The lines 2x+y=5 and x+2y=4 intersect at the point br> (A) (1,2) (B) (2,1) (C ) `(frac(5)(2),0)` (D) (0,2)

The point of intersection of the straighat line (x-2)/2=(y-1)/(-3)=(z+2)/1 with the plane x+3y-z+1=0 (A) (3,-1,1) (B) (-5,1,-1) (C) (2,0,3) (D) (4,-2,-1)

A line through A(-5,-4) meets the lines x+3y+2=0,2x+y+4=0 and x-y-5=0 at the points B,C and D rspectively,if ((15)/(AB))^(2)+((10)/(AC))^(2)=((6)/(AD))^(2) find the equation of the line.

The line tangent to the curves y^(3)-x^(2)y+5y-2x=0 and x^(2)-x^(3)y^(2)+5x+2y=0 at the origin intersect at an angle theta equal to (pi)/(6) (b) (pi)/(4) (c) (pi)/(3) (d) (pi)/(2)

The line 2x-y+4=0 cuts the parabola y^(2)=8x in P and Q. The mid-point of PQ is (a) (1,2)(b)(1,-2)(c)(-1,2)(d)(-1,-2)

The equation of the plane containing the line 2x+z-4=0 nd 2y+z=0 and passing through the point (2,1,-1) is (A) x+y-z=4 (B) x-y-z=2 (C) x+y+z+2=0 (D) x+y+z=2

The equation of the plane containing the line 2x+z-4=0 nd 2y+z=0 and passing through the point (2,1,-1) is (A) x+y-z=4 (B) x-y-z=2 (C) x+y+z+2=0 (D) x+y+z=2

The point of intersection of the line passing through (0,0,1) and intersecting the lines x+2y+z=1,-x+y-2z=2 and x+y=2,x+z=2 with xy plane is a.((5)/(3),-(1)/(3),0) b.(1,1,0) c.((2)/(3),(1)/(3),0) d.(-(5)/(3),(1)/(3),0)

The coordinates of the point of intersection of the lines (x-1)/1=(y+2)/3=(z-2)/(-2) with the plane 3x+4y+5z-25=0 is (A) (5,6,-10) (B) (5,10,-6) (C) (-6,5,10) (D) (-6,10,5)

Find the equation of the line passing through the points A(-1,1) and B(2,-4). (a) 3x+5y+2=0 (c) 2x+3y+5=0 (b) 5x+3y+2=0