![]() ![]() So here we're gonna say a B c D would be a rectangle. That means this would be representing rhombus. That means this would be and also these are parallel to each other. So we can say both pairs assistant pear, P. ![]() The legs are 6 and 10, so the hypotenuse AB has length sqrt(136). Is it possible to find the radius of the inscribed circle If so, how and what is it Hi Jacky, The diagonals of a rhombus are perpendicular, so ABO is a right triangle with right angle at the center O. Show that all rectangles inscribed in a fixed circle square has maximum area. The circumference of the circle touches all 4 sides of the rhombus. inscribed circle is the incircle the center is the incenter. The maximum area of a rectangle that can be inscribed in a circle of radius 2 units is (in square units). But say this angle would not be equal to 90°. A rhombus is a parallelogram in which all the sides are congruent. ![]() R would be equal to pick you and you do a decent say this would be here PQ of would be equals two RQ. Guidelines Blog NytStnd Docks 10 OFF Promo SHOWME. R would be equal to the supposed one due to submit to city. Circle inscribed to a rhombus by Dagmar Cordano - January 9, 2020. So similarly, in the same way we can say a B will be equal to D. D and both will be parallel and this, we can say this with a B c d would be a rectangle, that we have to prove that P Q r. So here we can see E b c D is a rectangle and similarly it's converse can be also proved because this is a B would be equal to C. So this quad a little would be a rectangle. So we can say one more data, this is a B is parallel to CD and E D is parallel to Bc. So opposing sides are equals and this is the core a later and this would be also pilot because this is the, this is itself a parallelogram or we can say this a rhombus. So we can say since this is a rhombus so we can say here E b would be equal. What kind of correlate er does a B C D seems to be. Now we have given a B c D is a quadrilateral whose vortices are the four points of this tendency. So we can say P Q is equal to Q R and Q r is equals to rs and rs is equals to speak. We can say this is inscribed in a rhombus so we can see that P Q r and S. So this is the figure and we have given this a circle, oh it's inscribed in a rhombus. In this problem, we have given a figure, let me show you first. ![]()
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