Question

the lenght of each side of an equilateral triangle having area of 4√3​

Answer 1

As per the data given in the question,

We have to determine the value of side of equilateral triangle.

From the question,

It is given that,

Area of equilateral triangle $=4{\sqrt{3}}\:units^2$

As we know that,

Equilateral triangle is that special type of triangle whose all sides are equal.

So, we have formula for finding the area of equilateral triangle,

We know that,

Area of equilateral triangle $=\frac{{\sqrt{3}}}{4}side^2$

So, putting the value given in the question, in above formula,

We will get the side of equilateral triangle as,

$4{\sqrt{3}}=\frac{{\sqrt{3}}}{4}side^2\\=>4\times 4 = side^2\\=>Side = {\sqrt{16}}\\=>Side = 4\:units$

Hence, value of side of equilateral triangle is 4 units.

Answer 2

answer= 4/-4

Step-by-step explanation:

√3/4a^2 = 4√3

Multiply both sides by 4/√3

=x^2 = 16

x= 4

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