If each side of an equilateral triangle is halved then find the ratio of new triangle to the area of the original Triangle
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If each side of an equilateral triangle is halved then find the ratio of new triangle to the area of the original Triangle
MARK IT AS BRAINLIEST
VERY EASY
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Let the triangle's side be x Then area of triangle would be √3x/2(3x/2-x)^3 =. √3× x/2 Now let the new triangle sides be x/2 Then the area would be 3x/4(3x/4 - x/2)^3 = √3×x/4 The ratio would be (√3×x/2)/ (√3×x/4) = 1/2 Ratio = 1:2