Let the line `(x-2)/(3)=(y-1)/(-5)=(z+2)/(2)` lies in the plane `x+3y-alphaz+beta=0`. Then, `(alpha, beta)` equals

Let the line (x-2)/3=(y-1)/(-5)=(z+2)/2 lie in the plane x""+""3y""-alphaz""+beta=""0 . Then (alpha,beta) equals (1) (6,""""-17) (2) (-6,""7) (3) (5,"" -15) (4) (-5,""5)

If the line (x-1)/(1)=(y-k)/(-2)=(z-3)/(lambda) lies in the plane 3x+4y-2z=6 , then 5|k|+3|lambda| is equal to

The line (x-3)/1=(y-4)/2=(z-5)/2 cuts the plane x+y+z=17 at

Find the image of the line (x-1)/3=(y-2)/4=(z-3)/5 on the plane x-2y+z+2=0 .

If the line (x-1)/2=(y+3)/1=(z-5)/(-1) is parallel to the plane px + 3y - z + 5 = 0 , then the value of p -

Let pi_(1)and pi_(2) be two planes and L be a line such that pi_(1): x + 2y + 3z = 14 pi_(2) : 2x - y +3z = 27 L : (x+1)/2=(y+1)/3=(z+1)/4 If the line L meets the plane pi_(1) in P(alpha, beta, gamma), Then alpha^(2)+beta^(2)+gamma^(2) is equal to:

A line L passing through (1, 2, 3) and perpendicular to the line L_(1):(x-1)/(-2)=(y+1)/(3)=(z-5)/(4) is also intersecting the line L_(1) . If the line L intersects the plane 2x+y+z+6=0 at point (alpha, beta, gamma) , then the value of 2020alpha+beta+2gamma is equal to

x+y-ln(x+y)=2x+5 has a vertical tangent at the point (alpha,beta) then alpha+beta is equal to

If the lines (x-3)/(2)=(y-5)/(2)=(z-4)/(lambda) and (x-2)/(lambda)=(y-6)/(4)=(z-5)/(2) intersect at a point (alpha, beta, gamma) , then the greatest value of lambda is equal to

The image of the line (x-1)/3=(y-3)/1=(z-4)/(-5) in the plane 2x-y+z+3=0 is the line (1) (x+3)/3=(y-5)/1=(z-2)/(-5) (2) (x+3)/(-3)=(y-5)/(-1)=(z+2)/5 (3) (x-3)/3=(y+5)/1=(z-2)/(-5) (3) (x-3)/(-3)=(y+5)/(-1)=(z-2)/5