414-3 Rhombus and Square On 1 — 2, refer to rhombus ABCD where diagonals AC and BD intersect at E. Given rho bus ABCD where diagonals AC and BD intersects at E. round to the nearest tenth. Find the side length of the square. ID: A 2 7 ANS: REF: 010025a 8 ANS: 14 2. As shown in the diagram of rectangle ABCD below, diagonals AC and BD intersect at E. If AE and BD- AC is 16, then the length of 1) 4) 6 10 12 In the diagram below of rectangle RSTU, diagonals and intersect at O.If and , what is the length of ? the length of a rectangle is three times of its width. 7. The areas of the large and small squares are 25 and 7, respectively. A rhombus has four congruent sides. Two of the right triangles she cut are shown below. O' 0k If AB = 36 and AC = 12, what is the length of AD? Ex 8.1, 8 ABCD is a rectangle in which diagonal AC bisects ∠ A as well as ∠ C. Show that: ABCD is a square Given: Rectangle ABCD where AC bisects.. What is the length of a diagonal of a small rectangle? Math PLEASE CHECK MY ANSWERS 1, calculate the slant height for a given cone. 1) 32º 2) 52º 3) 58º 4) 64º 18 If the rectangle below is continuously rotated about side w, which solid figure is formed? . If m∠DAB =32°, what is m∠BDC? Use this space for computations. (1) 32 (3) 3 (2)6 23 In the diagram of circle O below, chord AB intersects chord CD at £, DE = 2x + 8, EC = 3, AE = 4x-3, and EB = 4. If triangle ABC ~ triangle DEF, with right angles B and E, BC = 15 cm, and AC = 17 cm, what is … c = 142 +142 = 2×142 =14 2 REF: 010736a 9 ANS: 17. What is the value of x? 22 In the diagram below of right triangle ACB, altitude CD is drawn to hypotenuse AB. if the length of the diagonal is 8 root 10cm then the area of the parameter of the rectangle ? 17 In the diagram below of ACD, DB is a median to AC, and AB ≅DB. 1) pyramid 2) rectangular prism 3) cone 4) cylinder 19 In the diagram below, the circle shown … As shown in the diagram of rectangle ABCD below, diagonals AC and BD intersect at E. If AE = x +2 and BD = 4x – 16, then the length of AC is The length of each side of the square is 56 4 =14. A square is inscribed in triangle ABC as shown below. 3) A large square is divided into 4 small congruent rectangles and a small square as shown. The figure below shows a rectangle ABCD having diagonals AC and DB: Jimmy wrote the following proof to show that the diagonals of rectangle ABCD are congruent: