All Intermediate Geometry Resources
Example Questions
Example Question #2 : How To Find If Parallelograms Are Similar
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Example Question #1 : How To Find If Parallelograms Are Similar
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Example Question #1 : Acute / Obtuse Isosceles Triangles
An isosceles triangle has a base of and an area of . What must be the height of this triangle?
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Example Question #1 : Triangles
An isosceles triangle has a perimeter of . If the base of the triangle is two less than two times the length of each leg, what is the height of the triangle?
The height of the triangle cannot be determined with the given information.
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.
Example Question #1 : How To Find The Height Of Of An Acute / Obtuse Isosceles Triangle
An isosceles triangle has a perimeter of . If the base of the triangle is less than three times the length of a leg, what is the height of the triangle?
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.
Example Question #3 : Triangles
An isosceles triangle has a perimeter of . If the length of the base is one less than twice the length of a leg, what is the height of the triangle?
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.
Example Question #1 : Triangles
An isosceles triangle has a perimeter of . If the length of the base is fourteen less than three times the length of a leg, what is the height of the triangle?
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.
Example Question #1 : Acute / Obtuse Isosceles Triangles
An isosceles triangle has a perimeter of . If the length of the base is two less than one-third of the length of a leg, what is the height of the triangle?
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.
Example Question #6 : Triangles
An isosceles triangle has a perimeter of . If the length of the base is ten less than twice the length of a leg, what is the height of the triangle?
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.
Example Question #7 : Triangles
An isosceles triangle has a perimeter of . If the length of the base is four more than one-third of the length of a leg, what is the height of the triangle?
First, find the lengths of the triangle.
Let be the length of each leg. Then, the length of the base must be .
Use the information given about the perimeter to solve for .
Plug this value in to find the length of the base.
Now, recall that the height of an isosceles triangle can split the entire triangle into two congruent right triangle as shown by the figure below.
Thus, we can use the Pythagorean Theorem to find the length of the height.
Plug in the given values to find the height of the triangle.
Make sure to round to places after the decimal.