Is it possible to have a polygon, the sum of whose interior angle is 9 right angles.

Is it possible to have a polygon, whose sum of interior angles is : (i) 870^@ (ii) 2340^@ (iii) 7 right angles?

Is it possible to have a regular polygon whose each interior angle is : (i) 170^@ (ii) 1370^@

(a) Is it possible to have a regular polygon with measure of each exterior angle as 22^@ ? b) Can it be an interior angle of a regular polygon? Why?

Is it possible to have a regular polygon with each interior angle equal to 105^@?

Is it possible to have a regular polygon whose each exterior angle is : (i) 80^@ (ii) 40% of a right angle

Find the number of sides in a polygon if the sum of its interior angles is : (i) 900^@ (ii) 1620^@ (iii) 16 right angles

Sum of co-interior angles is always 180^(@)

Fill in the following blanks : In every triangle, the sum of (interior) angles of triangle = . . . . right angles.

Is it possible to have triangle, in which Two of the angles are right? Two of the angles are obtuse? Two of the angles are acute? Each angle is less than 60^0? Each angle is greater than 60^0? Each angle is equal to 60^0? Give reason in support of your answer in each case.

Find the number of sides in a regular polygon, if its interior angle is equal to its exterior angle.