17.38: A small 2.0 kg block rests at the bottom of a bucket. The bucket i
k)jv xut 8 psf/ sxuvij /499 -qan8jsp)77sszs spun in a vertical circle of radius L by a rope. When the bucket reaches the highest point in its motion,
7vix)q 9jpss 4u fku8s/s7/ns8z)xj a v 9ptj-it moves just fast enough for the block to remain in place in the bucket. When the bucket is at an angle $θ=30^{\circ}$from the vertical, as seen in the figure, what is the magnitude of the normal force (perpendicular to the surface) provided by the bucket onto the block? Note that the direction of the gravitational field is indicated in the diagram by

and that the block does not touch any sides of the bucket aside from the bottom of it.