Line segment CD is the altitude drawn to hypotenuse EF in right triangle ECF. If EC = 10 and EF = 24, then, to the nearest tenth, find ED. - QAmmunity.org

Line segment CD is the altitude drawn to hypotenuse EF in right triangle ECF. If EC = 10 and EF = 24, then, to the nearest tenth, find ED.

asked May 11, 2022 27.0k views

1 Answer

Answer:

4.2 = ED

Explanation:

C is the Right Angle.
You will do yourself a great favor by drawing your own diagram.
The easiest way to do this is to find CF first. Use the Pythagorean Theorem.
The next step is to find the area of the triangles using EC * CF which you just found. Equate that to the hypotenuse * altitude(CD) to find CD
Then use Pythagoras again to ED.

Step One

Find FC. That is the only side of the right triangle that you don't know the value of.

EC^2 + FC^2 = EF^2
EC = 20
FC = ?
EF= 24 This the Hypotenuse.

10^2 + FC^2 = 24^2
100 + FC^2 = 576 Subtract 100 from both sides.
FC^2 = 576 - 100 Combine the right
FC^2 = 476
sqrt(FC^2) = sqrt(476)
FC = 21.817

Step Two

Find CD. Do this by finding the area two ways. (Key Step)
Area = hypotenuse * altitude / 2
Area = EC * CF / 2
EC = 10
CF = 21.817
hypotenuse = 24
altitude = y
24*y / 2 = 10 * 21.817 /2
12 y = 218.17/2
12y = 109.085
y = 109.085/12
y = 9.0904

Step Three

Find ED
ED^2 = 10^2 - y^2
ED^2 = 100 - 9.0904^2
ED^2 = 100 - 82.6357
ED^2 = 17.36
sqrt(ED^2) = sqrt(17.36)
ED = 4.1671
ED = 4.2

Amid answered May 15, 2022

by Amid

7.7k points

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