The angle between the lines `ay^2-(1+lambda^2))xy-ax^2=0` is same as the angle between the line:

If one of the lines of my^(2)+(1-m^(2))xy-mx^(2)=0 is a bisector of the angle between the lines xy=0 , then m is

The angle between the lines 2x=3y=-z and 6x=-y=-4z is

Statement 1: Let theta be the angle between the line (x-2)/2=(y-1)/(-3)=(z+2)/(-2) and the plane x+y-z=5. Then theta=sin^(-1)(1//sqrt(51))dot Statement 2: The angle between a straight line and a plane is the complement of the angle between the line and the normal to the plane.

If one of the lines of my^2+(1-m^2)xy-mx^2=0 is a bisector of the angle between lines xy=0 , then cos ^(-1) (m) is

Consider the equation of a pair of straight lines as x^2-3xy+lambday^2+3x-5y+2=0 The angle between the lines is theta then the value of cos 2 theta is

if one of the lines the pair ax^2+2hxy+by^2=0 bisects the angle between positive directions of the axes , then a, b, h, satisfy the relation

Find the angle between the lines barr=3bari-2barj+6bark+lambda(2bari+barj+2bark) and barr=(2barj-5bark)+mu(6bari+3barj+2bark). Hint for solution : Angle between line barr=a_1+lambda barb_1 and r=bara_2+mubarb_2 then angle between them is obtained from cos theta=(|b_1.b_2|)/(|b_1|.|b_2|) .

Angle between the lines x + y = 0 and y = 5 is ...........

The angle between the lines 2x = 3y = -z and 6x = -y = -4x is .........

If two of the lines represented by ax^4 +bx^3y +cx^2 y^2+dxy^3+ay^4=0 bisects the angle between the other two, then