One side of an equilateral triangle is 24 cm. The midpoints of its sides are joined to form another triangle whose midpoints are in turn joined to form still another triangle this process continues indefinitely. The sum of the perimeters of all the triangles is

One side of an equilateral triangle is 18 cm. The mid-point of its sides are joined to form another triangle whose mid-points, in turn, are joined to form still another triangle. The process is continued indefinitely. Find the sum of the (i) perimeters of all the triangles. (ii) areas of all triangles.

One side of an equilateral triangle is 18cm. The mid-point of its sides are joined to form another triangle whose mid-points,in turn,are joined to form still another triangle.The process is continued indefinitely.Find the sum of the (i) perimeters of all the triangles.(ii) areas of all triangles.

One side of an equliateral triangle is 32 cm . The mid -points of its sides are joined to form another trianbgle whose mid -point are in turn joinded to form still another triangle . This process continus indefinitely . Then find the sum of the perimeters and areas of all the triangles .

If the side of an equilateral triangle is 6 cm, then its perimeter is

In which of the following situations, does the list of numbers involved in the form a G.P.? (iii) Perimeter of the each triangle , when the mid-points of sides of an equilateral triangle whose side is 24 cm are joined to form another triangle, whose mid-point in turn are joined to form still another triangle and the process continues indefinitely.

The side of a given square is equal to a. The mid-points of its sides are joined to form a new square. Again, the mid-points of the sides of this new square are joined to form another square. This process is continued indefinitely. Find the sum of the areas of the squares and the sum of the perimeters of the squares.

The side of a given square is 10 cm. The midpoints of its sides are joined to form a new square. Again, the midpoints of the sides of this new aquare are joined to form another square. The process is continued indefinitely. Find (i) the sum of the areas and (ii) the sum of the perimeters of the squares.