Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2)...
Transcript of Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2)...
![Page 1: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/1.jpg)
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![Page 3: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/3.jpg)
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![Page 4: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/4.jpg)
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![Page 18: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/18.jpg)
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![Page 19: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/19.jpg)
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![Page 23: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/23.jpg)
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![Page 24: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/24.jpg)
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![Page 25: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/25.jpg)
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![Page 26: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/26.jpg)
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data := [[1,2], [3,4], [5,6]]; ������
nops(data); ����������
op(data); ��������
op(1,data); ����� �����
op(2, op(1,data)); [1,2]�2���� �����data[2]; ����� �����
35
![Page 36: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/36.jpg)
• sort�"$�����%�����������
����
�� �
eq := 1 + x^2 + x + x^3;sort(eq);
�������
data2 := [Banana, Apple, Lemon];sort(data2);
�# �!��������
data3 := [1, 4, 3, 8, 5];sort(data3);
�� ������
36
![Page 37: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/37.jpg)
• ���sum�"$!���add�"$!����������
• #� �%������������
����&('
�"$! �
sum(��, ��=�1..�2)add(��, ��=�1..�2)
�1��2��������
#� � := [�1, �2, … ,�n];sum(#� �[��], ��=1..n);add(#� �[��], ��=1..n);
#� �����
37
![Page 38: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/38.jpg)
• ��product�#%"���mul�#%"�����������
• $�! &�������������
���')(
�#%" �
product(��, ��=�1..�2)mul(��, ��=�1..�2)
�1��2��������
$�!� := [�1, �2, … ,�n];product($�!�[��], ��=1..n);
mul($�!�[��], ��=1..n);
$�!������'n=����(
38
![Page 39: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/39.jpg)
'�(����
�� �
sum(x, x=1..10);add(x, x=1..10);
1��10����� ���
data := [2, 4, 6, 8, 10]; %!$#&"���
sum(data[i], i=1..5); %!$����� ���
sum(a*x^k, k=0..5); � ������ ����������
product(x, x=1..10); 1��10����product(data[i], i=1..5); %!$����
39
![Page 40: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/40.jpg)
• Matrix(3,3)�3*3�� ��� ��• �����10������...�������&)-#,'#��� ����!������
�
�!&)-#,'#�*(,'#%)+"$
���
40
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• ������#�����!������"�
• ��������� .,)'(- � �$&%*+��"�� * $���• � �� �^(-1)� "�����"�
������,.-
41
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������%'&
�!# �
Matrix([[a,b], [c,d]]); �������
��A + ��B ������
��A –��B ������
��A . ��B .% ��&�������
��"$ * ��A �����"$���
��A^(-1) ������
42
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��� �����
�� ��
A := Matrix([[1, 2], [3, 4]]);B := Matrix([[a, b], [c, d]]);
A + B; ������
A - B; ������
A . B; ������
4*A; ��������
B^(-1); � ����
43
![Page 44: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/44.jpg)
• ������expand����• ���� ��������factor����������
�� := expand(�);factor(��);
���������
44
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•������ ������
������������
�� ��
a1 := expand((x+2*y)^8); (x+2*y)^8���
factor(a1); a1����
a2 := (x+1)/(x+2);
expand(a2); �����
45
![Page 46: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/46.jpg)
%)�)���576
1342 �� ���
simplify(�) ��'��0�,$"�$.
eq1 := 1/(1+1/(1+1/(1+x)));simplify(eq1);
csgn(�) ��0�+. a := -5; b := 3;csgn(a); csgn(b);
coeff5� �,���,��)
��#&��)��0�-�$
eq2 := 6*z^3 - 5*z^2 + 2*z -3*z + 4;
coeff(eq2, z, 2);lcoeff(�) � �( */.�
!�)��0�+.lcoeff(eq2);
tcoeff(�) � �( */.���)��0�+.
