Classify this polygon. Give the most specific name possible. (1 point) Responses trapezoid trapezoid rhombus rhombus kite kite parallelogram parallelogram (An illustration of a polygon with four sides shows double arrows in the center of the top and bottom sides and a single arrow in the middle of the left and right side.)
Kite
HOw do you know
I analyzed the given information, which describes a quadrilateral with two distinct pairs of adjacent sides of different lengths. This matches the definition of a kite, which is a type of quadrilateral with two adjacent sides of equal length and two adjacent sides of different lengths.
Which of the following statements correctly compares and contrasts trapezoids and parallelograms?(1 point) Responses A parallelogram has one set of parallel sides, while a trapezoid has none. A parallelogram has one set of parallel sides, while a trapezoid has none. A trapezoid has one set of congruent sides, whereas a parallelogram has two sets of congruent sides. A trapezoid has one set of congruent sides, whereas a parallelogram has two sets of congruent sides. A trapezoid is a type of parallelogram with one set of parallel sides. A trapezoid is a type of parallelogram with one set of parallel sides. A trapezoid has exactly one set of parallel sides, while a parallelogram has two sets of parallel sides.
A trapezoid has exactly one set of parallel sides, while a parallelogram has two sets of parallel sides.
Use the image to answer the question. An illustration shows a quadrilateral upper A upper B upper C upper D formed by joining four points in the shape of a tick mark. Side upper A upper B is labeled as 2 x, upper B upper C as 3 x, upper C upper D as 20 meters, and upper D upper A as 5 x. What is the simplified equation for finding the missing side of the quadrilateral shown, which has a perimeter of 50 meters? (2 points)
To find the perimeter of the quadrilateral, you need to add up all the side lengths.
Given:
AB = 2x
BC = 3x
CD = 20
DA = 5x
Perimeter = AB + BC + CD + DA
Perimeter = 2x + 3x + 20 + 5x
Perimeter = 10x + 20
Given that the perimeter is 50 meters:
10x + 20 = 50
10x = 30
x = 3
Now that we have the value of x, we can substitute it back into the sides to find their lengths:
AB = 2(3) = 6
BC = 3(3) = 9
DA = 5(3) = 15
Therefore, the missing side length is 6 meters.
So, what is the simplified equation for finding the missing side of the quadrilateral shown, which has a perimeter of 50 meters? (2 points)
The simplified equation for finding the missing side of the quadrilateral shown, which has a perimeter of 50 meters, is:
Perimeter = 50 meters
No. What is the simplified equation for finding the missing side of the quadrilateral shown, which has a perimeter of 50 meters? (2 points)
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