What is the most precise name for quadrilateral ABCD with vertices A(–3, 2), B(–1, 4), C(4, 4), and D(2, 2)?
1. parallelogram
2. rhombus
3. quadrilateral
4. rectangle
just took the test
1. (a+c,b)
2. parallelogram
3. kite
4. 360
5. 130
6. 73: 107
7. 7
8. 157.5
9. greater than
10. is parallelogram, but sadly you'll have to write it in your own words
11. rhombus (same as 10, writing it in your own words)
12. y=14
13. I don't even know this one honestly
hopefully this helps, lemme know if any of them is wrong :)
1. Parallelogram.
BC and AD are the hor. sides.
AB and CD are the slant sides.
Y’all were no help lol
who is right bruh?
1. (a,b)
2. parallelogram
3. kite
4. 360
5. 130
6. 64
7. 7
8. 3600
9. decreases
10. rhombus
are those correct?
To determine the most precise name for the given quadrilateral ABCD, we need to analyze its properties.
First, let's plot the points A(–3, 2), B(–1, 4), C(4, 4), and D(2, 2) on a coordinate plane.
Now, let's examine the sides of the quadrilateral.
AB is a line segment with a slope of (4 - 2) / (–1 - (–3)) = 2 / 2 = 1. Since the slope is not equal to 0, AB is not parallel to the x-axis.
Similarly, CD is a line segment with a slope of (2 - 4) / (2 - 4) = -2 / -2 = 1. Again, CD is not parallel to the x-axis.
AC is a line segment with a slope of (4 - 2) / (4 - (–3)) = 2 / 7. Since the slope is not equal to 0, AC is not parallel to the x-axis.
BD is a line segment with a slope of (4 - 2) / (–1 - 2) = 2 / -3. Since the slope is not equal to 0, BD is not parallel to the x-axis.
Next, let's examine the angles of the quadrilateral.
Angle ABC can be calculated using the slope of line AB and slope of line BC. The slope of AB is 1 and the slope of BC is (4 - 4) / (4 - (–1)) = 0 / 5 = 0. Since the slopes are not equal, angle ABC is not a right angle.
Similarly, angle BCD can be calculated using the slope of line BC and slope of line CD. The slope of BC is 0 and the slope of CD is (2 - 4) / (2 - 4) = -2 / -2 = 1. Since the slopes are not equal, angle BCD is not a right angle.
From the analysis, we can conclude that the given quadrilateral ABCD is a quadrilateral since it has four sides and four angles. Additionally, since none of its sides are parallel to the x-axis and none of its angles are right angles, we cannot say that it is a parallelogram, rhombus, or rectangle.
Therefore, the most precise name for the quadrilateral ABCD is "quadrilateral" (option 3).
Isosceles Trapezoid
Daddy is right
1. (a+c,b)
2. rhombus
3. kite
4. 50
5. 142
6. 50
7. 5
8. 135
9. decreases
i don’t know the others <3