2013/08/04
Formula Math Surface Area of a Sphere
Label:
Formula Math
Difinition smart math
formula of A sphere is a three-dimensional space, such as the shape of a
football. A sphere is a body bounded by a surface whose every point is
equidistant (i.e. the same distance) from a fixed point, called the
centre or the origin of the sphere.
Like a circle in three dimensions, all points from the center are constant. The distance from the center to any points on boundary is known as the radius of the sphere. The maximum straight distance through the sphere is known as the diameter of the sphere. One-half of a sphere is called a hemisphere.
Like a circle in three dimensions, all points from the center are constant. The distance from the center to any points on boundary is known as the radius of the sphere. The maximum straight distance through the sphere is known as the diameter of the sphere. One-half of a sphere is called a hemisphere.
We can find the total surface area of a sphere by using the following formula:
SA = 4 π r^{2}
where r is the radius.
NOTE: The value of π can never be calculated exactly, so the surface area of a sphere is only a approximation.
Surface area of sphere in terms of diameter = πd^{2}
where d is the diameter of the sphere.
SA = 4 π r^{2}
where r is the radius.
NOTE: The value of π can never be calculated exactly, so the surface area of a sphere is only a approximation.
Surface area of sphere in terms of diameter = πd^{2}
where d is the diameter of the sphere.
- What is the total surface area of a sphere whose radius is 5.5 meters?
Smart Solution:
Given that:
r =5.5
Surface area of the sphere:
SA = 4 × π × r^{2}
SA = 4 × π × (5.5)^{2}
SA = 4 × 3.14 × 30.25
SA = 379.94
Thus the surface area of the sphere is 379.94 m^{2}.
Given that:
r =5.5
Surface area of the sphere:
SA = 4 × π × r^{2}
SA = 4 × π × (5.5)^{2}
SA = 4 × 3.14 × 30.25
SA = 379.94
Thus the surface area of the sphere is 379.94 m^{2}.
A spherical ball has a surface area of 2464 cm^{2}. Find
the radius of the ball, correct to 2 decimal places, using π = 3.142.
Smart Solution:
SA = 4 × π × r^{2}
In order to find r, we need to isolate it from the equation above:
r^{2} = SA / (4π)
r^{2} =2464 / (4 × π)
r^{2} =196.054
r = √(196.054)
r = 14.00 cm
SA = 4 × π × r^{2}
In order to find r, we need to isolate it from the equation above:
r^{2} = SA / (4π)
r^{2} =2464 / (4 × π)
r^{2} =196.054
r = √(196.054)
r = 14.00 cm
- Find the surface area of the sphere whose radius is 18 cm. [π = 3.14]
Smart Solution:
r = 18 cm
The surface area of a sphere is given by:
SA = 4 × π × r^{2}
SA = 4 × π × 18^{2}
SA = 4 × π × 342
SA = 4069.44 cm^{2}
The surface area of the sphere is 4069.44 cm2.
r = 18 cm
The surface area of a sphere is given by:
SA = 4 × π × r^{2}
SA = 4 × π × 18^{2}
SA = 4 × π × 342
SA = 4069.44 cm^{2}
The surface area of the sphere is 4069.44 cm2.
- Find the surface area of a sphere, whose radius is given as r = 11 cm.
Smart Solution:
The formula for calculating the surface area of sphere is given by:
SA = 4 × π × r^{2}
SA = 4 × 3.14 × 11^{2}
SA = 1519.76
The surface area of sphere is 1519.76 cm^{2}.
Example 5: A hemisphere has the radius measured to 8.3 cm. Find the surface area of it without the base.
Solution:
r = 8.3 cm
The surface area of a hemisphere without the base is determined by using the following formula math:
SA = 2 × π × r^{2}
SA = 2 × π × 8.3^{2}
SA = 432.62
The surface area of the hemisphere is therefore 432.62 cm^{2}.
The formula for calculating the surface area of sphere is given by:
SA = 4 × π × r^{2}
SA = 4 × 3.14 × 11^{2}
SA = 1519.76
The surface area of sphere is 1519.76 cm^{2}.
Example 5: A hemisphere has the radius measured to 8.3 cm. Find the surface area of it without the base.
Solution:
r = 8.3 cm
The surface area of a hemisphere without the base is determined by using the following formula math:
SA = 2 × π × r^{2}
SA = 2 × π × 8.3^{2}
SA = 432.62
The surface area of the hemisphere is therefore 432.62 cm^{2}.
- Find the surface area of a sphere whose radius is 6cm?
Smart Solution:
SA = 4 × π × r^{2}
SA = 4 × π × 6^{2}
SA = 4 × π × 36
SA = 452cm^{2}
SA = 4 × π × r^{2}
SA = 4 × π × 6^{2}
SA = 4 × π × 36
SA = 452cm^{2}
^{That is formula math in aplication mathematics of Formula Math Surface Area of a Sphere.}
0 komentar
Post a Comment