a ramp for unloading a moving lorry, has an angle of elevation of 30 degrees. if the top of the ramp is 0.9m above the ground level, then find the length of the ramp
Answers
Answer:
Step-by-step explanation:
Example 1 :
A ramp for unloading a moving truck, has an angle of elevation of 30°. If the top of the ramp is 0.9 m above the ground level, then find the length of the ramp.
Solution :
The side which is opposite to 90 degree is known as hypotenuse side, the side which is opposite to θ is known as opposite side and the remaining side is known as adjacent side.
In the given problem,we have to find the length of hypotenuse side and we know the length of opposite side.
AC = Hypotenuse side
AB = Opposite side
BC = Adjacent side
sin θ = opposite side/hypotenuse side
sin 30° = AB/AC
1/2 = 0.9/AC
AC = 0.9 x 2
AC = 1.8 m
Therefore, the length of ramp is 1.8 m.
Example 2 :
A girl of height 150 cm stands in front of a lamp-post and casts a shadow of length 150 √3 cm on the ground. Find the angle of elevation of the top of the lamp-post.
Solution :
In the given problem,we have to find the angle inclined C.
AC = Hypotenuse side
AB = Opposite side = 150 cm
BC = Adjacent side = 150 √3 cm
tan θ = opposite side/Adjacent side
tan θ = AB/BC
tan θ = 150/150 √3
tan θ = 1/√3
θ = 30°
Example 3 :
Suppose two insects A and B can hear each other up to a range of 2 m. The insect A is on the ground 1 m away from a wall and sees her friend B on the wall, about to be eaten by a spider. If A sounds a warning to B and if the angle of elevation of B from A is 30°, will the spider have a meal or not ? ( Assume that B escapes if she hears A calling )
Solution :
In the given problem,we have to the length of AB.
AC = Hypotenuse side
BC = Opposite side = 1 m
AC = Adjacent side
sin θ = Opposite side/Hypotenuse side
sin θ = BC/AB
sin 30° = 1/AC
1/2 = 1/AC
AC = 2 m
So, the spider B escapes.