Answer:
[tex]DC=\frac{57}{5}[/tex]
Explanation:
We have triagle ABC bisected by angle AD, like is shown in the image.
A bisector angle is a line which cuts an angle into two equal halves.
So:
BC = BD + DC ∴ 19 =BD + DC ⇒ BD = 19 - DC (1) because D cuts BC in 2 parts.
By angle bisector theorem: the ratio of any 2 sides of a triagle is equal to the ratio of the lenths formed on its third side by the anfle bisectorof the anfle formed by those 2 sides:
[tex]\frac{AB}{BD} = \frac{AC}{DC}[/tex] (2) read: side AB is BD as AC is to DC
Clear DC:
[tex]DC = \frac{AC*BD}{AB}[/tex] (3)
we know: AC = 24, BD = 19 - DC (from (1)) and AB = 16
replacing all the values:
[tex]DC = \frac{24 ( 19 - DC)}{16}[/tex]
[tex]DC=\frac{57}{5}[/tex] (4)
for (4) in (1)
BD = 19 - [tex]\frac{57}{5}[/tex]=[tex]\frac{38}{5}[/tex] (5)
Answer:
Explanation:
The ratio of the area of triangle ABD to the area of triangle ACD is BD/CD. By the angle bisector theorem, BD/CD = AB/AC = 16/24 = The Answer Do it urself bruh.
Its not that hard just simplify 16/24
2/3
