A ship’s guidance system measures that the ship is 380 m from the top of a lighthouse. The top of the lighthouse is 88 m above sea level. How far is the ship from the lighthouse to the nearest tenth of a meter?

2 Answers
Feb 16, 2018

The ship is 369.7 m away

Explanation:

diagram of the problem

Let's assign variables to the quantities given in the problem.
#d =380# m, the distance from the ship to the top of the lighthouse
#h = 88# m, the height of the lighthouse
#x = ?#, the distance from the ship to the base of the lighthouse (or the part of the lighthouse at sea level)

Using the pythagorean theorem:

#h^2 + x^2 = d^2#
#x^2 = d^2 - h^2#
#x = sqrt(d^2 - h^2)#

#x = sqrt((380 m)^2 - (88 m)^2)#
#x = 369.670123# m
#x = 369.7# m

Does this make sense?
Yes, #x# is shorter than #d# the hypotenuse of the triangle, but not by a lot. The distance of the ship to the top of the lighthouse significantly larger than the height of the lighthouse.

Feb 16, 2018

The ship is 369.7m from the lighthouse.

Explanation:

enter image source here
After converting the question into an image, you can see that it forms a right angle triangle, so you can use Pythagorean theorem.
#380^2-88^2=136656#
#sqrt136656=369.67#
Round to nearest tenth
#369.7#