Asked by Rayla
Select the three measurements that could be side lengths that form a right triangle.
7,11,54,60,61,65
7,11,54,60,61,65
Answers
Answered by
Rayla
In Figure 1, the area of square A is 9 square units, the area of square B is 16 square units, and the area of square C is 25 square units. In Figure 2, the area of square D is 36 square units and the area of square E is 64 square units. What is the area of square F in Figure 2?
Answered by
Rayla
In Figure 1, the area of square A is 9 square units, the area of square B is 16 square units, and the area of square C is 25 square units.
In Figure 2, the area of square D is 36 square units and the area of square E is 64 square units.
What is the area of square F in Figure 2?
A.
90 square units
B.
110 square units
C.
80 square units
D.
100 square units
Answered by
GPT 3.5
7, 11, 61
Answered by
GPT 3.5
In Figure 1, the side length of square A is √9 = 3 units, the side length of square B is √16 = 4 units, and the side length of square C is √25 = 5 units.
In Figure 2, the side length of square D is √36 = 6 units and the side length of square E is √64 = 8 units.
To find the area of square F in Figure 2, we need to find the side length of square F first. Since the side length of square F is the sum of the side lengths of square D and E, we add the side lengths: 6 + 8 = 14 units.
The area of square F is then (side length)^2 = 14^2 = 196 square units.
Therefore, the area of square F in Figure 2 is 196 square units.
In Figure 2, the side length of square D is √36 = 6 units and the side length of square E is √64 = 8 units.
To find the area of square F in Figure 2, we need to find the side length of square F first. Since the side length of square F is the sum of the side lengths of square D and E, we add the side lengths: 6 + 8 = 14 units.
The area of square F is then (side length)^2 = 14^2 = 196 square units.
Therefore, the area of square F in Figure 2 is 196 square units.
Answered by
GPT 3.5
In a square, the area is equal to the side length squared.
Given:
- Area of square A = 9 square units
- Area of square B = 16 square units
- Area of square C = 25 square units
- Area of square D = 36 square units
- Area of square E = 64 square units
For figure 1:
- Side length of square A = √9 = 3 units
- Side length of square B = √16 = 4 units
- Side length of square C = √25 = 5 units
For figure 2:
- Side length of square D = √36 = 6 units
- Side length of square E = √64 = 8 units
The side length of square F in figure 2 is the sum of the side lengths of squares D and E: 6 + 8 = 14 units
The area of square F = side length of square F squared = 14^2 = 196 square units
So, the area of square F in figure 2 is 196 square units.
Therefore, the correct answer is:
F) 196 square units
Given:
- Area of square A = 9 square units
- Area of square B = 16 square units
- Area of square C = 25 square units
- Area of square D = 36 square units
- Area of square E = 64 square units
For figure 1:
- Side length of square A = √9 = 3 units
- Side length of square B = √16 = 4 units
- Side length of square C = √25 = 5 units
For figure 2:
- Side length of square D = √36 = 6 units
- Side length of square E = √64 = 8 units
The side length of square F in figure 2 is the sum of the side lengths of squares D and E: 6 + 8 = 14 units
The area of square F = side length of square F squared = 14^2 = 196 square units
So, the area of square F in figure 2 is 196 square units.
Therefore, the correct answer is:
F) 196 square units
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