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The drawing shows a heart-shaped figure. The heart is composed of a square and two semicircles. The semicircles have the center in the middle of two of the sides.

a) Set up a formula to calculate the area of ​​the heart.


The drawing shows a heart-shaped figure. The heart is composed of a square and two-example-1
User Debbe
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2 Answers

16 votes
16 votes

The radius of each semicircle is 5 cm. The area of the heart-shaped decoration is calculated using the formula
\(A_{\text{heart}} = s^2 + 2 \cdot (1)/(2)\pi r^2\).

Let's denote the side length of the square as
\(s\) and the radius of each semicircle as
\(r\).

The area of the heart-shaped decoration is given by the formula:


\[A_{\text{heart}} = A_{\text{square}} + 2 \cdot A_{\text{semicircle}}.\]

1. From the first statement, the diagonal of the square is
\(10√(2)\).
Using the Pythagorean theorem
(\(d^2 = s^2 + s^2\)), we find
\(s = 10\) cm.

2. The area condition is
\(s^2 - 2 \cdot (1)/(2)\pi r^2 = 100 - 25\pi\).
Substituting
\(s = 10\), we get
\(100 - \pi r^2 = 100 - 25\pi\). Solving for
\(r\),we find
\(r = 5\).

Therefore, the radius of each semicircle is 5 centimeters, consistent with the calculations from the given information.

In summary, the formula to calculate the area of the heart-shaped decoration is
\(A_{\text{heart}} = s^2 + 2 \cdot (1)/(2)\pi r^2\), where
\(s\) is the side length of the square and
\(r\) is the radius of each semicircle.

User Tklg
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2.6k points
19 votes
19 votes

Answer:

Area = πx² + x² or x²(π + 1)

Explanation:

The area of the heart = area of a circle + area of the square

Note:

1. The 2 semicircles makes 1 full circle

2. The diameter of the circle = the side length of the square

Thus:

Area of the heart = πr² + s²

Where,

r = x

s = x

Formula for area of the heart = π(x²) + x² = πx² + x²

Area = x²(π + 1)

User MartinSGill
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3.0k points