Answer: [tex]\sqrt{117}[/tex] feet or about 10.82 feet.
Step-by-step explanation:
For the given situation , the ladder meeting the ground and the building is making right triangle with them [∵ building is standing vertical to the ground.]
Then, by Pythagoras theorem of right triangles , we have
[tex]l^2=h^2+b^2[/tex] (1), where l is ladder's height ,l h is building's height and b is the base .
Given : The base of a 11 foot ladder is 2 feet from a building .
i.e. l = 11 foot and b = 2 foot
Substitute the values in the above formula (1) we get
[tex](11)^2=h^2+(2)^2\\\\\Rightarrow\ 121=h^2+4\\\\\Rightarrow\ h^2=121-4\\\\\Rightarrow\ h^2= 117\\\\\Rightarrow\ h=\sqrt{117}=10.8166538264\approx10.82 \text{ feet}[/tex]
Hence, the height of building is [tex]\sqrt{117}[/tex] feet or about 10.82 feet.
