In order to answer this question, we find first the x and y components of the distances given.
1st plane:
x-component: x = (120 km)(sin 70°) = 112.76 km
y-component: y = (120 km)(cos 70°) = 41.04 km
2nd plane:
x-component: x = (180 km)(sin 55°) = 147.45 km
y-component: y = (180 km)(cos 55°) = -103.24 km (negative because it is in the south)
The distance between these planes is calculated through the equation
d = √(x₂ - x₁)² + (y₂ - y₁)²
Substituting the calculated values
d = √(112.76 - 147.45)² + (41.04 - (-103.24))²
d = 148.39 km
Thus, the distance between these planes is approximately 148.39 km
