Answer:
As per the statement
The altitude of the balloon is 50 feet and the rope is 75 feet long.
⇒ Altitude of the balloon = 50 feet.
And length of the rope = 75 feet.
We have to find the angle that rope makes with ground,
Using Sine ratio:
[tex]\sin \theta = \frac{\text{Opposite side}}{\text{Hypotenuse side}}[/tex]
You can see the diagram as shown below.
Here,
Opposite side = Altitude of the balloon = 50 feet.
Hypotenuse side = length of the rope = 75 feet.
Substitute the given values we have;
[tex]\sin \theta = \frac{50}{75} =\frac{2}{3}[/tex]
⇒[tex]\theta = \sin^{-1} (\frac{2}{3})[/tex] = 41.8°
Therefore, the angle that the rope makes with the ground is, 41.8 degree
Answer:
The angle that the rope makes with the ground is 41.8°.
Step-by-step explanation:
Given : The altitude of the balloon is 50 feet and the rope is 75 feet long.
To find : What is the angle that the rope makes with the ground?
Solution :
First we refer the image attached below.
Altitude of the balloon is the opposite side AB= 50 feet
Length of the rope is the hypotenuse side AC= 75 feet
Using the trigonometric ratios,
[tex]\sin \theta = \frac{\text{Opposite side}}{\text{Hypotenuse side}}[/tex]
Substitute the values,
[tex]\sin \theta = \frac{50}{75}[/tex]
[tex]\sin \theta =\frac{2}{3}[/tex]
[tex]\theta = \sin^{-1} (\frac{2}{3})[/tex]
[tex]\theta =41.8^\circ[/tex]
Therefore, the angle that the rope makes with the ground is 41.8°.
