The equation of the straight line through the origin and parallel to the line `(b+c)x+(c+a)y+(a+b)z=k=(b-c)x+(c-a)y+(a-b)z` are

Equation of the line passing through (1,1,1) and parallel to the plane 2x+3y+z+5=0

The equation of the circle touching the y -axis at the origin and passing through (b, c) is

The plane passing through the point (a, b, c) and parallel to the plane x + y + z = 0 is:

Let a and b non zero reals such that a ne b then the equation of the line passing through the origin and the point of intersection of (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 is

Prove that the line through the point (x_(1) , y_(1)) and parallel to the line Ax + By + C =0 " is " A (x - x_(1)) + B (y - y_(1)) = 0 .

Equation of line passing through the point (2,3,1) and parallel to the line of intersection of the plane x-2y - z +5 =0 and x+y+3z = 6 is

Equation of the plane passing through the line of intersection of the planes P= ax + by + cz + d = 0, P^(') = a^(')x + b^(')y + c^(')z + d^(') = 0 and parallel to x-axis it

If the straight line ax +by+c=0 always passes through (1,-2) then a,b,c are in

If the straight line ax+by+c=0 always passes through (1, -2), then a, b, c are in: