If for some α and β in R, the intersection of the following three planes x + 4 y - 2 z = l x + 7 y -5 z = β x + 5y + α z = 5 is a line in R3, then α + β is equal to :

Question

If for some α and β in R, the intersection of the following three planes x + 4 y - 2 z = l x + 7 y -5 z = β x + 5y + α z = 5 is a line in R3, then α + β is equal to : (A) 0 (B) 10 (C) -10 (D) 2

Tardigrade Admin · Accepted Answer

For planes to intersect on a line ⇒ there should be infinite solution of the given system of equations for infinite solutions Δ=|1&4&-2 1&7&-5 1&5&α|=0 ⇒ 3α+9=0 ⇒ α=-3 Δz=|1&4&1 1&7&β 1&5&5|=0 ⇒ 13-β=0 ⇒ β=13 Also for α=-3 and b=13 Δx=Δy=0 ∴ α+β=-3+13=10

Q. If for some α and β in R, the intersection of the following three planes x+4y−2z=l x+7y−5z=β x+5y+αz=5 is a line in R3, then α + β is equal to :

0

10

-10

2

Q. If for some $α$ and $β$ in R, the intersection of the following three planes
$x + 4 y - 2 z = l$
$x + 7 y - 5 z = β$
$x + 5 y + α z = 5$
is a line in $R^{3}$ , then $α$ + $β$ is equal to :