tcoeff(eq2);
46
![Page 47: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/47.jpg)
���������
���� �� ���
degree(�) ������ ����
degree(eq2);
ldegree(�) ������ ����
ldegree(eq2);
47
![Page 48: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/48.jpg)
• ����� ���solve���������fsolve����������
solve(��, ���)� �� ����
fsolve(��, ���)� �� ����
����� �
48
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• �#���!��'!&)��
1�2� ���,��132
�� ��
eq1 := 3*x^2 + 8*x + 4;
solve(eq1, x); eq1$��,�'*
fsolve(eq1, x); eq1$���,�'*
�#� ���%+*��solve-/0."(���,� eq2 := 3*x^2 + 8*x + 4.0;
solve(eq2, x); eq2$���,�'*49
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4�5�����3�#465
�� ��
eq3 := 4*x + 2*y = 4;eq4 := 2*x + 3*y = 3;
$-0 +�����/�#$*!)"1�
solve({eq3, eq4}, {x, y}); ��4� -��53��{}3��%(��&1�
fsolve({eq3, eq4}, {x, y});
�,���!�.21��3'�-��,complex*�&1�eq5 := 2*x^2 + 1;
fsolve(eq5, x, complex);50
![Page 51: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/51.jpg)
• �� %��� rsolve&()'%���#� rsolve(�� , ����)
�� %��*,+
�� ��
eqs1 := {a(n+1)=a(n)+4, a(0)=1}; ������� %���
rsolve(eqs1, a(n));
eqs2 := {a(n+1)=p*a(n)+q}; �� ����!$��#�"��#�
rsolve(eqs2, a(n));
51
![Page 52: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/52.jpg)
• ���������� ������http://ja.wikipedia.org/wiki/��������
���������
F0 =1F1 =1Fn+2 = Fn +Fn+1 n ≥ 0( )
"
#$
%$
52
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�������
��
fibo := {f(n)=f(n-1)+f(n-2), f(0)=1, f(1)=1};
rsolve(fibo, f(n));
53
![Page 54: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/54.jpg)
• Maple���������������� ����
plot � ������������plot3d � ������������
������
54
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• ���&+2/) �plot(��, ��=��..��)
• ��&��)�%��!(plot([��1, ��2], ��=��..��)
���#'���#&03-.)��!(�
���$ "��!(�'*0,14)��!(�plot(��, �=��..��, scaling=constrained);
8��03-.576
55
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• �������������plot([ ����, �����, ���=
��..��)• ����������������� := [[x1,y1], [x2,y2],[x3,y3]];
plot(������);
������� �
56
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• ����������
!�"#��� ��
�� �
plot(sin(x), x=0..10); y = sin(x) (0≦x≦10) �������
plot([sin(x), sin(x)^2], x=0..10); y = sin(x)�y = sin(x)^2����������
plot([t, sin(t), t=0..10]); x = t (0≦t≦10), y = sin(t)�������
points := [[1,3], [2,4], [3,7], [4,5]];plot(points);
�� ��������� �������
57
![Page 58: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/58.jpg)
• ����������plot3d(��, ����, ���)• ������ �����plot([��1, ��2],����, ��
�)
���������
58
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• ������ ��������plot([��1, ��2],��� �, ���
�, color=[�1, �2])• ������ �������plot3d([�����, �����, �����], ��1� �, ��2� �)
$��� ��!#"
59
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• ����������
��� ������
�� �
plot3d(sin(x)*cos(y), x=0..10, y=0..10);
sin(x)*cos(y)�������
plot3d([sin(x)*y, x+cos(y)], x=0..3, y=0..3);
sin(x)*y � x*cos(y)�����������
plot3d([sin(x)*y, x+cos(y)], x=0..3, y=0..3, color=[red, blue]);
sin(x)*y� x*cos(y)�����
plot3d([t, s, sin(t)*cos(s)], t=0..8, s=0..2);
x = t, y = s, z = sin(t)*cos(s)�������
60
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• �!���"������!���� #��������$�$�����plot
3dplot
������ ����
�!����� #
61
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• ���$�!�diff&()'%���$�
diff(��, ��)- ���������$�
Diff(��, ��)- ��%������� �� ""��� ���value*��+��% #$�����$�
��*,+
62
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• � ��������� �� ���������� ��! ����������
diff( , � 1, � 1)% ���� �$������diff( , � 1, � 2)% � 1�� 2������
��"$#
63
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• ����"��(�%� ���%�
��A = piecewise(��1, �1or��1, ��2, �2or��2), ����(��%�)���"�$�#��"��(��!������otherwise)�"���* �� '&%*
diff(��A, ��x), ����"��A(��x����%
��)+*
64
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�!��� ��
diff(x^2, x); x^2�x����
diff(sin(x)*x, x); sin(x)*x�x����
diff(ln(x), x, x); log(x)�x�2����
diff(sin(x*y), x, y); sin(x*y)�x�y����
peq := piecewise(x<0, sin(x), cos(x));diff(peq, x);
���peq������peq�x����
deq := Diff(x^2+x, x);value(deq);
����������� deq������
65
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• ���$�!�������#�int')*(&���$�
• Maple ����!����!���"%���
int(��, �). �������&���int(��, � = ��..��). ���������&���
��+-,
66
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• �����'2��.int46753%1,��'2��# 2�9 �-diff*.�"-)��8:
