1 / | | ________ | 2 / 2 | x *\/ 1 - x dx | / 0
Integral(x^2*sqrt(1 - x^2), (x, 0, 1))
TrigSubstitutionRule(theta=_theta, func=sin(_theta), rewritten=1/8 - cos(4*_theta)/8, substep=AddRule(substeps=[ConstantRule(constant=1/8, context=1/8, symbol=_theta), ConstantTimesRule(constant=-1/8, other=cos(4*_theta), substep=URule(u_var=_u, u_func=4*_theta, constant=1/4, substep=ConstantTimesRule(constant=1/4, other=cos(_u), substep=TrigRule(func='cos', arg=_u, context=cos(_u), symbol=_u), context=cos(_u), symbol=_u), context=cos(4*_theta), symbol=_theta), context=-cos(4*_theta)/8, symbol=_theta)], context=1/8 - cos(4*_theta)/8, symbol=_theta), restriction=(x > -1) & (x < 1), context=x**2*sqrt(1 - x**2), symbol=x)
Ahora simplificar:
Añadimos la constante de integración:
Respuesta:
/ | | ________ // ________ \ | 2 / 2 || / 2 / 2\ | | x *\/ 1 - x dx = C + |-1, x < 1)| / \\ 8 8 /
1 / | | / 2 6 2 4 4 | | 9*I*x I*x I*x 3*I*x 5*I*x 2 | |- -------------- - -------------- - -------------- + -------------- + -------------- for x > 1 | | _________ 3/2 3/2 3/2 _________ | | / 2 / 2\ / 2\ / 2\ / 2 | | 8*\/ -1 + x 4*\-1 + x / 8*\-1 + x / 8*\-1 + x / 4*\/ -1 + x | < dx | | 4 6 2 4 2 | | 5*x x x 3*x 9*x | | - ------------- - ------------- - ------------- + ------------- + ------------- otherwise | | ________ 3/2 3/2 3/2 ________ | | / 2 / 2\ / 2\ / 2\ / 2 | \ 4*\/ 1 - x 4*\1 - x / 8*\1 - x / 8*\1 - x / 8*\/ 1 - x | / 0
=
1 / | | / 2 6 2 4 4 | | 9*I*x I*x I*x 3*I*x 5*I*x 2 | |- -------------- - -------------- - -------------- + -------------- + -------------- for x > 1 | | _________ 3/2 3/2 3/2 _________ | | / 2 / 2\ / 2\ / 2\ / 2 | | 8*\/ -1 + x 4*\-1 + x / 8*\-1 + x / 8*\-1 + x / 4*\/ -1 + x | < dx | | 4 6 2 4 2 | | 5*x x x 3*x 9*x | | - ------------- - ------------- - ------------- + ------------- + ------------- otherwise | | ________ 3/2 3/2 3/2 ________ | | / 2 / 2\ / 2\ / 2\ / 2 | \ 4*\/ 1 - x 4*\1 - x / 8*\1 - x / 8*\1 - x / 8*\/ 1 - x | / 0
Integral(Piecewise((-9*i*x^2/(8*sqrt(-1 + x^2)) - i*x^6/(4*(-1 + x^2)^(3/2)) - i*x^2/(8*(-1 + x^2)^(3/2)) + 3*i*x^4/(8*(-1 + x^2)^(3/2)) + 5*i*x^4/(4*sqrt(-1 + x^2)), x^2 > 1), (-5*x^4/(4*sqrt(1 - x^2)) - x^6/(4*(1 - x^2)^(3/2)) - x^2/(8*(1 - x^2)^(3/2)) + 3*x^4/(8*(1 - x^2)^(3/2)) + 9*x^2/(8*sqrt(1 - x^2)), True)), (x, 0, 1))
Estos ejemplos se pueden aplicar para introducción de los límites de integración inferior y superior.