Answer:
Square; 68.0; 289.0
Explanation:
1. Shape
Your shape is plotted in the graph below.
It looks like a square.
2. Proof
To prove that the object is a square , we must show that adjacent sides are perpendicular and that the diagonals are perpendicular.
(a) Sides
If the slopes of thee lines are negative reciprocals, the lines are perpendicular, and the angles are 90 °.
The formula for the slope (rate of change) m of a straight line is
m = Δy/Δx = (y₂ -y₁)/(x₂ - x₁)
(i) AB
m = [-11 - (-19)]/(25 - 10) = (-11 +19)/15 = 8/15
(ii) BC
m = [-4 - (-19)]/(2 - 10) = (-4 +19)/(-8) = -15/(-8)= -15/8
The slopes of AB and BC are negative reciprocals, so ∠B = 90 °.
(iii) CD
m = [4 - (-4)]/(17 - 2) = (4 +4)/15 = 8/15
The slopes of BC and CD are negative reciprocals, so ∠C = 90 °.
(iv) AD
m = [4 - (-11)]/(17 - 25) = (4 +11)/(-8) = 15/(-8)= -15/8
The slopes of CD and AD are negative reciprocals, so ∠D = 90 °.
Also, the slopes of AD and AB are negative reciprocals, so ∠ = 90 °.
All four angles are 90°.
(b)Diagonals
AC: m = [-11 - (-4)]/(25- 2) = (-11 +4)/23 = -7/23
BD: m = [4 - (-19)]/(17 - 10) = (4 +19)/7 = 23/7
The slopes are negative reciprocals, so the diagonals are perpendicular.
The adjacent sides of quadrilateral ABCD have negative reciprocal slopes, 8/15 and -15/8, so, they form right angles and the slopes of the diagonals are negative reciprocals, -7/23 and 23/7, so they form right angles. Therefore the quadrilateral is a square.
3. Perimeter
The formula for the perimeter of a square is
P = 4s
where s is the side length
AB² = 8² + 15²
s² = 64 + 225
s² = 289.0
s = 17.0
P = 4 × 17.0 = 68.0
4. Area
The formula for the area of a square is
A = s²
A = 289.0