Mathcad dasturida differensiallash reja: Mathcad dasturi duffernsiyasi Mathcad dasturida differensiallash dasturi
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MATHCAD DASTURIDA DIFFERENSIALLASH
- Bu sahifa navigatsiya:
- g1(y), g2(y)
- Int(cos(x)*cos(2*x)*cos(3*x),x)=int(cos(x)*cos(2*x)*cos(3*x), x); b) > Int((3*x^4+4)/(x^2*(x^2+1)^3),x)= int((3*x^4+4)/(x^2*(x^2+1)^3),x);
- J=changevar(tan(x/2)=t,Int(1/(1+cos(x)), x=-Pi/2..Pi/2), t); > value(%);
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Karrali integrallarni hisoblash
Maple muhitida ikki va uch karali integrallarni hisoblash uchun maxsus buyruqlar mavjud. Ikki karrali integralni hisoblash uchun Doubleint(f(x, y), D) buyrug’i ishlatiladi, bu yerda D – integrallash sohasi bo’lib, quyidagi ko’rinishlardan birida yoziladi: x=x1..x2, y=y1..y2, bu yerda x1, x2, y1, y2 sonlar integrallashning to’rt burchakli sohasini aniqlaydi; x=f1(y)..f2(y), y=y1..y2, bu yerda f1(y), f2(y) –chiziqlar bo’lib y1 dan y2 gacha intervalda integrallash sohasini chap va o’ngdan chegaralaydi; x=x1..x2, y=g1(x)..g2(x) , bu yerda g1(y), g2(y) - chiziqlar bo’lib x1 dan x2 gacha intervalda integrallash sohasini quyi va yuqorian chegaralaydi. Uch karali integrallar ni hisoblash uchun Tripleint(f(x, y, z),x, y, z, V) buyrug’i ishlatiladi, bu yerda V – integrallash sohasi. Ikkala buyruq ham bekor qilingan amal buyrug’i hisoblanadi. Integralni sonli qiymatini olish uchun value(%) buyrug’i ishlatiladi. Takroriy integrallarni int buyruqlarini takroran yozish orqali bajarish mumkin, masalan, takroriy integral quyidagicha hisoblanadi: > int(int(x^2*y^3, x=0..1), y=0..2); Misollar 1. Aniqmas integrallarni toping: a) ; > Int(cos(x)*cos(2*x)*cos(3*x),x)=int(cos(x)*cos(2*x)*cos(3*x), x); b) > Int((3*x^4+4)/(x^2*(x^2+1)^3),x)= int((3*x^4+4)/(x^2*(x^2+1)^3),x); 2. Aniq integralni hisoblang: , bu yerda a > 0, b > 0. > assume (a>0); assume (b>0); >Int(sin(x)*cos(x)/(a^2*cos(x)^2+b^2*sin(x)^2),x=0..Pi/2)=int(sin(x)*cos(x)/(a^2*cos(x)^2+b^2*sin(x)^2),x=0..Pi/2); 3. Xosmas integralni toping: , bunda a>-1 > restart; assume(a>-1); > Int((1-exp(-a*x^2))/(x*exp(x^2)), x=0..+infinity)=int((1-exp(-a*x^2))/(x*exp(x^2)), x=0..+infinity); 4. Integralni sonli qiymatini toping: > Int(cos(x)/x, x=Pi/6..Pi/4)=evalf(int(cos(x)/x, x=Pi/6..Pi/4), 15); 5. Bo’laklab integrallashning barcha bosqichlarini bajaring: . > restart; with(student): J=Int(x^3*sin(x),x); > J=intparts(Int(x^3*sin(x),x),x^3); > intparts(%,x^2); > intparts(%,x); > value(%); 6. Universal o’rniga qo’yish tg(x/2)=t bilan integralni hisoblang: . > J=Int(1/(1+cos(x)), x=-Pi/2..Pi/2); > J=changevar(tan(x/2)=t,Int(1/(1+cos(x)), x=-Pi/2..Pi/2), t); > value(%); J=2 7. takroriy integralni hisoblang. > Int(Int(y^3/(x^2+y^2),x=0..y),y=2..4)= int(int(y^3/(x^2+y^2), x=0..y),y=2..4); 2. chiziqlar bilan chegaralangan ikki karrali integralni hisoblang. Izoh: avval integrallash sohasi D ni tengsizlik ko’rinishida yozamiz: > restart: with(student): > J:=Doubleint(sin(x+2*y), x=y..Pi/2-y, y=0..Pi/2); > J:=value(%); 3. uch karrali integralni hisoblang. > J:=Tripleint(4+z, y=x^2..1,x=-1..1, z=0..2); > J:=value(%); Download 151.54 Kb. Do'stlaringiz bilan baham: 
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