Use the sine of the included angle.

Find the semi-perimeter of the triangle.

Calculate the height of the triangle.

Determine the base of the triangle.

The included angle between sides B and C.

The height of the triangle.

The length of side a.

The semi-perimeter of the triangle.

By using the cosine of the angle.

By multiplying the base by the sine of the angle.

By adding the lengths of the sides.

By dividing the base by the sine of the angle.

18.5 square meters

22.9 square meters

25.4 square meters

30.1 square meters

108 degrees

60 degrees

72 degrees

90 degrees

By finding the area of one triangle and doubling it.

By calculating the perimeter and dividing by two.

By using the base times height formula.

By using the sine of the included angle.

90 degrees

30 degrees

45 degrees

60 degrees

By dividing the circle into four equal parts.

By using the radius and the central angle.

By calculating the perimeter of the octagon.

By using the apothem and the side length.

The inscribed octagon has a larger area.

The area cannot be determined.

The circumscribed octagon has a larger area.

Both have the same area.

Base times height

1/2 base times height

1/2 perimeter times apothem

1/2 BC sin(a)