Answer
4.47m
Work Step by Step
In Q 48.a we found that vector a is $26.5^{\circ}$ from the x-axis.
This equation says there are 2 vectors perpendicular to vector a still on the xy plane, vector c and vector d.
The question also says that vector d has a positive x component and vector c has a negative x component. '
Which means that vector d is going to be in the 2nd quadrant and vector d is going to be in the 4th quadrant.
To find to the angle between vector c and the x-axis we add the angle between vector a and the x-axis ($26.5^{\circ}$) to $90^{\circ}$
The angle between vector c and x-axis =$90^{\circ}+26.5^{\circ} = 116.5^{\circ}$
We were given the magnitude of vector d as 5m, so we can use this with the angle to find its y-component.
y-component of vector d = $ 5\times sin(116.5^{\circ}) = 4.47467 \approx 4.47m$