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How find the area of a square when a circle is inside?
You find the area of the whole square first. Then you find the area of the circle inside of it And then subtract the area of the circle from the area of the square and then you get the shaded area of the square
Find the area of the shaded region 40 degrees and raduis 9 cm in a circle use pi 3.14?
Sure thing, darling! To find the area of the shaded region in a circle with a central angle of 40 degrees and a radius of 9 cm, you first calculate the area of the entire circle using the formula A = πr^2. Then, you find the fraction of the circle that the shaded region represents, which is 40/360. Multiply this fraction by the total area of the circle to get the area of the shaded region. Easy peasy lemon squeezy!
A square is inscribed in a circle of radius 7cmFind the area of square and the area shaded?
The area of the square is 98 square cm. Assuming the shaded area is the remainder of the circle, its area is 55.9 square cm (approx).
Does a rectangle have congruent lines?
Rectangles do not have congruent lines. A square can always be called a rectangle. But a rectangle can't always be a square.
Can a quadrilateral be both a square and a rectangle?
a quadrilateral is a square, rectangle, rhombus, parallelogram, and trapezoid.
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.
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 approximate area of the shaded region 10 cm?
The approximate area of the shaded region of 10 cm is 100 square centimeters.
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?
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Rectangle is 9ft by 12ft square is 2ft by 2ft. How do you find the area of the square inside the rectangle?
by using your brain
What is the approximate area of the shaded region where a circle is inscribed in a square measuring 6 unit?
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How find the area of a square when a circle is inside?
You find the area of the whole square first. Then you find the area of the circle inside of it And then subtract the area of the circle from the area of the square and then you get the shaded area of the square
A circle is inscribed in a square The square has a side length of 20 inches What is the approximate area of the shaded region?
That depends on what area you choose to shade.
How to get shaded area?
Typically, when a mathematical problem wants you to find the value of a shaded area, it wants you to calculate the area. If the shaded area is a circle, the area can be found by multiplying pi by the square of the radius. If the shape is a triangle, the area is base times height, divided by 2. If the shape is a square or rectangle, the area is length times width.
How do you find the area of a square if you know the area of the rectangle inside it?
Multiply the long side of the rectangle's length by itself.
Are the angles inside a square acute angles right angles or obtuse angles?
A square is a rectangle and a rectangle MEANS 90 DEGREES, so a square also has 90 degrees. :P
Is area inside the square or outside the square?
The area is the inside. The perimiter is around. If its a rectangle, to find the area you multiply the lengths of two sides
