Asked by Alexis
an arrow is shot at a 30 degree angle with the horizontal. it has a velocity of 49 m/s how high will the arrow go? what horizontal distance will the arrow travel? and how long will the arrow be in the air?
Answers
Answered by
Damon
Vertical problem:
Vi = 49 sin 30 = 24.5 m/s
v = Vi - 9.81 t
at top v = 0
0 = 24.5 - 9.81 t
t = 2.50 seconds upward
so time in air = 2*2.5 = 5 seconds
h = Vi t - 4.9 t^2
at t 2.5
h = 24.5*2.5 - 4.9(6.25)
= 61.25 - 30.625
= 30.625 meters high
Horizontal:
u = 49 cos 30 forever or
at least until the ground hits it.
so
range = 49 cos 30 * 5 seconds
Vi = 49 sin 30 = 24.5 m/s
v = Vi - 9.81 t
at top v = 0
0 = 24.5 - 9.81 t
t = 2.50 seconds upward
so time in air = 2*2.5 = 5 seconds
h = Vi t - 4.9 t^2
at t 2.5
h = 24.5*2.5 - 4.9(6.25)
= 61.25 - 30.625
= 30.625 meters high
Horizontal:
u = 49 cos 30 forever or
at least until the ground hits it.
so
range = 49 cos 30 * 5 seconds
Answered by
Henry
Vo = 49m/s[30o] = Initial velocity.
Xo = 49*Cos30 = 42.4 m/s = Ver. component.
Yo = 49*sin30 = 24.5 m/s = Hor. component.
A. Y^2 = Yo^2 + 2g*h.
0 = 24.5^2 + (-19.6)*h,
h = 30.63 meters.
B. Range = Vo^2*sin(2A)/g
Range = 49^2*sin(60)/9.8 = 212.2 m.
C. Y = Yo + g*Tr.
0 = 24.5 + (-9.8)Tr,
Tr = 2.5 s. = Rise time.
Tf = Tr = 2.5 s = Fall time.
Tr+Tf = 2.5 + 2.5 = 5.0 s. = Time in air.
Xo = 49*Cos30 = 42.4 m/s = Ver. component.
Yo = 49*sin30 = 24.5 m/s = Hor. component.
A. Y^2 = Yo^2 + 2g*h.
0 = 24.5^2 + (-19.6)*h,
h = 30.63 meters.
B. Range = Vo^2*sin(2A)/g
Range = 49^2*sin(60)/9.8 = 212.2 m.
C. Y = Yo + g*Tr.
0 = 24.5 + (-9.8)Tr,
Tr = 2.5 s. = Rise time.
Tf = Tr = 2.5 s = Fall time.
Tr+Tf = 2.5 + 2.5 = 5.0 s. = Time in air.
Answered by
Josiemen
the answer was good
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.