvJSVib2xkR1EmZmFsc2U2Ii8lJ2l0YWxpY0dRJXRydWU2Ii8lKnVuZGVybGluZUdRJmZhbHNlNiIvJSpzdWJzY3JpcHRHUSZmYWxzZTYiLyUsc3VwZXJzY3JpcHRHUSZmYWxzZTYiLyUrZm9yZWdyb3VuZEdRKFswLDAsMF02Ii8lK2JhY2tncm91bmRHUS5bMjU1LDI1NSwyNTVdNiIvJSdvcGFxdWVHUSZmYWxzZTYiLyUrZXhlY3V0YWJsZUdRJmZhbHNlNiIvJSlyZWFkb25seUdRJmZhbHNlNiIvJSljb21wb3NlZEdRJmZhbHNlNiIvJSpjb252ZXJ0ZWRHUSZmYWxzZTYiLyUraW1zZWxlY3RlZEdRJmZhbHNlNiIvJSxwbGFjZWhvbGRlckdRJmZhbHNlNiIvJTZzZWxlY3Rpb24tcGxhY2Vob2xkZXJHUSZmYWxzZTYiLyUsbWF0aHZhcmlhbnRHUSdpdGFsaWM2Ii1JI21pRzYjL0krbW9kdWxlbmFtZUc2IkksVHlwZXNldHRpbmdHSShfc3lzbGliRzYiNjVRJGRvZzYiLyUnZmFtaWx5R1EhNiIvJSVzaXplR1EjMTA2Ii8lJWJvbGRHUSZmYWxzZTYiLyUnaXRhbGljR1EldHJ1ZTYiLyUqdW5kZXJsaW5lR1EmZmFsc2U2Ii8lKnN1YnNjcmlwdEdRJmZhbHNlNiIvJSxzdXBlcnNjcmlwdEdRJmZhbHNlNiIvJStmb3JlZ3JvdW5kR1EoWzAsMCwwXTYiLyUrYmFja2dyb3VuZEdRLlsyNTUsMjU1LDI1NV02Ii8lJ29wYXF1ZUdRJmZhbHNlNiIvJStleGVjdXRhYmxlR1EmZmFsc2U2Ii8lKXJlYWRvbmx5R1EmZmFsc2U2Ii8lKWNvbXBvc2VkR1EmZmFsc2U2Ii8lKmNvbnZlcnRlZEdRJmZhbHNlNiIvJStpbXNlbGVjdGVkR1EmZmFsc2U2Ii8lLHBsYWNlaG9sZGVyR1EmZmFsc2U2Ii8lNnNlbGVjdGlvbi1wbGFjZWhvbGRlckdRJmZhbHNlNiIvJSxtYXRodmFyaWFudEdRJ2l0YWxpYzYiLSUmVElUTEVHNiQtJSlfVFlQRVNFVEc2Iy1JJW1yb3dHNiMvSSttb2R1bGVuYW1lRzYiSSxUeXBlc2V0dGluZ0dJKF9zeXNsaWJHNiI2Ni1JI21zRzYjL0krbW9kdWxlbmFtZUc2IkksVHlwZXNldHRpbmdHSShfc3lzbGliRzYiNiNRKU15fmdyYXBoNiIvJSdmYW1pbHlHUTBUaW1lc35OZXd+Um9tYW42Ii8lJXNpemVHUSMxMDYiLyUlYm9sZEdRJmZhbHNlNiIvJSdpdGFsaWNHUSZmYWxzZTYiLyUqdW5kZXJsaW5lR1EmZmFsc2U2Ii8lKnN1YnNjcmlwdEdRJmZhbHNlNiIvJSxzdXBlcnNjcmlwdEdRJmZhbHNlNiIvJStmb3JlZ3JvdW5kR1EoWzAsMCwwXTYiLyUrYmFja2dyb3VuZEdRLlsyNTUsMjU1LDI1NV02Ii8lJ29wYXF1ZUdRJmZhbHNlNiIvJStleGVjdXRhYmxlR1EmZmFsc2U2Ii8lKXJlYWRvbmx5R1EmZmFsc2U2Ii8lKWNvbXBvc2VkR1EmZmFsc2U2Ii8lKmNvbnZlcnRlZEdRJmZhbHNlNiIvJStpbXNlbGVjdGVkR1EmZmFsc2U2Ii8lLHBsYWNlaG9sZGVyR1EmZmFsc2U2Ii8lNnNlbGVjdGlvbi1wbGFjZWhvbGRlckdRJmZhbHNlNiIvJTBmb250X3N0eWxlX25hbWVHUSVUZXh0NiIvJSxtYXRodmFyaWFudEdRJ25vcm1hbDYiLSUtVFJBTlNQQVJFTkNZRzYjJCIiISEiIi0lJVJPT1RHNictJSlCT1VORFNfWEc2IyQiI10hIiItJSlCT1VORFNfWUc2IyQiJHEjISIiLSUtQk9VTkRTX1dJRFRIRzYjJCIlK1IhIiItJS5CT1VORFNfSEVJR0hURzYjJCIlK08hIiItJSlDSElMRFJFTkc2Ig==
evalf(Pi);
JCIrYUVmVEohIio=
evalf(Pi, 100);
JCJfcW9xNlVgI1suRycpKiozaUcxayJ5SSNmV1woNCNlNXYkKlJwcj4lKUddektRVkVZUUt6KmVgRWZUSiEjKio=
the evalf tells maple to solve the problem with decimals, the second part gives how many decimal places or digits you want
plot3d(exp(-x**2)*cos(y), x=-2..2, y=-2..2);
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This is a 3d plot. It has 2 free variables. It is actually a 2d plot embedded into a 3d graph)