Trong tam giác vuông ABP:
\(tanP=\dfrac{AB}{AP}\Rightarrow AP=\dfrac{AB}{tanP}\Rightarrow PQ+AQ=\dfrac{AB}{tanP}\) (1)
Trong tam giác vuông ABQ:
\(tanQ=\dfrac{AB}{AQ}\Rightarrow AQ=\dfrac{AB}{tanQ}\) (2)
\(\left(1\right);\left(2\right)\Rightarrow PQ+\dfrac{AB}{tanQ}=\dfrac{AB}{tanP}\Rightarrow PQ=AB\left(\dfrac{1}{tanP}-\dfrac{1}{tanQ}\right)\)
\(\Rightarrow AB=\dfrac{PQ}{\dfrac{1}{tanP}-\dfrac{1}{tanQ}}=\dfrac{100}{\dfrac{1}{tan15^0}-\dfrac{1}{tan55^0}}\approx33\left(m\right)\)
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