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Find the area of the shaded sector when the radius is 12 and the not shaded is 100?
To find the area of the shaded sector, we first need to determine the area of the entire circle with a radius of 12, which is calculated using the formula (A = \pi r^2). Thus, the area of the entire circle is (A = \pi (12^2) = 144\pi). If the not shaded area is 100, the area of the shaded sector is then (144\pi - 100). Therefore, the area of the shaded sector is approximately (144\pi - 100) square units.
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Find the area of the shaded sector round to the hundredth shaded sector is 155 the rest is 4.3?
To find the area of the shaded sector, we need to determine the total area represented by the shaded and non-shaded parts. If the shaded sector is 155 and the rest is 4.3, the total area is 155 + 4.3 = 159.3. The area of the shaded sector is already given as 155, so rounding it to the hundredth gives us 155.00.
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 the shaded sector with a radius of 7?
That will depend on the length or angle of the arc which has not been given
What is the area of the shaded sector 12 and 100?
To find the area of a shaded sector, you typically need the radius and the angle of the sector in degrees or radians. However, your question provides two numbers, 12 and 100, without context. Assuming 12 is the radius and 100 is the angle in degrees, the area of the sector can be calculated using the formula ( \text{Area} = \frac{\theta}{360} \times \pi r^2 ). Plugging in the values, the area would be approximately 25.13 square units.
What value most closely approximates the area of the shaded sector?
To approximate the area of the shaded sector, you would typically need to know the radius of the circle and the angle of the sector in degrees or radians. The area of a sector can be calculated using the formula: (\text{Area} = \frac{\theta}{360} \times \pi r^2) for degrees or (\text{Area} = \frac{1}{2} r^2 \theta) for radians. If you provide the specific values for the radius and angle, I can help you calculate the area more accurately.
What is the area of the shaded sector if the circle has a radius of 3 and the central angle is 90 degrees?
Find the area of the shaded sector. radius of 3 ...A+ = 7.07
What is the area of a shaded sector when the radius is 16 and the arc is 110 degrees?
The area of the shaded sector is: 245.7 square units.
How do you find the area of a shaded region in a circle?
(pi * radius squared) * ( sector angle / 360 )
What is the area of the shaded sector of a circle when the radius is 3?
0. There is no circle so no shaded area of a circle!
Find the area of the shaded sector of 10 degrees and a diameter 12?
find the area of the shaded sector 12cm and 24°
What is the area of the shaded sector if the radius is 12 and the central angle is 100?
394.7841751413609 125.6637061
Find the area of the shaded sector if the sector is ten degrees and the diameter is 12?
area of whole circle = pi * radius squared = 3.14159 * 36 = 113.1area of sector = 113.1 * ( 10 / 360 ) = 3.14159 sq units
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 the shaded sector if the circle has a radius of 7 and the central angle is 45 degrees?
19.23
What is the area of the shaded sector with a radius of 7?
That will depend on the length or angle of the arc which has not been given
How do you find the area of a shaded sector of a sector?
The area is r^2*x where r is the radius of the circle and x is the angle measured in radians. If you are still working in degrees then Area = (y/180)*r^2, where the angle is y.
What is the area of the shaded sector with a central angle of 260 and radius of 12?
Area = pi*122 = 144pi square units Shaded area = (260/360)*144pi = 104pi square units
