The correct equation to determine the value of the two adjacent angles is:
4n + 22 + 8n - 10 = 180
Which equation can be used to determine the value of these two adjacent angles? (1 point) Responses (4n + 22) + (8n - 10) = 90 (4n + 22) + (8n - 10) = 90 (4n + 22) + (8n - 10) = 180 (4n + 22) + (8n - 10) = 180 (4n + 22) - (8n - 10) = 180 (4n + 22) - (8n - 10) = 180 4n + 22 = 8n - 10
3 answers
Determine the value of n in the angle pair above. (1 point) Responses n =12 n =12 n = 14 n = 14 n = 148 n = 148 n = 168
To determine the value of n, we can solve the equation from the previous step:
4n + 22 + 8n - 10 = 180
Combine like terms:
12n + 12 = 180
Subtract 12 from both sides:
12n = 168
Divide by 12:
n = 14
Therefore, the value of n in the angle pair is n = 14.
4n + 22 + 8n - 10 = 180
Combine like terms:
12n + 12 = 180
Subtract 12 from both sides:
12n = 168
Divide by 12:
n = 14
Therefore, the value of n in the angle pair is n = 14.