Answer:
The answer is approximately about 23.5 feet about the ground touching the wall.
Step-by-step explanation:
The ladder makes a right triangle with the wall and ground, therefore you use pythagorean theorem. If you draw what is being described, you can see that the 24 ladder is the hypotenuse or "c", while the ground and wall are "a" and "b" for the equation.
you set it up like so:
√(24²-5²) = a²
which will result in √(551) or ≈23.5 feet
The number of feet above the ground where the ladder touches the wall is 23.47 ft.
The information above forms a right angle triangle. The base of the right angle triangle is 5 ft and the hypotenuse of the right angle triangle is 24 ft.
Let's find the height of the triangle to know how many feet above the ground where the ladder touches the wall.
Using Pythagoras theorem,
where
c =hypotenuse
a and b are either adjacent side or opposite sides.
Therefore,
b² = 24² - 5²
b² = 576 - 25
b = √551
b = 23.4733891886
b ≈ 23. 47 ft.
Therefore, the feet above the ground where the ladder touches the wall is 23.47 feet.
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