Answer
As per the statement:
Height of the building(h)= 30 feet
Angle of elevation [tex](\theta)[/tex]= 41°
We have to find the distance of observer from the base of the building.
Using tangent ratio:
[tex]\tan \theta= \frac{\text{Opposite side}}{\text{Adjacent side}}[/tex]
You can see the diagram as shown below.
Opposite side = height of the building = 30 feet.
Adjacent side = distance of observer from the base of the building = x (let)
Then;
[tex]\tan 41^{\circ}= \frac{30}{x}[/tex]
0.86928673781 = [tex]\frac{30}{x}[/tex]
By cross multiply we have;
[tex]0.86928673781x = 30[/tex]
Divide by 0.86928673781 both sides we get;
x = 34.51 m
Therefore, the distance of observer from the base of the building is 34.51 m
