9000026005
Level:
C
Which part of the plane describes the solution of the following system of
inequalities?
\[\begin{aligned}
x\leq &3 & &
\\5x > &9 - 3y & &
\end{aligned}\]
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Systems of linear equations and inequalities
9000026006
Level:
C
In the picture, the shaded region corresponds to the set of points that is the solution to one of the given systems of inequalities. Which of the systems is it?
\(\begin{aligned}x +\phantom{ 2}y&\geq 3 &
\\y - 2x& < -1
\\ \end{aligned}\)
\(\begin{aligned}x +\phantom{ 2}y& > 3 &
\\y - 2x& < -1
\\ \end{aligned}\)
\(\begin{aligned}x +\phantom{ 2}y&\leq 3 &
\\y - 2x& < -1
\\ \end{aligned}\)
\(\begin{aligned}x +\phantom{ 2}y& < 3 &
\\y - 2x& > -1
\\ \end{aligned}\)
9000026007
Level:
C
In the picture, the shaded region corresponds to the set of points that is the solution to one of the given systems of inequalities. Which of the systems is it?
\(\begin{aligned}y & < 2 &
\\y + 1&\geq x + 1
\\ \end{aligned}\)
\(\begin{aligned}y &\geq 2 &
\\y + 1& < x + 1
\\ \end{aligned}\)
\(\begin{aligned}y & > 2 &
\\y + 1&\leq x + 1
\\ \end{aligned}\)
\(\begin{aligned}y&\leq 2 &
\\y& > x
\\ \end{aligned}\)
9000026008
Level:
C
In the picture, the shaded region corresponds to the set of points that is the solution to one of the given systems of inequalities. Which of the systems is it?
\(\begin{aligned}2x - y&\leq 2 &
\\2x + y&\geq - 2
\\ \end{aligned}\)
\(\begin{aligned}2x - y&\geq 2 &
\\2x + y&\geq - 2
\\ \end{aligned}\)
\(\begin{aligned}2x - y&\leq 2 &
\\2x + y&\leq - 2
\\ \end{aligned}\)
\(\begin{aligned}2x - y&\geq 2 &
\\2x + y&\leq - 2
\\ \end{aligned}\)
9000026009
Level:
C
In the picture, the shaded region corresponds to the set of points that is the solution to one of the given systems of inequalities. Which of the systems is it?
\(\begin{aligned}2y -\phantom{ 2}x& < 4&
\\x - 2y & < 2
\\ \end{aligned}\)
\(\begin{aligned}2y -\phantom{ 2}x& < 4&
\\x - 2y & > 2
\\ \end{aligned}\)
\(\begin{aligned}2y - x& > 4 &
\\2y - x& < -2
\\ \end{aligned}\)
\(\begin{aligned}2y - x& > 4 &
\\2y - x& > -2
\\ \end{aligned}\)
9000026010
Level:
C
In the picture, the shaded region corresponds to the set of points that is the solution to one of the given systems of inequalities. Which of the systems is it?
\(\begin{aligned}x &\leq 3 &
\\5x& < 9 - 3y
\\ \end{aligned}\)
\(\begin{aligned}x & < 3 &
\\5x& < 9 - 3y
\\ \end{aligned}\)
\(\begin{aligned}x & > 3 &
\\5x& < 9 - 3y
\\ \end{aligned}\)
\(\begin{aligned}x &\leq 3 &
\\5x& > 9 - 3y
\\ \end{aligned}\)
9000023908
Level:
A
Let \([x;y]\)
be the solution of the system
\[\begin{aligned}
2x - y & = -1, & &
\\4x - y & = 1. & &
\end{aligned}\]
In the following list identify a true statement.
\(y\) is
a prime number.
\(x\) is
a prime number.
\(x + y\) is
a prime number.
\(x - y\) is
a prime number.
9000023909
Level:
A
Let \([x;y]\)
be the solution of the system
\[\begin{aligned}
2x + 3y & = 0, & &
\\3x + 2y & = 5. & &
\end{aligned}\]
In the following list identify a true statement.
\(- 3\leq y\leq - 1\)
\(- 1\leq x\leq 2\)
\(- 2\leq x\leq 2\)
\(2\leq y\leq 4\)
9000023910
Level:
A
Let \([x;y]\)
be the solution of the system
\[\begin{aligned}
3x - y & = 1, & &
\\2x - y & = -1. & &
\end{aligned}\]
In the following list identify a true statement.
\(x\)
divides \(6\).
\(x\)
divides \(3\).
\(y\)
divides \(4\).
\(y\)
divides \(6\).
9000023901
Level:
A
Solve the following system and write the solution as the ordered pair
\([x,y]\).
\[\begin{aligned}
x + y & = -1 & &
\\x - y & = 5 & &
\end{aligned}\]
\([2;-3]\)
\([-2;1]\)
\([3;-2]\)
\([-3;2]\)