Find the values of m and n. The upper right angle at the intersection of the transversal and upper parallel line is 2 m degrees. The upper right angle at the intersection of the transversal and lower parallel line is left parenthesis 4 m minus 120 right parenthesis degrees. The lower left angle at the intersection of the transversal and lower parallel line is 5 n degrees. (1 point) Responses
m = 60, n = 12
m = 60, n = 12
m = 50, n = 20
m = 50, n = 20
m = 50, n = 16
m = 50, n = 16
m = 60, n = 24
The correct answer is:
m = 60, n = 12
that was not the right anwser
I apologize for the mistake. Let's go through the information given again and find the correct values for m and n.
We are given the following information:
1. The upper right angle at the intersection of the transversal and upper parallel line is 2m degrees.
2. The upper right angle at the intersection of the transversal and lower parallel line is (4m - 120) degrees.
3. The lower left angle at the intersection of the transversal and lower parallel line is 5n degrees.
To find the values of m and n, we need to set up an equation based on the information given.
From statement 1, we have an upper right angle of 2m degrees.
From statement 2, we have an upper right angle of (4m - 120) degrees.
Since the upper right angles should be equal, we can set up the equation: 2m = (4m - 120)
Simplifying the equation, we get: 120 = 2m
Dividing both sides by 2, we find: m = 60
Now, let's substitute the value of m into statement 3 to find the value of n.
From statement 3, we have a lower left angle of 5n degrees.
Substituting m = 60 into the equation, we get: 5n = 5(60) = 300
Therefore, the values of m and n are:
m = 60
n = 60
no thats still not right
I apologize again for the incorrect response. Let's go through the information again and find the correct values for m and n.
We are given the following information:
1. The upper right angle at the intersection of the transversal and upper parallel line is 2m degrees.
2. The upper right angle at the intersection of the transversal and lower parallel line is (4m - 120) degrees.
3. The lower left angle at the intersection of the transversal and lower parallel line is 5n degrees.
From statement 1, we have an upper right angle of 2m degrees.
From statement 2, we have an upper right angle of (4m - 120) degrees.
Since the upper right angles should be equal, we can set up the equation: 2m = (4m - 120)
Simplifying the equation, we get: 120 = 2m
Dividing both sides by 2, we find: m = 60
Now, let's substitute the value of m into statement 3 to find the value of n.
From statement 3, we have a lower left angle of 5n degrees.
Substituting m = 60 into the equation, we get: 5n = 5(60) = 300
Therefore, the values of m and n are:
m = 60
n = 60
I apologize again for the repeated incorrect response. I appreciate your patience.
Question Which solution for the value of x in the figure is incorrect? 2x = x + 75 x = 75 2x + x + 75 = 180 3x + 75 = 180 3x = 105 x = 35 (1 point) Responses
Solution A is incorrect.
Solution A is incorrect.
Solution B is incorrect.
Solution B is incorrect.
Both solutions are incorrect.
Both solutions are incorrect.
Neither solution is incorrect.
The correct answer is:
Neither solution is incorrect.