Respuesta :
Answer:
Q = 20.91 degrees.
Explanation:
Given:
- The velocity of boat in x direction v_x = 5 m/s
- The velocity of boat in y direction f(x) = 3sin(pi*x/40)
- The bank are x distance apart x = 40m
Find:
Determine the angle at which the boat should head.
Solution:
- We will first see that how much down the river will the boat be thrown at if boat doesn't move at an angle initially.
- The distance covered in x direction is:
x = v_x*t
x = 5*t
- The velocity of water is in y-direction is:
v_y = 3*sin(pi*x/40)
- Substitute the distance x traveled found above into v_y:
v_y = 3*sin(pi*5*t/40)
v_y = 3*sin(pi*t/8)
- What we have is the function of velocity with respect to time t. we know that velocity is the derivative of displacement. Hence,
y = integral ( v_y ) .dt
y = integral ( 3*sin(pi*t/8) ) .dt
- Perform integration:
y = -3*8/pi*cos(pi*t/8) + C
y = -24/pi *cos(pi*t/8) + C
- We know at t = 0, y = 0. Evaluate C:
0 = -24/pi *1 + C
C = 24/pi
Hence,
y = 24/pi *( 1 - cos(pi*t/8) )
- Back substitute t = x / 5, we have:
y = 24/pi *( 1 - cos(pi*x/40) )
- Now compute y(40):
y = 24/pi * ( 1 - cos(pi) )
y = 24*2 / pi = 48 / pi
- Now we compute the angle:
Q = arctan ( y / x )
Q = arctan ( 48/40*pi )
Q = 20.91 degrees.
- Hence, the boat has to traverse 20.91 degrees towards the flow or river to reach on the other side of the bank just ahead.
