The upper-left coordinates on a rectangle are (-3,2)(−3,2)left parenthesis, minus, 3, comma, 2, right parenthesis, and the upper-right coordinates are (6, 2)(6,2)left parenthesis, 6, comma, 2, right parenthesis. The rectangle has a perimeter of 303030 units.
Draw the rectangle on the coordinate plane below.
The upper-left coordinates on a rectangle are (-3,2)(−3,2)left parenthesis, minus, 3, comma, 2, right parenthesis, and the upper-right coordinates are (6, 2)(6,2)left parenthesis, 6, comma, 2, right parenthesis. The rectangle has a perimeter of 303030 units.
Draw the rectangle on the coordinate plane below.
The upper-left coordinates on a rectangle are (-3,2)(−3,2)left parenthesis, minus, 3, comma, 2, right parenthesis, and the upper-right coordinates are (6, 2)(6,2)left parenthesis, 6, comma, 2, right parenthesis. The rectangle has a perimeter of 303030 units.
Draw the rectangle on the coordinate plane below.
The upper-left coordinates on a rectangle are (-3,2)(−3,2)left parenthesis, minus, 3, comma, 2, right parenthesis, and the upper-right coordinates are (6, 2)(6,2)left parenthesis, 6, comma, 2, right parenthesis. The rectangle has a perimeter of 303030 units.
Draw the rectangle on the coordinate plane below.
Answers
Given:
The upper-left coordinates on a rectangle are (-3,2)(−3,2)left parenthesis, minus, 3, comma, 2, right parenthesis, and the upper-right coordinates are (6, 2)(6,2)left parenthesis, 6, comma, 2, right parenthesis. The rectangle has a perimeter of 303030 units.
To find:
Draw the rectangle on the coordinate plane below.
Solution:
From given, we have,
The upper-left coordinates on a rectangle are (-3,2) and the upper-right coordinates are (6, 2).
using distance formula, we will find the length of the rectangle
d = √[(x2 - x1)² + (y2 - y1)²]
d = √[(6 + 3)² + (2 - 2)²]
d = √[9²]
d = 9
Therefore, the length of the rectangle is 9 units.
⇒ l = 9 units
The rectangle has a perimeter of 30 units.
The perimeter of the rectangle is given by,
P = 2(l + b)
where, l = length of the rectangle
b = breadth of the rectangle
30 = 2(9 + b)
15 = 9 + b
b = 15 - 9
⇒ b = 6 units.
The lower coordinates of the rectangle should be such that the sum of the y-axis coordinates equals 6 units.
From the attached figure it's clear that the lower coordinates of the rectangle are (-3, -4) and (6, -4)
Answer:
Coordinates are (-3,2), (6,2), (-3,-4), (6,-4)
The top left and right points are a given and the length between those points is 9+9 for top and bottom which is 18. You cannot leave the bottom right and left points are their given spots because then it would not have a perimeter of 30, so you need to take each point and go down two full spaces/numbers. The side would each be six giving you a total of 12. 12+18 =30
Step-by-step explanation:
Answer: (-3,2), (6,2), (-3,-4), (6,-4)