Integral de sqrt(1-4y^2) dx

TrigSubstitutionRule(theta=_theta, func=sin(_theta)/2, rewritten=cos(_theta)**2/2, substep=ConstantTimesRule(constant=1/2, other=cos(_theta)**2, substep=RewriteRule(rewritten=cos(2*_theta)/2 + 1/2, substep=AddRule(substeps=[ConstantTimesRule(constant=1/2, other=cos(2*_theta), substep=URule(u_var=_u, u_func=2*_theta, constant=1/2, substep=ConstantTimesRule(constant=1/2, other=cos(_u), substep=TrigRule(func='cos', arg=_u, context=cos(_u), symbol=_u), context=cos(_u), symbol=_u), context=cos(2*_theta), symbol=_theta), context=cos(2*_theta)/2, symbol=_theta), ConstantRule(constant=1/2, context=1/2, symbol=_theta)], context=cos(2*_theta)/2 + 1/2, symbol=_theta), context=cos(_theta)**2, symbol=_theta), context=cos(_theta)**2/2, symbol=_theta), restriction=(y > -1/2) & (y < 1/2), context=sqrt(1 - 4*y**2), symbol=y)

1. Añadimos la constante de integración:

   $\begin{cases} \frac{y \sqrt{1 - 4 y^{2}}}{2} + \frac{\operatorname{asin}{\left(2 y \right)}}{4} & \text{for}\: y > - \frac{1}{2} \wedge y < \frac{1}{2} \end{cases}+ \mathrm{constant}$

Respuesta:

$\begin{cases} \frac{y \sqrt{1 - 4 y^{2}}}{2} + \frac{\operatorname{asin}{\left(2 y \right)}}{4} & \text{for}\: y > - \frac{1}{2} \wedge y < \frac{1}{2} \end{cases}+ \mathrm{constant}$