Let `P_(1)` and `P_(2)` be two places given by
`P_(1) : 10 x + 15y + 12 z - 60 = 0,`
`P_(2) : -2x + 5y + 4z - 20`
Which of the following straight lines can be an edge of some tetrahedron whose two faces lie on `P_(1)` and `P_(2)`

Consider the three planes P_1 :3x +15 y +21 z=9 , P_2 :x - 3y -z=5 , and P_3 : 2x +10y +14 z =5 then , which one of the following is true ?

Let the acute angle bisector of the two planes x - 2y - 2z + 1 = 0 and 2x - 3y - 6 + 1= 0 be the plane P. Then which of the following points lies on P ?

Let the acute angle bisector of the two planes x - 2y - 2z + 1 = 0 and 2x - 3y - 6 z+ 1= 0 be the plane P. Then which of the following points lies on P ?

Let two planes p _(1): 2x -y + z =2 and p _(2) : x + 2y - z=3 are given : equation of the plane through the intersection of p _(1) and p_(2) and the point (3,2,1) is :

Let P_(1):2x+y-z=3" and "P_(2):x+2y+z=2 be two planes. Then, which of the following statement(s) is (are) TRUE?

Let P_(1) : 2x + y + z + 1 = 0 P_(2) : 2x - y + z + 3 = 0 and P_(3) : 2x + 3y + z + 5 = 0 be three planes, then the distance of the line of intersection of planes P_(1) = 0 and P_(2) = 0 from the plane P_(3) = 0 is

Consider the lines L_(1): (x-1)/(2)=(y)/(-1)= (z+3)/(1) , L_(2): (x-4)/(1)= (y+3)/(1)= (z+3)/(2) and the planes P_(1)= 7x+y+2z=3, P_(2): 3x+5y-6z=4 . Let ax+by+cz=d be the equation of the plane passing through the point of intersection of lines L_(1) and L_(2) , and perpendicular to planes P_(1) and P_(2) . Match Column I with Column II.

P_(1) : x + 3y - z = 0 and P_(2) , y + 2z = 0 are two intersecting planes P_(3) is a plane passing through the point (2,1,-1) and through the line of intersection of P_(1) and P_(2) Equation of P_(3) is

Let P_(1) : y^(2) = 4ax and P_(2) : y^(2) =-4ax be two parabolas and L : y = x be a straight line. if a = 4, then the equation of the ellipse having the line segment joining the foci of the parabolas P_(1) and P_(2) as the major axis and eccentricity equal to (1)/(2) is