All Intermediate Geometry Resources
Example Questions
Example Question #1 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on top of a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #11 : Equilateral Triangles
An equilateral triangle is placed on top of a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #211 : Triangles
An equilateral triangle is placed on a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #13 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #14 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #15 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #16 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on top of a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #17 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #18 : How To Find The Length Of The Side Of An Equilateral Triangle
An equilateral triangle is placed on top of a square as shown by the figure below.
Find the perimeter of the shape.
Recall that the perimeter is the sum of all the exterior sides of a shape. The sides that add up to the perimeter are highlighted in red.
Since the equilateral triangle shares a side with the square, each of the five sides that are outlined have the same length.
Recall that the height of an equilateral triangle splits the triangle into congruent triangles.
We can then use the height to find the length of the side of the triangle.
Recall that a triangle has sides that are in ratios of . The smallest side in the given figure is the base, the second longest side is the height, and the longest side is the side of the triangle itself.
Thus, we can use the ratio and the length of the height to set up the following equation:
Plug in the given height to find the length of the side.
Now, since the perimeter of the shape consists of of these sides, we can use the following equation to find the perimeter.
Example Question #19 : How To Find The Length Of The Side Of An Equilateral Triangle
Given: Regular Pentagon with center . Construct segments and to form .
True or false: is an equilateral triangle.
True
False
False
Below is regular Pentagon with center , a segment drawn from to each vertex - that is, each of its radii drawn.
The measure of each angle of a regular pentagon can be calculated by setting equal to 5 in the formula
and evaluating:
By symmetry, each radius bisects one of these angles. Specifically,
.
An equilateral triangle has three angles of measure , so is not equilateral.