All GED Math Resources
Example Questions
Example Question #2 : Similar Triangles And Proportions
Note: Figures NOT drawn to scale.
Refer to the above figures. Given that , evaluate .
By the Pythagorean Theorem, since is the hypotenuse of a right triangle with legs 6 and 8, its measure is
.
The similarity ratio of to is
.
Likewise,
Example Question #2 : Similar Triangles And Proportions
Note: Figures NOT drawn to scale.
Refer to the above figures. Given that , give the area of .
Corresponding angles of similar triangles are congruent, so, since is right, so is . This makes and the legs of a right triangle, so its area is half their product.
By the Pythagorean Theorem, since is the hypotenuse of a right triangle with legs 6 and 8, its measure is
.
The similarity ratio of to is
.
This can be used to find and :
The area of is therefore
.
Example Question #1 : Similar Triangles And Proportions
In the figure below, the two triangles are similar. Find the value of .
Since the two triangles are similar, we know that their corresponding sides must be in the same ratio to each other. Thus, we can write the following equation:
Now, solve for .
Example Question #1 : Pythagorean Theorem
The two legs of a right triangle measure 30 and 40. What is its perimeter?
By the Pythagorean Theorem, if are the legs of a right triangle and is its hypotenuse,
Substitute and solve for :
The perimeter of the triangle is
Example Question #261 : Geometry And Graphs
A right triangle has legs 30 and 40. Give its perimeter.
The hypotenuse of the right triangle can be calculated using the Pythagorean theorem:
Add the three sides:
Example Question #3 : Pythagorean Theorem
A right triangle has one leg measuring 14 inches; its hypotenuse is 50 inches. Give its perimeter.
The Pythagorean Theorem can be used to derive the length of the second leg:
inches
Add the three sides to get the perimeter.
inches.
Example Question #3 : Pythagorean Theorem
Whicih of the following could be the lengths of the sides of a right triangle?
10 inches, 1 foot, 14 inches
2 feet, 32 inches, 40 inches
7 inches, 2 feet, 30 inches
15 inches, 3 feet, 40 inches
2 feet, 32 inches, 40 inches
A triangle is right if and only if it satisfies the Pythagorean relationship
where is the measure of the longest side and are the other two sidelengths. We test each of the four sets of lengths, remembering to convert feet to inches by multiplying by 12.
7 inches, 2 feet, 30 inches:
2 feet is equal to 24 inches. The relationship to be tested is
- False
10 inches, 1 foot, 14 inches:
1 foot is equal to 12 inches. The relationship to be tested is
- False
15 inches, 3 feet, 40 inches:
3 feet is equal to 36 inches. The relationship to be tested is
- False
2 feet, 32 inches, 40 inches:
2 feet is equal to 24 inches. The relationship to be tested is
- True
The correct choice is 2 feet, 32 inches, 40 inches.
Example Question #4 : Pythagorean Theorem
An isosceles right triangle has hypotenuse 80 inches. Give its perimeter. (If not exact, round to the nearest tenth of an inch.)
Each leg of an isosceles right triangle has length that is the length of the hypotenuse divided by . The hypotenuse has length 80, so each leg has length
.
The perimeter is the sum of the three sides:
inches.To the nearest tenth:
inches.
Example Question #5 : Pythagorean Theorem
Note: Figure NOT drawn to scale.
Refer to the above diagram. . Give the perimeter of Quadrilateral .
The perimeter of Quadrilateral is the sum of the lengths of , , , and .
The first two lengths can be found by subtracting known lengths:
The last two segments are hypotenuses of right triangles, and their lengths can be calculated using the Pythagorean Theorem:
is the hypotenuse of a triangle with legs ; it measures
is the hypotenuse of a triangle with legs ; it measures
Add the four sidelengths:
Example Question #6 : Pythagorean Theorem
Note: Figure NOT drawn to scale.
Refer to the above diagram. Evaluate .
The altitude perpendicular to the hypotenuse of a right triangle divides that triangle into two smaller triangles similar to each other and the large triangle. Therefore, the sides are in proportion. The hypotenuse of the triangle is equal to
We can set up a proportion statement by comparing the large triangle to the smaller of the two in which it is divided. The sides compared are the hypotenuse and the longer side:
Solve for :