To determine the values of x and y for which LMNO must be a parallelogram, we need to make sure that the opposite sides of the parallelogram are equal in length.
Given that ON = 8x - 8 and LM = 7x + 4, we can set up the equation ON = LM:
8x - 8 = 7x + 4
x = 12
So x = 12 satisfies the equation ON = LM.
Next, given that NM = x - 5 and OL = 3y - 6, we can set up the equation NM = OL:
x - 5 = 3y - 6
12 - 5 = 3y - 6
7 = 3y - 6
13 = 3y
y = 13/3
Therefore, x = 12 and y = 13/3 is the solution that satisfies the conditions for LMNO to be a parallelogram.
In a parallelogram ON=8x-8=LM=7x+4 and NM=x-5=OL=3y-6 find the values of x and y for which LMNO must be a parellogram.
5 answers
could i have a whole number
Apologies for the confusion. Let's solve for whole numbers x and y.
Given that ON = 8x - 8 and LM = 7x + 4, we can set up the equation ON = LM:
8x - 8 = 7x + 4
x = 12
So x = 12 satisfies the equation ON = LM.
Next, given that NM = x - 5 and OL = 3y - 6, we can set up the equation NM = OL:
x - 5 = 3y - 6
12 - 5 = 3y - 6
7 = 3y
y = 7/3
Since we want to find whole numbers, y = 7/3 does not give us a whole number solution. Therefore, there is no combination of whole numbers x and y for which LMNO must be a parallelogram.
Given that ON = 8x - 8 and LM = 7x + 4, we can set up the equation ON = LM:
8x - 8 = 7x + 4
x = 12
So x = 12 satisfies the equation ON = LM.
Next, given that NM = x - 5 and OL = 3y - 6, we can set up the equation NM = OL:
x - 5 = 3y - 6
12 - 5 = 3y - 6
7 = 3y
y = 7/3
Since we want to find whole numbers, y = 7/3 does not give us a whole number solution. Therefore, there is no combination of whole numbers x and y for which LMNO must be a parallelogram.
i meant mixed number
Apologies for the confusion. Let's solve for mixed numbers x and y.
Given that ON = 8x - 8 and LM = 7x + 4, we can set up the equation ON = LM:
8x - 8 = 7x + 4
x = 12
So x = 12 satisfies the equation ON = LM.
Next, given that NM = x - 5 and OL = 3y - 6, we can set up the equation NM = OL:
x - 5 = 3y - 6
12 - 5 = 3y - 6
7 = 3y
y = 7/3
Therefore, x = 12 and y = 7/3 is the solution that satisfies the conditions for LMNO to be a parallelogram with mixed number values.
Given that ON = 8x - 8 and LM = 7x + 4, we can set up the equation ON = LM:
8x - 8 = 7x + 4
x = 12
So x = 12 satisfies the equation ON = LM.
Next, given that NM = x - 5 and OL = 3y - 6, we can set up the equation NM = OL:
x - 5 = 3y - 6
12 - 5 = 3y - 6
7 = 3y
y = 7/3
Therefore, x = 12 and y = 7/3 is the solution that satisfies the conditions for LMNO to be a parallelogram with mixed number values.