A garden in the shape of a right triangle has sides measuring 60, 80 and 100 ft. The owner of the garden adds a new section of fence that runs from the right angle to the hypoteneuse and separates the garden into two parts of equal perimeter. Find the length of the new section of the fence. Problem is not out of a textbook, rather on a worksheet.

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farahahmed13 farahahmed13 · Answer 1 · 2019-12-25T10:54:12+01:00

Answer:

The answer is 48 ft

Step-by-step explanation:

Step 1:

The garden before the fence is: (refer to graphical representation in attached file)

o = side

b = base

h= hypotenuse

Use Sin (t) formula;

Sin (t) = o/h

Sin (t) = 80/100

Sin (t) = 0.8

Step 2:

The garden was divided in 2 parts and a is the missing length which needed to be found (refer to graphical representation in attached file)

For Small triangle (refer to graphical representation in attached file);

a = side

c = base

b= hypotenuse

Use Sin (t) formula;

Sin (t) = a/b

0.8 = a/60

A = 0.8x60

A = 48 ft