There is a square with a star inside. The square has 25cm to show the length of one side. On the right, outside the square, it says 125cm squared, with a line pointing the center of the star in the square. The question is; The target of a shooting game features a shaded star on a white background. Approximately, what percent of the area of the target is shaded?
To find the percentage of the shaded area in the target, we need to calculate the area of the shaded star and then determine what percentage it represents of the total area of the target.
First, let's calculate the area of the square. Since the square has a side length of 25 cm, the formula to find the area of a square is A = side^2. Therefore, the area of the square is 25 cm * 25 cm = 625 cm^2.
Next, let's determine the area of the shaded star. Unfortunately, we don't have enough information to directly calculate the area of the star. We need to know the length of the star's sides or have some angle measurements.
However, based on the given information, we do have the area of the square (625 cm^2) pointing to the center of the star. This suggests that the star is inscribed within the square. In other words, the vertices of the star touch the sides of the square. If this is the case, the area of the shaded star will be smaller than the area of the square.
Since we can't accurately determine the area of the star without further information, we cannot provide an exact percentage of the shaded area in the target. Without the length of the star's sides or additional details, it is not possible to calculate the percentage.