A magnet suspended at `30^@` with magnetic meridian makes an angle of `45^@` with the horizontal. What shall be the actual value of the angle of dip?

If a dip needle is suspended at an angle 30° to the magnetic meridian, it makes an angle of 45^@ with the horizontal. The real dip is

If a magnet is suspended at an angle 30∘ to the magnetic meridian and in thisplane the dip needle makes an angle of 60∘ with the horizontal. The true value of dip is

A freely suspended bar magnet makes an angle of 60^@ with the horizontal component and 45^@ with the magnetic meridian of a place. Calculate the angle of dip for that place.

If a magnet is suspended at an angle 30^(@) to the magnetic meridian and in this plane the dip needle makes an angle of 60^(@) with the horizontal. The true value of dip is:

The real angle of dip, if a magnet is suspended at an angle of 30^(@) to the magnetic meridian and the dip needle makes an angle of 45^(@) with horizontal, is:

At an angle of 30^(@) to the magnetic meridian, the apparent dip is 45^(@) . Find the true dip:

A dip circle lies initially in the magnetic meridian. If it is now rotated through angle theta in the horizontal plane, then tangent of the angle of dip is changed in the ratio:

A magnetic needle free to rotate in a fixed vertical plane stays in a direction making an angle of 60^@ with the horizontal. If the dip at that plane is 37^@ , find the angle of the fixed vertical plane with the meridian.