The parametric equation of a line is given by `x=-2+(r)/(sqrt(10))` and `y=1+3(r)/(sqrt(10))` :

The parametric equation of a line is given by x=-2+(r)/(sqrt(10)),y=1+(3r)/(sqrt(10))* then the area of the triangle formed by the line with the axes is (in sq.units)

The parametric equation of a given by x=-2+(r)/(sqrt(10)) and y=1+3(r)/(sqrt(10)) then, for the line

The parametric equation of the circle x^(2)+y^(2)=r^(2) are

Find the parametric equation of the circle x^(2)+y^(2)+x+sqrt(3)y=0

The equation of tangent to the curve y=int_(x^(2))^(x^(3))(dt)/(sqrt(1+t^(2))) at x=1 is sqrt(3)x+1=y (b) sqrt(2)y+1=x sqrt(3)x+y=1(d)sqrt(2)y=x

The length of latusrectum of the parabola whose parametric equations are x=t^2+t+1,y=t^2-t+1, where t in R is equal to (1) sqrt(2) (2) sqrt(4) (3) sqrt(8) (4) sqrt(6)

P=(-1,0),Q=(0,0) and R=(3,3sqrt(3)) be three points.The equation of the bisector of the angle PQR (1)sqrt(3)x+y=0(2)x+(sqrt(3))/(2)y=0 (3) (sqrt(3))/(2)x+y=0(4)x+sqrt(3)y=0

The equation of the lines passing through the point (1,0) and at a distance (sqrt(3))/(2) from the origin is sqrt(3)+y-sqrt(3)=0x+sqrt(3)y-sqrt(3)=0sqrt(3)x-y-sqrt(3)=0x-sqrt(3)y-sqrt(3)=0

A beam of light is sent along the line x-y=1 , which after refracting from the x-axis enters the opposite side by turning through 30^0 towards the normal at the point of incidence on the x-axis. Then the equation of the refracted ray is (a) (2-sqrt(3))x-y=2+sqrt(3) (b) (2+sqrt(3))x-y=2+sqrt(3) (c) (2-sqrt(3))x+y=(2+sqrt(3)) (d) y=(2-sqrt(3))(x-1)