The angle between the plane ax+by+cz+d=0 and the line `(x-1)/(a)=(y-2)/(b)=(z-3 )/(c)` is

The angle between the planes 3x-4y+5z=0 and 2x-y-cz=5 is

If the plane ax-by+cz=d contains the line (x-a)/(a)=(y-2d)/(b)=(z-c)/(c ) , then the value of (b)/(4d) is equal to (b, d ne 0)

The equation of the plane containing the line (x-x_(1))/(l)=(y-y_(1))/(m)=(z-z_(1))/(n) is a(x-x_(1))+b(y-y_(1))+c(z-z_(1))=0,backslash where (A) ax_(1)+by_(1)+cz_(1)=0(B)al+bm+cn=0(C)(a)/(l)=(b)/(m)=(c)/(n)(D)lx_(1)+my_(1)+nz_(1)=0

The plane which passes through the point (3,2,0) and the line (x-3)/(1)=(y-6)/(5)=(z-4)/(4) is a.x-y+z=1 b.x+y+z=5cx+2y-z=1d.2x-y+z=5

Find the angle between the planes 3x+y+2z=1 and 2x-y+z+3 = 0 .

The angle between the line (x)/(3)=(y)/(4)=(z)/(5) "and the plane " 2x+y-2z=7 is

The angle between the line (x-3)/(2)=(y-1)/(1)=(z+4)/(-2) and the plane, x+y+z+5=0 is