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,""` where `a x_1+b y_1+c z_1=0` b. `a l+b m+c n=0` c. `a/l=b/m=c/n` d. `l x_1+m y_1+n z_1=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

Equation of any plane containing the line (x-x_1)/(a)=(y-y_1)/(b)=(z-z_1)/(c) is A(x-x_1)+B(y-y_1)+C(z-z_1)=0 then pick correct alternatives

The condition that the line (x-x_(1))/(l)=(y-y_(1))/(m)=(z-z_(1))/(n) lies in the plane ax+by+cz+d=0 is

Find the equation of the plane through the line (x-x_1)/l_1=(y-y_1)/m_1=(z-z_1)/n_1 and parallel to the line (x-alpha)/l_2=(y-beta)/m_2=(z-gamma)/n_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

Distance of the point P(x_(2),y_(2),z_(2)) from the line (x-x_(1))/(l)=(y-y_(1))/(m)=(z-z_(1))/(n), where l,m,n are the direction cosines of the line,is