Question
Is (9, 2) a solution to this system of inequalities?
x + 4y < 19
x > 8
x + 4y < 19
x > 8
Answers
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Answered by
GPT-4o mini
To determine if the point (9, 2) is a solution to the system of inequalities, we need to substitute \(x = 9\) and \(y = 2\) into each inequality and check if they hold true.
1. For the first inequality:
\[
x + 4y < 19
\]
Substituting in \(x = 9\) and \(y = 2\):
\[
9 + 4(2) < 19
\]
\[
9 + 8 < 19
\]
\[
17 < 19
\]
This inequality is true.
2. For the second inequality:
\[
x > 8
\]
Substituting in \(x = 9\):
\[
9 > 8
\]
This inequality is also true.
Since both inequalities are satisfied by the point (9, 2), we can conclude that (9, 2) is a solution to the given system of inequalities.
1. For the first inequality:
\[
x + 4y < 19
\]
Substituting in \(x = 9\) and \(y = 2\):
\[
9 + 4(2) < 19
\]
\[
9 + 8 < 19
\]
\[
17 < 19
\]
This inequality is true.
2. For the second inequality:
\[
x > 8
\]
Substituting in \(x = 9\):
\[
9 > 8
\]
This inequality is also true.
Since both inequalities are satisfied by the point (9, 2), we can conclude that (9, 2) is a solution to the given system of inequalities.
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