![]() ![]() Our units for area will always be square units. ![]() This means that the area of the kite to the nearest tenth is 61.9 square inches. If the deciding number is five or greater, we round up. This is also called expanding the brackets and gives us an answer of 18 root five plus six root 13.Īs we need to give our answer to the nearest tenth, we need to type this into the calculator. We could distribute the parentheses at this stage by multiplying six by three root five and six by root 13. Both two and 12 can be divided by two, leaving us with three root five plus root 13 multiplied by six. Once we’ve multiplied these two lengths, we need to halve the answer or divide by two. This needs to be multiplied by the length of □□, which is 12. We add the length of □□ to the length of □□. The length □□ is equal to three root five plus root 13. We will now clear some space to calculate the area. Finally, square rooting both sides of this equation gives us □ is equal to root 13. Subtracting 36 from both sides gives us □ squared is equal to 13. So we have □ squared plus 36 is equal to 49. Repeating this process to calculate the length of □□, we have □ squared plus six squared is equal to seven squared. The length of □□ is three root five inches. This can be simplified to three root five. Square rooting both sides gives us □ is equal to root 45. Subtracting 36 from both sides of this equation gives us □ squared is equal to 45. Six squared is equal to 36, and nine squared is 81. Substituting in the lengths gives us □ squared plus six squared is equal to nine squared. If we consider triangle □□□, then □□ is the hypotenuse as it is the longest side opposite the right angle. ![]() This states that in any right-angled triangle, □ squared plus □ squared is equal to □ squared, where □ is the length of the hypotenuse and □ and □ are the lengths of the shorter sides of the triangle. on a series of BODIPY-dye-labeled switchable resorcin4arene cavitands. We can calculate the length of □□, labeled □, and □□, labeled □, using the Pythagorean theorem. Their switching behavior from the 'vase' to 'kite' conformations in bulk. As both of these are equal to six inches, the length of □□ is 12 inches. The length of □□ is equal to the length of □□. We are told that the length of □□ is nine inches, the length of □□ is seven inches, and the length of □□ is six inches. In this question, we’ll calculate the area by multiplying the length of □□ by the length of □□ and then dividing by two. We know that the two diagonals in a kite meet at right angles and that the area of a kite is equal to □ multiplied by □ divided by two, where □ and □ are the two diagonals of the kite. The shorter diagonal divides the kite into 2 isosceles triangles. The kite can be viewed as a pair of congruent triangles with a common base. Angles opposite to the main diagonal are equal. A kite is symmetrical about its main diagonal. Determine the area of the kite to the nearest tenth. Kite has 2 diagonals that intersect each other at right angles. □□□□ is a kite, where □□ equals nine inches, □□ equals seven inches, and □□ equals six inches. ![]()
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