Page:Linear Algebra (1882) Tevfik.djvu/25

—8—

same values of ${\displaystyle a,b,c}$ which render ${\displaystyle a\alpha +b\beta +c\gamma =0}$ will also render ${\displaystyle a+b+c=0}$.

Let

${\displaystyle OA=\alpha ,OB=\beta ,OC=\gamma }$;

then

${\displaystyle AB=\beta -\alpha }$,

${\displaystyle AC=\gamma -\alpha }$.

But ${\displaystyle AC}$ is a multiple of ${\displaystyle AB}$, or

${\displaystyle \gamma -\alpha =x(\beta -\alpha )=x\beta -x\alpha }$;

${\displaystyle \therefore }$

${\displaystyle x\alpha -\alpha -x\beta +\gamma =0}$,

or

${\displaystyle (x-1)\alpha -x\beta +\gamma =0}$;

and as in this equation the coefficients of a, p, y are x — 1, — a:, +1 which correspond to a, 6, c in the first equation, and as (x — 1) — aj+1=:0, then a-h6 + c=:0. 22. Conversely, if «, P, y are coinitial, coplanar lines, and if both a«-H&p + cY=0, and a-H6H-c=0, then do «, P, y terminate in a straight line. For by supposition, a-f-fc-hc = 0, therefore aY-*-6Y-»-CY=0, and by subtraction a(Y-«)-H6(Y — P) = or (^_a) + ^(Y_p) = 0. This shows that y — « is a multiple of y — P and therefore it is in the same straight line with it; «, p, y terminate in that straight line. 23. Examples. Ex. 1. In a plane triangle are given one angle, an adjacent side, and the sum of the lengths of the other sides, to determine the triangle. Let ABD be the given angle, AB = b ,, ,, ,, side, S MM sum of the lengths of the other two sides. 8 If in designating by a and p two unit lines, we represent by a; « the unknown side adjacent to the angle B, and by t/p the opposite side to this angle, we shall have j/P=6-hx<x and S = a? + 2/,