The formula to calculate the area of an ellipse is:
\[ \text{A} = \pi \times a \times b \]
Where:
An ellipse is a curve on a plane surrounding two focal points such that the sum of the distances to the two focal points is constant for every point on the curve. In simpler terms, it is a shape that resembles a flattened circle. Ellipses are important in physics, astronomy, and engineering, and understanding their properties, such as area, is crucial in these fields.
Let's assume the following values:
Step 1: Multiply the length of the major axis by the length of the minor axis:
\[ 5 \times 3 = 15 \]
Step 2: Multiply the result by \( \pi \):
\[ 15 \times \pi \approx 47.12 \]
Therefore, the area of the ellipse is approximately 47.12 square units.
Let's assume the following values:
Step 1: Multiply the length of the major axis by the length of the minor axis:
\[ 7 \times 4 = 28 \]
Step 2: Multiply the result by \( \pi \):
\[ 28 \times \pi \approx 87.96 \]
Therefore, the area of the ellipse is approximately 87.96 square units.
