Respuesta :
Answer:
"In each figure the total area is equal and the area of the 4 triangles is equal, so the remaining white area in each figure must also be equal."
Step-by-step explanation:
Both figures make up congruent squares, and they are made up of 4 congruent triangles, so the white area in between must be equal between the two figures
The measure of the area of each square is given by the difference
between the area of the large square and the area of the triangles.
The best statement is given by the option;
- In each figure, the total area is equal and the area of the four right triangle is equal so the remaining white area in each figure nust also be equal.
What measurement indicates that the (sum of) areas of the white squares in each figure are equal?
Please find attached a likely drawing for the question, obtained from a similar question.
In the figure to the left, the inscribed square creates for right triangles of
base a and height b. In the figure to the right, the space outside the two
squares can be bisected into four right triangles having base length a
and height b.
Whereby the area outside the square but enclosed in the larger square
is 4 right right triangles and the area outside the two squares in the
figure to the right is also 4 right triangles, we have;
The area occupied by the white square in figure 1 is the same as the
area occupied by the two white squares in figure 2.
The correct option is therefore;
- In each figure, the total area is equal and the area of the four right triangle is equal so the remaining white area in each figure nust also be equal.
Learn more about the area of basic shapes here:
https://brainly.com/question/8976947