int(int(��, �1), �1)< �&(�);���'2�
Int(��, �)< ��3��&+!��-��-//�"� ����value9�:)�3�02$*#��2�
��9;:
67
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• ������ �������������
��A = piecewise(��1, �1or �1, ��2, �2or �2)� �� �������
int(��A, ��x)� �� ����A���x����
����
68
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��� ����
�� ��
int(x^2, x); x^2� ����� ��
int(x^2, x=1..3); x^2�1≦x≦3���� ���� ��
int(x^2, x=a..b); ���������������
peq := piecewise(x<0, sin(x), cos(x));int(peq, x);
����peq������peq� ���
69
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������ �
�� �
deq := Int(x^2+x, x);value(deq);
���� ��������deq�����
int(ln(x), x); log(x)�����
int(int(ln(x), x), x); log(x)��������
70
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• ��(��"$�limit*.0,(���'�
limit(�, �=�, )-+/0)3 (�)�(�)"���!�#(�)#���(���'�1� ��$infinity!���'2)-+/0"right%�$left(��'�! �������(�&'�!� �'�
��
71
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• ����������
����
�� �
limit(sin(x)/x, x=0);
eq := (2*x^2+x-3)/(x^2-2*x+1);limit(eq, x=infinity);limit(1/x, x=0, right); �� ���
limit(1/x, x=0, left); �� ���
x→0lim sin(x)
x
x→∞lim 2x2 + x −3
x2 − 2x +1
72
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• ��� ����series����������
series(��, ��=� )! 6���������� ���
series(��, ��=� , �)! �������� ��
��� � �
73
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)�*���
�� ��
eq1 := series(sin(x), x=0); sin(x)%���
eq2 := series(sin(x), x=0, 8); 8�"�!�� ���
↓�������!&('%� �$↓
peq1 := convert(eq1, polynom); plot!� convert����%�#������$
plot(peq1, x=-4..4); plot�$
74
![Page 75: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/75.jpg)
• ����#)))��%'��"���"�(��!�$&�
evalf(Int(�, ��))* ���(��
�"���� ���"� (��&�����&�
���
75
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!�"�� �
�� �
evalf(Int(sin(x), x=0..1)); sin(x)�0≦x≦1���� ��������
evalf(Int(eq1, x=0..1, digits=20, method=_Dexp));
�����
evalf(Int(eq1, x=0..1, digits=20, method=_Gquad));
��� �
evalf(Int(eq1, x=0..1, digits=20, method=_NCrule));
�� ���� ��
76
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• ��� �������� diff ����������
dsolve(�� �, �����)� �� ����
��� �
�� �
deq := diff(f(x), x); �����
dsolve(deq, f(x)); f(x)����
ddx
f (x)
77
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• �����(�����(��-�"'�������-�*���-�+,�
• �'��-�#,!&%���-�)'����-�+,!&�% ,�
dsolve({�����, ����}, �+,��).����-�"$���-�)'����-�+,�
�����(���
78
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3�4������)���
� ��
deq := diff(f(x), x) = x*f(x); �����-�$,
ini := f(0) = 1; ����ini-�$,
sol1 := dsolve({deq, ini}, f(x)); ����-��#%�����-�!
sol2 := dsolve({deq, ini}, numeric); numeric.0/12-�$,'���-�+,"'�& ,
sol2(1.5); � (�-�#%�-��#%*,
79
![Page 80: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/80.jpg)
• ������������������� diff �� �������
pdsolve(����, ����)! ��������
�����
�� ��
pdeq := diff(f(x,y), x); ���
pdsolve(pdeq, f(x,y)); f(x,y)����
∂∂x
f (x, y)
80
![Page 81: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/81.jpg)
• ��� �� pdsolve &,.)��!#�����#�
• ����*.($��#������$�!#��"��#�
• build%+'-.��$� �������!#
pdsolve(�� �, �!#�, *.(, build)/ ��� �$��
��� �����
81
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�� ��� �����
�� ��
pdeq1 := diff(f(x,y), x) = 4*diff(f(x,y), y); ��� �����
pdsolve(pdeq1, f(x,y)); ��� ����
pdsolve(pdeq1, f(x,y), HINT=g(x)+h(y), build); ��������������
∂∂x
f (x, y) = 4 ∂∂y
f (x, y)
82
![Page 83: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/83.jpg)
7�8�����'���
�� ��
pdeq2 := diff(f(x,t), x) = -0.3*diff(f(x,t), t); �����)��
ini2 := {f(x,0)=sin(x), f(0,t)=-sin(t)}; x,t'���)��
pds1 := pdsolve(pdeq2, ini2, numeric, time=t, range=0..1);
numeric*/+25)��"$��70,163��%��8
p1:=pds1:-plot(t=0, color=red):p2:=pds1:-plot(t=1,color=blue):p3:=pds1:-plot(t=2,color=green):plots[display](p1, p2, p3);
t �#(&!'9��/4-.)��
pds1:-plot3d(t=0..1, axes=boxed); :��/4-.)��
83
![Page 84: Maplefactorial( 1) 1 factorial(5); iquo( 1, 2) iquo(10,4); irem( 1, 2) irem(10,4); iroot( 1, 2) ( 2) n ( 1) ! n iroot(65,3); isqrt%) ) 576 1342 simplify( ) ' 0 ,$ eq1 := 1 ...File](https://reader030.fdocuments.net/reader030/viewer/2022041102/5edbee57ad6a402d6666608c/html5/thumbnails/84.jpg)
• ���LaTeX����� ���latex������ ��
LaTeX������
�� �
eq := sin(x) / cos(x);
latex(eq); LaTeX�����
deq := Diff(sin(x),x) = diff(sin(x),x);
latex(deq);
84