Statement I The points (3,2) and (1,4) lie on opposite side of the line `3x-2y-1 =0`
Statement II The algebraic perpendicular distance from the given the point to the line have opposite sign

Are the points (3,4) and (2,-6) on the same or opposite sides of the line 3x-4y=8?

Are the points (2,1) and (-3,5) on the same or opposite side of the line 3x - 2y + 1 = 0 ?

If the point (1,2) and (34) were to be on the same side of the line 3x-5y+a=0 then

The co-ordinates of a point on the line y = x where perpendicular distance from the line 3x + 4y = 12 is 4 units, are :

Find the coordinates of the foot of the perpendicular drawn from the point (2,3) to the line y=3x+4

Statement 1 :If the point (2a-5,a^2) is on the same side of the line x+y-3=0 as that of the origin, then a in (2,4) Statement 2 : The points (x_1, y_1)a n d(x_2, y_2) lie on the same or opposite sides of the line a x+b y+c=0, as a x_1+b y_1+c and a x_2+b y_2+c have the same or opposite signs.

The length of the perpendicular drawn from the point (3, -1, 11) to the line (x)/(2)=(y-2)/(3)=(z-3)/(4) is

Find the length of perpendicular from the point (5,4,-1) on the line (x-1)/(2)=y/9=z/5

The line segment joining the points (1,2) and (-2,1) is divided by the line 3x+4y=7 in the ratio:

Statement I two perpendicular normals can be drawn from the point (5/2,-2) to the parabola (y+1)^2=2(x-1) . Statement II two perpendicular normals can be drawn from the point (3a,0) to the parabola y^2=4ax .