All Basic Geometry Resources
Example Questions
Example Question #1 : Diameter
Give the diameter of a circle whose circumference is .
Example Question #1 : How To Find The Length Of The Diameter
The perimeter of a circle is 36 π. What is the diameter of the circle?
3
18
72
6
36
36
The perimeter of a circle = 2 πr = πd
Therefore d = 36
Example Question #2 : Diameter
Two circles have only one point in common. Both circles have radii of . If point is on the first circle and point is on the second circle, what is longest possible distance of line ?
6
12
24
20
18
24
Example Question #3 : Diameter
What is the name of the segment in green?
Radius
Chord
Diameter
Ray
Diagonal
Diameter
The diameter is the maximum distance between two points on a circle's perimeter. The diameter passes through the circle's center.
Example Question #302 : Circles
The area of a circle is . What is its diameter?
First solve for the radius:
Note that , where is the radius and is the diameter.
Therefore, .
Example Question #5 : Diameter
A circle has an area of . What is the circle's diameter?
The area of a circle is given by the equation , where is the area and is the radius. Use the given area in this equation and solve for to find the circle's radius.
To find the circle's diameter, multiply its radius by .
Example Question #6 : Diameter
A circle has a radius of 7 inches. What is the diameter of the circle?
inches
inches
inches
inches
inches
inches
The diameter of a circle can be written as , where is the radius and is the diameter.
Therefore the diameter of the circle is 14 inches.
Example Question #41 : Circles
Two legs of a right triangle measure 3 and 4, respectively. What is the area of the circle that circumscribes the triangle?
For the circle to contain all 3 vertices, the hypotenuse must be the diameter of the circle. The hypotenuse, and therefore the diameter, is 5, since this must be a 3-4-5 right triangle.
The equation for the area of a circle is A = πr2.
Example Question #7 : How To Find The Length Of The Diameter
If the area of a circle is , what is its diameter?
Before we can find the diameter of this circle, we need to find its radius. We need to use the formula for the area of a cirlce:
Given that the area is , we can find the radius
cancel the pi and then square root it to find 'r'.
Now that the radius is found, we can find the diamater by multiplying it by 2.
Example Question #1 : How To Find The Length Of The Diameter
Find the diameter of a circle that has an area of .
Recall how to find the area of a circle:
Next, plug in the information given by the question.
From this, we can see that we can solve for the radius.
Now recall the relationship between the radius and the diameter.
Plug in the value of the radius to find the diameter.