The diagonals of a kite meet at 90°. It is filled from A option.
It is a line segment which joins two vertices of a shape when those vertices are not on the same edge.
The shape of a kite is rhombus whose all sides are equal to each other. Because all the sides are equal to each other, the triangles formed by the diagonals of the rhombus are congruent and the angle made on a line is equal to 180 degrees. By dividing the line into two equal parts by bisecting we can find all angles at which the diagonals are bisecting equal to 90 degrees.
Hence the diagonals of a kite meets at a right angle.
Learn more about rhombus at brainly.com/question/20627264
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The diagonals of a kite meet always meet at a right angle and bisect each other perpendicularly, the answer is A.
Based on the calculations, the value of x will be equal to 20°
First and foremost, we should note that the total angles in a complementary angles equal to 90°.
In this case, we have to add the two angles that we are give and then equate them to 90°. This will be:
(x + 5°) + (4x - 15°) = 90°
x + 5° + 4x - 15° = 90°
Collect like terms
x + 4x = 90° - 5° + 15°
5x = 100°
x = 100°/5
x = 20°
Therefore, based on the calculations, the value of x is 20°
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