Sometimes, you may be required to calculate the area of shaded regions. Usually, we would subtract
the area of a smaller inner shape from the area of a larger outer shape in order to find the area
of the shaded region. If any of the shapes is a composite shape then we would need to subdivide it
into shapes that we have area formulas, like the examples below. Hopefully, this guide helped you develop the concept of how to find the area of the shaded region of the circle. As you saw in the section on finding the area of the segment of a circle, multiple geometrical figures presented as a whole is a problem. Find the area of the shaded region by subtracting the area of the small shape from the area of the larger shape.

The given combined shape is combination of a
triangle and incircle. We will learn how to find the Area of the
shaded region of combined figures. We encourage parents and
teachers to select the topics according to the needs of the child. For more difficult
questions, the child may be encouraged to work out the problem on a piece of paper
before entering the solution. We hope that the kids will also love the fun stuff and
puzzles. Then add the area of all 3 rectangles to get the area of the shaded region.

  1. And two quarter-circles with the same radius of 10mm have centers on the opposite vertices.
  2. If any of the shapes is a composite shape then we would need to subdivide it
    into shapes that we have area formulas, like the examples below.
  3. To find the area of a rectangle, multiply its height by its width.
  4. Find the area of the shaded region in terms of pi for the figure given below.

Calculate the area of the shaded region in the right triangle below. The area of the shaded part can occur in two ways in polygons. So, the area of the shaded or coloured region in a figure is equal to the difference between the area of the entire figure and the area of the part that is not coloured or not shaded.

So, the ways to find and the calculations required to find the area of the shaded region depend upon the shaded region in the given figure. We can observe that the outer square has a circle inside it. From the figure we can see that the value of the side of the square is equal to the diameter https://bigbostrade.com/ of the given circle. We can observe that the outer rectangle has a semicircle inside it. From the figure we can observe that the diameter of the semicircle and breadth of the rectangle are common. And two quarter-circles with the same radius of 10mm have centers on the opposite vertices.

Formula for Area of Geometric Figures :

Also, in an equilateral triangle, the circumcentre T
coincides with the centroid. Then subtract the area of the smaller triangle from the total area of the rectangle. By Developing 100+ online Calculators and Converters for Math Students, Engineers, Scientists and Financial Experts, calculatored.com is one of the best free calculators website. The area of the sector of a circle is basically the area of the arc of a circle. The combination of two radii forms the sector of a circle while the arc is in between these two radii.

For instance, if a completely shaded square is given then the area of the shaded region is the area of that square. When the dimensions of the shaded region can be taken out easily, how much do forex traders make we just have to use those in the formula to find the area of the region. The area of the shaded region is in simple words the area of the coloured portion in the given figure.

Let’s see a few examples below to understand how to find the area of a shaded region in a square. Let’s see a few examples below to understand how to find the area of the shaded region in a rectangle. Let’s see a few examples below to understand how to find the area of a shaded region in a triangle. The area of the shaded region is most often seen in typical geometry questions. Such questions always have a minimum of two shapes, for which you need to find the area and find the shaded region by subtracting the smaller area from the bigger area. The ways of finding the area of the shaded region may depend upon the shaded region given.

How to find the area of a shaded region in a triangle?

Suppose, that the length of the square is about 45cm, so find the area of the shaded region. In this problem, it is easy to find the area of the two inner circles, since their radii are given. We can also find the area of the outer circle when we realize that its diameter is equal to the sum of the diameters of the two inner circles. But in this case, and in many similar geometry problems where the shape is formed by intersecting curves rather than straight lines, it is very difficult to do so. For such cases, it is often possible to calculate the area of the desired shape by calculating the area of the outer shape, and then subtracting the areas of the inner shapes. We can conclude that calculating the area of the shaded region depends upon the type or part of the circle that is shaded.

As stated before, the area of the shaded region is calculated by taking the difference between the area of an entire polygon and the area of the unshaded region. Some examples involving the area of triangles and circles. The area of the shaded region is the difference between the area of the entire polygon and the area of the unshaded part inside the polygon. The area of the shaded region is basically the difference between the area of the complete figure and the area of the unshaded region.

Area Of Shaded Region

The result is the area of only the shaded region, instead of the entire large shape. In this example, the area of the circle is subtracted from the area of the larger rectangle. Or we can say that, to find the area of the shaded region, you have to subtract the area of the unshaded region from the total area of the entire polygon.

The general rule to find the shaded area of any shape would be to subtract the area of the more significant portion from the area of the smaller portion of the given geometrical shape. Still, in the case of a circle, the shaded area of the circle can be an arc or a segment, and the calculation is different for both cases. Try the free Mathway calculator and
problem solver below to practice various math topics. Try the given examples, or type in your own
problem and check your answer with the step-by-step explanations. The following diagram gives an example of how to find the area of a shaded region. These lessons help Grade 7 students learn how to find the area of shaded region involving polygons and circles.

To find the area of the shaded region of a circle, we need to know the type of area that is shaded. Therefore, the Area of the shaded region is equal to 246 cm². Therefore, the Area of the shaded region is equal to 16cm². Calculate the area of the shaded region in the diagram below.

To find the area of the shaded region of a
combined geometrical shape, subtract the area of the smaller geometrical shape
from the area of the larger geometrical shape. To find the area of the shaded region, square the diameter or side length and subtract the product of pi and half the side length squared. The following formula helps you to understand how to find the area of a shaded region. The shaded region can be located at the center of a polygon or the sides of the polygon.

Plane Shapes Drawing Plane Shapes CircleSquareTriangleRectangle

For finding the area of the figures, we generally use the basic formulas of the area of that particular figure. There is no specific formula to find the area of the shaded region of a figure as the amount of the shaded part may vary from question to question for the same geometric figure. Our area of shaded region calculator helps you to determine the area of a shaded region of a square. It quickly determines the shaded area regardless of its shape and complexity on a coordinate plane. Two circles, with radii 2 and 1 respectively, are externally tangent (that is, they intersect at exactly one point).