Math, asked by abdulsumear9882, 11 months ago

A square and an equilateral triangle have equal perimeters. If the diagonal of the square is 12√2cm, then area of the triangle is
A. 24√2cm²
B. 24 √3cm²
C. 48 √3cm²
D. 64√3 cm²

Answers

Answered by ayush7137
1

Answer:

64

3

cm

2

Explanation:

Let

A

s

be the area of the square,

P

s

be the perimeter of the square and

a

s

be the length of a side of the square. (All sides have equal lengths.)

Let

A

t

be the area of the triangle,

P

t

be the perimeter of the triangle and

a

t

be the length of a side of the triangle. (All sides have equal lengths.)

============================================

1) As we know the length of the diagonal of the square, we can compute the length of a side of the square using the Pythagoras formula:

a

2

s

+

a

2

s

=

d

2

2

a

2

s

=

(

12

2

)

2

a

2

s

=

12

2

a

s

=

12

cm

2) Knowing the length of one side of the square (and thus knowing all lengths of a square), we can easily compute the square's perimeter:

P

s

=

12

4

=

48

cm

3) We know that the square and the equilateral triangle have the same perimeter, thus

P

t

=

48

cm

4) As all sides have the same length in an equilateral triangle, the length of one side is

a

t

=

P

t

3

=

16 cm

5) Now, to compute the area of the equilateral triangle, we need the height

h

which can be computed with the Pythagoras formula again:

h

2

+

(

a

t

2

)

2

=

a

2

t

h

2

+

8

2

=

16

2

h

2

=

192

=

64

3

h

=

8

3

cm

6) At last, we can compute the area of the triangle:

A

t

=

1

2

h

a

t

=

1

2

8

3

16

=

64

3

cm

2

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