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Area of a shaded region formula?
Simply put, the area of a shaded region can be calculated using: Area of shaded region = Total area - Area of unshaded region. Sometimes finding the area is simple, and other times, not so easy. Often , it is necessary to subdivide areas into shapes mathematics provides regular area formulas for.
What is the approximate area of the shaded region 10 cm?
The approximate area of the shaded region of 10 cm is 100 square centimeters.
The diagram below shows a square inside a regular octogan the apothem of the octagon is 13.28 units to the nearest square unit what is the area of the shaded region?
463 square units
What is the area of the shaded region of 10 in and 133 degrees?
96.86 hehe ;)
How do you find the area of the shaded region in a rectangle?
You will need to divide the shaded area into smaller parts, such as triangles or rectangles, or find the length of sides of these polygons.
How can you find the area of a shaded region assuming the octagon is regular?
To find the area of a shaded region within a regular octagon, first calculate the area of the entire octagon using the formula ( A = 2(1 + \sqrt{2})s^2 ), where ( s ) is the length of a side. Then, determine the area of any non-shaded regions (such as triangles or smaller shapes) within the octagon and calculate their total area. Finally, subtract the area of the non-shaded regions from the total area of the octagon to find the area of the shaded region.
If 5.7 of a region is shaded what part is not shaded?
If 5.7 of a region is shaded, then 94.3% of the region is not shaded. This can be calculated by subtracting the shaded percentage from 100%.
If one fifth of a region is not shaded what part is shaded?
If one fifth of a region is not shaded then 4 fifths of the region is shaded. Fifths means there are five parts.
Area of a shaded region formula?
Simply put, the area of a shaded region can be calculated using: Area of shaded region = Total area - Area of unshaded region. Sometimes finding the area is simple, and other times, not so easy. Often , it is necessary to subdivide areas into shapes mathematics provides regular area formulas for.
When graphing x greater than 5 should the region to the left of 5 be shaded or should the region above the line y --6 be shaded?
Neither. The region to the right of 5 should be shaded. (The shaded region being the solution region.)
How to find area of a shaded area of a shaded region in a circle?
The area of the shaded region can be gotten by multiplying the area of the circle by the subtended angle of the sector.
What is the area of a the shaded region if the radius of the unshaded region is 9m on a circle and the radius of the entire circle is 13m?
The area of the shaded region is 1265.42 meters squared, since I subtracted the two totals of both the unshaded region and the shaded region of a circle.
The octagon is regular what is the area of the shaded region below and round your final answer to the nearest hundredth Apothem length 13.28 the square inside the octagon that isnt shaded is 11 and 11?
yo ueshuigbueswtk hjbvs
In the graph of a linear inequality the shaded region above or below the line is called?
The shaded region above or below the line in the graph of a linear inequality is called the solution region. This region represents all the possible values that satisfy the inequality. Points within the shaded region are solutions to the inequality, while points outside the shaded region are not solutions.
What is the approximate area of the shaded region 10 cm?
The approximate area of the shaded region of 10 cm is 100 square centimeters.
How do you calculate the probability that a coin tossed would land in the shaded region of a circle with a radius of 6 meters?
You divide the area of the shaded region by the area of the full circle. For example, if the radius of the shaded region is 2 meters, the probability would be 4pi / 36pi, or 1/9. If the shaded region is a 'slice' of the circle, the chance is just the fraction of the circle which the 'slice' is.
The diagram below shows a rectangle inside a regular hexagon the apothem of the hexagon is 15.59 units to the nearest square unit what is the area of the shaded region?
To find the area of the shaded region (the rectangle inside the hexagon), we first calculate the area of the hexagon using the formula ( \text{Area} = \frac{3\sqrt{3}}{2} \times a^2 ), where ( a ) is the apothem. Given that the apothem is 15.59 units, the area of the hexagon is approximately ( \frac{3\sqrt{3}}{2} \times (15.59^2) \approx 609.67 ) square units. Assuming the rectangle’s area is not specified, the shaded area would be the hexagon's area minus the rectangle's area. If the rectangle's area is provided, subtract it from the hexagon's area to find the shaded region's area.
