Can an isosceles trapezoid can be inscribed in a circle?

Can an isosceles trapezoid can be inscribed in a circle?

The area an isosceles trapezoid is equal to S, and the height is equal to the half of one of the non-parallel sides. If a circle can be inscribed in the trapezoid, find, with the proof, the radius of the inscribed circle. Express your answer in terms of S only.

How do you find the centroid of an isosceles trapezoid?

To obtain the centroid, determine the mid-points of any two sides of the triangle and join them with the vertices opposite the concerned sides to get two medians. The point of intersection of these two medians is the centroid. Being an isosceles triangle does not make any difference.

How do you find the centroid of a trapezoid?

Using centroid of trapezoid formula,

1. x = $\frac{b + 2a}{3(a + b)}$ × h.
2. x = $\frac{5 + 2 \times 12}{3(12 + 5)}$ × 5.
3. If the parallel sides of trapezoid measures 8 cm, 10 cm and the height 9 cm, then find its centroid.
4. Let a and b be the parallel sides of a trapezoid.
5. According to the given,

How do you calculate the CG of a trapezoid?

The center of gravity of a trapezoid can be estimated by dividing the trapezoid in two triangles. The center of gravity will be in the intersection between the middle line CD and the line between the triangles centers of gravity.

How do you prove a trapezoid is isosceles?

One way to prove that a quadrilateral is an isosceles trapezoid is to show:

1. The quadrilateral has two parallel sides.
2. The lower base angles are congruent and the upper base angles are congruent.

The converse statement is proved in the lesson Two parallel secants to a circle cut off congruent arcs under the topic Circles and their properties of the section Geometry in this site: if the trapezoid is inscribed in a circle, then the trapezoid is isosceles.

Can a trapezoid be inscribed in a circle?

If a trapezoid is isosceles, it can be inscribed in a circle. Prove. Proof. The angles LBAD and LABC concluded between these congruent sides are congruent as the base angles of the isosceles trapezoid (see the lesson. Trapezoids and their base angles under the topic Polygons of the section Geometry in this site).

How do you find the radius of a trapezium in triangle ACL?

The circle will always touch the sides of trapezium at their midpoints, Say the midpoints of AB, BD, CD, AC are G, F, H, E and join them with the centre of the circle. Now in Triangle ACL apply the Pythagoras theorem . Now the radius of the circle is simple half of the height and hence the area can be calculated easily.

Are the angles LACB and ladb inscribed in a circle?

It implies that the angles LACB and LADB are congruent as the corresponding angles of congruent triangles. Thus the angles LACB and LADB are congruent and are leaning on the same segment AB. Hence, these angles are inscribed in a circle in accordance with the lesson