Simply
`(x^(2)y^(2))^(-1/6)div(y^(3))^(1/9)xx(x^(2))^(1/3)`

Simply (27)^(5/3)div(125)^(-4/3)xx9^(-3/2)

Multiply (x^(2/3)+3x^(1/3).y^(1/3)+9y^(2/3)) by (x^(1/3)-3y^(1/3))

4^(1/3)xx[2^(1/3)xx3^(1/2)]div 9^(1/4)=

4^(1/3)xx[2^(1/3)xx3^(1/2)]^(7)div9^(1/4)

Simply 8x^(-3/4)xx1/4xydiv3y^(2/3)

x^(3)-y^(3)+3y^(2)-3y+1

If A(x_1,y_1),B(x_2,y_2) and C(x_3,y_3) are the vertices of traingle ABC and x_(1)^(2)+y_(1)^(2)=x_(2)^(2)+y_(2)^(2)=x_3^(2)+y_(3)^(2) , then show that x_1 sin2A+x_2sin2B+x_3sin2C=y_1sin2A+y_2sin2B+y_3sin 2C=0 .

If x^2=y^3 , then prove that (x/y)^(3/2)+(y/x)^-(2/3)=x^(1/2)+y^(1/3) .

Normals at (x_(1),y_(1)),(x_(2),y_(2))and(x_(3),y_(3)) to the parabola y^(2)=4x are concurrent at point P. If y_(1)y_(2)+y_(2)y_(3)+y_(3)y_(1)=x_(1)x_(2)x_(3) , then locus of point P is part of parabola, length of whose latus rectum is __________.

IF sin ^(-1)x + sin ^(-1) y+ sin ^(-1)""z=(3pi)/(2), then the value of x^(9) +y^(9) +z^(9)-""(1)/(x^(9)y^(-9)z^(9)) is equal to -