In a triangle ABCLC = 90° (AC) - 5cm and I (BC) - 12 cm. What is the
length of segment AB
Answers
Answer:
The length of AD = 5√2 cm
Step-by-step explanation:
Triangle ABC with right angle from C is given in figure.
We know that angle bisector is a line that divides an angle into two half.
Here AC = 5 cm
BC = 12 cm (given)
\textbf{\Large Using Pythagorus Theorem :} a^2 + b^2 = c^2Using Pythagorus Theorem :a
2
+b
2
=c
2
So
\begin{gathered}5^2 + 12^2 = AB^2 \\\\25 + 144 = 169 = AB^2\\\end{gathered}
5
2
+12
2
=AB
2
25+144=169=AB
2
So AB = 13 cmNow It is given that a bisector from A meets at D on the libe BC,
which makes angle DAC = 45°
So
By trigonometry
Cos 45° = \frac{\textbf{\large AC}}{\textbf{\large AD}} = \frac{ 1}{\sqrt 2}
AD
AC
=
2
1
As We know that AC = 5cm
\textbf{\large So the length of side AD}= 5\sqrt 2So the length of side AD=5
2
cm (Answer)
