Respuesta :
Answer:
distance of 2nd team from 1st team will be: 58.2
Direction of 2nd team from 1st team will be: 14.90 deg North of east
Explanation:
ASSUME Vector is R and makes angle A with +x-axis,
therefore component of vector R is
[tex]R_x = Rcos A[/tex]
[tex]R_y = Rsin A[/tex]
From above relation
Assuming base camp as the origin, location of 1st team is
[tex]R_1 = 37 km[/tex] away at 21 deg North of west (North of west is in 2nd quadrant, So x is -ve and y is positive)
[tex]R_{1x} = -R_1*cos A_1 = -37*cos 21 deg = -34.54 km[/tex]
[tex]R_{1y} = R_1*sin A_1 = 37*sin 21 deg = 13.25 km[/tex]
location of 2nd team is at
[tex]R_2 = 32 km[/tex], at 38 deg East of North = 32 km, at 58 deg North of east (North of east is in 1st quadrant, So x and y both are +ve)
[tex]R_{2x} = R_2*cos A_2 = 32*cos 58 deg = 16.95 km[/tex]
[tex]R_{2y} = R_2*sin A_2 = 32*sin 58 deg = 27.13 km[/tex]
Now position of 2nd team with respect to 1st team will be given by:
[tex]R_3 = R_2 - R_1[/tex]
[tex]R_3 = (R_{2x} - R_{1x}) i + (R_{2y} - R_{1y}) j[/tex]
Using above values:
[tex]R_3 = (16.95 - (-34.54)) i + (27.13 - 13.42) j[/tex]
[tex]R_3 = 51.49 i + 13.71 j[/tex]
distance of 2nd team from 1st team will be:
[tex]\left | R_3 \right | = \sqrt (51.49^2 +13.71^2)[/tex]
[tex]\left | R_3 \right | = 53.28 km = 58.2 km[/tex]
Direction of 2nd team from 1st team will be:
[tex]Direction = tan^{-1} \frac{R_{3y}}{R_{3x}} = tan^{-1}[ \frac{13.71}{51.49}][/tex]
Direction = 14.90 deg North of east
