AB, BC and CD are the three consecutive sides of a regular polygon. If `angleBAC= 15^(@)`, find,
number of sides of the polygon

AB, BC and CD are the three consecutive sides of a regular polygon. If angleBAC= 15^(@) , find, each exterior angle of the polygon

AB, BC and DC are the three consecutive sides of a regular polygon. If angleBAC=15^(@) , find : (i) each interior angle of the polygon. (ii) each exterior angle of the polygon. (iii) number of sides of the polygon.

AB, BC and CD are three consecutive sides of a regular polygon. If the angle BAC=20^@ , find (i) its each interior angle (ii) its each exterior angle (iii) the number of sides in the polygon.

The interior angle of a regular polygon is 156^0dot Find the number of sides of the polygon.

In a polygon the number of diagonals 77. Find the number of sides of the polygon.

If each interior angle of a regular polygon is 144^@ , find the number of sides in it.

The exterior angle of a regular polygon is one-third of its interior angle. Find the number of sides in the polygon.

Two alternate sides of a regular polygon, when produced, meet at right angle. Calculate the number of sides in the polygon.

The difference between any two consecutive interior angles of a polygon is 5o . If the smallest angle is 120o , find the number of the sides of the polygon.

If each interior angle of a regular polygon measures 140^(@) , how many side does the polygon have?