Circles

1103077108

Level:

The figure shows an equilateral triangle whose side is \( 10\,\mathrm{cm} \) long. The circular sector inside the triangle has the centre at one of the vertices of the triangle, and the arc touches the opposite side. Calculate the area of the sector. Round the result to one decimal place.

\( 39.3\,\mathrm{cm}^2 \)

\( 37.5\,\mathrm{cm}^2 \)

\( 14.4\,\mathrm{cm}^2 \)

\( 3.75\,\mathrm{cm}^2 \)

1103077107

Level:

The figure shows an equilateral triangle whose side is \( 10\,\mathrm{cm} \) long. The circular sector inside the triangle has the centre at one of the vertices of the triangle, and the arc touches the opposite side. Find the ratio of the circumference of the sector to the perimeter of the triangle. Round the result to one decimal place.

\( 0.9 \)

\( 0.5 \)

\( 0.8 \)

\( 1.5 \)

1103077106

Level:

Let an equilateral triangle have a side of length of \( 10\,\mathrm{cm} \). Suppose there is a circular sector inside the triangle that has the centre at one of the vertices of the triangle, and the arc touches the opposite side (see the picture). Calculate the length of the arc of the sector. Round the result to two decimal places.

\( 9.07\,\mathrm{cm} \)

\( 8.62\,\mathrm{cm} \)

\( 8.93\,\mathrm{cm} \)

\( 9.05\,\mathrm{cm} \)

1103077210

Level:

The picture shows a roundabout with the radius of \( 6\,\mathrm{m} \). Inside the roundabout there is a flower bed, which has the shape of an equilateral triangle inscribed in it. The remaining part inside the roundabout is the lawn. Calculate the area of the lawn.

\( 66.33\,\mathrm{cm}^2 \)

\( 46.77\,\mathrm{cm}^2 \)

\( 113.10\,\mathrm{cm}^2 \)

\( 24.66\,\mathrm{cm}^2 \)

1103077209

Level:

A semicircle is inscribed in a triangle \( KLM \) so that the diameter of the semicircle is parallel to side \( KL \) (see the picture). The length of \( KL \) is \( 8\,\mathrm{cm} \) and the height to side \( KL \) is \( 4\,\mathrm{cm} \) long. Determine the radius of the semicircle.

\( 2\,\mathrm{cm} \)

\( 4\,\mathrm{cm} \)

\( 6\,\mathrm{cm} \)

\( 8\,\mathrm{cm} \)

1003077208

Level:

Find the length of the diagonal of a square that has the same area as the circle with a radius of \( 10\,\mathrm{cm} \).

\( 10\sqrt{2\pi}\,\mathrm{cm} \)

\( 10\sqrt{\pi}\,\mathrm{cm} \)

\( \sqrt{20\pi}\,\mathrm{cm} \)

\( 10\,\mathrm{cm} \)

1003077207

Level:

Given a circle of which the area and the circumference have the same numerical value, determine the diameter of the circle in \( \mathrm{cm} \).

\( 4 \)

\( 2 \)

\( \sqrt2 \)

\( \pi \)

1103077206

Level:

The circumference of a semicircle is \( 10\,\mathrm{cm} \). Find its radius.

\( \frac{10}{\pi+2}\,\mathrm{cm} \)

\( \frac{10}{\pi}\,\mathrm{cm} \)

\( \sqrt{\frac{10}{\pi}}\,\mathrm{cm} \)

\( \frac{10}{\pi+1}\,\mathrm{cm} \)

1103077205

Level:

A farmer has a fenced rhombus shaped garden with a side length of \( 4\,\mathrm{m} \). At one corner where the angle between the sides is \( 60^{\circ} \) the farmer tied a goat (see the picture). Of what length has to be the rope so that the goat grazes down exactly half the area of the garden? Round the result to one decimal place.

\( 3.6\,\mathrm{m} \)

\( 3.2\,\mathrm{m} \)

\( 4.1\,\mathrm{m} \)

\( 2.9\,\mathrm{m} \)

1103077204

Level:

Given a circle, the length of the chord \( AB \) is \( 16\,\mathrm{cm} \) and the height \( v \) of the corresponding circular segment is \( 5\,\mathrm{cm} \) (see the picture). Calculate the area of the segment. Round the result to two decimal places.

\( 57.29\,\mathrm{cm}^2 \)

\( 55.12\,\mathrm{cm}^2 \)

\( 47.12\,\mathrm{cm}^2 \)

\( 63.12\,\mathrm{cm}^2 \)

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