Answer:
Width of the street = 128.67 m
Height of Tam’s building = 37.31 m
Step-by-step explanation:
25° is the angle of depression from the top of Chris's building to the bottom of Tam's building
If the height of Chris's building is 60 m and the width if the road is x m,
then we can write
[tex]\tan 25 = \frac{60}{x}[/tex]
⇒ [tex]x = \frac{60}{\tan 25} = 128.67[/tex] m. (Answer)
Now, if the height of Chris's building is y m more than Tam's building and the angle of depression of top of Tam's building from top of Chris's building is 10°, then we can write,
[tex]\tan 10 = \frac{y}{128.67}[/tex]
⇒ y = 22.69 m
Therefore, Tam's building height is (60 - 22.89) = 37.31 m (Answer)
