4)if the area of the square on ac,

4)if the area of the square on ac, hypotenuse, equals ac^2 and the area of square on ab and bc, legs of the triangle, are ab^2 and bc,^2, respectively, how can we write the relationship between the area of square on the hypotenuse and the area of the squares on the legs of the triangle?
5)does this relationship, obtained from 4), follow pythagorean theorem

from activity 2, the answers are as follows:
1)the area of the square on ac equals 25 square centimeters
2)if can be seen that 25 = 9 + 16.
the area of the square on the hypotenuse (ac) equals the sum of the areas of the square on the legs of the right triangle (ab and bc).
3)triangle abc is a right triangle.
4)write the relationship between the area of the square on the hypotenuse and the area of the square on the legs of the right triangle as
ac^2 = ab^2 + bc,^2
5)the relationship, obtained 4),follows pythagorean theorem.

activity 3
1)cut paper into eight right triangle by letting the legs of the right triangle be a and b units long and the hypotenuse be c, units long.
2)cut each of a paper into square with the sides A,b and c, units