Answer:
Height of vertical post relative to the horizontal is 6.3 ft
Height of vertical post above the roof (roofing sheets) is 4.0 ft
Step-by-step explanation:
Given the roof is 20° relative to the horizontal and the solar panel should be 38° relative to the horizontal, then finding the vertical support holding the back of the panel relative to the horizontal will be;
Apply the formula for sine of an angle as;
Sin of angle theta = opposite side length/hypotenuse
Sin 38° = O/8 where O is the length of opposite side of the angle
8*sin 38°=O
4.93 ft = O
Applying Pythagorean relationship to find the length from the bottom part of the panel to the vertical support relative to the horizontal will be;
a²+b²=c² where a=?, b=4.93 and c = 8
a²+4.93²=8²
a²=8²-4.93²
a=6.3 ft
Finding the height of the roof from the horizontal at 20° angle
Tan 20°= O/6.3
6.3 tan 20° = O
2.3 ft =O
Now finding the length of vertical post above the roof will be;
6.3-2.3=4.0 ft
The height of the vertical post relative to the horizontal is 6.3 ft
The height of the vertical post above the roof (roofing sheets) is 4.0 ft
Here we applied the sine of an angle formula
Sin of angle theta = opposite side length ÷ hypotenuse
Sin 38° = O ÷ 8
Here O is the length of the opposite side of the angle
Now
8 × sin 38°=O
4.93 ft = O
Now apply the Pythagorean theorem
So,
a²+b²=c²
where a=?,
b=4.93
and c = 8
So,
a²+4.93²=8²
a²=8²-4.93²
a=6.3 ft
Now the height of the roof from the horizontal at a 20° angle should be
Tan 20°= O ÷ 6.3
6.3 tan 20° = O
2.3 ft =O
so,
= 6.3-2.3
=4.0 ft
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