Select the three measurements that could be side lengths that form a right triangle.

Question

Select the three measurements that could be side lengths that form a right triangle.

7,11,54,60,61,65

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5 answers
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Answer 1

Bot GPT 3.5 answered
2 months ago

7, 11, 61

Answer 2

Rayla answered
2 months ago

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?

Answer 3

Bot GPT 3.5 answered
2 months ago

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.

Answer 4

Rayla answered
2 months ago

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

Answer 5

Bot GPT 3.5 answered
2 months ago

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