the Pythagorean Theorem is not what you need here.
The boy is 3/4 as tall as his shadow.
The tree is 3/4 as tall as its shadow.
so, what's 3/4 of 72?
You could use the theorem to find the distance from the boy's head to the tip of his shadow (d^2 = 3^2 + 4^2)
but that still wouldn't help you find the height of the tree. You'd still have to fall back on using similar triangles.
a 3ft tall boy casts a 4ft shawdow at the same time a tree casts a 72 foot shawdow using the pythagorean therem find the distance from the top of the tree to the tip of the shawdow
5 answers
approximate to the nearest inch the lenght of a rectangle whose diagnol measures 25.0 inches and whose width is 18.0
Now you can use your theorem:
If the length is x, then
x^2 + 18^2 = 25^2
x^2 = 625 - 324
x^2 = 301
x = 17
If the length is x, then
x^2 + 18^2 = 25^2
x^2 = 625 - 324
x^2 = 301
x = 17
a ladder 39 ft long leans against a building and reaches the ledge of a window if the foot of the ladder is 15 ft from the foot of the building how high is the window ledge above the ground tot the nearest foot.
come on. this is just like the one I just did for you. show me whatcha got. I'll let you know whether anything's amiss.