Answer:
To the nearest foot, the streetlamp is about : 26 feet
Step-by-step explanation:
We will use the trignometric ratio in the right angled triangle ΔABD in order to find the height of the streetlamp above the ground i.e. we need to find the value of x in ΔABD.
Hence, In ΔABD we have:
[tex]\tan 50=\dfrac{x}{13+9}\\\\\\i.e.\\\\\\\tan 50=\dfrac{x}{22}\\\\i.e.\\\\x=22\times \tan 50\\\\\\i.e.\\\\\\x=26.21857\ feet[/tex]
i.e. on rounding it to the nearest foot we get:
x=26 feet
Hence, the height of street lamp is:
26 feet
