Question

If the sides of an equilateral triangle are increased by 20%, 30% and 50% respectively to form anew triangle, what is the percentage increase in the perimeter of the equilateral triangle?​

Answer 1

Answer:

Answer. increase in percentage=10/30*100=3.333.... *10=33.3333. %approximately..

Step-by-step explanation:

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Answer 2

Answer:

$\huge\underline\bold {Answer:}$

Let the sides of the equilateral triangle be x cm. Then, after increase the three sides are

x + 20/100x, x + 30/100x and x + 50/100x,

i.e., x + 0.2x, x + 0.3x and x + 0.5x,

i.e., 1.2x, 1.3x and 1.5x.

Therefore Original perimeter = 3x,

Increased perimeter = 1.2x + 1.3x + 1.5x = 4x

Percent increase in perimeter =(Increase in perimeter ÷ Original perimeter) × 100

$= \frac{(4x - 3x)}{(3x)} \times 100\%$

= 100/3%

Hence percent increase in the perimeter of the equilateral triangle

= 100/3%