Question

The base of the ladder is 7 feet from the building. The ladder is 1 foot longer than the height it reaches on the building. What is the length of the ladder?

Answer 1

The question involves finding the length of a ladder based on given distances, forming a right-angled triangle. By employing the Pythagorean theorem and solving an equation, we can determine both the height the ladder reaches on the building and its length.

Step-by-step explanation:

The student is asking about the length of a ladder that is 1 foot longer than the height it reaches on a building, given that the base of the ladder is 7 feet from the building. This is a classic application of the Pythagorean theorem, since we have a right-angled triangle formed by the ladder, the ground, and the height the ladder reaches on the building.

Let's denote the height the ladder reaches on the wall as h feet. According to the problem, the ladder's length is h + 1 feet. Since the ladder forms a right-angled triangle with the ground and the building, we can use the Pythagorean theorem to write the following equation:

h2 + 72 = (h + 1)2

Solving this equation will give us the height that the ladder reaches, and adding 1 to it will give us the length of the ladder.

Answer 2

By the Pythagorean theorem:


`x= √(7^2+6^2)= √(49+36)= √(85) \approx 9.22 \ \text{ft}`